Maths-
General
Easy
Question
In the adjoining figure, it is given that
find the measure of ECD .....
![](data:image/png;base64,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)
- 105°
- 110°
- 115°
- 120°
The correct answer is: 105°
Related Questions to study
Maths-
In the given figure
and t is a transversal If
and
find the value of x
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJsAAAB2CAYAAADfu+HQAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AABAgSURBVHhe7Z0FdFVXFoapUncX6u6uFOpeoHgp0NLgUsIKDDIUGWQChQIzUKQ4BEkgCy3urkmDBgjuToRQIHvyHe7Nury8hPuS2zczeftba5dyyLP7/nOP7f2nkChKkFCxKUFDxaYEDRWbEjRUbErQULEpQUPFpgQNFZsSNFRsStBQsf0FbNy4Ufr37y+zZ8+2WhRQsXnM/v37pWLFilKoUCF577335Pjx49a/2GTImQz+G3qo2DzkwIED8uOPP8pll11mxHbvvffKb7/9Zv3raUnZv1XWzZsrK/ekSnoIqk3F5hEIrX79+kZkzvjggw8kPf2UyNmDsnZcO6lWqaVErT4gJ63HhRIqNg/IyMiQ8PBwI65rr71Wrr/+ern88svliiuukCJFikh07ASR1G2yJqqx1OyxSnafOGs9MrRQsXnA6dOnpUyZMvLoo49K06ZN5dVXX5W33npLatSokSm6wlKmfJlMrS2X4Y1qSuclh+VEKE7YMlGxeQB3tn379pkYNGiQXHPNNVKpUiVZunSp1KhZRzp1ai57E2Lk75UaSt/5m+Woik3xgrZt25rhtFatWnLmzBk5fORI5or0sKSnHJSk9VvlUPJJOWP9bKihYvOYOnXqGLG1adPGalFsVGwecuzYMSlVqpRcd911EhUVZbUqNio2D/njjz/k5ZdflmeffVaWL19utSo2KjYPiYmJkRtvvFFKliwphw8ftloVGxWbh9iLg7p161otihMVm4dUr17diA3RKdlRsXlEenq6WRwULlxYBg4caLUqTlRsHrFp0yZ5/fXXzSnCvHnzrFbFiYrNIyZNmiR33323fPnll7Jz506rVXGiYvOITp06ySWXXCINGjSQP//802pVnKjYPOKHH34wi4PIyEirRfFFxeYBZ8+elS+++EIuuugiXRzkgorNA3bv3i1vvPGGmbPNnDnTalV8UbF5wJw5c+TBBx80WbmsShX/qNg8oGfPnnLVVVeZjI+UlBSrVfFFxeYBNWvWNIuDn3/+2WpR/KFi84BPPvnEiG3w4MFWi+IPFVs+OXr0qKk5uOGGG2TKlClWq+IPFVs+IW+NIypWo2vWrLFaFX+o2PIJBS7ksJHxoTlsuaNiyyfUi3JMxeKAzV0lZ1Rs+eTDDz80i4MRI0ZYLQUXShbzgyux8SIrVqyQJUuWmLwt5RwnT5409QbksE2dOtVqLXiwdzh8+HBp3769jBs3zlhN5IVcxXbq1ClZvXq19OrVS1588UV555135MiRI9a/Klu2bJFHHnlEXnnlFdm2bZvVWvBITU01G9ZYS1x99dXSsGFDk1K1efNm6yfc4VdsXERWWeyMP/nkk2aYuPTSS6VYsWKmynvHjh0mtm/ffl5wwYmtW7eaSEpKMsHz8cbs4EgnMTHRBF5mxIYNG7Ji/fr1JtatW5cVa9euNcGKz46EhAQTVDUR8fHxWREXF2eCzkKsWrUqK1auXJkV3LHt4DMHEl27dpWbb75Z3n//fZk4caIsW7YsK+yfcbbZwTV0G4wmbmLx4sVZsWjRIlm4cKGJBQsWyPz5801C59y5c83RGr5xs2bNMsFZ7owZM2T69Okybdo0E9yl2cb5/fffswIt0KnQgh2fffaZjB071jgBuCGb2BgyS5Qocd6TErfffrt89NFH5sK+++67Urx4cXOnI4oWLSpvv/228bdgC4CMVfaeKGvjjvj888+b4eaZZ56Rp59+2gj4scceM1sGDz/8sDlXfOCBB+T++++X++67z1hN3XPPPXLXXXfJHXfcYV77tttuk1tvvdV8uaz+CAxc7N7GcdGVV15pzFwwdSHoIBdffHG2z/L/FGSS2MFnsYNFCcFntAOrLjvsa2AHQ71vcK18g2voDK4r1/emm24y15v34Xx/vJchQ4ZY6smdbGIj8a9y5crmRZxPyhvmiyez4c4778xT8PgLBcJyE4jPbSDSQILH2K/D+0b0fG46AB2BDkHH4Avm2vDvdBw60OOPP246FF8OXxKdjM72wgsvmI5HB+QO8dprr5lOSeekk9JZ6bh0YjozRoIc7NPBP/74Y3NKwZ2EVKavvvrK3BCoecDQpmzZslK+fHljQvjNN98Yn5Fvv/3WfI9VqlSRqlWryvfff2+iWrVqEhYWZrZqML7hqA2riNq1a5ugMqxevXomCRSvOYJhk8fwPm090Mm5PpQtMrq4we+djf2ikSNHmgvBBUPNt9xyi7Rr184Mg6TU7Nq1y/y5Z88eE3v37s0yV3EGToxeBRPTvyIOHjzoKg4dOpQVfH7uyFyb2NhYc80I5rQM6XzRfGH83Tc4dfANqul9A9dK3zhx4kS2SE5OzhZM6nMK5mC5RVpa2nnB9xgREWG0wN2ODsU8nvR3Xj/7lk+GZGS2nc3UknP9muMCAVMUBMSYTl49L0KPY/6kiLk2DP0IjrmkE9wmv/76azNXLAiwUOzevbvZ5iE5lPk5bTlyJkUOJMbL8iUJssuRIZ+j2JxwB2MSOX78eKPkUIe7P5Nmhn1E5SxwYUgpW7actPzpp3zvS/2vwJ2Luzaf0119RebdfeYw6dhioKx3WDa5EptyPlxwClwwkGnVqpUZmoDpRJUqlaVC5rxpe+IGOZWWIidC0R8rebXMHtFBGnZeJslWE6jY8gDzmgoVKpjVYHR0tGlj7sfku0TJ0hK/YpokxPSVzh37yJwQzKVMjpsoIyObSddV598FVWx5gMk7m7msytifY/+KVRlD6qLFSzJ/4rQs79teIqo3ktHHzj0mdDgm8ZMGS+cWv8rq01aThYotD7ChzfYI+1JsO5QrV85sEbBhbLM5doB0bdZMxoSa2E4slugu9aViwxjZlma1WajY8gC78ezHsbFcunRpk2Zkz9tsNo/NFFvzFhLrnLSEAskbJW5WtAydmiiHUq02CxVbgLA44OiGxQFDp//zwXRZ2aeV1K9UTXonnRJNPDqHii1A2Pph950NzpytTFMlcXqU9OvRT6ZuPalis1CxBQirTo6jWBxw4K24R8UWIGS1cJrC4oCsFcU9KrYAIZ2HQ2gO0jkfVdyjYgsAfm3QgAEDTKoNyYQcoCvuUbEFAIuDRo0aGbH17t0798NoJRsqtgDg7JOcM7Y9LmRlSopNiP6KqhxRsQUACwK2PPhFaKS9+yUjQ9IObJLV82fLgvjtclT3PbJQsQUA56CkQbP1QTKlP9K3LZUZMQPk1x5tpEm9ehL+y1zJWy1SwUPFFgBjxowx6fEcuJM86Y9TR/fJ7h27ZOeuVRL9SzMJq95bNN30HCo2F5CO3a9fP3nuuedMoQj1COT1c4JABkg2jqyXuMXTZdzCzbIxIUmOW82hjorNBZx/UpDCRi42C/3795fmzZubYhIO4idPnmz9ZCZpu2XL0qkybfEG2aP13OehYnMBG7lsd1BzQAEIsMdGfQapReTmDxo6VA7ET5DoLhESVqux/NSxt8RMXigbQi3rIxdUbC6gaJezUMrxfPfWEF+XLl2kaPFiMqpHE5kWPUR69hkqUYMGS/SUpbJJXU+zcCU2CjdIGKSC3O8cpQBDsQfDJingDJucIvijdq1aUrdBIzl8rODN0LgGlCdSYUUaPIUveSnmcX1no460fv365kVDCfLXMFRhYdCyZUtT4ugPvgQKhvHAKGhgoMM14O5O0ii/VzUvXFBs+HKMHj3aVFljs0C+fajRtGlTM2fjDpcTpIRT8FJQrU4p46TiHxcAKuvRBL4sgeBXbNQIYorCvhLl/iiazUzsA/B1INuBW6kd/oxmbJMZp9GMr9mMP8MZp+mMbTyTk+GMr9mM02jGaTBjm8s4DWacxjK2CYzTCMY2dsEiCkMdHAEwkrGNW3zNW7hWFHO3aNHCGLnkFhx1uQ06t9vANOZCganMhcJpOkPw/4iLzGR8RNADgTUEvnQc47nBr9iY8JJGYz8pgaELXhMs9fGZwG+Ci4sYaf/0009N4EnBm2CFhgkNgW+FbUbDF8f5oq8RDSk7mNHgg4EfxksvvWQm5Oxt4ZfBrv1TTz1lTGko/8dbgwqnhx56KJspDftgtikNhSkIhfeP/4bTkIZjJ9tSgG0Nhko2bem9zNHoYITzOhTEyM24huB6cI0wqfZ3Pbp162YpJ3f8io3lPE/sfEJekC+OLxSDFbfBl59bFClSJM/h7/nchL/3mVMgUD4/YnQ+FkE7gzb7PTnb+DvtthkNHYMOgnsTncU2pHniiSdMR6JD4fZEJ7PNaOh4dEA6o21I8+abb5oOy9SGzksnpkPTuTGkobPbhjTcBD7//HNzg7BLDm1DGirDqIG1DWnwKGHD+rvvvssyouGXwGFUw+sgPq4HHZPOzGccNmyYpZzc8Ss2jEnw3eLJuRPYyuZFuV3bQx1/MvwxHDI0MkwybNpDqT28MtQ6jWhsExrbLMY2bbGNWZyGK4GGbcriVVDcwsXlC+IkgTan0UteglSlC4WvUYxvOI1ifMPXKMYZTsMYZ7AIyC1YFDAaIDI6IItFpix8HrepVjkuEFjuIgDmMaic4YbeSB5XKMHve+eu1qFDB6slNGHuhvVXkyZNjMgQfKDkKDYniI6JLZNB7mKhAndjhhvmf6zGQhnuioxW3Mnyiiux2WT34SrYsBplPsUcimmDkj8CEluowXYGS30m4e6sopTcULHlQt++fc3igO0eJSfS5GDiSolft0ZWrmDfco1s3LZD1i2ZK8uSUtw5T4Y6TBlat25t9pVIJ1JyIkPWR0VKZKdu0rNXN+ne8R/SdchwGfzvdvL3oUnnuQGo2HKA7Rj2ltgM5lxYyYndMqZVY2n5z74y6Ne20jK8iXQcHCWDIv8mraYc0TubGzjmYjOVTVaOvRT/nNnUR5o36Sz9YsdL1L/aSPPIkTJlwkBpXbWW9ElUM0BXcDdjE5OjNzZZFf+cWTtRJsyJkzWbEmTZnJkyM26n7FszU6L6xMiy/al6Z3MDXrksDtgpV7xBxeYHjmfCwsLM0QwrUsUbVGx+IK2JQ20OyTk5UbxBxeYHEiDJ2iAlym2ulnJhVGx+sDM9SL1RvEPF5odmzZoZsWGLpXiHis0HTg7I2yNz1W0GquIOFZsPJHuyt0aGbUEtXvlvoWLzgZUoWR7UOehK1FtUbD5QXUSNACnxpL0r3qFi84G0dyqsKPxQG1NvUbH50LhxY7MS5VdVK96iYvMBPw/E1rlzZ6tF8QoVmwNKAamxpGZ2woQJVqviFSEvNqrFKLLFxoGtDoqJKeRlcUCNqOIdIS82vNewYcBKgkJkhtAGDRrIqFGjJCIiwlRYKd4Q8mIj/RsrA0Rmm6ZQuoetAHYTsbGx1k8q+UXnbJlERkZm8zbBfAb/XMU7VGyZ4EGCSYstNLwssMdSvEXFZsEq1BZbeHh4yFX/BwMVm0WpUqWM0LCEwtJT8R4VmwXGMWx71K5d2+y3Kd6jYrPgHJSMDxyblL8GFZsSNFRsStBQsSlBQ8WmBA0VmxI0VGxK0FCxKUFDxaYEDRWbEjRUbErQULEpQUPFpgQJkf8A3RAkqEn2YxMAAAAASUVORK5CYII=)
In the given figure
and t is a transversal If
and
find the value of x
![](data:image/png;base64,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)
Maths-General
Maths-
In the figure given below AOB is a straight line Find the value of x
![](data:image/png;base64,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)
In the figure given below AOB is a straight line Find the value of x
![](data:image/png;base64,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)
Maths-General
Maths-
Find the value of x in the adjacent figure
![](data:image/png;base64,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)
Find the value of x in the adjacent figure
![](data:image/png;base64,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)
Maths-General
Maths-
Find the value of x in the adjacent figure
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALIAAAB3CAYAAACnrxpvAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AABv5SURBVHhe7Z0HdFzV1e95hGSFJEAaLSRxAikQIBDSE8gjXwKsFELy+QGGJITmCraxHfcq29iyJKvYlossWd2S1Yut3nux+qiNpFEf9amSps//nX11ZYwsyxIINDM6v7XOsnXPnTt37v2fffbZp90EDscB4ELmOARcyByHgAuZ4xBwIXMcAi5kjkPAhcxxCLiQOQ4BFzLHIeBC5jgEXMgiFosFSqUSw8PDMJlM4lGOvcCFLKJWq5GQkICAgABUVFRAq9WKORx7gAtZRCaTYc2aNXjqqaewfPlyVFVViTkce4ALmTE6Oorw8HA89thjuOmmm3Dbbbfh3LlzU1wMK6wmA4y6UYxqNFCpNNDqTOBOiG3AhczIy8vDiy++iFtvvVUQMqUNGzagubmZ+c7WiZMsOpgUrZDVFCInNR3paTkorJOhRWWBzjJxCmfhWPRC1ul08PDwwJ133nlFxLfccgt+9rOfwcvLi1nrsYkTrRqYVUXIjPCH5wFvXIgMRkR8AoIiilHeOgzNxFmcBWJRC9loNKKoqAivvvrqFRFPpptvvhnPPvssKiurYDKb2dkKQJuE82d8sHt7IPILQhAT6IZ1rx+FX3I9etgZou3mLACLWshdXV1Yt24d7rnnnmuETOm+++7DocPOaJF1M9eiF+jwg9/pQGx3z0VNeTDiT+7EP190xcnERgyK1+QsDItWyORSJCYm4oEHHhBES64F+cif/exncfvttwv/0vFHHv0xLsRcZNa4FYbs93HGfT9WH42GT4AP/E+cxtFTOcivH4JOvC5nYVi0QlYoFDhz5gy+973v4eGHH8bLL7+M+++/H1/84hfx0EMP4cc//jFuu+123HX3PTjp6wtTbz3a/Xfg9P5X8Z/9u/G/azxx2JtZ5t5x6IwW7lYsMItWyGNjY8jIyMD69evh6ekphN9++9vf4nOf+xx+/vOfY8eOHXj//cPYtm0rcktSoWopQ/qhPTh3YiMOR3jg3yvd4eyVh07xepyFZVH7yGSVL1++DLlcDqlUiueee05wJyhikZh4EVrtGMvrwbiiCDVpftjz1i54+F9ARn0m/Pbugcteb0S1KNClFy/IWTAWtZAJilwQHR0dQpSChPz4448jLS1dOM5aeUBfPFLObsYrL+/FnnPlaGiXoPL0Fngwq70nUYrCQR5IXmgWvZAnoS7qP/7xjxMNvEceQVJSspjDUFajvjAOweHZSKsYhlKpgKYmBSXpSUio7INUzT3khYYLWaStre2KkB988EFcvHhRzOHYA1zIIlcL+fvf/74wEo5jP3Ahi1wtZArDxcXFiTkce4ALWYSE/MwzzwhCXrJkCWJjY8Ucjj3AhSxCjb1JIVPXdHR0tJjDsQe4kEWuFvK9996LyMhIMYdjD3Ahi1wt5LvuugsRERFiDsce4EIWISFPdoh89atfFbqsOfYDF7LI1UK+4447EBYWJuZw7AEuZJGrhUxz9s6fPy/mcOwBLmSR9vb2K4OGuJDtDy5kERLyn/70Jy5kO4ULWYSE/Je//EUQMs0QCQ0NFXM49gAXsggJ+W9/+xsXsp3ChSxC45H//ve/cyHbKVzIIp2dnVi6dOkVIYeEhIg5HHuAC1mEhEyrDXEh2ydcyCK0xsWyZcsEIVOHCBeyfcGFLNLd3Y1//vOfXMh2yqISMs2sM19neh0J+bXXXuNCtlMWh5Cteph1SihH1BhWGWA0Xavmnp4evPnmm4KQv/zlLyM4OFjMuRFWoYDM3/RTdj12sfm73uLAxoVMb5QWEJw9JADzh2bnW6EZkaOlvAgVaRmoqJSgUaXDiJg7CQmZFvgmIX/lK1+ZnZB1YzAp+jGsGcWIiX2veHgu0P2adEba+0H8axwqhQoDg1pW4D7KFRcnNihkK7OeWoyqRjCiHoPWMLc1I6wWE4yjCmiUKii1BhhMWnS11eFSwAWkenkg62IcEjoUqJ+yQndvby9WrVo1SyGT4PQY7W1HZ1UdpF0j6DfMUchWC6xjCqj7ZWhvb0Vr7wiGRy0wmUcx1NmM5moJOga00PCVxGeF7QmZWeDRjjq0luWhXNoPmXZCNrOGCdckr0BjVQXy6vrQr+6GtKkUIScjkOfhgssJoQiuG0ThlAWN+/r68O67714RclBQkJgzHeOAgYmtqhgpKfVoaNfAwG5yTvdpNMDUWA5ZbiiS8mMRktuAXIkZ2jEzDL1laCtIROrlTlT0MWM9pwsvTmzStRhtKkR9RjTSqrtRP6SBtq8ekrIylFa3o0trZbZwBgxKmNvTUJKTiaiiHnQr2iBtLIS/dyzKjh9F46Vg+FUMIGtYPF+EhExLzM5KyLoRGJsSkZ9+EYF5cjQM0WpFrOYwD2Ow+TIqi8tRJh1BH9P7dTHoYLqcgcZ4d4QmnYVbfAViiy2sFmF5Wgl6qmMRGFWI+KJBjF+vhcq5go0JmYnBqkF/bQHKU1ORX9+LNnkXOkujkXjOAx5nIhCa1w2ZgtXj12UM6C9HVX4OEjLr0TLQivrmMoScIovsirKEMITUDaFYLZ4uQkJ+7733ZiVk02AnuiNPITHiAsI6dGhjOrYaVdD1lqAs/ix8jnrB3ScBCRXd6GWlblrvwGyAviQD9QleiMgNhNely4jNGYNSqCmGMdCRj5DjITgfXoAOnfkj+d+LCRsTsoLpuBQF6Wm4EHUZ9TI5Bvo60JB/CWWXXOHh4Yy1TheRWcrq2+vCrBezyh2F2cgMDUd2fS1yWhuRGHQeSZ4eSEq4hOQuFVqnqKu/vx+bNm3CZz7zGWGqU2BgoJhzLepOCXLdjiDobAhS1GYMsGOGARk6C2KQkRQGv+MuOLJuNfYej0RwsxX9E8vLfRj9GIaSE1Ee7YYYSQjckwoRFi3H8DC1CUxQddXg0iFn+J0ORZbSwKTNmQnbEvJYK8ZrzuD8+Si4x8nRNqjGuFaBXpkUalk4LkadwtZD6cgopteqY6Jn1rmpDQ1NHRhWdqKzqw01Ejn6NBZWO2ehxv99+CcXIEQyghrmmtRk56C8VopWrR5Td9EjIW/ZskVYVnZmIWvRL81FwI7DOO4VgbJxE0bZUeOwHL21pWhoaUJ1ViTSdr2MHQdPYk+BDtKBfvS3sZqhvh2DI52QD3SiqqQOVcEhKIg8gtDiczgSX4DwxAEMKyYat2NdDShx3oJTHl7wk41fU/A4H8amhGztrkRP2A74nA2GW7GBCY5aUBaY9YMwtEUhPTYARwNrUdJEroUaFuZC5ISHI5hZxvTii4hOS0NITBXqesZgleegK3YvjpxNwtGscQxqWOPKaITOwKrpaVzOgYEBYU1kWrWehEwbR05PF7rro+G60QUubhchGTOC7sZqYdc1Gdm1zTDKStEeuBs+gTE4WaVBRyfz8S9FIuR0EFLyEpDIaougoAwUxcSiOjsIMemR8M+UIKfeAFbGBAy97DPH1uGEszMOl2hQy/evnBGbEvJYQyHKDr8Dz+N+8G4GOgUrxCzUaD3aLu2H83/X440tMUguGWLHDbCO9kAa5Y0Qp81w8mHVM/Mzc2v6mGhZXa4uQF/GAew6FIJ9Ib1Q3GBvhMHBQezevVtYsf5rX/sa/P39xZypNKK9NgB71rrioHMapKOmKdEKI8Y6L6M02B/xScUoY/68RjOE/tQARB/chAPeZ+FysRypxVL0dnZC0S+DrF2Gll4lBplpn+yrMfVJ0HZmFbwO7sf2FBXKuW8xIzYl5OGqXCRtXg4XjzPw7wF6xePQt6Ejzx/u763FimV7kZJULWYwyk4j3WUFlh+Kg0eu6gOXYawU8gIXbN11Cju8qjGomM5R/QAS8t69e4VpTiRkPz8/MWcqdWirPottq12x71Am2piQr8Yy1o1OSSkyM6pRKxumYjiBhLkhXm/jHadg7Ls0iL4bbM5n6Zegw3clvA7sw6Z4JUrIEedcF5sS8kBFNuLWvwln91MI7gfkzNZZzEYYxzXQKvpQFHUewZv3oC4jT6jKyVUw1Pgi3WcT1hxIhHea6oNNafTl6C12w5btx7HNrQwDIzNFOoChoSE4OTkJ4yxIyL6+vmLOVJilZELevtqFCTkdrZNCpo4YdTdaC1KQlZiE9JpOSFVj0JvYcaMJ5uYIlAZuwHtOYTgUPYjhmUJzDBJyu++ERf5vAhMy3zZqRmxKyIOVOUjY8BYTsg9C+k3ogwJD0goUp2SjpKQESYmXcOFkMNpqSqHpr0d1DvMzU08jJPB9vLvWA4e8CyEZMFF3BfM8yiEvccXWnd7Y7l6BgRtY5OHhYRw4cEAIvZGQfXx8xJypNDPXIhD73nXGgcMpaBqfsKxGeRUaYpzhvmkVVq76L7a7HsOxuGSEp5UgKykTlVnnEHPBGRvec8Uu53SUtmmhniGmRq5Fy5l3cOzQ+9iVzlwLhZjBmRabErKmLg/5e9/GkaO+OCWzTghZkoFk/0BER0YgIq0ASQVNkA91QdFZhryYSKRmXkJCViLOuJ5mfm0aynoMQhQB6lz0Zu7DtveDsCeAna+ZuSofHx+HM2tYkUUmMV8/atHHGnuxcF+7F4eOxKCCGWS6srWzAFWBu+CyYwNWbdiJ7bv34KBvMI5FpCMqKAo5WReRXJiCs55ncPZkPPKalcL4jOsx3lWHCpd1OO7iBs86PRr4PiUzYlNCNreXo813M06eDoR7pRGtFBFQdjLh1KC+qRUtfWqMaA0wmg3QjY6gv7sHA8MjGFYq0SvrQG/3AFR660TnQV8mepP2MSsdB9ckLRQ3qMrJIh8+fFjYb48s8smTJ8Wcqegx2FqE8N0H4X0sBLkaA5TsqFXP/PM+GbpkrZC2tQsLvnT0ytHRN4Cujh4MMtdlRK1Cb0cXejrkUIwyl2ma6Mkk2o4GFDjvhs+xUwjt1qF95nK46LEpIUPTh9F6Vg2XJiChuBwJRT1okI2xelYPA2vOX10Tz6CBCVQyZuFTkRkejdj0BjQw55ka/iPDQ5DU1SItLU3ovXNzcxMETPtRb968GU8//bSwYv2f//xnYQIqbWM2lXFlP6S5eSiJjkBBThbyZXI0z7PQ9MpByAouIiH8PELSylHTOzxz1/wix7aEPImhFj21sax6z0R0Wg8U7A1+pC7a8SG0xIUi/IwPPFNL4JOSh8AAf7gdcRZES1ObfvnLX+Kxxx4TFmdZvXo13njjDWGzSOqqpv32aOV6Ghmn118rI70kGw1hXvBPKUNcjxljNyxdc8DKvs/UgJL0ePh4J6Kgtps63znXwTaFzF6ZXl6N0vg4JKeWoWbYAvWcLR67Rn8t4vx98fZb6/H035fhV//zRzz37LN47d//FnrxqAPknXfewYoVK7Bx40Yh/EaD62k3VBIy9fKRwI8cOSI0NsmP/hBjDRi4HI7Q2DxEFQ1DfYOQ2pwwq1n1kY/y3BQExTejtmNs+jEbHAEbFTIZpFFo2iohbZRA0q+HksZJzoEGSTG8j2zF/764DE89uxRL/7EUy996HTt37hQiEqmpqSgtLRUSibS4uBg5OTk4evQofvOb3wh7UVOj7/e//70wBYrGKh88eBApKSlQMp98gnEYNE2oyC5Cfm4zulRGjM+LVTbDNNqHkVrmZpWVo7jDiCFujmfEZoUseMFWHXTjo1CxBpXBODtrR5ulV1dXw8lpH57+v7/Dk7/7Hd7bsFHYpam7u0vweclNMJlMsFgsH0pms1kQ9n/+8x+hh49cDnd3dyG98MILwo6oNEGV1k6mBV0MBnI3TBjvaEJXsxStaiOU82KUjdBpB9DR0Iw25n+rzNYPOlY402LDQv4Aq8kC6yxGlxsMBmRmZgp+7pNP/Q4rVq5GIGvQVVdVQqWatKIz09DQIFhfEjLtTU3Xa2lpQVJSEg4dOiSsRvSHP/xBcEUKCoomPmRilnlMDTUrbPp5scisUBl1UKvGWMGbuSOHM4FdCHk2kKWlTR5ff/11PPnkk1izZg3y8vIEKzsXyJrT3L0vfOELgpDLysrEnInev3PnzgkLuTz11FOCf00bs2tHeb2/0DiEkMmdIP/236wRR/4thdPIipKFnis1NTWCRf7Sl76EX//618zqFog5E2i1WkHc27ZtE0J19J2pqWmCq8JZOBxCyCQ+sqIkrP3796OpqUnMmTt1dXXC3D1aNutXv/qVUECmgyz39u3bhe8kn/rSpUtczAuI3QuZpihRpIFER3PuaA23j4NEIsH69euFrmq6ZlZWlphzLSR6GvpJ51FBor+NxpnHdHA+GexayGQBaUwENcDINyaraKXVTT4G1NijhhyF3n7xi18IPvD1oO8n4ZOvTPuPuLq6QiqVirmcTxO7FTIJlqzvypUrhUYZdTePjExddmXukFtCvX403oJ69qgr+0aFgxqVVJAomkED8qfrBeR8stitkKlTIj4+XljT+F//+pdgGeeD5uZmoSH39a9/XYgbUwcIxZhngvJpIP5ktIT857lGSzgfD7sVMvmjJLhXX30Vp06dEkavzQcU7aCua9r99IknnhDix7NpxNH9UK8hFSzy2SlUx/n0sFshkz9MVTkN9CG/9qOE2qaDhLxr164rQqbY9GyETOMwyMV4/vnnBZ+9trZWzOF8GtilkKkqJ1/00UcfFaznfIa9WltbsWfPHtx99934yU9+InRtzzYSQTOx3377bSEkFx0dfe0gI84nhl0KWaFQCOOHqfPD09NTPDo/tLW1Yd++fbjnnnvw+OOPIzY2dtbWnhp5J06cwEsvvSTEsym+zfl0mFHINDCGRoZRSGm+qu6PC1nj+vp6QSjUVTzfGzvSNmV07W984xvCoCGyrNRzOBuogVdUVIStW7cKI+bos/YKPWfajoJGBTY2Nt6wwbvQXCNkCjWNjo4KjRcXFxe8/PLLOH78uM00Xkgs2dnZwnhiihDQcMz5hF4eDQ667777hAH2JMa5hNPkcrlQW1Bc+frTpWwfKrwRERFCY5oKZmFhoVATzqcbN59cI2SydvQiSMAPPvigMAqMumzJUtkCZBkSExOF3jd6wGQB5xPqKaQC/K1vfeuKkOcaSqNtG376058Klt1eUalUwnOgtgI9C9oVliYe5Ofni2fYFoKQabV2snIxMTGCpfvRj34kzJC45ZZb8MADDwiNH4qNUocDlcqFShQ7JqHRfdI90cwNihRMd+5cE12bEkUb6IV985vfxEMPPYSzZ88K+4tM5k/32clE+TSoiDpnqBBQjUGfncyber4tJ2r0kr9PsXQyZqQHcrdoBg0tgk41oS31Yt5ELXKKw1LD5tvf/raw7tnNN98s3Dg1eKhqoa5XWguNJmOStVmoRP4wiYTitCRkWofC29tbuK+Pe29hYWFC8vLyEmoj6qK+9957hfAeLdZC301pus9OJvo8FTKqKag2e+aZZ4Tr0Yu/0WdtKdGzpOd87Ngx4ff/4Ac/EPRAiQZTUSH/7ne/K/xOKqgfd1jAfHAT3TTNGJ680asTbQpDISiKDlDJJLFTA2ihEn3/1fcw+f+pxz9Kot9JcWMSIHVPTz4DEvMjjzwyq++ga1C3Nr1kmu9HQ0Fp/h/lfdz7+zQT3Ss9CxrGSuNNyL24WheTiWabU/uJxLzQ3ETW9q9//aswR23qjX7+858XSh+5F/RyyGKTv7SQie6B0pIlS4Q03/dE1/vOd76D+++/X0hz/Y5P+v4+jSQ8A/a+H2CFkH4DrYc3VRuUHn74YWGZMVtwMW4iX+j06dNC6ZsqZvKJXnnlFRxgjRaat0ZVOjUAFjpR4aP1KOhfStOd81ETXY9+K7kElOg3z+U7rj73k7i/Tz6xe2bPlhr8tPLSypUr8MMf/vBDuqBEx6hLnmLlFOVaaITGHoWcyIejrtmXXlqG7//gQXaz/0coiTSL+KT3CdRLajFAC1b38zRTot49CsFRdUvrYUx3jm2nQQwOKdDZ0YyoCwF4cek/8LWv3imI964l38VfXngBWzZtwhlm/OZroNZ88KHwGzX8ystKsXPbFjzx+KO44/Yv4dbP34q3Vr6LyrpG8SyO46NHS20Rtm94B3ezBv/X77wDS76zBM/+dRl8Q2IxrNbYRAPvaq6JI5uNatSXpOCE8148/9wzeOhHD+ONtTuRU93BFwhZFDA3QVGJlBB/vLJ0BZ747f9g3cZXcHTvWmxdvht+YXnCnim2xjVCBlSwKEuRHBSAXZudseeIC056HUVMZALyWkbQxcfBODTj8jI0x7rCy9Uba50v4HhQOKolGWjNC8epVTtw2D0SGUzrs1tc4dNjGiF3Q9sTgxMHjmG/cwpKpI2ounAYvtvW42BiA9IdcQsAiwkmvQ56nQF6oxlmiwUTO0wvJtjvtY6gNcUPAetW48DpBER06TCsN7AcNeTlsTj92grsdvJBlMJic1b5WiGPVWLosiecnHxxMKgVcrUczUG74frW69geU4tUlXieQ0BiHYNGLkVjaSnKympR0dQJmXwYo/rFNomUVbVjBUj3dcI7L+2EW9hlyMQcoB+yQn84LV2DrXuCka4hadsW1wjZ2p0BWcRGbD9wCluCalBWVYz8IG/4uJ9FVKUcUgda+MYyroC2OR8VOSlISMtDVm4KUjKzkZDTinb5IvOhrAqg7xxCPLbg+df8cS75qtnoI8koCd2B5W+4YveZy2gzWm2uvXSNkMeq4lHk8gZ2HDyCTf4ZiL2UiqycMhTV92NAaxL2XHYUTPImyIL2I+D0ORwv7oSkqwA1JckIiWtDnXSRTSC1jABd53Deczv+sTIUgamdsFhpyzUNFNnHEeO8Hu+6p8K3ZBQ6G9TAFCHr0ZUZgYhNa+DqG4LA2hZUNbYKu9QrHXAupVlejbaTb8LpvzuxPLgZ5f0d0CpaUVmnRO/AIps8amU1kJrVSsEu2LjqMDyCMlHWVIPq4kTEn3DDcc9AhJb1otnWfAqRD4Rs1cGsrUK6zxFseWUrPKOKUc8OO/Tr1PVAU3gMfnvX4a2N3vBIqELdkA5a5h5bFuUkaC1r1MUj5tBeeJw5j+CsXGSnRiAqMgmRWTK0085YNhY/nuQDIZsHMN4aDD+ntfh/Sw/CPUqCmXZ8dggsepg1UkginHB05TL8a1sA3LNHMLIoRUxYMN51GbXxp+AfEIHAtHpIZD3oHxxG34gGSpUOBp2tD6y3qKCX56MwORLnQvOQXzfokEv9m5W96C9LQUFuPjKZ6yRtL0VBmCvcNm3D7hPJiKtWQbPYen6sYzAoZZBVFyI3ygdBbluxbdt+7PBMQFxxO7rUBuYXm6AbZ//qbbOUT/GRHagldx2MrIHXEnMC4YGBOJucjazcC4gMC8fJkMuokGlYA0c8cTFhVUPXV4nKtDAEe7yPI7u2YOu2fdjtFgC/+BKUyhQYZoXblh/NFCE7PuYxFZSyesgaa9HQKkVzazMaWnog69PDRo3Np4ARZp0CCnk7ZE0NaJTUoU7SgAYp+7tnCENawzwtYP7JseiE/MH7sAg+so61Xxatfh2IRSdkjmPChcxxCLiQOQ4BFzLHIeBC5jgEXMgch4ALmeMQcCFzHAIuZI5DwIXMcQi4kDkOARcyxyHgQuY4BFzIHIeAC5njEHAhcxwCLmSOQ8CFzHEIuJA5DgEXMscBAP4/fRohS66tFWkAAAAASUVORK5CYII=)
Find the value of x in the adjacent figure
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALIAAAB3CAYAAACnrxpvAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AABv5SURBVHhe7Z0HdFzV1e95hGSFJEAaLSRxAikQIBDSE8gjXwKsFELy+QGGJITmCraxHfcq29iyJKvYlossWd2S1Yut3nux+qiNpFEf9amSps//nX11ZYwsyxIINDM6v7XOsnXPnTt37v2fffbZp90EDscB4ELmOARcyByHgAuZ4xBwIXMcAi5kjkPAhcxxCLiQOQ4BFzLHIeBC5jgEXMgiFosFSqUSw8PDMJlM4lGOvcCFLKJWq5GQkICAgABUVFRAq9WKORx7gAtZRCaTYc2aNXjqqaewfPlyVFVViTkce4ALmTE6Oorw8HA89thjuOmmm3Dbbbfh3LlzU1wMK6wmA4y6UYxqNFCpNNDqTOBOiG3AhczIy8vDiy++iFtvvVUQMqUNGzagubmZ+c7WiZMsOpgUrZDVFCInNR3paTkorJOhRWWBzjJxCmfhWPRC1ul08PDwwJ133nlFxLfccgt+9rOfwcvLi1nrsYkTrRqYVUXIjPCH5wFvXIgMRkR8AoIiilHeOgzNxFmcBWJRC9loNKKoqAivvvrqFRFPpptvvhnPPvssKiurYDKb2dkKQJuE82d8sHt7IPILQhAT6IZ1rx+FX3I9etgZou3mLACLWshdXV1Yt24d7rnnnmuETOm+++7DocPOaJF1M9eiF+jwg9/pQGx3z0VNeTDiT+7EP190xcnERgyK1+QsDItWyORSJCYm4oEHHhBES64F+cif/exncfvttwv/0vFHHv0xLsRcZNa4FYbs93HGfT9WH42GT4AP/E+cxtFTOcivH4JOvC5nYVi0QlYoFDhz5gy+973v4eGHH8bLL7+M+++/H1/84hfx0EMP4cc//jFuu+123HX3PTjp6wtTbz3a/Xfg9P5X8Z/9u/G/azxx2JtZ5t5x6IwW7lYsMItWyGNjY8jIyMD69evh6ekphN9++9vf4nOf+xx+/vOfY8eOHXj//cPYtm0rcktSoWopQ/qhPTh3YiMOR3jg3yvd4eyVh07xepyFZVH7yGSVL1++DLlcDqlUiueee05wJyhikZh4EVrtGMvrwbiiCDVpftjz1i54+F9ARn0m/Pbugcteb0S1KNClFy/IWTAWtZAJilwQHR0dQpSChPz4448jLS1dOM5aeUBfPFLObsYrL+/FnnPlaGiXoPL0Fngwq70nUYrCQR5IXmgWvZAnoS7qP/7xjxMNvEceQVJSspjDUFajvjAOweHZSKsYhlKpgKYmBSXpSUio7INUzT3khYYLWaStre2KkB988EFcvHhRzOHYA1zIIlcL+fvf/74wEo5jP3Ahi1wtZArDxcXFiTkce4ALWYSE/MwzzwhCXrJkCWJjY8Ucjj3AhSxCjb1JIVPXdHR0tJjDsQe4kEWuFvK9996LyMhIMYdjD3Ahi1wt5LvuugsRERFiDsce4EIWISFPdoh89atfFbqsOfYDF7LI1UK+4447EBYWJuZw7AEuZJGrhUxz9s6fPy/mcOwBLmSR9vb2K4OGuJDtDy5kERLyn/70Jy5kO4ULWYSE/Je//EUQMs0QCQ0NFXM49gAXsggJ+W9/+xsXsp3ChSxC45H//ve/cyHbKVzIIp2dnVi6dOkVIYeEhIg5HHuAC1mEhEyrDXEh2ydcyCK0xsWyZcsEIVOHCBeyfcGFLNLd3Y1//vOfXMh2yqISMs2sM19neh0J+bXXXuNCtlMWh5Cteph1SihH1BhWGWA0Xavmnp4evPnmm4KQv/zlLyM4OFjMuRFWoYDM3/RTdj12sfm73uLAxoVMb5QWEJw9JADzh2bnW6EZkaOlvAgVaRmoqJSgUaXDiJg7CQmZFvgmIX/lK1+ZnZB1YzAp+jGsGcWIiX2veHgu0P2adEba+0H8axwqhQoDg1pW4D7KFRcnNihkK7OeWoyqRjCiHoPWMLc1I6wWE4yjCmiUKii1BhhMWnS11eFSwAWkenkg62IcEjoUqJ+yQndvby9WrVo1SyGT4PQY7W1HZ1UdpF0j6DfMUchWC6xjCqj7ZWhvb0Vr7wiGRy0wmUcx1NmM5moJOga00PCVxGeF7QmZWeDRjjq0luWhXNoPmXZCNrOGCdckr0BjVQXy6vrQr+6GtKkUIScjkOfhgssJoQiuG0ThlAWN+/r68O67714RclBQkJgzHeOAgYmtqhgpKfVoaNfAwG5yTvdpNMDUWA5ZbiiS8mMRktuAXIkZ2jEzDL1laCtIROrlTlT0MWM9pwsvTmzStRhtKkR9RjTSqrtRP6SBtq8ekrIylFa3o0trZbZwBgxKmNvTUJKTiaiiHnQr2iBtLIS/dyzKjh9F46Vg+FUMIGtYPF+EhExLzM5KyLoRGJsSkZ9+EYF5cjQM0WpFrOYwD2Ow+TIqi8tRJh1BH9P7dTHoYLqcgcZ4d4QmnYVbfAViiy2sFmF5Wgl6qmMRGFWI+KJBjF+vhcq5go0JmYnBqkF/bQHKU1ORX9+LNnkXOkujkXjOAx5nIhCa1w2ZgtXj12UM6C9HVX4OEjLr0TLQivrmMoScIovsirKEMITUDaFYLZ4uQkJ+7733ZiVk02AnuiNPITHiAsI6dGhjOrYaVdD1lqAs/ix8jnrB3ScBCRXd6GWlblrvwGyAviQD9QleiMgNhNely4jNGYNSqCmGMdCRj5DjITgfXoAOnfkj+d+LCRsTsoLpuBQF6Wm4EHUZ9TI5Bvo60JB/CWWXXOHh4Yy1TheRWcrq2+vCrBezyh2F2cgMDUd2fS1yWhuRGHQeSZ4eSEq4hOQuFVqnqKu/vx+bNm3CZz7zGWGqU2BgoJhzLepOCXLdjiDobAhS1GYMsGOGARk6C2KQkRQGv+MuOLJuNfYej0RwsxX9E8vLfRj9GIaSE1Ee7YYYSQjckwoRFi3H8DC1CUxQddXg0iFn+J0ORZbSwKTNmQnbEvJYK8ZrzuD8+Si4x8nRNqjGuFaBXpkUalk4LkadwtZD6cgopteqY6Jn1rmpDQ1NHRhWdqKzqw01Ejn6NBZWO2ehxv99+CcXIEQyghrmmtRk56C8VopWrR5Td9EjIW/ZskVYVnZmIWvRL81FwI7DOO4VgbJxE0bZUeOwHL21pWhoaUJ1ViTSdr2MHQdPYk+BDtKBfvS3sZqhvh2DI52QD3SiqqQOVcEhKIg8gtDiczgSX4DwxAEMKyYat2NdDShx3oJTHl7wk41fU/A4H8amhGztrkRP2A74nA2GW7GBCY5aUBaY9YMwtEUhPTYARwNrUdJEroUaFuZC5ISHI5hZxvTii4hOS0NITBXqesZgleegK3YvjpxNwtGscQxqWOPKaITOwKrpaVzOgYEBYU1kWrWehEwbR05PF7rro+G60QUubhchGTOC7sZqYdc1Gdm1zTDKStEeuBs+gTE4WaVBRyfz8S9FIuR0EFLyEpDIaougoAwUxcSiOjsIMemR8M+UIKfeAFbGBAy97DPH1uGEszMOl2hQy/evnBGbEvJYQyHKDr8Dz+N+8G4GOgUrxCzUaD3aLu2H83/X440tMUguGWLHDbCO9kAa5Y0Qp81w8mHVM/Mzc2v6mGhZXa4uQF/GAew6FIJ9Ib1Q3GBvhMHBQezevVtYsf5rX/sa/P39xZypNKK9NgB71rrioHMapKOmKdEKI8Y6L6M02B/xScUoY/68RjOE/tQARB/chAPeZ+FysRypxVL0dnZC0S+DrF2Gll4lBplpn+yrMfVJ0HZmFbwO7sf2FBXKuW8xIzYl5OGqXCRtXg4XjzPw7wF6xePQt6Ejzx/u763FimV7kZJULWYwyk4j3WUFlh+Kg0eu6gOXYawU8gIXbN11Cju8qjGomM5R/QAS8t69e4VpTiRkPz8/MWcqdWirPottq12x71Am2piQr8Yy1o1OSSkyM6pRKxumYjiBhLkhXm/jHadg7Ls0iL4bbM5n6Zegw3clvA7sw6Z4JUrIEedcF5sS8kBFNuLWvwln91MI7gfkzNZZzEYYxzXQKvpQFHUewZv3oC4jT6jKyVUw1Pgi3WcT1hxIhHea6oNNafTl6C12w5btx7HNrQwDIzNFOoChoSE4OTkJ4yxIyL6+vmLOVJilZELevtqFCTkdrZNCpo4YdTdaC1KQlZiE9JpOSFVj0JvYcaMJ5uYIlAZuwHtOYTgUPYjhmUJzDBJyu++ERf5vAhMy3zZqRmxKyIOVOUjY8BYTsg9C+k3ogwJD0goUp2SjpKQESYmXcOFkMNpqSqHpr0d1DvMzU08jJPB9vLvWA4e8CyEZMFF3BfM8yiEvccXWnd7Y7l6BgRtY5OHhYRw4cEAIvZGQfXx8xJypNDPXIhD73nXGgcMpaBqfsKxGeRUaYpzhvmkVVq76L7a7HsOxuGSEp5UgKykTlVnnEHPBGRvec8Uu53SUtmmhniGmRq5Fy5l3cOzQ+9iVzlwLhZjBmRabErKmLg/5e9/GkaO+OCWzTghZkoFk/0BER0YgIq0ASQVNkA91QdFZhryYSKRmXkJCViLOuJ5mfm0aynoMQhQB6lz0Zu7DtveDsCeAna+ZuSofHx+HM2tYkUUmMV8/atHHGnuxcF+7F4eOxKCCGWS6srWzAFWBu+CyYwNWbdiJ7bv34KBvMI5FpCMqKAo5WReRXJiCs55ncPZkPPKalcL4jOsx3lWHCpd1OO7iBs86PRr4PiUzYlNCNreXo813M06eDoR7pRGtFBFQdjLh1KC+qRUtfWqMaA0wmg3QjY6gv7sHA8MjGFYq0SvrQG/3AFR660TnQV8mepP2MSsdB9ckLRQ3qMrJIh8+fFjYb48s8smTJ8Wcqegx2FqE8N0H4X0sBLkaA5TsqFXP/PM+GbpkrZC2tQsLvnT0ytHRN4Cujh4MMtdlRK1Cb0cXejrkUIwyl2ma6Mkk2o4GFDjvhs+xUwjt1qF95nK46LEpIUPTh9F6Vg2XJiChuBwJRT1okI2xelYPA2vOX10Tz6CBCVQyZuFTkRkejdj0BjQw55ka/iPDQ5DU1SItLU3ovXNzcxMETPtRb968GU8//bSwYv2f//xnYQIqbWM2lXFlP6S5eSiJjkBBThbyZXI0z7PQ9MpByAouIiH8PELSylHTOzxz1/wix7aEPImhFj21sax6z0R0Wg8U7A1+pC7a8SG0xIUi/IwPPFNL4JOSh8AAf7gdcRZES1ObfvnLX+Kxxx4TFmdZvXo13njjDWGzSOqqpv32aOV6Ghmn118rI70kGw1hXvBPKUNcjxljNyxdc8DKvs/UgJL0ePh4J6Kgtps63znXwTaFzF6ZXl6N0vg4JKeWoWbYAvWcLR67Rn8t4vx98fZb6/H035fhV//zRzz37LN47d//FnrxqAPknXfewYoVK7Bx40Yh/EaD62k3VBIy9fKRwI8cOSI0NsmP/hBjDRi4HI7Q2DxEFQ1DfYOQ2pwwq1n1kY/y3BQExTejtmNs+jEbHAEbFTIZpFFo2iohbZRA0q+HksZJzoEGSTG8j2zF/764DE89uxRL/7EUy996HTt37hQiEqmpqSgtLRUSibS4uBg5OTk4evQofvOb3wh7UVOj7/e//70wBYrGKh88eBApKSlQMp98gnEYNE2oyC5Cfm4zulRGjM+LVTbDNNqHkVrmZpWVo7jDiCFujmfEZoUseMFWHXTjo1CxBpXBODtrR5ulV1dXw8lpH57+v7/Dk7/7Hd7bsFHYpam7u0vweclNMJlMsFgsH0pms1kQ9n/+8x+hh49cDnd3dyG98MILwo6oNEGV1k6mBV0MBnI3TBjvaEJXsxStaiOU82KUjdBpB9DR0Iw25n+rzNYPOlY402LDQv4Aq8kC6yxGlxsMBmRmZgp+7pNP/Q4rVq5GIGvQVVdVQqWatKIz09DQIFhfEjLtTU3Xa2lpQVJSEg4dOiSsRvSHP/xBcEUKCoomPmRilnlMDTUrbPp5scisUBl1UKvGWMGbuSOHM4FdCHk2kKWlTR5ff/11PPnkk1izZg3y8vIEKzsXyJrT3L0vfOELgpDLysrEnInev3PnzgkLuTz11FOCf00bs2tHeb2/0DiEkMmdIP/236wRR/4thdPIipKFnis1NTWCRf7Sl76EX//618zqFog5E2i1WkHc27ZtE0J19J2pqWmCq8JZOBxCyCQ+sqIkrP3796OpqUnMmTt1dXXC3D1aNutXv/qVUECmgyz39u3bhe8kn/rSpUtczAuI3QuZpihRpIFER3PuaA23j4NEIsH69euFrmq6ZlZWlphzLSR6GvpJ51FBor+NxpnHdHA+GexayGQBaUwENcDINyaraKXVTT4G1NijhhyF3n7xi18IPvD1oO8n4ZOvTPuPuLq6QiqVirmcTxO7FTIJlqzvypUrhUYZdTePjExddmXukFtCvX403oJ69qgr+0aFgxqVVJAomkED8qfrBeR8stitkKlTIj4+XljT+F//+pdgGeeD5uZmoSH39a9/XYgbUwcIxZhngvJpIP5ktIT857lGSzgfD7sVMvmjJLhXX30Vp06dEkavzQcU7aCua9r99IknnhDix7NpxNH9UK8hFSzy2SlUx/n0sFshkz9MVTkN9CG/9qOE2qaDhLxr164rQqbY9GyETOMwyMV4/vnnBZ+9trZWzOF8GtilkKkqJ1/00UcfFaznfIa9WltbsWfPHtx99934yU9+InRtzzYSQTOx3377bSEkFx0dfe0gI84nhl0KWaFQCOOHqfPD09NTPDo/tLW1Yd++fbjnnnvw+OOPIzY2dtbWnhp5J06cwEsvvSTEsym+zfl0mFHINDCGRoZRSGm+qu6PC1nj+vp6QSjUVTzfGzvSNmV07W984xvCoCGyrNRzOBuogVdUVIStW7cKI+bos/YKPWfajoJGBTY2Nt6wwbvQXCNkCjWNjo4KjRcXFxe8/PLLOH78uM00Xkgs2dnZwnhiihDQcMz5hF4eDQ667777hAH2JMa5hNPkcrlQW1Bc+frTpWwfKrwRERFCY5oKZmFhoVATzqcbN59cI2SydvQiSMAPPvigMAqMumzJUtkCZBkSExOF3jd6wGQB5xPqKaQC/K1vfeuKkOcaSqNtG376058Klt1eUalUwnOgtgI9C9oVliYe5Ofni2fYFoKQabV2snIxMTGCpfvRj34kzJC45ZZb8MADDwiNH4qNUocDlcqFShQ7JqHRfdI90cwNihRMd+5cE12bEkUb6IV985vfxEMPPYSzZ88K+4tM5k/32clE+TSoiDpnqBBQjUGfncyber4tJ2r0kr9PsXQyZqQHcrdoBg0tgk41oS31Yt5ELXKKw1LD5tvf/raw7tnNN98s3Dg1eKhqoa5XWguNJmOStVmoRP4wiYTitCRkWofC29tbuK+Pe29hYWFC8vLyEmoj6qK+9957hfAeLdZC301pus9OJvo8FTKqKag2e+aZZ4Tr0Yu/0WdtKdGzpOd87Ngx4ff/4Ac/EPRAiQZTUSH/7ne/K/xOKqgfd1jAfHAT3TTNGJ680asTbQpDISiKDlDJJLFTA2ihEn3/1fcw+f+pxz9Kot9JcWMSIHVPTz4DEvMjjzwyq++ga1C3Nr1kmu9HQ0Fp/h/lfdz7+zQT3Ss9CxrGSuNNyL24WheTiWabU/uJxLzQ3ETW9q9//aswR23qjX7+858XSh+5F/RyyGKTv7SQie6B0pIlS4Q03/dE1/vOd76D+++/X0hz/Y5P+v4+jSQ8A/a+H2CFkH4DrYc3VRuUHn74YWGZMVtwMW4iX+j06dNC6ZsqZvKJXnnlFRxgjRaat0ZVOjUAFjpR4aP1KOhfStOd81ETXY9+K7kElOg3z+U7rj73k7i/Tz6xe2bPlhr8tPLSypUr8MMf/vBDuqBEx6hLnmLlFOVaaITGHoWcyIejrtmXXlqG7//gQXaz/0coiTSL+KT3CdRLajFAC1b38zRTot49CsFRdUvrYUx3jm2nQQwOKdDZ0YyoCwF4cek/8LWv3imI964l38VfXngBWzZtwhlm/OZroNZ88KHwGzX8ystKsXPbFjzx+KO44/Yv4dbP34q3Vr6LyrpG8SyO46NHS20Rtm94B3ezBv/X77wDS76zBM/+dRl8Q2IxrNbYRAPvaq6JI5uNatSXpOCE8148/9wzeOhHD+ONtTuRU93BFwhZFDA3QVGJlBB/vLJ0BZ747f9g3cZXcHTvWmxdvht+YXnCnim2xjVCBlSwKEuRHBSAXZudseeIC056HUVMZALyWkbQxcfBODTj8jI0x7rCy9Uba50v4HhQOKolGWjNC8epVTtw2D0SGUzrs1tc4dNjGiF3Q9sTgxMHjmG/cwpKpI2ounAYvtvW42BiA9IdcQsAiwkmvQ56nQF6oxlmiwUTO0wvJtjvtY6gNcUPAetW48DpBER06TCsN7AcNeTlsTj92grsdvJBlMJic1b5WiGPVWLosiecnHxxMKgVcrUczUG74frW69geU4tUlXieQ0BiHYNGLkVjaSnKympR0dQJmXwYo/rFNomUVbVjBUj3dcI7L+2EW9hlyMQcoB+yQn84LV2DrXuCka4hadsW1wjZ2p0BWcRGbD9wCluCalBWVYz8IG/4uJ9FVKUcUgda+MYyroC2OR8VOSlISMtDVm4KUjKzkZDTinb5IvOhrAqg7xxCPLbg+df8cS75qtnoI8koCd2B5W+4YveZy2gzWm2uvXSNkMeq4lHk8gZ2HDyCTf4ZiL2UiqycMhTV92NAaxL2XHYUTPImyIL2I+D0ORwv7oSkqwA1JckIiWtDnXSRTSC1jABd53Deczv+sTIUgamdsFhpyzUNFNnHEeO8Hu+6p8K3ZBQ6G9TAFCHr0ZUZgYhNa+DqG4LA2hZUNbYKu9QrHXAupVlejbaTb8LpvzuxPLgZ5f0d0CpaUVmnRO/AIps8amU1kJrVSsEu2LjqMDyCMlHWVIPq4kTEn3DDcc9AhJb1otnWfAqRD4Rs1cGsrUK6zxFseWUrPKOKUc8OO/Tr1PVAU3gMfnvX4a2N3vBIqELdkA5a5h5bFuUkaC1r1MUj5tBeeJw5j+CsXGSnRiAqMgmRWTK0085YNhY/nuQDIZsHMN4aDD+ntfh/Sw/CPUqCmXZ8dggsepg1UkginHB05TL8a1sA3LNHMLIoRUxYMN51GbXxp+AfEIHAtHpIZD3oHxxG34gGSpUOBp2tD6y3qKCX56MwORLnQvOQXzfokEv9m5W96C9LQUFuPjKZ6yRtL0VBmCvcNm3D7hPJiKtWQbPYen6sYzAoZZBVFyI3ygdBbluxbdt+7PBMQFxxO7rUBuYXm6AbZ//qbbOUT/GRHagldx2MrIHXEnMC4YGBOJucjazcC4gMC8fJkMuokGlYA0c8cTFhVUPXV4nKtDAEe7yPI7u2YOu2fdjtFgC/+BKUyhQYZoXblh/NFCE7PuYxFZSyesgaa9HQKkVzazMaWnog69PDRo3Np4ARZp0CCnk7ZE0NaJTUoU7SgAYp+7tnCENawzwtYP7JseiE/MH7sAg+so61Xxatfh2IRSdkjmPChcxxCLiQOQ4BFzLHIeBC5jgEXMgch4ALmeMQcCFzHAIuZI5DwIXMcQi4kDkOARcyxyHgQuY4BFzIHIeAC5njEHAhcxwCLmSOQ8CFzHEIuJA5DgEXMscBAP4/fRohS66tFWkAAAAASUVORK5CYII=)
Maths-General
Maths-
Find the value of x in the adjacent figure
![](data:image/png;base64,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)
Find the value of x in the adjacent figure
![](data:image/png;base64,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)
Maths-General
maths-
In the following figure the value of x = ..............
![](data:image/png;base64,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)
In the following figure the value of x = ..............
![](data:image/png;base64,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)
maths-General
Maths-
Using information given in the adjacent figure, the value of x and y is......
![](data:image/png;base64,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)
Using information given in the adjacent figure, the value of x and y is......
![](data:image/png;base64,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)
Maths-General
Maths-
In figure, the sides QP and RQ of
are produced to points S and T respectively If
and
then ![text PRQ = end text](data:image/png;base64,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)
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WLZNEnH0qPIf3kyd7d5a2ly6REr/HdgIpoXEmbJyUFeforLgW7d8mrA/rL0KFDHRHRj5WjSsdq0i7FWvLQsOcOcbcHxsho6cwUCDtV+DkiKpL1UlDeqhki0g6kPcjsCEMwdFLuvPNOJ1Tb+LUw2MOQDZS+853vuPFDSIJARiwnbUOq2Z0790ivXq9IayUiHR52uA5FivVYJfnBQhn57lRp1+8lmapVcbGGCxlLlYi1iIVk767tMm/u+64HT8eKOPBQQMDf//73boUPHaLVq1e7JgHXIR7xNRKS3kwiOX/rQo6IimS9nENEqmQKi/YWu3CxZyFVcZcuXdzKGXrSEJT2IfdQqMyWQE6qZLYOeeedd9z1UaNGuTYaHYvi4hIld1A2b94mPXv1lVat26g12+isYagKIoZkW/EOGTh1tDz+Sk+ZvPgj2aMdmAK1pGV8aTQek/ydW2Xm6xOkx3Od5MVuXd2Gn1THxIOOC9aQBRYsvD3//PPdawm0GSEgxCOuRkJv2jMBwk+lI0dERbJea8NRxXLEkjCOePPNN7tqmPYe24AwY0J1a/dS1WEtzz33XLfbK4Sk0wJYecMGnLTlsIrhcER27ymQvv0Gy4MtH5FNGzcoEbXHHSmRWHWlbC/eLkPfGC8dBvSRqR99JDujMdmjUhzRZkMsKlvXfypD+/WW22+8Ti664Hz3YFD9QiyqZh6Ijz/+2L2gxVDT5Zdf7poVkBRY1WxNhUzCT7nmiKhI1ksBUZhYQs6pSmkP8qYdH96xHrJZFvxwP4XcoUOH2t1fGWLhOteMzE8//bRa0SmyVwm6Zt0mebFnP3mxe29t9+1WzXGtsoslHC2RnWoRR0yfIO379JQ3lIhUzXuVMHvpcUe0jVpRKts2fipTxo+ROzRePCDsGmZxMYJxTrVM9cyYJueA+Jh1NH+ZAmGnCj9HREWyXgqGAqWgqO4YR8Sa0DvG8mzevNkRlULEalKNc2RMj2VebDd877331nZgaGNCSAofa0rve5p2frp07S73t2wr6zduUQKGpVotYjRaqhaxQvJKdslIJWKH3r3kzSVLXUelTKXCfSVA4xsJSaSyWHZv2ySvK7HZO2fWrFmuKQFID/HjiBuzN+wigZUEuFkbkThm0iom529dyBFRkayXcyskqlGGQSAPMytYnokTJ7qNkbCYEBJ/LPPCYkJCOgn0VCEohcwRUgBI3E7bii+82F3atG0nPV/qqxYQarEwQckdhW5BKSzdI8Mmj5aOL/eW91Z8oi5KQpVKbSPug5ItxOD2EtdWpamAvmSQlg0bNjiibtmyxZHOCIgYYTOF5PytCzkiKpL1UlAUHoVEtbxEe60UNL1eqtePtKq0qTruw+LRi+YVgP/+7/9243W4WVgWPgJ5GZAeNHiIPN2xs0ycPE0CYaYTtaqPBtQqBqSoYKtMfn2M3NO6hfzz9tukz4gx8lneXilVo1UUCsv8RQtlyoQx8va0yTLzzdflrTemyxLtNRdre5U4M1bIjAodLD6bgRWGhAzvEC+zhsTNJJOwtDeEHBEVyXopGLMUdYHrVNtWgBTuCy+84HZsYOsQLCYk9cKrA2v05ptvyTMQcdLrUh5ItNWqowwXRWTtqg+lZau75fSfnyEnnHa63NaqjcxculKKNTr55ZXS9YXn5aq/Xiq3XneNtHmghbw2YICs/fRTtY8J68dUHm1VmhLMvLBHN1adtwVJF3HDH/HJEbEOZEMnSNZLwUAMIyLXKEDcOYdI3oY+1TfLuVhvyEvzdGy47oVXB1X13LkfSLv2T8ugISMlWFWzACGCFdVqdN0y6fD0o3LJFZfK+ZdeKo8+200+WLXWEbGgMij9BvSXe26/VR5reb907dhBJowdKxu16iUuEIwqmt45zQg+It67d2+3cMPNWWs6iFuOiA0gGzpBXXrr+m1uHCk8CMlYI9N+dFIgYosWLdwwSvL9XnCtTO9r16GTtHyknRQUl0qkKiShQIleDEjerg0y463JMuX1STJJOzWzPlrsqubiiEhpKCILtGp+fdJ4eW/GdFk4d7Zs2vCZa0LYA8IyMJoPVMsIFpI2LdfQjT/EiMt5Q/E9WBB2qvBzRFQcqF7uYdoMy/Mf//EfbrqPAWssnp/CnTNvkTzRoYsMHDRESooKJB7T6j6svfDKAiku2CFlFSVSUhmQQq26i9RqlkSqpTgQluLSEikt1jZj0R4pK8yTcDCxKpv2J2RDN80FevyMYxpJjXRYXywjv61DlUn4yd8cERWN1ev1y4wJK1vopDDjQuEDsz4NoaQiKK8OHSWtHmoja9es0jaBVpehUqkOM5mnVX9cyaK1ZlClQqUsEpcSJWLM9ZyV6JEK166MxRLLz6ztZ2Tz6ue3kRR3yOf3gTlYEH4qHTkiKhqrF78UID1npvyYzuNTZvROsURUeRRyQ2FypUJ7y7MXLpaeffrJxAnjZevGdRKpLFKrWCLxqPZuw0z5RaRC2Vgajkm5ErFSz1kwEa8KSFStJ1Y0Gt3f0hkhrf1n7vjhNzA3I2xj0t9Y+Ak/R0TFgeiFcAzZsMSKbYfppVI1ettdVuh1gStUiAVllfLOrLnybKdOMmnsSCnavVUvBtXSBbXzohYsGpdgVNuUjoixBBEZd6QaV4tIB6cqHHKLKNBp1a0RzRsXBDfE0my/G4rrwcJP/uaIqDgQvbQN7777bjdkw5o/eqoUOtUfx1Th8claPuJN8W/YvFWe69xFenR7TtatWKwXA2qyghKtouqMafVcLSGVslBcist5JwaSBtQqlksszKxNop0H4Rhg5yHhHDfiwhFi4oa1hKgQjzjiZkTNFPzkb46Iirr0NvSbDgBzzrynzHpD5o+t4K2QU0E1SlBJFlazGAhVyeIPP5RunZ6W0YP7S+GuzVo9l0t1nOpWq3msolbLFSG1igEsnla7ahGxmvEoJEysMYR03nYipESMjMli/oyUmUJd+ZuMHBEVdenlt1kRxEswrB/r/GgbshG7zd/ij8L1S8QqrWJDSkb6HryTsmTRQnnq8bbyco8X1NKpVVQw41KpvebKUETbi1EnCeLoMYbl1Wq6hkjEF+EcP8QFwc1LNvMLGf3E9WCBPtNdH3JEVCTr5dwsBlUtgqVhGISVzyyrYq0hWw6z3hBAVCt4szINAR1Uz6ZHXZz7mNGj5Ml27WTlyhWyfv1nrgkQVotJW5FOCu+uJOJFFUvP3D+RspG3IDl/60KOiIpkvVgLI5ZZRAjDJ2z5rC2dE6pl5nIhHES1JWNGLI4NpYVr3Gv+zZIxQA7ZWdHNrAjrGIE3TKpb1kFybIxFayg+mQR6U+nOEVGRrJdzq7rMnXOGZ3g9lPeU+UgP1gpAVMho5LVjQyQhXCOi6fK271i9wxt4vCuDJbaX5qmqCR+/3vj5QWP8phPoTaU7R0RFsl7OKXQbE6TAmSJjKRidE95H4a0+1iBCGiOSEZBz7kuVFu6DUFhTu9fCwvpiFekU2esG3vDxh+QsYgaQDZ3Aq5cjBQ0JISPnWD7eYT711FOdNeQ9Yl6e5zqW0MjI0c79pAN/3E84Zglxg3BU0SxSYLEtL/dTRXOdeHHd/HH0i2zkLfDmb33IEVHh1csR8hmp+M0bdvfff78ceeSRbs0hbUMsGYAYNm5npPTeWx+4hjUzQSfEsnvNnXdOeIGf77AACIs/hDg0pCMZjfGbTqA3le4cERXJeiEAZIAcFDZtQ16I+uIXv+heQpo7d64jBKBatbf98GtEMjLVB9OJH6wauhDcOJqFXLBggVtoO3LkSLeeELJzjxGxIR3J8KaxKWFpbQg5IiqS9XIOGQBjhOzmdcQRR7i2IVuHUJWaf4iA8NuOJg3B6yfZv/0mPIiORWZhK9OIvL9shIWMRkw/8OpoSlh6GkKOiIq69NpvquFjjjnGfT2eD3rb66N+C78+1KWzIfBOMu8mYxnpQaPfLKnfcBqjL53wk9YcERX16V27dq3ceOONbuuQSy+91L0JB6gSzWIeKPykFbKhB8LRYeKh4JVQVoAzzdjYvGqs/3TBT1pzRFQk66XgGZrp2bOnW3V97LHHunaafS+PKrEpiGgWz9qjtEXpvbdu3dptc9JYZCNvgZ+05oioSNbL+cKFC90Or+xteOGFFzrriLt1RCDJwcQ1WWdd4DpW0QTwgPDlKoaQIGZjcDDxPRj4SWuOiIpkvRQ6wyVsK/fjH//Y7VVIdYxlskHug42nn7TadfTSQTLy04tnxc+YMWNqraUfHGycDxR+0npYE9F0cTSLg7VjJoNhGlbXYA29VTLX0xFHv2klXtY7NiJyzhQgsy6QEStp8IabHL4ffZmAN0714bAlIgVs1awVNO0xZjOo9ngZip1e+VqUkQ9/B1slG/ymFX1YPeu0EAfAmCK9eBZhMMsD7Dp+EdLEvaYnHfE+EPhJ62FJRCtcCo0qz1vt8hYe1pA5ZXbzYqiEOHkLNh1k9JvWZHLRLiQezD2zewPvLPNCP1uJkA6E6zw8pI00cR9oirytC37SetgRkfAhk5HPjrjzojxtL4Zr+CYK7ytjIblOwXK0c6vKDxR+0+olIueQC0E/VTLvLbM+cuzYsY6cRkB72DjHLZvwk9bDjogUIAVE4Rq5OMdysKKGDZSYymNDJXrKFCTLsPBD4XJPUxIRP5DQ+xAYKQH72bClCMNLbLREvIizpcviDTKdt/XBT1oPS4tIwSAUmgkDxqxyYbthtg1hiw4jnFV33sKFDAcTVz9pRTd6OBIXHhbiYXEH/GYnB779ggWn6uY693GNuJrfTOdtffCT1sOyjUihWpVs1gJryMIGNtl86KGH3HpA4mKkNRKaRaJwDyauftLqJSJxsAfAfhMXwsCNhRhU0XRgjHxGREvjwcT3YOAnrYelRYSE1uhHaAcySMxwDWRkgQGbbHotCoVuxOX3wcJPWrmOLohmes2NuBA/4mVg4yX2+WZjUdyNrDkiNhJNodNbiFa4NPTZNoRqmfdE6LQA/EBa/HEPAinMKh0M/KSV6+g2nfYw2DkPiTdObF3MZzWoohnS4Zql0cLLdP7WBT96D9s2IgUHOOeTFXRQWO5lO70CK2wjolkXb+EeKPyklevoMUEvcSDu/LYwcCeeCHtks80y1tH7PWgjr90L/MQhHfCj57BsI1Jw6GG4gw96n3TSSa5aZtwQNwN+rMC9BW9yMPAbhteP3eN1I16Qyx4syMbqHL79x5gowLKzORTWHX88VLhxNKuZSSTHuS4clkQ0HexnzSZK7HuNNWSAmIIyomYS6Ugr9xNXI5eRkRe9+IoAn+Flb2+Gc6xNjB8sJwtu7aWtHBGT0BQ6rVrCOjBPy6prvonCl5oABUrhZDoe6Ugr95tFJM5YQ9wgHFU07UW+NsDGoVwzKwjxICcD4rgdCmk9LIlIwbFBO9uF8AoA1pAP+AAKzAo0k0hXWgnD4gzBjHCsJGcslJkiVnXzeTSzigBCMi5pnbFMwk9aD8uqmQUDzNGyxItOio29AUhKYZrlzBTSlVbiCblssJu4QzLk008/delko3k+PmRDUtxjVTrCeSbz3U9aD0si2vfyeA+FDz1SYIA2EwXTFPFIhw7uJ76QyzoiENGm+CAn1TJrK3nFgFqAB86mLfFrZMxkev2ktZl5ShaeGqSuawlBgUnCzcEd7RypuVbj7E45d6g9cWBDIdtUyHvP/vdq3FRMp3Nz/hPXzC3xrwaeU6wCQxv0lL///e+7t/IoMAqOwvRawn3hpV9S568/McvmJRXEJD2cA3rPvHtDbxqduHsH9M0iZkpSpRX4I2JcJeYRfnv8xuKaGbF9Y1sQJR7T+6P62+7R83g0JjGXWYmqj3DiTmru02NMBTfTGY/sCyemwuaWVSocY04S99bGUY/s81btdKlEtN1Uta+QGCdkLpnhGnrMVFm4U3AWD+DCzKCgy/QdrAAjpIXJb9IEGB2gF02HbM2aNbWk5ToWkvPkMNMpqdIKUlfN+KMty8NlogWuJa4nCYmy6biSK6KJh4RsNh6t0owJ6+8qDUclrufRsLZdwkH3KQcIGddwomy3pmSJuSMNbyWjCjrjbNMb0jaMhgUZ8RvS8Nk5kH0WqjRyUYioiVSlGjeNl95brf5jQdUVCEk4EJZQMFF18ebbC1ogWMKf/vSnbioPy0A6sQwUSqbbS4ba/G0iMFvEcA4LO/j0BUA/pEQgSqbgJ60HSEQVF3BCtOgdIZxogthuNxJWCxRSAoU1HBUIFQ6GlYRhJaAWtvpjN1RnEZVAVWFtZCtZq5REkbC6Q14lIqLmz5GrKhKVoOqtVH0BFYjoooIVhIgQVgkYrdCqSSXMUX9X6zWIxv4xF1x4oXz1qK+62RTaTLhjEThiIZCmIKOfwkkHvDoYX2ROnRf1eeggn1nHf2MiJi4hbsNJTUiVVs9VmigsF+SqdhZKPahQRUI2qklXjap/NiV3Jlt/u+qT3VNdla7XIV+NOEunYUbUv7bipEIjgGhWJqKSiITqgYgajhIwopYwGlBiVYZU+b5P2H7ta0e7T1GwuRFLv+ig0HinMKy6goiZhp/CSQfIX9IFIB87jPHBc74pyMMHXBlkMC5+0uqPiBSyI4Oe1xCRSzxDCG01vqrOB63dpxcc0dSPkiemlrBaLR1EclWrkiWq1yEvVXkVv1UiWDwlI0R0JEenEgjLGAkqQahqNUODejGgWgM1RNRn2cXFxZE2IlWzWuO4iquiNUyw/OPlbmXNUUcf5baXo+dM+igMqm0sg1lECi5Vxh0savM3wzAi8nBBRF594OPmvHjF24A8iJmGn7Q2gohKECd6nkxE9US1HKe95u7TI5aNb8yFwkoITCJWUySkx7CGV6UZhPCJ2IiG6VS4Dobeqz84YkWrlfhxraqdZVTQ/NYQnaht1TCp4pX8BA4RNQzaohHVG1MLDEqKiqVTx05uBuWMM890vUdAISGQEEJaNf3/rWq2dCKAlTnMuDDYzbrLTMNPWv0TUQsnIZoY/c2lBAlrRB0Swyp6i1rG6ohSJqZE0I5MXNuFZeUVUlwRlAolTKUSpkzJSccDA8tHEQNKHNdu0fDp/UZCaqFUIGVIOx178wqlsLBELWrUavuEgdY4OSum4UF+qvhARaVUqoS1k0LP+e23Zsjxxx/vXoiibUhPmXsgHqSDfOjGjcJKlWnpgJ/CSRfQQ7pIL+csgOBhxCoyv85UXybj4ietPoiowpOkhEqI0q6msIyIUT2PKAnoLeMeiyihItqvjSm5Kkpk24Z18v6cObJg6UrZXR6UMrV0e7XtVqYELFSCLlu5Wt6b/b5s2LBR25HaucAiut5zTEpLymThgsUyoP8gGTZslGzask3JqMTDAqNfiRRRAmHVEudKcCUg4UDCjRpm65pv5fFCFNNekM6qZCMhYtawKchYm79NBPLHFjmQPsZTyYvu3bs7MuKeKfhJa2oiYhKrlW7Uke6IQIJEjzVBRBUlj2sbci2GNQxLoKxAls5/T7o+/YT86+ab5YV+g2R9YamUqb9itWzrd+6RYeMmyq133it33Hm3G3itUGKG1TqCoFrCWbPel569+kqX53rKiy+8pI3t4bJq9SoJhoKuF229PmfZVKpo66lYut/QzD71lFPku9/9ruus0GkBRkAvEQnDJNMk8VM46QJ6SB8Wn/yyKpp2Mu9F9+vXr3b5G9dqH2o9Wq1xMPCTVh8D2giNd5MEGRlIxhKa8PkFhm3iajVjag3j0YAEy/Pk44XvSPdn28nf/n6ltO3yvKzZWyh88rBI82LDngIZNWmKNFcSXnfDjfLuzHclUFnhLBy6t6r169v/Nen98gCZt2CpzHl/ofTs3ktGjhgpm7Rtk+hp7+vp0lmChAyKQ8qVn6yUe++91w1eH3fccW4/G28ajXSQEUmkd/98yJTsy9+6r6dLAGk0QiGMEkBMxlAnTZrkNhSwj52bX3vAccM/7qAuHakkVVpBI4iIlUESZPw8EbUDoqSIxdUiBcu0p1uknZQCqSjYIGuWzpaOnZ+Rji/3k1V7CyRfdeepgS1U8m7bu1fGTp4iT7RvL+/NmqnWMPGhm7Kycnn77ZnSo3dfeXf2XKnSdmNpeVjbe+9I106d5a1p07UNqV0Wta6J75AomVzPPZFhlcGA9H7lZTn+hB/J17/xdXnwwQfdcI03U0ByuptKvPHIpAAjF8QyIkJCyEb7kOVwbdq0cUezhkZKfptfUJeOVJIqrcBH1YwZV/K54WNETbv+0VOmyGtFvSY6K2phQqUSq9yrXdx8iQe2Sd6WZdKnfx/p/NpQWZpXJLs1yDy9qVjvKdAEvzV7lrR/poPMnPm2WkRmOpSg27erJewnXV98SZZ+ska1aY+7qlrWrFwjHdo+LoP7DdCqv1wjqrHTB8B9FFEzDn/E57NNm+SB1q3ky0ceIX/+y8Wye88elxl1VTXeDGkqNKVO0m3VMmTkaOdGEqYA//GPf7jdaQFERLiPoxHxQOAnrb6ISN82MWDCyJ0+MfofF9drRdSb60zTRtSesvuOcKRIW8h5Uh1SIm7/WF4Z+Ip0HDRC5u8pkp3qv0DvK9RjXiAo78x9Xzp2eVbmz5+rbcQS7WgE5TNtv3Tq0lU6dH5eFiv5iElIOzArl6yQ9g+1lWH9XpWgEpH5a/RWKsECmmmgoKxU+g0aKKeecZp889vfkg7PPC0hrYpITxgi6j1e+MmodKOpdKKDBw+xqpaH0QiIG2BMkQ+gT5482fWquUb1jV8bTThQ+EmrbyJqtJyosf4cESlWoukSVxVSElaqNSwUCe+U6rAScccy6Q0Rh4yUhQXFwjtyezTofL0xPxSRmfM/kCc6tJNZc2Y6IsaiYVm/Yb08+1xXeapTV1n48SpHRD6OuPzDZdL23gdlcJ9+EizVKoPxQs3kkGZWSNuIpcFKmb1ovlzX/CZp9oVm8ocLzpePlixxcSM9VXRKDiMiGtlMn3XMXFmpWO1AFc32yKxfZMB727Zt7rr5T65FGgM/aW0EEdWSqDCKx6/9LWJi+IYpvKj2ZvmOcHVEiRjZrRe3y57tS6R7v17y5MCh8sHeYtmiwe5SyVf27q2KyuwPF8rTnTtpZ2WGVs10ZWKycdNGbR/2kWef7ynzl61yeiJq+VYvXSmP3NFCBvboI6GySomEEzMhxIGHoShUKcMnjJUzf3mOHHfi8dKrT28pr6yUgLYZqcIT89z7Z4qfjEo3mkonOswaIpybbn6bxQOQ8bXXXnN7dbNKCXDN2pcHCj9pTQsRWZIV1h4zRIxVaRWoPeZ4FV9ih4g7JG/XcunVv7c8/dpwWVRQJrRCGERhwKBQEzhn0YfStfsLMn/BXCULO/ZH9YncKmMnTJTe/QfJ/KWfOJKhY/7MudLx4cdlyoixbh45Brl4cjWcKs3kpatXyi133SHHfO87cv3NN8qylSslqHEq0eqaXrYzrUnwk1HpRlPqNKsIqSCiEZN2H1W1WUgIx8qcJ5980hFy586d7h4vgQ8EftLaCCJqIpwkqubPdVbUyrg2YpQZDu3+B4vVYu2SypLNsnb1QnmuRzd5pk9fWbxth+zVREPCYk3cjsJCmTBlirR6qLXMmPGGhLRqjWk7s7CwQJYsXSYjxkyQN2fOkT1FxbJ58xZ5re+rMviVAbJ2+SqJaW/ZEVGtcUAzcbf2imlrfvGIL8l3v/89eb5Hd9m5e3diIYbqsnnsZPjJqHSjqXSiA5KZQCgIh/Db4uAlJnvpsKKbvSEZ+LZ78WPn3rinSkuq68AHEd0v/YOQJvzhmhAISEGzrMsNaMfVakaCUl5WKJ+uWS4jhg2SO9RKNb/7Xhk9earkl5RIWMPelb9X3tUqoF37J+XKK6+UZ7RTwadhCZVZgO3bd8ibb82Qfq8OlOEjR8vw4SOkm3Zg5r0/V4KVAUdCvnNMBhIP2oJ/veJvcoT2lK+97lpZ+vEyl/H0qHnqyci6MsRPRqUb2dRpZDLgZlYSd/KTdiITAO+9915tG5FhHOtBI/g38YaXDD9p9UnEhuESoh2ARIQgJBYoKiWlJW7N34D+/d04VUvtlb02aLDbCpiE7dixUyZMnOg2D7r/vvvd5kc8jYAEM9q/fv0GN+j6nHZcXur1kmu78PJTWKtb9LkMUQF8BYBvovAd5b79+rpxQ0AHhcykmsF/cqY1Jq3pQrZ01gXKwgho7UU+1cuQDi+WWXnxnouNKZKfvGJhr1k0lBY/aU0bEUkIkU2ca+dFI0vjd+vWbW5TIGY15s+bp+fLa98m45XHT9escZ/5goCQjJd9SBz3WxVCW+XDDz90ixW4Bkk5QkRmUYglX2Rib0NmUa666iq3CJaBW8so4sYRyRFxf5Af5KXlD/4oG3YYY1U3e+mw9yJlYtaPI3mLsaD2Ss5TL/ykNa1EJHLeiFpD2BsO5zxVEMyeQEhiIHFkAvfbNcQSyv2EadUFwC8fTvzKV74ip5xyilv0ig7uIZMIBz/oQ5IzjTC9cWwKZEtnXcA9Ob8pHywg33O56aab3EJa8g13ypV78I+fQ4aIgIgQMSMYiSFxySTiHHcjk1k37uW6ZYiFxf0kFOtq17gHHYDwqP7/+Mc/uneUGZSFyHbNdFm8+G3xMTQ2relAtnTWBfKDvCGf7Eh+4Z9XbR999FEZMmSIWyTBwlpe1icfESvr5Dz1wk9a09dG1MgY+SCLEc0K3sJDcIMsEJB78M+5ZQBH7rEwIR7CfVS3tqEQYErq7rvvdh/mOfnkk11Pj/vJIMSbyd54eFGXW6aRLZ31gXzHutlDTr6TZ9Qs7J/TqVMnN9jNQlorX45W5kh94ftJa1qISAETESOOkcAiaG6cG8FIMAkB3t8IftGNfxIMSSEg1/DHb67hxk6v55xzjmsbstLGPiWLWFh2tPglp6sxaU0XsqWzLngfVssrhDwkn7mPNjevWPBOOOA6ZWF5Tb7WBz9pbZCIBgvI3FBKhE05RxJB5IxoFkHu8RLVwuEcd2AZgRvhEhZ+cLMOB4k2/wZ6c1Qb7Nhw5pln1n6fDn9eEhKe9yFIDsfi1JTIls66QH5YfMgfKyuOiIFeNB9Qp0Npfilj8jc5T72wsBuCLyKixCLFuT0NRh4iQoT4bWIEskR5I0rYlnj7jR/uo3rgPtwIl3C4Bmgr8kV3PklG45mqgqEarCFr6nhv2cA9XjF9Jl7U5ZZpZEtnQ+B6XeVix+XLl7uOIHtKstsYD7nxgfP6wse9vmsGX1UzRwiFQiOWiZEFIhIZSMQ51/DPuZE2FfBL25F2CeEi1uvFHRLecMMN7rNkf/7zn+W0006TI4880n0zj0/IglQJrgvetDYVsqXzQGHlzjBZly5d3JgtHxkClG1dNZbBT1p9W0QiYUezjPbbCIM14xx3L3EhmJGzIeCf++kh0yHhN2OIjEMOGDDAWT3GHPmqPBnB3oa8o8xYF2OThJ9KR13wk1HpRrZ0HigoU0B5sM0dnRde7aDMyXO7Xhf8pDUlETlaAXOOdcICQjB+EwFzg2y48xtCcTRCIg1FFuDfGsAQmx4aq4aZhOcpZJkSYTB8QNvwBz/4gVxyySWOnOizODYW3HMg9x0MsqXzQEE5IuQzH0JihzH20mGigvJqCH7SmrJqRih8CtkiYoQzNwgE0bzgGtW0tRP9gDAgIuC+KVOmSMeOHZ31wwoCLCVjWuzmxafKeDLZZMiInirBdcHS2ZTIls4DhZW3nTMFyCQCbUZqsIaMjJ+0+m4jUtCQkEggZrksAhCHLj6vKPJ9OKaE8IP4tVYQ2vyRUKzgq6++Wvu5CcC4Ie1Ednq94oor3E6vWGOLb0MZUh/s3qZEtnQeKOwhhweUP+VNc4l1Ah988EGNr7rhJ62+iWjVLREiMrQNICJHNvfh3VisFx+c+cMf/uCeFAP+EHui6gI6jLB8X471cAwX2LZxuFNdT5s+ze3k9cMf/tDpKCkpdfdFatYl5ohYPw5GH/dSBhCQciCfGaVgXLFz586uGVWb96gx4VCT1s9p9/ipJSIerSBNqREHN4iIcA4x6NnSk2WhQuvWreVf//qXq0LHjRvndlPgxW0D93FPbYTqEMCR9h9W0L5DDOkRrjHCf/bPz5YvfelLcvHFf5aZM9918SGehG+SCJPwGpJ9ur3pbirJls663P2KGSPy2LjBogfIeNutzWX3rpqaS/263UAQPeelOrdelXC47Px4RNHMlBCwl2wo5JxrEIEqlt+AJ4J1aoznsW0Fy7foPNCpoM1Gr8q+Zcc9VJ1GpvrEQPXOOjiIjB5AfCoqymXQ4NfkK1olf/s735KevV7U9mKBxps2KnElg/a1EwlyP9GHdT9xfhLCPQdbSI2VbOmsy92vGCfgCnygTAEvXN14/bUye+bbEqooc27se8TyPHQGw8oBdoKDjFxT0eD0X40oHBHxTOAoso4IRwiEG34AbTWqYHqyVItsEk6DlWEVBjnZ8gwSMjkOuI8I27ig6apLDGwOxFQSbUTuscQyhHPppX+RY771Dbnmn1fJ0mWJdYvRKE8p7VAeFKp/qmj0JIk+wAnhHLd9ukk74nXLtGRLZ13ufsXbxIIbGArKh/HEiePHyqABfWXerJlSlJ+nRIwI277wvnlpRaWUsg2M0gg7irgS19811NpHRMhHwSMo4kh7gHNgVhAz/OyzzzqrxW5S/OZbdgx0cs/B4pFHHnGbSXqBbkh/9NFHyQknHifjJ4zSOKceIM+h6VBRViKTx4+RHs93leVLlzg3thkMscGWEhIiVihpKTXGUGAVJNyPiJANkwvbzfRyxJrRIIVk9JD4JjBjR7zPcP7558tFF13kLBjX2ZuZnjLCXCTtOywjy4j4zXlDQlVOJ+WOO+6Q6667zk0hWVi0Gc899zw3lXfSj0+QceNHy6bNm2TFymWqd5Xev079faq61qhedG3YXz5DNtYI5/vrJq4W36aSbOmsy70xwhgiZc3RwuO49KNFMmzwQLn1ln/JcK0Z4Q47vFWEqqRciVhYGZASmndKOiOjVlTOKoJmRjqrBjnHEnIOMUeNGuUWFLCJEcusfvGLX7jvk7C7FkuvuPbrX/9azj77bCf8ZtctVsT88pe/dHPBuPH1z/oE//ghbPa3PvbYY11YzJwgJ5xwgtMHEY86+qtyyqkny7nn6bVzzpKfnX1WTRinuSm/008nTPR55HT1c/rPPPJ5/YjXLdOSLZ11ufsVypQysrifddZZteV9xmk/lVNPOUl5coxc/tdLZfzECbJWDckalYUfr5ANO3a6bQipM00gZKK+rbGIVMsQD1JyZEiGNgCEHDZsmFv1zLsg7DEIQX7yk5+4nivfsGOeF7Kceuqpzh/XGGzmyDAL7hCEaxCYa3UJ17iH8Eks9+IG+ckE3M8552w575fnyGmnq65Tf6zHUzTck2vCOEH9n6hHdODmkRM1TieeUiOc2z0JIQ2I1y3Tki2ddbn7FcrHytfKhvMTTviR/j7JlclxP/qBnHLaT+Qf114jrR9/VO5p1UrubNlKRk2dJnvVKjIHYwIZbarDDd/QRrT2IUSEhNZZwQRjFamWmzdvLrfeeqsbnuGtu8suu8wtC+JbJbQfWXjAbAi9ad4CY4cpXnyaOnWqE3pXXE8WrnG06+aXoSDCsnCmTJkkk6eM1/Nx6qbCcRJ6Jqj/iTWCvtf3lynItBpJ/PbqR1d9ccuUZEtnXe5+hHspBysPiz/n47SjMmHCWBk2cog8+kQbue2e2+XpLp1k4Mjh0qVXT7ny+hvk5vvulxkLFtR8DSLxVQjIaC19ZxGtGkao2zniBjGxlhCVaTQUM1ZIJ4WxQ3rMvOXFOkCWCNlwS2ZhAwBuEACHHA4RlFcWy5Q3JssgJeTKdWucW1ksKh20o3neny6SjtqxLYNv6v45IlobEYGAVMtGRo64A/wxfMPbdAzTsC3FXXfd5XrPjCNCSiwiDVmqdGDVPkT2C/zW7x/ixfQ/45t0pspl954d2tGhEZ3oqCS2nmPcizgzZBEXvt/CpzMYtmEMMYeDB2WbbAf2Fu6R8VPGyYChA2Xp6hXO8hUqh55R4/W7yy+XTr17S3E85qrkxLdyIGUiEGcRIZvr5dRUyVhDs5JGRqwj5wizHyxCoOpkrpHhHHq2EPLqq692Y4y2LItwIKOLeArgx+TzwJ2mLXELaFxLNQ5L5LmuneWaa65Wvf+Q66+/zs1Pf6a94kCAsUWNN3snVmnTIxSV8rKgVFYwTmpN5ATq15k5ZEtnWrFfcNVSWLJXJkwdL8917yrT3nlL1u/YJlPfe1eaP/CA3Kc8maOcKVdLgDXkezkBPecrYqAZ1scGJyEc5MGi4cZviMQRUtpvQKJYqs9KaYjI23OQkpmV66+/3lXZ+LHxST9WMXXhqIWLhyQvf6eMGTtCmwjt5eVXemsbdbi88cY0baeMU/3PyuOPt9O24TSNX36tFYxG4lJRpg9WQJ9BN26wD6n1ph/Z0pk5VEtRSb4MHTFYrrnuavnr36+Q5nffKbe0uEf6jRgpn2zaJHuVQ6WRmJSpISiLVElpWMuDTf8VrmqGeFTJEA3iQEIjItcR3BEjJcJv5hp5EZvxRZbuQ0A2fMQykXDutXBSIXXhVEtZeZFM13bIgy1bSMdOHeTTtaudu4EX9R95pK08+GArbbvOkNLS8trZlKoQcYl/rnpOrTf9yJbOzIF1AnkyXInY4r57pPXDD8n9rVrKJVdeIZNmvO16x7QJ2ci/XIlYCc+UhGyeBZxFhFCpIsl1IyTEZV0glg6SAYjLwlVe52TlDHPGRmyr6lNZxVSFw3Ymn63/VJ5s/6i0an2/zJ79rgS0nagx0weDxbqMgVaodXxLbrnlNunW7XnZtGFzDRG1UlcSQkTakF6k0psJZEtnpkCzKT9vl0yaMEaGDR0ka9etlfWbN0lnLYP2z3aRjz5Z7bqXbuhGo8F0n/tGTg0nHBGxasxssLqFGQ02yWSWY8PGxEwJawAhnllCFkKaBTUBVs3TjrQ2JdeMsKmsYqrCqaoKyvwFc+T2O26RJ9q1lXXrVmvYNHuZkmQSPrHwYfHiJdKixf3Stu1jsmTxUiWhkk9V02HhC1fJKrJFimzozBSq41Ep2LNTpioRB/TtIx8vXeKItmrtOmnV5jHp0r2XbMvb63rJ2EC2MmTpHh8HBc0gCFXrgy1byuWXXe4+pM2C0yvUpHLkU7KsrGEBKosXsGwQzKpmfie3Ab1WEOE311NlRKrCgYhz3p8p/7z2amn/1BPaBtyh/kkaRKQpwfMm2oNe50h45513a09+ulSUB51VpJ2IcO5FKr2ZQLZ0ZgoQcc/2rTLs1f7y0P0tZMTQIc4oVYbCMnLMBLnltrukS7fusnHrdikPaIcYTqhh4iNNoFkwGJBFCxbIkEGDZeyosTLo1UFyxWVXSst7W8q4kWNl9IjRGuhIWbTww9rqGCJCMMjIb7N4lrkQz6px85OqWgapCicUqpR33n1DrvrH5dKuXRvZk7dd4krEWBxry+oeTZw2ALHqjz76hLRt87h8MHeh66BQLUejPIXa5uVzaR6k0psJZEtnppCft1uGDBwg/1TD9YuzzpLbm98ic2bNlvKKSskvKNROZX81IDdKq4fayNhxExJbIzN6UROlZmEt3F2bt0j+tl3OoWBbgTzZsr1MfG1iokLHbVehbN20zS2EhYCQDpJxNItXV7UL+bwWMRVSFU4kEpKFi+bITf/6h9zb4hZZtnyBRGMBJR/L1yo0DsSnSuZ9MF/ua9FSunXtLps2bk30mvnsrhLRvg3tRbZIkQ2dmUJxcaG89+7bMnBAf+nNiqzRo2Xl8pVqtBIk2rlT249TpsrgwUO0LzE3sQFojTUEzWJauIGiEgkVlrm5l+2rt0mHB56WsS+Nk8AObX9pOOGyKikrKnOfFjP4JVdjkLpworJ9x3rp+vyTcsNNV8or/V6QvPyt7goD3FTR27dtlT69+8qDD7SWUSPHS8HeYr2YIGJVUC0jXy7NVc1Ninr14lxzqZnbajishcinbJVX21dtk6daPCWje46Vim2Vbi6mWrs5fMDbxt8IGAuYDSIGAoVqFWdKu6daywMt71AzP1RWr1mmvek1WiWvcAtzW7d6WPr3GyhrVn/mquUYMyuhuJSXapNCiejgUZNab/qRLZ3ZgB+9zbSe0jpPSaiNeIi4ZeVmaXf3EzKq52ip2K5EZD4mYWxcgNb245juhBFe/WFyDZ0MvudrtTxPevXuJrfedpO2Pf6unavLtHP1N7nvvvtlpLZr165dryQM1kzvxZWI2l4NaFuStKLCo6ZhvZlBtnRmA37S2sx9oEctYrVWW/SrN6/cJE/c+4SM7j1GKndq1VxDRL6HDAFp85k1NAV+FPlB6nBohxIhph6LZMOmNTJt+iRp07aV/OzsM+QX557jVnJv2bxN26+8M5GYZ66sDEtRQakSUTtaldp5CvFk7UO64t8YZEtnNuAnrc2q40rEKsioLMQirt4s7R98Usa8Mk4qdyfaiAhEdATUBqYFDBlN0pHI1BHGEtP1ZzqSl3SqXEdl9ZoVbqrvttuaS6tWLWXs2PHy4UdLZMOGLVJUWOqGb0qKy/VYKQElovvMhQep9aYf2dKZDfhJazNlmBoatTQ1DfjdG3fJM22ekclDXpdIMVW2OioR+Zi3NzDI57WQ6UhkwxHmmuqLBiQULpNgqFSlTMJV5VIVCUhR8V6ZNGmiPP74Y9K+/VPy/PMvyvTpM2Tb1p1qARm+iSoZy9wLPcloWG9mkC2d2YCftDoiVkMkbTvRplo89yO566a75YWnesiWNdskUqlE1dqQjoqzftUJ6wf5GL5BcE8HGo4w+iGitvtizNhUSHlFkVa7DCnxm1mfgOTn58m8efNkyOCh8s7bMyU/b68bvmFGpbRESZsjYpPDT1qb8UHwuFq2sJJw1fJPpFP7TnLeWb+S35zzB+nzfH/ZvTlfSZrwbAGaQEYkXbBw6wOdlXgcImGFw84SRqJse8LvfdUtA+ilJaVuJog3ybDmiVdJa3r+SSpS6c0EsqUzG/CT1mbuG8xqaaKRKtm5bae8N2OWjBo2WkYOGSWL1DqW5JdLNEgB1tzhQboTljrCREItdI0k1iciWOn626ku7naJY5K31HrTj2zpzAb8pLUZFobFAlWsDQto9aY9TFfOQAsQAxQNa0B1EDHd8Fc4RCRBvgTwf3AZ7E9vepEtndmAn7Q2Y1qMtlVloNxNUoeCYTfoy/AitR0k5Lwp0uCvcLhukh7405teZEtnNuAnrWoRmTtmNU1Ae6CJVRGMwUUiLK/XDkxlxI3HNQUyVziEmSz7kDm99SNbOrMBP2ltFndDIiwaqJQge8hoLzjIhjnRxCLSUEjbj57J6UwiM4VDeMTfK/vryIzehpEtndmAn7Q6IkbjvM+MNYxIOBqTgFpEjhHtbUJIthNrCqS3cAgHSSZhjohNDT9prSFilYpWwdp7DkYibguxKiUiq6UgIxaxKRLhJ8L+QTjJBDTZX0d69fpDtnRmA37S2sx9X7k6JjEViBjihRa+g+wGr7XDov/+fYnYkOxDevX6Q7Z0ZgN+0vq5rYvx7iRLGdXUOsHhktZs5C3wk1Zfe2g3FbKhExwuac1G3gI/aa2XiDnk0JTIETGHQwI5IuZwSCBHxBwOAYj8H7sbgjJjBB1oAAAAAElFTkSuQmCC)
In figure, the sides QP and RQ of
are produced to points S and T respectively If
and
then ![text PRQ = end text](data:image/png;base64,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)
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WLZNEnH0qPIf3kyd7d5a2ly6REr/HdgIpoXEmbJyUFeforLgW7d8mrA/rL0KFDHRHRj5WjSsdq0i7FWvLQsOcOcbcHxsho6cwUCDtV+DkiKpL1UlDeqhki0g6kPcjsCEMwdFLuvPNOJ1Tb+LUw2MOQDZS+853vuPFDSIJARiwnbUOq2Z0790ivXq9IayUiHR52uA5FivVYJfnBQhn57lRp1+8lmapVcbGGCxlLlYi1iIVk767tMm/u+64HT8eKOPBQQMDf//73boUPHaLVq1e7JgHXIR7xNRKS3kwiOX/rQo6IimS9nENEqmQKi/YWu3CxZyFVcZcuXdzKGXrSEJT2IfdQqMyWQE6qZLYOeeedd9z1UaNGuTYaHYvi4hIld1A2b94mPXv1lVat26g12+isYagKIoZkW/EOGTh1tDz+Sk+ZvPgj2aMdmAK1pGV8aTQek/ydW2Xm6xOkx3Od5MVuXd2Gn1THxIOOC9aQBRYsvD3//PPdawm0GSEgxCOuRkJv2jMBwk+lI0dERbJea8NRxXLEkjCOePPNN7tqmPYe24AwY0J1a/dS1WEtzz33XLfbK4Sk0wJYecMGnLTlsIrhcER27ymQvv0Gy4MtH5FNGzcoEbXHHSmRWHWlbC/eLkPfGC8dBvSRqR99JDujMdmjUhzRZkMsKlvXfypD+/WW22+8Ti664Hz3YFD9QiyqZh6Ijz/+2L2gxVDT5Zdf7poVkBRY1WxNhUzCT7nmiKhI1ksBUZhYQs6pSmkP8qYdH96xHrJZFvxwP4XcoUOH2t1fGWLhOteMzE8//bRa0SmyVwm6Zt0mebFnP3mxe29t9+1WzXGtsoslHC2RnWoRR0yfIO379JQ3lIhUzXuVMHvpcUe0jVpRKts2fipTxo+ROzRePCDsGmZxMYJxTrVM9cyYJueA+Jh1NH+ZAmGnCj9HREWyXgqGAqWgqO4YR8Sa0DvG8mzevNkRlULEalKNc2RMj2VebDd877331nZgaGNCSAofa0rve5p2frp07S73t2wr6zduUQKGpVotYjRaqhaxQvJKdslIJWKH3r3kzSVLXUelTKXCfSVA4xsJSaSyWHZv2ySvK7HZO2fWrFmuKQFID/HjiBuzN+wigZUEuFkbkThm0iom529dyBFRkayXcyskqlGGQSAPMytYnokTJ7qNkbCYEBJ/LPPCYkJCOgn0VCEohcwRUgBI3E7bii+82F3atG0nPV/qqxYQarEwQckdhW5BKSzdI8Mmj5aOL/eW91Z8oi5KQpVKbSPug5ItxOD2EtdWpamAvmSQlg0bNjiibtmyxZHOCIgYYTOF5PytCzkiKpL1UlAUHoVEtbxEe60UNL1eqtePtKq0qTruw+LRi+YVgP/+7/9243W4WVgWPgJ5GZAeNHiIPN2xs0ycPE0CYaYTtaqPBtQqBqSoYKtMfn2M3NO6hfzz9tukz4gx8lneXilVo1UUCsv8RQtlyoQx8va0yTLzzdflrTemyxLtNRdre5U4M1bIjAodLD6bgRWGhAzvEC+zhsTNJJOwtDeEHBEVyXopGLMUdYHrVNtWgBTuCy+84HZsYOsQLCYk9cKrA2v05ptvyTMQcdLrUh5ItNWqowwXRWTtqg+lZau75fSfnyEnnHa63NaqjcxculKKNTr55ZXS9YXn5aq/Xiq3XneNtHmghbw2YICs/fRTtY8J68dUHm1VmhLMvLBHN1adtwVJF3HDH/HJEbEOZEMnSNZLwUAMIyLXKEDcOYdI3oY+1TfLuVhvyEvzdGy47oVXB1X13LkfSLv2T8ugISMlWFWzACGCFdVqdN0y6fD0o3LJFZfK+ZdeKo8+200+WLXWEbGgMij9BvSXe26/VR5reb907dhBJowdKxu16iUuEIwqmt45zQg+It67d2+3cMPNWWs6iFuOiA0gGzpBXXrr+m1uHCk8CMlYI9N+dFIgYosWLdwwSvL9XnCtTO9r16GTtHyknRQUl0qkKiShQIleDEjerg0y463JMuX1STJJOzWzPlrsqubiiEhpKCILtGp+fdJ4eW/GdFk4d7Zs2vCZa0LYA8IyMJoPVMsIFpI2LdfQjT/EiMt5Q/E9WBB2qvBzRFQcqF7uYdoMy/Mf//EfbrqPAWssnp/CnTNvkTzRoYsMHDRESooKJB7T6j6svfDKAiku2CFlFSVSUhmQQq26i9RqlkSqpTgQluLSEikt1jZj0R4pK8yTcDCxKpv2J2RDN80FevyMYxpJjXRYXywjv61DlUn4yd8cERWN1ev1y4wJK1vopDDjQuEDsz4NoaQiKK8OHSWtHmoja9es0jaBVpehUqkOM5mnVX9cyaK1ZlClQqUsEpcSJWLM9ZyV6JEK166MxRLLz6ztZ2Tz6ue3kRR3yOf3gTlYEH4qHTkiKhqrF78UID1npvyYzuNTZvROsURUeRRyQ2FypUJ7y7MXLpaeffrJxAnjZevGdRKpLFKrWCLxqPZuw0z5RaRC2Vgajkm5ErFSz1kwEa8KSFStJ1Y0Gt3f0hkhrf1n7vjhNzA3I2xj0t9Y+Ak/R0TFgeiFcAzZsMSKbYfppVI1ettdVuh1gStUiAVllfLOrLnybKdOMmnsSCnavVUvBtXSBbXzohYsGpdgVNuUjoixBBEZd6QaV4tIB6cqHHKLKNBp1a0RzRsXBDfE0my/G4rrwcJP/uaIqDgQvbQN7777bjdkw5o/eqoUOtUfx1Th8claPuJN8W/YvFWe69xFenR7TtatWKwXA2qyghKtouqMafVcLSGVslBcist5JwaSBtQqlksszKxNop0H4Rhg5yHhHDfiwhFi4oa1hKgQjzjiZkTNFPzkb46Iirr0NvSbDgBzzrynzHpD5o+t4K2QU0E1SlBJFlazGAhVyeIPP5RunZ6W0YP7S+GuzVo9l0t1nOpWq3msolbLFSG1igEsnla7ahGxmvEoJEysMYR03nYipESMjMli/oyUmUJd+ZuMHBEVdenlt1kRxEswrB/r/GgbshG7zd/ij8L1S8QqrWJDSkb6HryTsmTRQnnq8bbyco8X1NKpVVQw41KpvebKUETbi1EnCeLoMYbl1Wq6hkjEF+EcP8QFwc1LNvMLGf3E9WCBPtNdH3JEVCTr5dwsBlUtgqVhGISVzyyrYq0hWw6z3hBAVCt4szINAR1Uz6ZHXZz7mNGj5Ml27WTlyhWyfv1nrgkQVotJW5FOCu+uJOJFFUvP3D+RspG3IDl/60KOiIpkvVgLI5ZZRAjDJ2z5rC2dE6pl5nIhHES1JWNGLI4NpYVr3Gv+zZIxQA7ZWdHNrAjrGIE3TKpb1kFybIxFayg+mQR6U+nOEVGRrJdzq7rMnXOGZ3g9lPeU+UgP1gpAVMho5LVjQyQhXCOi6fK271i9wxt4vCuDJbaX5qmqCR+/3vj5QWP8phPoTaU7R0RFsl7OKXQbE6TAmSJjKRidE95H4a0+1iBCGiOSEZBz7kuVFu6DUFhTu9fCwvpiFekU2esG3vDxh+QsYgaQDZ3Aq5cjBQ0JISPnWD7eYT711FOdNeQ9Yl6e5zqW0MjI0c79pAN/3E84Zglxg3BU0SxSYLEtL/dTRXOdeHHd/HH0i2zkLfDmb33IEVHh1csR8hmp+M0bdvfff78ceeSRbs0hbUMsGYAYNm5npPTeWx+4hjUzQSfEsnvNnXdOeIGf77AACIs/hDg0pCMZjfGbTqA3le4cERXJeiEAZIAcFDZtQ16I+uIXv+heQpo7d64jBKBatbf98GtEMjLVB9OJH6wauhDcOJqFXLBggVtoO3LkSLeeELJzjxGxIR3J8KaxKWFpbQg5IiqS9XIOGQBjhOzmdcQRR7i2IVuHUJWaf4iA8NuOJg3B6yfZv/0mPIiORWZhK9OIvL9shIWMRkw/8OpoSlh6GkKOiIq69NpvquFjjjnGfT2eD3rb66N+C78+1KWzIfBOMu8mYxnpQaPfLKnfcBqjL53wk9YcERX16V27dq3ceOONbuuQSy+91L0JB6gSzWIeKPykFbKhB8LRYeKh4JVQVoAzzdjYvGqs/3TBT1pzRFQk66XgGZrp2bOnW3V97LHHunaafS+PKrEpiGgWz9qjtEXpvbdu3dptc9JYZCNvgZ+05oioSNbL+cKFC90Or+xteOGFFzrriLt1RCDJwcQ1WWdd4DpW0QTwgPDlKoaQIGZjcDDxPRj4SWuOiIpkvRQ6wyVsK/fjH//Y7VVIdYxlskHug42nn7TadfTSQTLy04tnxc+YMWNqraUfHGycDxR+0npYE9F0cTSLg7VjJoNhGlbXYA29VTLX0xFHv2klXtY7NiJyzhQgsy6QEStp8IabHL4ffZmAN0714bAlIgVs1awVNO0xZjOo9ngZip1e+VqUkQ9/B1slG/ymFX1YPeu0EAfAmCK9eBZhMMsD7Dp+EdLEvaYnHfE+EPhJ62FJRCtcCo0qz1vt8hYe1pA5ZXbzYqiEOHkLNh1k9JvWZHLRLiQezD2zewPvLPNCP1uJkA6E6zw8pI00cR9oirytC37SetgRkfAhk5HPjrjzojxtL4Zr+CYK7ytjIblOwXK0c6vKDxR+0+olIueQC0E/VTLvLbM+cuzYsY6cRkB72DjHLZvwk9bDjogUIAVE4Rq5OMdysKKGDZSYymNDJXrKFCTLsPBD4XJPUxIRP5DQ+xAYKQH72bClCMNLbLREvIizpcviDTKdt/XBT1oPS4tIwSAUmgkDxqxyYbthtg1hiw4jnFV33sKFDAcTVz9pRTd6OBIXHhbiYXEH/GYnB779ggWn6uY693GNuJrfTOdtffCT1sOyjUihWpVs1gJryMIGNtl86KGH3HpA4mKkNRKaRaJwDyauftLqJSJxsAfAfhMXwsCNhRhU0XRgjHxGREvjwcT3YOAnrYelRYSE1uhHaAcySMxwDWRkgQGbbHotCoVuxOX3wcJPWrmOLohmes2NuBA/4mVg4yX2+WZjUdyNrDkiNhJNodNbiFa4NPTZNoRqmfdE6LQA/EBa/HEPAinMKh0M/KSV6+g2nfYw2DkPiTdObF3MZzWoohnS4Zql0cLLdP7WBT96D9s2IgUHOOeTFXRQWO5lO70CK2wjolkXb+EeKPyklevoMUEvcSDu/LYwcCeeCHtks80y1tH7PWgjr90L/MQhHfCj57BsI1Jw6GG4gw96n3TSSa5aZtwQNwN+rMC9BW9yMPAbhteP3eN1I16Qyx4syMbqHL79x5gowLKzORTWHX88VLhxNKuZSSTHuS4clkQ0HexnzSZK7HuNNWSAmIIyomYS6Ugr9xNXI5eRkRe9+IoAn+Flb2+Gc6xNjB8sJwtu7aWtHBGT0BQ6rVrCOjBPy6prvonCl5oABUrhZDoe6Ugr95tFJM5YQ9wgHFU07UW+NsDGoVwzKwjxICcD4rgdCmk9LIlIwbFBO9uF8AoA1pAP+AAKzAo0k0hXWgnD4gzBjHCsJGcslJkiVnXzeTSzigBCMi5pnbFMwk9aD8uqmQUDzNGyxItOio29AUhKYZrlzBTSlVbiCblssJu4QzLk008/delko3k+PmRDUtxjVTrCeSbz3U9aD0si2vfyeA+FDz1SYIA2EwXTFPFIhw7uJ76QyzoiENGm+CAn1TJrK3nFgFqAB86mLfFrZMxkev2ktZl5ShaeGqSuawlBgUnCzcEd7RypuVbj7E45d6g9cWBDIdtUyHvP/vdq3FRMp3Nz/hPXzC3xrwaeU6wCQxv0lL///e+7t/IoMAqOwvRawn3hpV9S568/McvmJRXEJD2cA3rPvHtDbxqduHsH9M0iZkpSpRX4I2JcJeYRfnv8xuKaGbF9Y1sQJR7T+6P62+7R83g0JjGXWYmqj3DiTmru02NMBTfTGY/sCyemwuaWVSocY04S99bGUY/s81btdKlEtN1Uta+QGCdkLpnhGnrMVFm4U3AWD+DCzKCgy/QdrAAjpIXJb9IEGB2gF02HbM2aNbWk5ToWkvPkMNMpqdIKUlfN+KMty8NlogWuJa4nCYmy6biSK6KJh4RsNh6t0owJ6+8qDUclrufRsLZdwkH3KQcIGddwomy3pmSJuSMNbyWjCjrjbNMb0jaMhgUZ8RvS8Nk5kH0WqjRyUYioiVSlGjeNl95brf5jQdUVCEk4EJZQMFF18ebbC1ogWMKf/vSnbioPy0A6sQwUSqbbS4ba/G0iMFvEcA4LO/j0BUA/pEQgSqbgJ60HSEQVF3BCtOgdIZxogthuNxJWCxRSAoU1HBUIFQ6GlYRhJaAWtvpjN1RnEZVAVWFtZCtZq5REkbC6Q14lIqLmz5GrKhKVoOqtVH0BFYjoooIVhIgQVgkYrdCqSSXMUX9X6zWIxv4xF1x4oXz1qK+62RTaTLhjEThiIZCmIKOfwkkHvDoYX2ROnRf1eeggn1nHf2MiJi4hbsNJTUiVVs9VmigsF+SqdhZKPahQRUI2qklXjap/NiV3Jlt/u+qT3VNdla7XIV+NOEunYUbUv7bipEIjgGhWJqKSiITqgYgajhIwopYwGlBiVYZU+b5P2H7ta0e7T1GwuRFLv+ig0HinMKy6goiZhp/CSQfIX9IFIB87jPHBc74pyMMHXBlkMC5+0uqPiBSyI4Oe1xCRSzxDCG01vqrOB63dpxcc0dSPkiemlrBaLR1EclWrkiWq1yEvVXkVv1UiWDwlI0R0JEenEgjLGAkqQahqNUODejGgWgM1RNRn2cXFxZE2IlWzWuO4iquiNUyw/OPlbmXNUUcf5baXo+dM+igMqm0sg1lECi5Vxh0savM3wzAi8nBBRF594OPmvHjF24A8iJmGn7Q2gohKECd6nkxE9US1HKe95u7TI5aNb8yFwkoITCJWUySkx7CGV6UZhPCJ2IiG6VS4Dobeqz84YkWrlfhxraqdZVTQ/NYQnaht1TCp4pX8BA4RNQzaohHVG1MLDEqKiqVTx05uBuWMM890vUdAISGQEEJaNf3/rWq2dCKAlTnMuDDYzbrLTMNPWv0TUQsnIZoY/c2lBAlrRB0Swyp6i1rG6ohSJqZE0I5MXNuFZeUVUlwRlAolTKUSpkzJSccDA8tHEQNKHNdu0fDp/UZCaqFUIGVIOx178wqlsLBELWrUavuEgdY4OSum4UF+qvhARaVUqoS1k0LP+e23Zsjxxx/vXoiibUhPmXsgHqSDfOjGjcJKlWnpgJ/CSRfQQ7pIL+csgOBhxCoyv85UXybj4ietPoiowpOkhEqI0q6msIyIUT2PKAnoLeMeiyihItqvjSm5Kkpk24Z18v6cObJg6UrZXR6UMrV0e7XtVqYELFSCLlu5Wt6b/b5s2LBR25HaucAiut5zTEpLymThgsUyoP8gGTZslGzask3JqMTDAqNfiRRRAmHVEudKcCUg4UDCjRpm65pv5fFCFNNekM6qZCMhYtawKchYm79NBPLHFjmQPsZTyYvu3bs7MuKeKfhJa2oiYhKrlW7Uke6IQIJEjzVBRBUlj2sbci2GNQxLoKxAls5/T7o+/YT86+ab5YV+g2R9YamUqb9itWzrd+6RYeMmyq133it33Hm3G3itUGKG1TqCoFrCWbPel569+kqX53rKiy+8pI3t4bJq9SoJhoKuF229PmfZVKpo66lYut/QzD71lFPku9/9ruus0GkBRkAvEQnDJNMk8VM46QJ6SB8Wn/yyKpp2Mu9F9+vXr3b5G9dqH2o9Wq1xMPCTVh8D2giNd5MEGRlIxhKa8PkFhm3iajVjag3j0YAEy/Pk44XvSPdn28nf/n6ltO3yvKzZWyh88rBI82LDngIZNWmKNFcSXnfDjfLuzHclUFnhLBy6t6r169v/Nen98gCZt2CpzHl/ofTs3ktGjhgpm7Rtk+hp7+vp0lmChAyKQ8qVn6yUe++91w1eH3fccW4/G28ajXSQEUmkd/98yJTsy9+6r6dLAGk0QiGMEkBMxlAnTZrkNhSwj52bX3vAccM/7qAuHakkVVpBI4iIlUESZPw8EbUDoqSIxdUiBcu0p1uknZQCqSjYIGuWzpaOnZ+Rji/3k1V7CyRfdeepgS1U8m7bu1fGTp4iT7RvL+/NmqnWMPGhm7Kycnn77ZnSo3dfeXf2XKnSdmNpeVjbe+9I106d5a1p07UNqV0Wta6J75AomVzPPZFhlcGA9H7lZTn+hB/J17/xdXnwwQfdcI03U0ByuptKvPHIpAAjF8QyIkJCyEb7kOVwbdq0cUezhkZKfptfUJeOVJIqrcBH1YwZV/K54WNETbv+0VOmyGtFvSY6K2phQqUSq9yrXdx8iQe2Sd6WZdKnfx/p/NpQWZpXJLs1yDy9qVjvKdAEvzV7lrR/poPMnPm2WkRmOpSg27erJewnXV98SZZ+ska1aY+7qlrWrFwjHdo+LoP7DdCqv1wjqrHTB8B9FFEzDn/E57NNm+SB1q3ky0ceIX/+y8Wye88elxl1VTXeDGkqNKVO0m3VMmTkaOdGEqYA//GPf7jdaQFERLiPoxHxQOAnrb6ISN82MWDCyJ0+MfofF9drRdSb60zTRtSesvuOcKRIW8h5Uh1SIm7/WF4Z+Ip0HDRC5u8pkp3qv0DvK9RjXiAo78x9Xzp2eVbmz5+rbcQS7WgE5TNtv3Tq0lU6dH5eFiv5iElIOzArl6yQ9g+1lWH9XpWgEpH5a/RWKsECmmmgoKxU+g0aKKeecZp889vfkg7PPC0hrYpITxgi6j1e+MmodKOpdKKDBw+xqpaH0QiIG2BMkQ+gT5482fWquUb1jV8bTThQ+EmrbyJqtJyosf4cESlWoukSVxVSElaqNSwUCe+U6rAScccy6Q0Rh4yUhQXFwjtyezTofL0xPxSRmfM/kCc6tJNZc2Y6IsaiYVm/Yb08+1xXeapTV1n48SpHRD6OuPzDZdL23gdlcJ9+EizVKoPxQs3kkGZWSNuIpcFKmb1ovlzX/CZp9oVm8ocLzpePlixxcSM9VXRKDiMiGtlMn3XMXFmpWO1AFc32yKxfZMB727Zt7rr5T65FGgM/aW0EEdWSqDCKx6/9LWJi+IYpvKj2ZvmOcHVEiRjZrRe3y57tS6R7v17y5MCh8sHeYtmiwe5SyVf27q2KyuwPF8rTnTtpZ2WGVs10ZWKycdNGbR/2kWef7ynzl61yeiJq+VYvXSmP3NFCBvboI6GySomEEzMhxIGHoShUKcMnjJUzf3mOHHfi8dKrT28pr6yUgLYZqcIT89z7Z4qfjEo3mkonOswaIpybbn6bxQOQ8bXXXnN7dbNKCXDN2pcHCj9pTQsRWZIV1h4zRIxVaRWoPeZ4FV9ih4g7JG/XcunVv7c8/dpwWVRQJrRCGERhwKBQEzhn0YfStfsLMn/BXCULO/ZH9YncKmMnTJTe/QfJ/KWfOJKhY/7MudLx4cdlyoixbh45Brl4cjWcKs3kpatXyi133SHHfO87cv3NN8qylSslqHEq0eqaXrYzrUnwk1HpRlPqNKsIqSCiEZN2H1W1WUgIx8qcJ5980hFy586d7h4vgQ8EftLaCCJqIpwkqubPdVbUyrg2YpQZDu3+B4vVYu2SypLNsnb1QnmuRzd5pk9fWbxth+zVREPCYk3cjsJCmTBlirR6qLXMmPGGhLRqjWk7s7CwQJYsXSYjxkyQN2fOkT1FxbJ58xZ5re+rMviVAbJ2+SqJaW/ZEVGtcUAzcbf2imlrfvGIL8l3v/89eb5Hd9m5e3diIYbqsnnsZPjJqHSjqXSiA5KZQCgIh/Db4uAlJnvpsKKbvSEZ+LZ78WPn3rinSkuq68AHEd0v/YOQJvzhmhAISEGzrMsNaMfVakaCUl5WKJ+uWS4jhg2SO9RKNb/7Xhk9earkl5RIWMPelb9X3tUqoF37J+XKK6+UZ7RTwadhCZVZgO3bd8ibb82Qfq8OlOEjR8vw4SOkm3Zg5r0/V4KVAUdCvnNMBhIP2oJ/veJvcoT2lK+97lpZ+vEyl/H0qHnqyci6MsRPRqUb2dRpZDLgZlYSd/KTdiITAO+9915tG5FhHOtBI/g38YaXDD9p9UnEhuESoh2ARIQgJBYoKiWlJW7N34D+/d04VUvtlb02aLDbCpiE7dixUyZMnOg2D7r/vvvd5kc8jYAEM9q/fv0GN+j6nHZcXur1kmu78PJTWKtb9LkMUQF8BYBvovAd5b79+rpxQ0AHhcykmsF/cqY1Jq3pQrZ01gXKwgho7UU+1cuQDi+WWXnxnouNKZKfvGJhr1k0lBY/aU0bEUkIkU2ca+dFI0vjd+vWbW5TIGY15s+bp+fLa98m45XHT9escZ/5goCQjJd9SBz3WxVCW+XDDz90ixW4Bkk5QkRmUYglX2Rib0NmUa666iq3CJaBW8so4sYRyRFxf5Af5KXlD/4oG3YYY1U3e+mw9yJlYtaPI3mLsaD2Ss5TL/ykNa1EJHLeiFpD2BsO5zxVEMyeQEhiIHFkAvfbNcQSyv2EadUFwC8fTvzKV74ip5xyilv0ig7uIZMIBz/oQ5IzjTC9cWwKZEtnXcA9Ob8pHywg33O56aab3EJa8g13ypV78I+fQ4aIgIgQMSMYiSFxySTiHHcjk1k37uW6ZYiFxf0kFOtq17gHHYDwqP7/+Mc/uneUGZSFyHbNdFm8+G3xMTQ2relAtnTWBfKDvCGf7Eh+4Z9XbR999FEZMmSIWyTBwlpe1icfESvr5Dz1wk9a09dG1MgY+SCLEc0K3sJDcIMsEJB78M+5ZQBH7rEwIR7CfVS3tqEQYErq7rvvdh/mOfnkk11Pj/vJIMSbyd54eFGXW6aRLZ31gXzHutlDTr6TZ9Qs7J/TqVMnN9jNQlorX45W5kh94ftJa1qISAETESOOkcAiaG6cG8FIMAkB3t8IftGNfxIMSSEg1/DHb67hxk6v55xzjmsbstLGPiWLWFh2tPglp6sxaU0XsqWzLngfVssrhDwkn7mPNjevWPBOOOA6ZWF5Tb7WBz9pbZCIBgvI3FBKhE05RxJB5IxoFkHu8RLVwuEcd2AZgRvhEhZ+cLMOB4k2/wZ6c1Qb7Nhw5pln1n6fDn9eEhKe9yFIDsfi1JTIls66QH5YfMgfKyuOiIFeNB9Qp0Npfilj8jc5T72wsBuCLyKixCLFuT0NRh4iQoT4bWIEskR5I0rYlnj7jR/uo3rgPtwIl3C4Bmgr8kV3PklG45mqgqEarCFr6nhv2cA9XjF9Jl7U5ZZpZEtnQ+B6XeVix+XLl7uOIHtKstsYD7nxgfP6wse9vmsGX1UzRwiFQiOWiZEFIhIZSMQ51/DPuZE2FfBL25F2CeEi1uvFHRLecMMN7rNkf/7zn+W0006TI4880n0zj0/IglQJrgvetDYVsqXzQGHlzjBZly5d3JgtHxkClG1dNZbBT1p9W0QiYUezjPbbCIM14xx3L3EhmJGzIeCf++kh0yHhN2OIjEMOGDDAWT3GHPmqPBnB3oa8o8xYF2OThJ9KR13wk1HpRrZ0HigoU0B5sM0dnRde7aDMyXO7Xhf8pDUlETlaAXOOdcICQjB+EwFzg2y48xtCcTRCIg1FFuDfGsAQmx4aq4aZhOcpZJkSYTB8QNvwBz/4gVxyySWOnOizODYW3HMg9x0MsqXzQEE5IuQzH0JihzH20mGigvJqCH7SmrJqRih8CtkiYoQzNwgE0bzgGtW0tRP9gDAgIuC+KVOmSMeOHZ31wwoCLCVjWuzmxafKeDLZZMiInirBdcHS2ZTIls4DhZW3nTMFyCQCbUZqsIaMjJ+0+m4jUtCQkEggZrksAhCHLj6vKPJ9OKaE8IP4tVYQ2vyRUKzgq6++Wvu5CcC4Ie1Ednq94oor3E6vWGOLb0MZUh/s3qZEtnQeKOwhhweUP+VNc4l1Ah988EGNr7rhJ62+iWjVLREiMrQNICJHNvfh3VisFx+c+cMf/uCeFAP+EHui6gI6jLB8X471cAwX2LZxuFNdT5s+ze3k9cMf/tDpKCkpdfdFatYl5ohYPw5GH/dSBhCQciCfGaVgXLFz586uGVWb96gx4VCT1s9p9/ipJSIerSBNqREHN4iIcA4x6NnSk2WhQuvWreVf//qXq0LHjRvndlPgxW0D93FPbYTqEMCR9h9W0L5DDOkRrjHCf/bPz5YvfelLcvHFf5aZM9918SGehG+SCJPwGpJ9ur3pbirJls663P2KGSPy2LjBogfIeNutzWX3rpqaS/263UAQPeelOrdelXC47Px4RNHMlBCwl2wo5JxrEIEqlt+AJ4J1aoznsW0Fy7foPNCpoM1Gr8q+Zcc9VJ1GpvrEQPXOOjiIjB5AfCoqymXQ4NfkK1olf/s735KevV7U9mKBxps2KnElg/a1EwlyP9GHdT9xfhLCPQdbSI2VbOmsy92vGCfgCnygTAEvXN14/bUye+bbEqooc27se8TyPHQGw8oBdoKDjFxT0eD0X40oHBHxTOAoso4IRwiEG34AbTWqYHqyVItsEk6DlWEVBjnZ8gwSMjkOuI8I27ig6apLDGwOxFQSbUTuscQyhHPppX+RY771Dbnmn1fJ0mWJdYvRKE8p7VAeFKp/qmj0JIk+wAnhHLd9ukk74nXLtGRLZ13ufsXbxIIbGArKh/HEiePHyqABfWXerJlSlJ+nRIwI277wvnlpRaWUsg2M0gg7irgS19811NpHRMhHwSMo4kh7gHNgVhAz/OyzzzqrxW5S/OZbdgx0cs/B4pFHHnGbSXqBbkh/9NFHyQknHifjJ4zSOKceIM+h6VBRViKTx4+RHs93leVLlzg3thkMscGWEhIiVihpKTXGUGAVJNyPiJANkwvbzfRyxJrRIIVk9JD4JjBjR7zPcP7558tFF13kLBjX2ZuZnjLCXCTtOywjy4j4zXlDQlVOJ+WOO+6Q6667zk0hWVi0Gc899zw3lXfSj0+QceNHy6bNm2TFymWqd5Xev079faq61qhedG3YXz5DNtYI5/vrJq4W36aSbOmsy70xwhgiZc3RwuO49KNFMmzwQLn1ln/JcK0Z4Q47vFWEqqRciVhYGZASmndKOiOjVlTOKoJmRjqrBjnHEnIOMUeNGuUWFLCJEcusfvGLX7jvk7C7FkuvuPbrX/9azj77bCf8ZtctVsT88pe/dHPBuPH1z/oE//ghbPa3PvbYY11YzJwgJ5xwgtMHEY86+qtyyqkny7nn6bVzzpKfnX1WTRinuSm/008nTPR55HT1c/rPPPJ5/YjXLdOSLZ11ufsVypQysrifddZZteV9xmk/lVNPOUl5coxc/tdLZfzECbJWDckalYUfr5ANO3a6bQipM00gZKK+rbGIVMsQD1JyZEiGNgCEHDZsmFv1zLsg7DEIQX7yk5+4nivfsGOeF7Kceuqpzh/XGGzmyDAL7hCEaxCYa3UJ17iH8Eks9+IG+ckE3M8552w575fnyGmnq65Tf6zHUzTck2vCOEH9n6hHdODmkRM1TieeUiOc2z0JIQ2I1y3Tki2ddbn7FcrHytfKhvMTTviR/j7JlclxP/qBnHLaT+Qf114jrR9/VO5p1UrubNlKRk2dJnvVKjIHYwIZbarDDd/QRrT2IUSEhNZZwQRjFamWmzdvLrfeeqsbnuGtu8suu8wtC+JbJbQfWXjAbAi9ad4CY4cpXnyaOnWqE3pXXE8WrnG06+aXoSDCsnCmTJkkk6eM1/Nx6qbCcRJ6Jqj/iTWCvtf3lynItBpJ/PbqR1d9ccuUZEtnXe5+hHspBysPiz/n47SjMmHCWBk2cog8+kQbue2e2+XpLp1k4Mjh0qVXT7ny+hvk5vvulxkLFtR8DSLxVQjIaC19ZxGtGkao2zniBjGxlhCVaTQUM1ZIJ4WxQ3rMvOXFOkCWCNlwS2ZhAwBuEACHHA4RlFcWy5Q3JssgJeTKdWucW1ksKh20o3neny6SjtqxLYNv6v45IlobEYGAVMtGRo64A/wxfMPbdAzTsC3FXXfd5XrPjCNCSiwiDVmqdGDVPkT2C/zW7x/ixfQ/45t0pspl954d2tGhEZ3oqCS2nmPcizgzZBEXvt/CpzMYtmEMMYeDB2WbbAf2Fu6R8VPGyYChA2Xp6hXO8hUqh55R4/W7yy+XTr17S3E85qrkxLdyIGUiEGcRIZvr5dRUyVhDs5JGRqwj5wizHyxCoOpkrpHhHHq2EPLqq692Y4y2LItwIKOLeArgx+TzwJ2mLXELaFxLNQ5L5LmuneWaa65Wvf+Q66+/zs1Pf6a94kCAsUWNN3snVmnTIxSV8rKgVFYwTmpN5ATq15k5ZEtnWrFfcNVSWLJXJkwdL8917yrT3nlL1u/YJlPfe1eaP/CA3Kc8maOcKVdLgDXkezkBPecrYqAZ1scGJyEc5MGi4cZviMQRUtpvQKJYqs9KaYjI23OQkpmV66+/3lXZ+LHxST9WMXXhqIWLhyQvf6eMGTtCmwjt5eVXemsbdbi88cY0baeMU/3PyuOPt9O24TSNX36tFYxG4lJRpg9WQJ9BN26wD6n1ph/Z0pk5VEtRSb4MHTFYrrnuavnr36+Q5nffKbe0uEf6jRgpn2zaJHuVQ6WRmJSpISiLVElpWMuDTf8VrmqGeFTJEA3iQEIjItcR3BEjJcJv5hp5EZvxRZbuQ0A2fMQykXDutXBSIXXhVEtZeZFM13bIgy1bSMdOHeTTtaudu4EX9R95pK08+GArbbvOkNLS8trZlKoQcYl/rnpOrTf9yJbOzIF1AnkyXInY4r57pPXDD8n9rVrKJVdeIZNmvO16x7QJ2ci/XIlYCc+UhGyeBZxFhFCpIsl1IyTEZV0glg6SAYjLwlVe52TlDHPGRmyr6lNZxVSFw3Ymn63/VJ5s/6i0an2/zJ79rgS0nagx0weDxbqMgVaodXxLbrnlNunW7XnZtGFzDRG1UlcSQkTakF6k0psJZEtnpkCzKT9vl0yaMEaGDR0ka9etlfWbN0lnLYP2z3aRjz5Z7bqXbuhGo8F0n/tGTg0nHBGxasxssLqFGQ02yWSWY8PGxEwJawAhnllCFkKaBTUBVs3TjrQ2JdeMsKmsYqrCqaoKyvwFc+T2O26RJ9q1lXXrVmvYNHuZkmQSPrHwYfHiJdKixf3Stu1jsmTxUiWhkk9V02HhC1fJKrJFimzozBSq41Ep2LNTpioRB/TtIx8vXeKItmrtOmnV5jHp0r2XbMvb63rJ2EC2MmTpHh8HBc0gCFXrgy1byuWXXe4+pM2C0yvUpHLkU7KsrGEBKosXsGwQzKpmfie3Ab1WEOE311NlRKrCgYhz3p8p/7z2amn/1BPaBtyh/kkaRKQpwfMm2oNe50h45513a09+ulSUB51VpJ2IcO5FKr2ZQLZ0ZgoQcc/2rTLs1f7y0P0tZMTQIc4oVYbCMnLMBLnltrukS7fusnHrdikPaIcYTqhh4iNNoFkwGJBFCxbIkEGDZeyosTLo1UFyxWVXSst7W8q4kWNl9IjRGuhIWbTww9rqGCJCMMjIb7N4lrkQz6px85OqWgapCicUqpR33n1DrvrH5dKuXRvZk7dd4krEWBxry+oeTZw2ALHqjz76hLRt87h8MHeh66BQLUejPIXa5uVzaR6k0psJZEtnppCft1uGDBwg/1TD9YuzzpLbm98ic2bNlvKKSskvKNROZX81IDdKq4fayNhxExJbIzN6UROlZmEt3F2bt0j+tl3OoWBbgTzZsr1MfG1iokLHbVehbN20zS2EhYCQDpJxNItXV7UL+bwWMRVSFU4kEpKFi+bITf/6h9zb4hZZtnyBRGMBJR/L1yo0DsSnSuZ9MF/ua9FSunXtLps2bk30mvnsrhLRvg3tRbZIkQ2dmUJxcaG89+7bMnBAf+nNiqzRo2Xl8pVqtBIk2rlT249TpsrgwUO0LzE3sQFojTUEzWJauIGiEgkVlrm5l+2rt0mHB56WsS+Nk8AObX9pOOGyKikrKnOfFjP4JVdjkLpworJ9x3rp+vyTcsNNV8or/V6QvPyt7goD3FTR27dtlT69+8qDD7SWUSPHS8HeYr2YIGJVUC0jXy7NVc1Ninr14lxzqZnbajishcinbJVX21dtk6daPCWje46Vim2Vbi6mWrs5fMDbxt8IGAuYDSIGAoVqFWdKu6daywMt71AzP1RWr1mmvek1WiWvcAtzW7d6WPr3GyhrVn/mquUYMyuhuJSXapNCiejgUZNab/qRLZ3ZgB+9zbSe0jpPSaiNeIi4ZeVmaXf3EzKq52ip2K5EZD4mYWxcgNb245juhBFe/WFyDZ0MvudrtTxPevXuJrfedpO2Pf6unavLtHP1N7nvvvtlpLZr165dryQM1kzvxZWI2l4NaFuStKLCo6ZhvZlBtnRmA37S2sx9oEctYrVWW/SrN6/cJE/c+4SM7j1GKndq1VxDRL6HDAFp85k1NAV+FPlB6nBohxIhph6LZMOmNTJt+iRp07aV/OzsM+QX557jVnJv2bxN26+8M5GYZ66sDEtRQakSUTtaldp5CvFk7UO64t8YZEtnNuAnrc2q40rEKsioLMQirt4s7R98Usa8Mk4qdyfaiAhEdATUBqYFDBlN0pHI1BHGEtP1ZzqSl3SqXEdl9ZoVbqrvttuaS6tWLWXs2PHy4UdLZMOGLVJUWOqGb0qKy/VYKQElovvMhQep9aYf2dKZDfhJazNlmBoatTQ1DfjdG3fJM22ekclDXpdIMVW2OioR+Zi3NzDI57WQ6UhkwxHmmuqLBiQULpNgqFSlTMJV5VIVCUhR8V6ZNGmiPP74Y9K+/VPy/PMvyvTpM2Tb1p1qARm+iSoZy9wLPcloWG9mkC2d2YCftDoiVkMkbTvRplo89yO566a75YWnesiWNdskUqlE1dqQjoqzftUJ6wf5GL5BcE8HGo4w+iGitvtizNhUSHlFkVa7DCnxm1mfgOTn58m8efNkyOCh8s7bMyU/b68bvmFGpbRESZsjYpPDT1qb8UHwuFq2sJJw1fJPpFP7TnLeWb+S35zzB+nzfH/ZvTlfSZrwbAGaQEYkXbBw6wOdlXgcImGFw84SRqJse8LvfdUtA+ilJaVuJog3ybDmiVdJa3r+SSpS6c0EsqUzG/CT1mbuG8xqaaKRKtm5bae8N2OWjBo2WkYOGSWL1DqW5JdLNEgB1tzhQboTljrCREItdI0k1iciWOn626ku7naJY5K31HrTj2zpzAb8pLUZFobFAlWsDQto9aY9TFfOQAsQAxQNa0B1EDHd8Fc4RCRBvgTwf3AZ7E9vepEtndmAn7Q2Y1qMtlVloNxNUoeCYTfoy/AitR0k5Lwp0uCvcLhukh7405teZEtnNuAnrWoRmTtmNU1Ae6CJVRGMwUUiLK/XDkxlxI3HNQUyVziEmSz7kDm99SNbOrMBP2ltFndDIiwaqJQge8hoLzjIhjnRxCLSUEjbj57J6UwiM4VDeMTfK/vryIzehpEtndmAn7Q6IkbjvM+MNYxIOBqTgFpEjhHtbUJIthNrCqS3cAgHSSZhjohNDT9prSFilYpWwdp7DkYibguxKiUiq6UgIxaxKRLhJ8L+QTjJBDTZX0d69fpDtnRmA37S2sx9X7k6JjEViBjihRa+g+wGr7XDov/+fYnYkOxDevX6Q7Z0ZgN+0vq5rYvx7iRLGdXUOsHhktZs5C3wk1Zfe2g3FbKhExwuac1G3gI/aa2XiDnk0JTIETGHQwI5IuZwSCBHxBwOAYj8H7sbgjJjBB1oAAAAAElFTkSuQmCC)
Maths-General
maths-
In the given figure of ![P Q R equals 70 to the power of ring operator end exponent text then end text left floor A B C equals text . end text](data:image/png;base64,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)
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)
In the given figure of ![P Q R equals 70 to the power of ring operator end exponent text then end text left floor A B C equals text . end text](data:image/png;base64,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)
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)
maths-General
Maths-
From the given figure the value of q = ............
![](data:image/png;base64,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)
From the given figure the value of q = ............
![](data:image/png;base64,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)
Maths-General
maths-
In the adjoining figure, AB is parallel to CD, then the value of x in degrees is.....
![](data:image/png;base64,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)
In the adjoining figure, AB is parallel to CD, then the value of x in degrees is.....
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOUAAACLCAYAAACeN148AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADATSURBVHhe7Z35k1XltffvX5A/IFXmp1TdVCpv+eOtel9z7zW5JhHiECP3xmhMTKJGRRQnkEEFRWZQUAwz2DLK0MyK0EyCgIAgMzZTMzVNNz2cPvM5vd71eU6vZrPpAQ6es3fd2t+u1Xt6nmetvffzPWs9w977XyRChAihQkTKCBFChoiUESKEDBEpI0QIGSJSRogQMlxHyra2tva1mwd5bjVfMXluFeXQUSzCaldQCOu9Kpddfh0RKQNAWO0KCmG9V+Wyy68jImUACKtdQSGs96pcdvl1RKQMAGG1KyiE9V6Vyy6/joiUASCsdgWFsN6rctnl1xGRMgCE1a6gENZ7VS67/DoiUgaAsNoVFMJ6r8pll19Hl6T0GsQyn8+7ddDZMcS7vzvcbLrbQTl0FIuw2hUUgrpXpjeXy0kmk7muDnulO3Dc6r/B9nnLyGaz16XxguNe3EBKhMwYaYZSIOuAEzh79qx89913EovF3D6OpdPpDkN6gukpJcqho1iE1a6gENS9ol6nUilJJBLS0tLi6rDVe+p5VyQCHLc0lsfOg3XKtXKQeDzu9HUG/7l3SkoyJ5NJZyTrtuRYbW2tTJo0Sd599105fPiwy4dSS3MzMD2lRDl0FIuw2hUUgrpX1FfIYnUdMTKZPV3ZRVpLxxIHhdj+1tbWjrIQdLFkH3zxwq+j0/DVy36UYDjrFHb06FEZPny4PP/881JVVeVOiPQoI+3NAD1dnez3hXLoKBZhtSsoBHGvrM5avYY01GX22f7u7CK/kRiBkM3NzR1lQErKYJ10lM+S47dMSgSFZPb+ilAQSg8cOCArV66UV155RWbPni11dXUujxngV9gZTE8pUQ4dxSKsdgWFIO4V+qizkIXw1eq6kYz9PdlFfvKw9BOQdcplCZ9YN0L6y/Rvd9umNAVss7x06ZIcO3bMEXHevHnOY0JSYL8cpOsJpqeUKIeOYhFWu4JCUPfq8uXLMnfuXDl9+nSHfqvrLLuyi33XE7e9L+WGpAUuWXnwg6Uffh3XkRKQyVgNYDaF8Uty5MgR2b59uyPnzp07pU+fPjJr1iynFIHInSn1o3AiN57s94ly6CgWYbUrKAR1r5qammTBggUyePBgmTBhgmuaYYfV+a7rcps7nssV6rwjp/5dvHRRFi9aLAMHDpTXXnvNLfv37y9DtPw1a9Y4feT1w3/unZISQkJMIxvS0NAg8+fPlxdffFGGDBkib7zxhtx5551u/erVqy4NeTC2pwtcjptQDh3FIqx2BQmuSWckYJ/3erHt39cZOivLC8tP2++jjz5y9RhifvPNN13mtTxtbTlJpeOSzRU6hzIZSJmXS7XnZeasaXJv717yy//6lQwaPFQGDBwkT/7jaXno4Ydk/YYqSWVubN75z6XT8BWBZLhoA72uq1atkvHjx8vIkSPl/fffd+Hr66+/Lrt27XJpLI7ml8Yunq17YTpKiXLoKBZhtSsoUD+sXca6XR+WOAjqotUnS2f1iiXizWPpurvOHCONRYQ4lhkzZriRhS+++EIuXrzo0phgQy5b6BCCkLF4nWTyLZJTXdmceldhyDApjfFLUrl2lXw8f7krFxw9fUJ+/qv/kNHvTZErjckbfKXfzk5JaV7PloSqdOps2bLlOqLi7n//+9/LM888I4cOHZLGxsbrLqA7gfaGrhemp5Qoh45iEVa7ggL1hN5LmkisQxbqDUs8Gfsgnh1jiYeCUKSztJaGpTmH7kAZjE9aOefOnXPRIF4TctJcA5RN2qx6RNImUy1KxHrJtjVKWvWllJRqkf5dlYbEGZm/bLH0fXmYfLZpt+z4eo8sWLFIHu/7hMxbsVbqY2qnK/Ua/PWhU1LaRWEdQ/GOjz32mEycONH9gkAyjn/22Wfyu9/9Tu655x53EtXV1e4Y+YyUlMW6XUyvnlKiHDqKRVjtCgpUeNpbEBMisQ0ZHQFUrA5Rf4x01D/SAa6nEcuOW1ndgXKNvORFiAi//PJLV9eJBunYNJgtubwuc3WSa7uq3lLtzStn2tQeaZCmzDmZXjFT/u3nveXp51+Xf7z4ivzhb4/Kc6/3k52Hj0irmpT13X5/fejSU5pwsfCCX331lTOQXxZ+0bhoNTU1smfPHtmxY4ebSEAIgNFcLE7UyIjYwGqECH5QL6jwVv+6A3XKC6IzelGpq/5jtwp0Wx3FHnpmcUjHjx+X8+fPu30FtEkqW6fLFreFVnylSExashdk3rKF0u+VN2Xjtr2ycfsumbukQv7S7wmZMHWGnK1tcum98J/zDaTkxDCMXw3IZEsjGIS0MR0jGvlIB1Et7EU4RhrS2nAKIYEJ4W+ppBw6ipWw2hWU8IOO7N+/3/3Is2SojSUdL3YvbT/rJ06ccM6Afo2hQ4c6x7F3716XhrI60+MXyqH8ffv2ycGDB13+3bt3d+hk+fLLL8sdd9zhxuXJQ9mHDh+QQ0d2yuEju3X7iG4f0+0DcvD4Ttl3dKuScoF8MHWBXGnWSFF51ZxtlnmVFXLXL34jK9dtKpDNgx5JiUAoIx9EwztCSEgG6RBIyi/UlStX3DakNO9IfsjIZAPy0HPLr86jjz4qvXr1kt/+9rdO7rvvvpJJOXQUK2G1Kyjhejz44IPy8MMPO/n1r38tP/7xj+WHP/yh3H333S5N7969XTqW9957r9x///1umxGAf/3Xf+0oi3IsrYkd8wvpLC3blGnlY8Of/vQnN+z3ox/9SH76058620jb+7e9pPd9v5Zev71X7u31oNbp38lvNM9Df+gtYyYNlZmfzJD3PpgltQ1xaYynpC5WK9Pn/VP+894HpHLt1na2XcNNkRIyErbi4SCjERHSeQXCMZHAhkTMmyLmOc1TQmAmsRMK8Ctny1IJ5ZdaR7ESVruCEq6H1Q28Fj/gDzzwgDz00ENuKifHiLJIi0fDK7K+ePFiN0T3z3/+03k2jlk0Zum7E9Kgk6V5QfOyLNG7bt06GTBggAtjv/322/b0mubYHjl2HK99XEVtP3FUvt6/ReYsmCRPPf+0PPmPV2ThkrWydPUamfHJdPnDn/vI0BFjpLqGsPd69EhKAOEgmZEPgrFtpEUgoBETYd28JNsQk31G0ggRegLhIp0rDE0wLHHmzJlu6860adNk0KBBnrbe9wtISYfP8uXLXdR3PeIq17cOW+IXZemKWdLvpb7S74VBMmjoSBn0xjAZOHSATJ42QQ5XV0sqz4jm9bgpUnphBOwMlp6ld530tg28x4F/uxQoh45iEVa7SgnqBJET4v0Bt2uxefNmR7DJkye7dSIzYD/81n/BNnnoIWXWDGPnwFvn/PWvM3DcHArrlG/9JwCvO3bsWPnkk09cZxJ6Eed0MgnJ5pSkbUrMnOrSLPm8Nu8y9XK57oRUnzom31WfkSPHquWweuFj1Qe0fVmj7UstQ8u+bVL2BPLcar5i8twqyqGjWITVrlKB86UyU+HxapDGsGnTJjcdDVm9erVr5uCVSOttMrHOPrt2TGBhChtNrWJAOZQHKbHJaxedSePGjXOExB7Iih7SZ3N0YmratpgWoh46p/bQ8ZqHbjxf3Jk9HIs7SjIcEpEyhAirXaUC5wsprTMQIkAAvB3h6jvvvCOff/65Ow5IAwkgIvlYeu8n80hfeuklF+LeDqxM9PJDwDptSdqPH3/8sRsxgKzoZ4lN6QwPXTCG36oFpAuDjjhXR2hI2Sht+ZTjKJJt02agtChvG3VdfaUmj0gZQoTVrlKB88XL2DrDDhCxb9++smTJEvcmC8jnhfcaQRo81oYNG5wHe/XVVzsIeTvXkh8HwmlsY4SBDiTakHPmzHE2ccw8NEvscN7SkVLDaw1ZJaP6faSUdlK2QUxHymaVBpV2UvpM9p9DRMoAEFa7SgkqMx03TNkcM2aMmzMNMSHB6NGjXejKcXpOvb2gCHOr33vvPfc0x8CBrzty4mnxqOZdbxXcA4jGKAO2sZw6dap76gkP6T1mIwjWBs2kGRLsjpSEtaoD6SBlfUTKcugoFmG1q5RgUJ9QlbYg80vxjEzLnD59uts3duwYR84RI0bICCUrS/aPUuHVMxxbu3atkqPQAQRp4onCJJZiwD2AcCYM6zH8wSw1YJ4RsU4m9uE906m4hqiQUr07hOwgpYa00nQDKfNKyryHlP7b768PESkDQFjtullgv/Vw2rl4t63DBFDJ169f73pVISAVn8rtx75937ghDh58mD1rtoaQc+VjDSPnzJwlq1at1DZfk5atbc1kq6TSKcnS25lj2fV8av+2FxyzzicIZ2nNA2MjYqRlH+n5EchmtS1Je5IY9TpS8gOh3jKvxzykbNN9bY6YGecl/Wb57YxIGQDCaldPsAqLUJFZWqV1YV175TUw0I7H69evn6xYseIGMto9SiaVXJ58bQwzqGjtl7asq9mqPCspJWRLa6Mks0oWbbclcnFdpl2PKPqtXYqdZl9P15rj/nTkN+GYnZPZq2sYScJCxyriYlL0Q1iO6QLRg22ibVAnrN8Iv40RKQNAWO3qDlRQC+eMhLbPpmGyDWiTbdu2zXlH2oy0Dwn7ukJOCchziVyVNl1mEklJxjRETKsLam+E5VRfMtHinmVk+D2RiUtLUvXm0s5z4sGMPNhGexDbbudad1uH2O8MNvFseI+5f1wXxO24AX4dESkDQFjt6g7YbGSEAEZEhgkgHPsgQX19vXsrBXNWCUU7C1X9gJCtlKOSy2Qlq2TMprOSS2Wl9Uqj1J69IE11jZJobpV4c0xOnzzlwuI44aWGknqnnV0XLlxwHUWnTp1y7UCzsViUqw75dUSkDABhtasnUPEZz6NTxI3Z6bYNKTCEwFMbTAJgSIHncCEG50pY2d05xyF5QssjDFVix5paJKGesv5inaxauExeeup52bv1a2mLt8mVmjoZ/PJgGTVstDRdKYwtppXE6Kfn9IknnnBDJkwA6ElvTyDv7eS/Wfh1RKQMAGG1qzsQmlLJ8Xx4IDwjZGR58uRJF6o+9dRTbt6qvUoDEFJCXgst/SCV85TphLSm4pLVMkmbTWTkwK598tI/+kmvu34lh7d/6zo3t67eIvff/aAMe/ltSdYXOlQuXrwklZWVsnDhQvfoF8MrDKEw6fx2UK465NcRkTIAhNWu7oDNkJIQFSKyTtuRHlXmiFZUVLgH4XlMz0tcCEkea292Bo4kNQxNZpjqlpV8Nie5eEZa1BPuqtohLzz2rBzatN89U9xwoUHGDBgn7w3+QFpqmHsqcvjgYZkyZYqbM4s+vPTbb7/t3rx4O9e6XHXIryMiZQAIq13dAZuNlIAZNkwCQBh35Ml8A2RESEsIS6hL3s6h5bblJNOWKYiSM5NMOVLSmdl09qoM/ftAObRBScmDGqq+8qMVMmPYXKmvbnSk3L/vgHz44YeysWqj+zHgGV/eTMdQDCQtFuWqQ34dESkDQFjtsvCUpXcYgHWvpyM8HTVqlBtXJHSlp9NAetIiFrp2F75qDsm1aVsyn5FUTr2whrGEsG1pvUZKwEtHL8rAv7wqJzYfUTepyTWEXfDeQpn51lxpPqWeUtN8s2+/85RMvePHgKc6mKhASNtdr29PKFcd8uuISBkAwmoXxMGrIXg5COr1NISrvCPVHizGW3IuRsCuzqv7ewEp8+olIaZ6SfWU+az+ANBpqp7y0ncX5bXHX5Ljmw8XXomjHJv57iyZ/tYcyVzUdJqG5zA/+OADF77SEcWD95Ay8pS3gGLy3CrKoaNYhNUuyAUZEYhJBWcdz8NQA48y8bgUXglC4lEtTO06PO0JkLLNeUqeqFAjJJfOFjylcq7m0GkZ/ORrcmTLt4UJM+oZPx43TyrGLXAz2sA33+x3b1NkbBRbGC5hih69wbeDctUhv46IlAEgrHbh7ajULC1cpa3IUAOvxICMhKuAdHhSGxLpOjztGUwbSGS0vHTSha7phJI8oaF0Y0K2rd0sT/d5QtYvWivxCzFprmuWUYPGyJDn35KzR7Udq5fyzJkaWbRokSxbtswNhfDqUzwlr/m4HZSrDvl1RKQMAGG1C0BG7CME5H05M2fOdE9zEK4yM4djkBEiQkh6W+nMYbvY84KUsWRcmmKFT8llUhrGxlNy9sRpmfHBVHn0gT4yY/wUOXOwWr7ZsUdefPYl6XP//0jlkpVKYtqtGffqDjqc8JAMh+Alsct+XIoB51OOe+XXEZEyAITVLgOhKV9V4/UcDHdQ4YF1BNnEAXo6rQ0KKYtFVonTqmRsTTBOWZjvmktl5NLZ8/J55WpZUrFAtqz7Qi6eOivf7v1GVlWudJPWq9xrQwrT6yAzITYv0+LRLgu9iw+ry1eH/DoiUgaAsNoF0XgAmecKmQzAA8iM+WGvVXy8D0sjKGSk8pO32PPKKgkzWh7zXpmInldi5vkQji5F25eix/MQLMUPQouGua2SyiUlmdX2bLagGzFbzE5+LCJPeZMoJs+tohw6ikW57DI9/iXw20Cl5iVUfIaCh4nxjhAPMrKkshv5bAkpOY4w6O8GDek2dR02ev110cbrMnhcwk0RUHFPU+gxF7Ryj3SX7oM8TpcSK89TInhL1eHS67F8hvam/gjkUhJPxyWZT0iWP1XCUyIQEjtZUg72QU7WiwXXyH+dSgG/joiUAaCUdlG2kckqKNtWYREIYB6EEJQJ3BCSoQ7ajYR+ltabj7KsPNs2fbwiI6feq40vUWWaJJtQ79WkFG1SgqVTSqq4esHC+CNDHrm2TGGuq5I2lyvcK6/oPy3Luw9dardKTtcR1q+Ru3O5HXwfZdwM/DoiUgaAUtoFWayDA49GCAd58Bp4D+stxQbWeZqfN4FDSHvqHpDH2o6URR4rw0h9PSnZn5RMuk6arp6R5rpGyfIWxkResrEWSTXXq+dLFhwp5eXiEkumpLkV25RYIbxV5apDfh0RKQNAKe0yMkIgBOJBGpuLynE8IW+So92I8CY5Xs0BSHs92a4J+42QbBtBSZvP40V51vKKZFL10lLXIvE6DT+TekzD3HyyRb1lStpSlJuWeOqq63G92pyVWDwipRcRKQNAqe2CLJCQpbX/LNyEmEuXLpU333zTPWYFKZmpA7zks7y2j23/esF7FtqVtANzWdqDGr6mmmTflwdk75ajkuddUlqOslFSsWZZv2aDzJk9U3bu3SRX41e1faiH8Z7OgnChXHXIryMiZQAopV2QxYYoIAvreEbA6/cZ5uC9prxVjhk6bPM2cMhKHiMbxDMy4w0pC2EbsrKOF66tLbwbNU+7UNuAsabLUrlkgfylzzMyZdRiyaNaPWMi3iD7vt4hMz+aJePGjpZ5i6fK3kO7pbGVlxTrNXEWhgvlqkN+HREpA0Ap7YJAtCm9H10CdOQwiZynJ2z6GW1IBtrxlszcMeIhZqPXVspDAMTklZDHjh11RIVVdLIm4k2ybmWlPPDLR2TUoKmuDckLpmqqD8nYkW/J1g1b5cD+vTJn/mSpWDxLjlaflmSae+WKDRXKVYf8OiJSBoBS2kXZeC5Ig5fkswC8noNQFe9oHT2OSIpPP/1U/va3v7npc+YBmetKiGtT1SiPB4eZbsfLsMiL9+UrVExrI1ROxFPSGku6ELa1qVkmjZwt/xy1SDLqKXPJlOz7apMMGdhfTh87qR44Lp9XLZZpcyfLnm8POVKG0VWWqw75dUSkDACltgtvhufjM3LDhg1zHz61ydroxnuaB2W+KK/QYJKAhbBMneOxJ3pkISc9tHhTprGxzZMivKWO127wMVUeKB49apysXfOFNDZc5QTlk6krZMbYSsk0aRu3JSabPq+UkcMHS23NJSVuUr45WCXTKz6U7bt3KymLH0ssJcpVh/w6IlIGgFLaBamYs8r0OB5A5rsbBpsiBzktDOX43//+dxfKst+ICZi2RvsTsYnoX3/9tfOgTDB45pln3CtAaJe+PWyErF29XpoaGySTTMiHY+bKlHcXST6uNmk4vWHtUhk29DVpaXCNTNn7bZVMmjZePeYWifFAcwhRrjrk1xGRMgCU0i6eLSRUZaocc0AhIfoIW63zBuKxH9DWtPDVwl6WkJYn+PmQDu++6QynT592QynmdQvISKK1WWa8v0imja6UVL2Gr7FW2b5xjbw1+BX3VjptZMqXu9bJpKkTZetXX0siFXlKLyJSBoBS2gURn3zySReu0h5EF+1EvJ8JxDNSrly5Uv761792TDo3kIaZPjwhQq8tZUBWSA3oTKJ9CSl5mXImw9gl5EpJPhuXedMqZd6Hn6t71vNNJWTP9ip5Y+DLcq76nKbLyLoNS2X63GlySNuYWnTU++pBRMoAUEq7CFFp99FOpLcVb2bXAlKZF7QQlQ4cPCUEBBwnlGViOi/Coh3J41t0GEFAOoGsLMrm1Y4FD8w7YFv1WKucOXlIBjw3VN544X2pPVUv+XRKLpw+LhWzZ8iaZZ/Jxg1VMnf+NFmxrlIu1jVoHqc6dLDrVmr4dUSkDACltouOGmbsQCiIaSEmevF4kIgeU0AnDqSkoweykpa2KB05hMI8xkX7ka8mQ0LyUxZLfgDwmIWQOCGXLmm7NH1FZs94X/7t//w/6f3vj8miWZWSuNokbeo9z505JSPeGCN/evTPMvmjCXJciRpP5d3DIGG8V+WqQ34dESkDQDnsQkdtba1rDzI2SaeNeUi8HW1MvB3PTQ4ZMsSl5Rgko+cWYdgDgvPmcV6WxQuyCl6xMKOHMkifyzEemlZP2ahlXJGmxho5X31eLlXXS2tDTPKqJ59qkXRrTMPXWjn53Rmpb7osLYmUxDSKTmf0XrXbHSaUqw75dUSkDACltMu8mIEpdISfDGPQBqStiICtW7e6McyNGzd2dAhZpw2kg3wW5gKOs8/7yBbHC0K7kucX1QPnPW+Q41RzGckmY9LadLXwdJcik9P2qZI5qU1UR8oQ3itsKoddfh0RKQNAKe2ibEgCqSANJIKYfNeD2TuEpwAvxyfE+fYj7UnSecls4a4f7DPiGthXeLSK/DysnCl8NYtk7oOMHFN7sspAV6aG0bx0mT/d5HnKwv5woXBepbfLryMiZQAopV0Q5pr3KjxuxZIQlG988A4bXlzMKxkZNmHcEc9JPogcBMJ6r8pll19HRMoAUEq7KBtyQTS8n7UdWaddyFS5O++8U372s5+52TwAQtI2jEh5Pcpll19HRMoAUEq7KBty4R0hos3ggZh03NDLShvz+eefd+1MxichJe1Ef1haLoT1XpXLLr+OiJQBoJR2QSzIaN4SstlsHnpPISvAa/LoFq+OZKwRmzgWxDUL670ql11+HREpA0Ap7aJsyGhvGoCU5i1ZQk72Ad7tSjsTj8mQCV40CIT1XpXLLr+OiJQBoNR24SWtjYj3Y4kQvlrHj02zw0viLfkM+ty5czslpt9etvHI39d5UE6pr0kxKJddfh0RKQNAuewyPQx1QErbZmmEBUw8J5SFmLQ3LZwFkM8v5MXzsqRs9t3OOZH3dvKXCuWyy68jImUACKtdzOqBlHzijrFLCGdjnZDQBDIaITkGuSFmsQjrvSqXXX4dESkDQFjtAoSvtDEJaS2UJeQl3DUvaZ7RSItEpCwefh0RKQNAWO0CkO7EiRPukS06gXjdh30UFuKZ4DHp1WUdUpKv2PMK670ql11+HREpA0BY7TKy4RV58da4cePknnvucZ6TdicktFAVEtKLa9u3c05hvVflssuvIyJlAAizXdZWRHiuks8Y8JQJ82Z5csSICyHNQ7J9O+cU1ntVLrv8OiJSBoCw2mXAPuuZBcz6Ya6s6wA6fapjdpCFrmyzXizCeq/KZZdfR0TKAFBauyi7K+kBlkTtyyvZIJqR8+yZs24C+/Tp0+VszdkOj0rvazKdklz+Wk8s4By9290hrPeqXHb5dUSkDACltYuy8Vp+uQmdJGkX98UrFT5HYDh39pz7xDptzLi2L0EO4vIpumymo41JOAshIS5LBAJ3hbDeq3LZ5dcRkTIAlNYuyvYTErkJnSTpStpx+tRp5y379+/v2pkQDxDCWkcQJGRGkXtJsxLVvGpXCOu9Kpddfh0RKQNAae2ibD8hwU3oJEkX4j7g004s3tXDe2V53yuPgjG5nXMyr4hARkjp7bHtCmG9V+Wyy68jImUAKK1dlO2Xm4fL4c+uAqkgG8Ml5h15o8HQoUPdLCB6ZgHp8JqksTyEsxEpu4ZfR0TKABA+uyCMXq/2Nfwh6yYAm10bUQmG58Nr4g2ZaDBxwkTnMW0GEOkgIksjaHcI670ql11+HREpA0BZ7EJFl2o4AP1Mcronr39tjpBQiKUddanV5oySCyLa85kQM6brJ6tPykdTPnKT2nlXLOEsnpHjDJ2QvjuE9V6Vyy6/joiUAaDkdlG8X9rRxvfqOugG/ZBrCdib1DQMZGR0vyerI2aa3tV2QiJ4Ql6SdUbbmR9MnixPP/20m55nU/MgpM2bBXbu3vvjXQ8TymWXX0dEygBQcrso3i/t4B2tuRxvGGCuauF9rclEs1y8VCMnTh2Xiw11cjURl3g+xwcI5Gpri5w6XyNnL16QGEMeSsSsEgySEZZmUmlHyjbdPnr0qPvcHl/6mjFjhvOSENeGSCzs5fxZt9A2zPepHLb5dUSkDAAlt4viOxMF3i6V4vMFMbWDF2s1ytZtG+WV116Q+35/n0yc+qGcvXJZmrJJaUwlZPlna+SxJ/8qT/V9VjZsrpJEGqqqF03zIZ+45DK8UrIwngnxICsdQLxlnVlA5iUhIV4TUto2oTDEZF8YUa465NcRkTIAlNwuircIlXWPQIiCp8xoGzEu5y+ckt1fb5Nt2zfKwuUL5aU3X5dtB/ZIQzoha5SEH1XMlqqd2+XzzRtl5tzZ8tXuXZJSQmWVjFklpk0yQCCgtR/5ihefzMNjMpkdAkI+iMsYJm9et15ZJIz3qlx1yK8jImUAKLldFN8FKQkXvaRsjV9VqZdEqlEOfXdQPqyYIQfOVEttIiZj1WvOXrJQGpJxOXXxnEyfO0c+Xb7Mde7g6cxD5pSc+WzOeU/2Qzz0HDx40HlLJhnwgSDICGnttSSksbRhvFflqkN+HREpA0BJ7aJoI2QnxHSkyUAIbR8qKfl0XSp9VbbtWC/vThwhUxd+LBe0HXm6sV7emDBaFq1bKQ2pVjl54ZwsWLZUlqyolIarVztISfiaTmgIShibu/Zpd7wiAjF5BGzAgAHujexMKLDhEq4D5USkvF5HRMoAUFK7KLobUvINSffdjyzeLqY7ExpaXpEvqlbIc68+K32HvCrf1pyRb8+dkddGDZclX6x1nT7fXaiROYvmS8WihXJe24xZ2oFado7ykkrC9rZlS3Nhap1df7wjT5ls3rzZTWivqKhwpAR4SSNoGFGuOuTXcQukbL+rTq6hGMOLyXOrKIeOYlFSuyi6G1Ly3Y58Hs+EN+MFzLw9oFnqG2pkddUq6T98kMxT77jv9HcyeNxIqdy4Xn2pyOnLl2RB5TJZsHSJ1F6pk3xbXtIpDT0zOWlTYtK+pJ0Zby28ztIP2pvPPvus3HHHHS6ctU4h9kcdPdfr+JeOG8ai/SBLfr3y+guJ0I1e6EKnS1vDFpfqGtimmzxLet3y1wmrF4ZynGw5dBSLktvV2cVvV1nQzc7CR3cYjSyMVYo0xZtk0cplMnvxAjl8ulreGPmOfPLpIuHbzZfqr0jFgvmy8NPF0qwhaDpdeImWC4cdOQsv0zKyAULVJUuWuE+0M0+WV4zwnUu+9LV48WL3dgNAGdbhU6h3hY6fm7mHHCcPxGYdm1inDJYcc6G2HmNpPxhsm50szWOz3y9+sC9JyO6+XM0wU4EnfmT1h6twpUWS+uOV0R/EjIb47oNGHvh1dEpKFPAR0HRaf0n5jFmWXjKeLtdwQ/c1tTRJXX29XLx8WWL0uGk7okWXaS6CFoYRnUnhEhT0dHay3yfKoaNYlN0u1LWrxMNROTMZJgAwQycuDUq4y1dq5djxY7Jw0SKp0lCztu6yzFMSLlu+XA4fPeo+Qjtn7hzZsHGjq8Bu0oCeBxU5ES988sAqOeHrmjVr5M0333RtSSYU8PFahkrIw9Q8PjT06aefutdZUh557ckSKjliROkO5CONs0P1kp/zo/d31apV7gNGdCyxz4ZgzG7K50fEdJGG/Swpl3Sd3Sv2JeNJyaQg+bWvWNc31Gl7+4o0NjXI5fo6OXfpopw+f0EuNTRLa7ZNmhNZiSVVhxGhHX4dXZCSXw4a7AVS8kuaU1LGWhvl0JEDsmjJQpmoIciosWPk840bZPuunXLwyBFHyozm7YyQSETKAoK0i3tLRbT23LFjx9yHY8eNHeeGMPjoz/lz51xPKiTasmWL66hh3LGqqsoNZWA/lZelkYJ1yoRY69atk5dfftl5RL4GbeA44Srp6QDiPbPDhw93X5Nm2IRj5Oc4aSEYJOoOZgPEsiEZ8vItTl5j8tZbb8ki/aHhyRYDx70kJT+wc+mJlIAshO5x/UFCd23tJVm9ZqWMHTdK3nl3uEx4b6KMHT9ehr87Ssa9P0W27/5G6mN6/hnV4SvTr+MGUiIoyWa5cQViQkoGm7fv2KLKxspbw99UGS5vvfO2zPmkQsZNnCDzFy9yHjNHfs3RmUSkLCBIu6hsJlROSEmvKJ9T5xuWkI77b16Dt9nx5nS82pkzZ1wZ2F+oI9eIaUK4yufYmdljaY0sEACdCNi7d68jJuSFOPUafQHIQh5IybK764VO83iso4P82Me58arM119/3Z3D/v37Hfkpj/TkI52dD9t2Hra/K92ZlHpnJWU6XfDSly/XygoN/R97/BH59b2/kmFvKz/eflsGDBoiD/33o/LHx5+WLV/tk4S6SZp6Xvh1dEpKbgjhDb10qRTd5lmpqTklI94dJq8PHiA7dn7lCIhXPH2uRmZ/PFeWrqiUZr2AESl7RpB2GZm8QiW0Y4hVbKu0HDcyUTe8+1g3QOjnnnvOPTECOGaEZEl6ykWsLLBnzx738doFCxa4ObPYBCERPKfZ1xm4lmYb+hDsRjgPymL63+TJk117ls/NW1vWe/4szS4rh/1d3StImdOQNKskS9C+1IiyNd4iCxZWyPuT39OoUX/UNF1LMiUr130hvR98RJ7s+5ocP1VTKMADv44bSIkhBaNskJn1lGza9IU8/uc/ysefzJErV+vdPEjakc0aS9dqm+SC/lI0xlokpSfnJ6NJRMoCgrSL+2v3mEpL5QXYVPgxLgz+2zHSGZGouEZKwDbr5KXdxlMihIyHDh1yxzlGetJRHoSjbCOAHQMQ8231LITSRkyONzY2dujrDP7zgfxsk9dIiX0My1RWVroQndeZ4EX5EbG0nCtpsY9t9oOu7lWOMDTDNcNb8uPSJql0XCrmz5Ux40erw6J/RSSlxbRqmhXrquSuX9ynEeVKLdMV0QG/jk49JU8SQMpC1zm/RKrsk9lyz69/IV/u2CqJdEJatc2Z4GT0RJCWRIGgxMteIiKcXuenFiEoUImtAlqloFJSqVni3RDWSWuVuzNQgQk/x2sbateuXY4M5DEycZxKj+ejDLbRzT6WVi7hLO1XHprm2UxsszK6A2lIi42UTXmUjbBt+xDalnjlPn36uLCdHwDyY5vl916TLqGHM0m88rW0NPfmqaccM2G0tCpH0lpWjM4gPXy5sVnu/q/7ZeToDyTt6+nx6+q0o4cdeEiU0POaSrfK/AUV8u//+XPZs3e3S8EvQZKXJelFZUkom4HMegxiIuyzpVtX4aTthtkFK4WUQ0exEqRd6KbyGdkQIwfreDAqKPvYhqSQjOMIZbA04lFnqMR4IDqDqPTss/LQQ1or06+bY0Z+hA6gV1991ZFmw4YNLnylPMR/Lgi6zVYT9qGf8siHDtKYrXjIHTt2OK+OZ8azm3cmn9lJ+ZTn1+kkh6f0NgUKM6UWLVkg498bq1zQHzYtK676WlI52XPwhPzf/+gtk6fMUTschTqAXV50QUp+fQodPYUQNi3rN6yTe3v/RjZt3iiZrCrTYwltd0JKwlYkycXQk4jrSUHUlmRcYsmE1Fy4IDu/3i3btn/pLsb27dudsF4qKYeOYiUsdvFAMmL2sM6S4Q/b9l5H9m/dutWJfx/ttX79+sny5cs79tHZQzq2Lb2J6WadY9u2betIy1AG3uzxxx+XpUuXunIsbVfiLc+E8rxi+ykPrwwh7777bvnJT37iPD0dQaTDFuywMiyfV3Z9tUu2b9up6dD5lS63yeHDB2Wehq/jJo4R9fGSUA7EM1lpTqbl05Xr5Ze9+sjCJWvbGXYNPZISYZyy4CX5ZdRftXxKqk8ekyFDB8rwd96Uvfv3STO/bpr2ckO97D90UA4dOypXtV2R1rx0AhHSQlrC2i93fiXD3nlbnuvb1904kxdeeKFkUg4dxUpY7epOzGYmAvAmOzp02Gb54IMPyl133SV//OMfpa/eY2bukA6iWn7y2Lpf7F6RxvKx/sgjj8iLL77opLN8PQmfkEdYxyZ0UDblMWSDjl69eskPfvADpwvdpLF8Zpe/XOSlF1+R/i+8LC++0F/TFvLMmDlNpk77QCZOGq9k1OhCPWo8nZVNX+6UR/70lDzXf5DypNCD7UWPpMQ1M1vDSOkmL+dSkki2yJfbN8sL/fvKiy+9oI3ZcfLhR1NkxpzZsvqzdXLi1Ek1QD2kekuWeExIyXrNxQuye+8e2antDX6hGNBFaNyXSsqho1gJq13dCTbv3r3b3T+28SYIc1rpOJk0aZLzLoxL4rHsPuOVWFq+zoTjtEVt2zwrnut2rpWVi2czz4192ELZ6CHkfuaZZ2T16tXu/EjHftatDH+5yO6duvx6r5a5S3XslqqqjTJn7ix58ukn5OH/eVg+nPqRTJ0xUya8P1n+/Ld/SJ9HnpAtO3ZrlKkhf4FuHbgpT0l8jIeEmLFWZkPwREFCGpvq5LP1a2Ts+LHyzsgRMmLUSJld8bF8e+Sw6+TBKyKErpCT9VQu69qafkMi/O8B7TE+1f59AufwfaKz8mizMk7KY2V23E+QmwVt3/VffC6jRo+QIW8MlhGjR2p0OEJ5MlrGT54iVdt3Sn1LUjSSlZxPRY+kLCxpwNI9zlgP40tKrnSrJFMtEk/G5ELtBTle/Z0cOnpEqrVhD/kIZd0QiYa1EJEw1nUAKSFdhxDjnq5Hl0Zy6TthrNHf2bGgJax2dSfY7O1AoTOETiGOFX7ICx0erLOPzhXSAzvmLc8r5CGt5bHybXZPZ3luRswWK8/WISMhLHNx8fQMu3CMNDbJwe5RV/eKIYVUMiOtMcY2M2pri1y6dEHO1pxSTnwnx6pPqLM6qutn5GJ9o5vU35KkN1bLLIaUDIfE4zE1kouunk69ZC6n7cR0TImV1OSFYY+MpidMde1HvVkxPRmWbNPBg0DWAkH1xujSadB9fkO+b1B+qXUUi7Da1R2wmQpKpWZpFZgKyjHISk+tEZF9pPX2gnYFK4NyKcPKsbHRYkFe7PSWQVhM7y4zmAhrOY6NEBF9tm02dWY3+1pjamNKf0gSXAddp/+ljTqu+vL646WODd+LMCTSmmmTeFbzpZRPuYJXNvh1dEpKDGLuKxPS6X1Na/iaSvF+FYZHEhqaFtqODHFAzrSSuFUJGNcTS3MjdDum3hNSMnTiBlI1LaY4DV2c7PcJyi+1jmIRVru6g11Pr+eg8rLNfi+JEPN4N0NKy4+QnnIgCevsKxbohWQGvKLNtTV4iei1oTub2d/SHJOEekmGRQr2qqgTSyhPUpmkG8dPavuR3tekFqNOUj1lVqNJ1XFT45Tt8B+kFxbjCGUhpZ6mJodgOSUfpNQbxAVVEkI8ezcoj6xQEpLTdfbxIRgrHT1dnfD3hXLoKBZhtasnYDf1wYgIvOsGq9xe9HTO3jykZd3If7tgjJROKZ5MYbgFUC46IL/pYMn5GSm71a2nk+Lhbp4lJY8Smy+PMfGGJ3Go7c4h6fXBcSFxJaXfSwL/tbmth5zdluaxfHbEUpn44c1TKpRDR7EIq11BoVT3ClJRLj2oTBTgiRcA6TjWLekUt2OXNxfr3ZXi1xG9DiQAhNWuoFCqe2Wej2EQZu1ARms7GmG7Q6ns8sOvIyJlAAirXUGhlPcKUtp8XpY8HgYxCV170llKu7zw64hIGQDCaldQKNW9okzavBCR+a6QkR5j690tZfh6K/DriEgZAMJqV1Ao1b2CeISqkJAeVrYthGW7J52lsssPv46IlAEgrHYFhVLdK0JWSEnvKx4SQtrwhw3tdIdy1SG/jutIGSHC/yZQ2a2zB2Hd28FTDsIVg4iUESKEDBEpI0QIGSJSRogQMkSkjBAhZIhIGSFCyBCRMkKEkCEiZYQIIUNEyggRQoaIlBEihAwRKSNECBkiUkaIEDJEpIwQIWSISBkhQsgQkTJChJAhImWECCFDRMoIEUKGiJQRIoQMESkjRAgZIlJGiBAyRKSMECFkiEgZIULIEJEyQoRQQeT/A0D8j9w1qkN2AAAAAElFTkSuQmCC)
maths-General
Maths-
In the given figure, ![A B parallel to C D text and end text P Q parallel to R S text then end text left floor S P R equals](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPMAAAAQCAYAAADDJkkTAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAOJ5y/mQAABXFJREFUeNrtWm9kVWEYP65JkshMZjKSTDKRzCQZSZLJmJkkM/qQpA+RPiSTSJJJIrlmMjEzmSRmkpmJZJLJmCSZvkxyzTWX0/PwO3p7vX+e95yz2dX58XB3znt3nv//7omiAgX+b8SFCsLwwvK5QKH7Ipg3Cdc896tENaJvRMtEU0TNHoVJlbeP6D7RAtEannGHaLeBh1ihCtE4UWudOUrVIEOX4dwpojfQCX9n1nIure4TPn4QvSd6TdSknWkgGsKZKs6drtNA8vEglVViP4luNwR9ROsQxoT9CDQVHGwjOTjUdaJXRMeJSri2F8llxMFDCcnkCoK/p06CWZdjG9FJoq9EB5Xr94heEh2FrEzdRD+JjuUQzCab3kVSVcFJ+xyev51oAM5rw2odB7NEVon9pLrNHVz9PhFNQxAT+PqYdq3HcC3UoW4QPRPyec7yPEYv0W8lGWzlYLbJMYjExrhK9NTyfa4A8zkEs4mPPi2BdqVo1+M6DWaprBL7SXS7IWCn6Se6SPTYcuY2Ak/FqKUFkTrUAbTrDUI+byvKMqGCKmZDN9od7kCWDNUtVhLDMtqkd+gSdJxA5l3H2YEAZ7XJcQ9dBj/vsycx/UJFyBLMJj6GtHHrPNFMYLCoZOLtDJKRS7/sj99xZgRVMq2tpMEsldVnP6luc0cnWlzGHijGhHGl/ThMVHYwJnWoB4HCjSMgbZhBu2PDmNIGDSBgdL570Qq1KufeaefaiBaJDuFv/p8TAcFskqMJCaYR7dgVz/+Yhh2yBLPOxy6iL/CDSBl31nC2OYfKPIjZsc2h3w7wsRf+donoYUpbhQSzVFaf/aS6dSXB2JMYjcP+By2bfVQUrWJJG/hP57CEWcRsIcWSR8lfAxYMJVRVne8uwbkyKkfaNlKX4wjRnPLsz4KFHu8IdmQM5oSPBtjzIwJEx2EkSrb7LcEo4wrmMYF+Jw36XUlpq1AbSWT12S9Et7nB1ApwVbhsUFJFG/bn0SanDeYSWqMoIPgqjvs7sBjKMj9JZ70VQ9snDWaWo4azq3CCO4pzlFAdfEn4V8ZEqvKR0HHPc/vBG/O8M2UwS/RWMVSw3znN5dKEa5PVZ7+0us2ENmQL0yw4ZWh7Zgzzxf0MDrXNYCAXOjzzzEXBIu0WMmbNM9P5HKCWwVFYjreeQPXppQf7iizBrPPRGck2rezYz6HLvBZgsbDl3Mxgtsnqs19a3WZqs2cdX9J/oupHa6nigiN4pA5VsbSKtkxZdtznbXy7Z8nXq1WGtA5StbRfsVAO30ZzzdPKzlnm5RDdm/iYjmS/11/w2CJrMK8K/GIzgtkkq8R+WXQbDF4oDDvuv8DGMcEjLBckc2OIQ5Uj93Y68vCQYNgjT2SpdmmDmbOuvglvFDrKI+jfhVGHrDc9WV6qexMfnY6Kr4Kr1VnH/fXAZKdfH8GibCsEsy6rxH5ZdBuEZlQx18wzqAXHpLLwakKFW4jMP42EOFQrsjA7aPKm13Yorxz9u5me1JZu/Gx+O4o3o08Ecn9RHKQFc84KPoc6SAcybQuc9iyqpcRRJrVEaRuBvmN0SDqkdjjW3QBnjVPwwaNMsvF/AtskC9Fd2LNMeHhYCFwQ6td5KboM+yZ+MrrBwSyVVWI/iW5zwbgnqybOvqS1PUkLXkXlbsnBoRLDjaJyxljsTBiUofJQw7JrDBlPgnbsCLhqvEdADmlLsxAH4eXfS+gjaXslwbxqWQLZ5q5q9Pe1wMuBS704BR+dSJCMQ0ggVehtXlAxGV3Qa5Y59yj0yrbm7X73BgezVFaJ/SS6rRukeTe7gBt96CQ+wMmaCt1n9s0CAlQtnwtkA49G/BbeotKCFroPD2bxixhbGX8ArPQicIPCIxcAAAEndEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1pPkE8L21pPjxtaT5CPC9taT48bW8+JiN4MjIyNTs8L21vPjxtaT5DPC9taT48bWk+RDwvbWk+PG10ZXh0PiYjeEEwO2FuZCYjeEEwOzwvbXRleHQ+PG1pPlA8L21pPjxtaT5RPC9taT48bW8+JiN4MjIyNTs8L21vPjxtaT5SPC9taT48bWk+UzwvbWk+PG10ZXh0PiYjeEEwO3RoZW4mI3hBMDs8L210ZXh0Pjxtbz4mI3gyMzBBOzwvbW8+PG1pPlM8L21pPjxtaT5QPC9taT48bWk+UjwvbWk+PG1vPj08L21vPjwvbWF0aD76aIxJAAAAAElFTkSuQmCC)
![](data:image/png;base64,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)
In the given figure, ![A B parallel to C D text and end text P Q parallel to R S text then end text left floor S P R equals](data:image/png;base64,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)
![](data:image/png;base64,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)
Maths-General
Maths-
In the given figure
|| m then the value of x = ....................
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/Bg+Sj1WuEdUeQvUfKZceefbJ1Z4l8snytzJkzX5YuWSY7tu2SPTv3SuWhSineUizjhr4mQ3sNkeKNO2XXll3Sv29/6dGzR/0CDm+//bZb0AG/3cofBU90BceD8YPntwTC8gorQ1PLRVyssw292blYQEYtWMMIomMZDRDdhvyqqxkOZHmXNHGr1VJXxcs1jvrEul9ZVSbbd2yR5SuXSlHRZo1bqXnoTaIWP1VdKVu3bpCx6rqMm/S6rN5aJOV6GWLq81eqJLQo5VVJKVJir1mzSfbuKeXBIcJDIiFSokQfP2ycvNrvFdm7bY8cPXBUBg0c5BZwYE0mwCJk1OPDDz90T5+G4ImuaK1Ep15YZ8gL0RHAY581jAYOHOhW1L777rudlbS4hGmrzjg3byFVUpXOWieSMSeHDu+XdetXydx5s+WTT5ZIsbosu4qLpGj7Zu1olsj+AyVKxA9k5KhX5JXRI2XuBx/KlpK9as0r5JB2asvjKTlSUSU7du2Vdeu2yL69pZJS9lfH9cmj4bZ1+jToM1j6dOktReuLtAOclJEjRkn7e9rLrFmzXHkZdcFHp0Nq1zgKnuiK1kp04pq/bW8c0bHcZLdu3Vxb/Mu//Iucc845buRl8uTJsmPHjnqipy0680sq0pZcCV6jvnlZ+SFZ9MH70qVrR7nhxmulXbsb9Gb5gzzw4D3SvUdX6dKlo/Tr30vemzdHPtabYODgwfLEsx1l9KQpskU7mWW8VU2mJBZPyuGjFVJSsl/27zssVTHt8FartY8lZezwMXLZTy6Rqy+9Ssbo9t7ivbJ+3XrXiWZ8nbVRGWZk5IX+BfVqiOye6Iq2QnQe7+zzxpGXLX/4wx/ccukspNujRw/3kmb06NFuVAbU1DDywqv5cmfNUykWNFOSxo6qX75Mxk8YI721s/nii131xnleevfu4XQjRg6TSZPGyWb12Y8cLZVF6lqMnjBB5n2wWPYdPiJV6rpUVevTRsNqtpXw5WWVEiuvlKRux45UytyZ70rPLj1kYO+BMm/2PCndrxZf3SnXvxg4wJH8rbfeci+cqBt1zInowUYkDF58EDwehuxzbD8oBouTrS8ESNvE9i2Ptkh0yGHuiLkwy5cvd498SM3K0U899ZQjC0vGox86dKgba4foafcFd0VJqO4LFh2yE6YdakO189vT8xXTZWQ/rv58XDuzXAG0HI2r1a5Sgej63+mrUzUSr4xLrCwmVUr4+qQ5iGgClB8Bxh3qxZOKsCHUE52TrNPCSQjbJhyz49bgwUbnWPoVbvpVraWB2B2HnnxIwwppHR8reDDNfGDlsnQsT9DWiA6IT/vS1tYOdEZZYHfEiBFueBG3hWNcF/x3yI4PjxsD0aur6aDGdLtK49URXUmcZmM6zXRovUm2ETqmcanWXiZ7lJyjSd1IqTDzF6K7AwrInqjUm1I7qS6iJler/nqtnpBSn74ypv0E5QsI8irIuyhkWHQ7iQSscfB/0NEIhOxzHNIw/GSJczyYKWJpoMveJj4h6fBa2GasoT8eUB4T22/LRAecY20AsNYQnTejjLowjs61AFwDfPhRo0Y5P3716lVObySvqeH6Mapi+2nip5nJjJZj2+l9NWL6j6saFGpRL7XcZIierYQuL1MuqHWvSSqntBOKO5NiQlkdp+CIPaXYh4/sB+uYjc8QHTLYI45KGwFJBD3kIGF0wRvCiGuZchzhZsA3TI/JHisc24gd5wZiP58LGYSRwdIhbOtEB8HzsqcAsEQ61y2Y/uLFi50PP3XqFL0ucdUrwepIbqMvWHX2GXZM0/cYwYOiV8BZdITUs2tQo0RnjntSO6hxLUd5uXZ+NWQ6MDMl41VqPHXbOGZc4roZlzjWUNtkEB1iQjgjLvskkk1kS5SQYxbHyM++bZMeQ0HWETJwnJvIzg0W/nhgF8sqTeiJnplH2KQurgdxuAagqKjIuS+9evVU332ZatTVVB+dsXJCZ9GV6Ow3RnSOack/Q3AD+Rq36p/sWTxwPGEefF08QuNkLpzJ8NHJADIQkgACCZPqp5ERxyAsOo6hIzOE7WySWwjZOY+JPEy5ZMYZvxQhPbtBIDpCuscDI4NdWEJP9Mw8gkTHdcFHNyNE+xOX68Vkq8cff0xGjnxFr+FhZ8UhNQTHuuOmZLsuocKbIPKnCCYB0P7woKqqsp5/ceXRgdKDslO5cvjIYafjp3sWHwkSvbF2ybDoRl7EEuIOwyIzcQbfjYnwu3fvdg1hxCSkIEHSc449HdjeunWrTJyYnpRz1113uWEi8iAulSPk3HwvpIHzTWyffIAnehphrgvXENg1KSsrV6u+TYYPHyYDBvSV5Ss+0Wtc4ciN64JA+EZJjjiiI3odKIcryzEhT2dQk3AoTdw9yrc+/frKtdddK0OHDZXi3SX6FElPNINz8M14ijTGnWNE1+5vSn0kTiZTgAWePGmy9OzR080P7tO7t7zY7QU3jrls+TJXqJTGrawjqhWYQlCY+jQmT3aNed1118lll10mN910k+vdA7u5OK85iA5sm4vJhT3xxBMd0blZQXbc7PObG2F5hZWhUOUKEp3hRa4NRgkEjV15eZlMmTJZevR4Ud55Z5a2H3EgWYV7/Q/Z025LY2TnaYFgcD4rtYzK1KiRrFF3hIlj1UnZvXe39OvfV/7rh/8lv7joF9LrpZfcuDmv+60NKKMZV8oN/6JQT/RqzSiunQ6EBMCObduly3Od5PJfXCS/u7GdDO4/UP7Y72Vpf+ddMvG1cW5eMkR3d5eGwYvAE4BfgkyYMMEN7v/61792M81oXDo6nNPSoCGuv/56OfXUU93EfbsZ2xpwHYcMGSLjxo2Tdu3auYlRUSSBXC+80FXmv/9enablsH1HkYweO1ruvOtOufSSS1znGP7gUuEhBPkG2XMiOp8rqOTlAK991ennqVK654BMHjFG7rr2Jnm5cw85vGuf7N9eIn26vCgjBw6W/cW7XdyEEiapGVWoZYfgjNO+8MILcuWVVzpiPf74464x0fHTJyzK9u3bXWFxhzZu3OjmK2zevNkJHaEo4TjxmdhjOrbRkwZp2jFC3gKSH2PCvCi54oorHNHvueceN90TPW8CiRdMz7b/rwt1oU1oG9qN+s6bN0+ee+4593aUa8QrdV4WcYx2QNjm2jDL8aGHHlA//VVtR/RFmh7tvFmPb9R251ps1bxoM0Lbtv3wcmXKNlc2rsP6Des1zU2yectmWbN2jSxYuEBeHfGq/OxnP5Nf/epX7kl89dVXO07NmTPH9flwZ3J2XRgEqtJHSFL9KOYbMKIfLz0qn7wzXzq1f0gmDXxVn/3aKz9QLmMHDJEJQ1+VYrX4zk3ROymlmfCzKt6ynXvuuY5MZ555pvz85z+X3/zmN3LVVVe5gvKovOWWW9zdSXjzzTe7hsay3HjjjY0K8RHcH87D5yd9XmPjlqDjOHFJHyFt9OjOOOMM+au/+itXRm5CnjIcN7G0kWC+/1flhhtucG3w+9//3tWPkHb67ne/KxdeeKF89atflW9961uu3swfIe6tt97qhPb50Y9+JOeff777WRttQhzSsPYk/ew88xXSp4y2TRnIj32IDpcuuugi+frXvy6nn366fOUrX5Hf/va3OXkI9UTH6CeU5GbR3Y9hyypl9aKPpfvDT8vUoaPd9MnEviPSr1M3mfjqKIkdKdO7Sd0WvZsq1d2Z8uab8r3zvycnnHCCk2984xvSvn1790ICQtKYEB1iEiIUlAalMuxzEdBFCW/yTGhkGuKHP/yhnHbaaa4RaBzSYTSBOPQLLC7n0zif+9zn3MUlDvpgWRrLvzkkLE902fowXUMSjG91pK0vvfRS+c53viMXXHCBfPnLX5Z//dd/de3EMeKwjWA5Ifk3v/lNR3jaizgIx7PzOx6xdNmmzHbN2t3czhkjfk1EX4Ib4fvf/778+Z//uePYF77wBffU4QfWDeFYZ1QFax5XX5tHAcyvqUzJp/M+kPuuv1XaX9dORvUdJKP6DJSeHTrJvJlzJBFLD+TjusT0jlr80RJ55tkOcvHFFzuLzh3YpUsX10CMtOAX8omCwYMHuwlE7GcLxxoT4g0bNsxtE0L2s88+2/ndU6dOdXM1GANmrjJxCfHtCLnAWHQsFK+6Od/iMW0VnZUtO9/mEvIL02Xrw3SNidWf9uBc6svj34wE7fGLX/zCtVmwLTiXt6cdOnRwP7Xr3Lmzax/ikA6dWYTt420r8kZIi/YnPX7mxxQFRuro52EsuQEoMzfjeeed58rO02XmzJnu8xg5uS7Ooqtlhui8oeJTZKmKuCxfsERuu/oaufzCH8ofrrlBHrvjXnn3zemyu2inlB8+4r7YlNS4VXpeeWVM9u3f7z6DwEsIyE1BzjrrLEd6XikzAsMvQj755BMnS5culY8++sj1ptn+9NNP64+FCcfxrREm3nMuDU7laSR0xKMjbOmhY5SHPCjH3/zN3zgrQTkYLuU48ZpSjkIK+YXpsvVhusaEdiKkXoT44pAHH7djx46uPXia2jFrC/KhDa3taCfisM/1pe0WLFjg2ux42yrY9qTNPnmSFyTmBsBYMqWYJwzz5/mR9KRJk1x/ArfFRl+iUE/0ar0bIKv7ohIkV5ekdPdeWfLeAnmq/f3S97musn7pctmrndGqozGpjqckFU+/rXId0XiVxCp5u5kehWH+yvjx493j6Db15yAijz9cixkzZrhhR8boeeSwzfAW5yE2vBUlDBMyJm7j76TxzjvvuB/MchH37NnjnkqkRbrkwwgLn1vgccw4Or+qoeOMnuPEIz17J5CdZ3NKWH5hbRGma0gsLm1B3dinvpCWed1YTtzIe++911lEawuE+BYG0+GdiL3ss+uAPphvPkL72zXg/QaceP/9950l/8EPfuAME4aT68cXAOi8ki/CaAtpNDSKlmnRNWIVjaGEr1Hybl2/Ubp16Ci//OnPpeMjj8v29enPDjg/R314Jt24eQh6XjypDVHXIHZnUdj58+e7X4Lw6MNyXHLJJa6jgfUAFJQGa2hoKAzZvWxIi3sC2bEMBtK18pAPN9wpp5wizz77bP04uqUVjNuakP1I37Bhg3v62Y+jcU2s3pCFdkBsOwjedzREqHxh+QHyeOONN9y1guT8CgrDhBHjCcCIHXGolxkm9rPLGkSGj45VJzO+qweKt++UgS/1lUfve0CG9B8g61aslkS53kFVmqhadOe2UHFtJCTJCyQ93+5SA1aAoT1+AtWrVy/3uz+G/ADnI0Y2E/ZJi5AKWMgxQjuHbQTrw82DX4nbxFxr8gUcB5xLJwqLju+JFQOkBUjPLEOwLM0tVq9sXbY+TNeQAOJTL2srwDAe7YQfjEsQJLoZKsRdW22LYJ6WTjAPYPv5CLD8AOGUKVPkzjvvdKN4bM+dO9cNJRo4D4Lb08TqFoUMohOVT/u6718rmCq5a/su2bZ5q+zeWSLlpUelulIbQl0WPjipubkMOYdJOE7qGskaJFgAyMjLClwLuxGsstZ4dg4NTIWtsQmNhMH07Rz2ubsXLlzoxojxQbEA+JJMN8C9YWyYIc6TTjrJ3WxGdM41WP6k21IIywtdtj5Mlws4J1gn/Fp7MwrRg1/qsnYFdp6dmy2FRDA98sPNZBwfcuPSZCNYjmDdolBPdEDUjOjsOPbXSUoT5PPBkLxugg3IztTIGGykxhB2LiHkNitjbg6kt7QtfYRzuZlwSbiYEJ7hTawXozH04hk7/uIXv+gsup/r0vAn6Sy/fPPMF7nm15SyZRC9UZCmkt2RvC4TGqbeCtTtmxW2Y2aZXZwIWKGJY/GM3AjpIdYxIo5Vkm3Lw0AcRhxmz57thqcYNmPUh2HIv//7v3dENx89mJaVw/ZbAmF5hZXheMoVPO//ItHDytGUsjVIdJcEf4LifuR3jOA0kBGd+S5mcU2HEMcsc7AhgzAdxyE2lpkw+yYhZJ9jkJ58ELsBbN8uHHFxWegj0Iv/8Y9/7FyX4KSuYJms8cLK2FwIyyusDMdTruB5nuhZIAnSyRbnk0OmOlK5zFSMjAaOWcPRkJAuqnCm5xxIzA0TjMf5iOkILW1CO24C6UmDtEgT4JMznOaJ3taJzjmB89iEutlSXavWXBukfk0aDZJKrEOlpVJSUuI6Evi/WFkaEKLV3xBEDykcOhoZ4YaAlMXFxa4TCWnNgtsx5sQjdFTs4jD+b9ae8VgbAzaiUzZmUeK6QHTvo3uiO7DpiB0Q9t0krhq11nWZMO6+W0k0YfwENxxE54+xbCwmBTELSyNGIV1oGrla9u/fJ9OnT5Pnn+/kXhEzMxHycj4vopi1xtQChA/YQHyOkU8yle7AGskhPvuAc5lLwfQET3RP9HrYrrPkmiDCPhaSqQK4LmRUoVZ1hfrAr0983b2EYISDxoRIRjJgjWiFM3LWN64S/XDpAVm5/BOZOeNtGTCgvzzfqZOMHTNarfsu9xKLISfGVZlz8fTTz8jTz3SQWbPnSIW6KTxlErzVdZb92JMEsgNcGYhuvzDyrosnukNwlwaANBbyFhSLiaVlvjMjGxCcMXKIRTyIxDgoc6Ht5Q3x6Ryix8KmrW6alLX6lDiwt0Q2rFkpu4u3S0nxDr15xsvL/fsqwTfoDVXmXv0ydHhAXZr35y+URx9/Unr16Sf7Sg+7J05C70q+/mT1pyEoC8DKM26c/QujP/XFDcsrrAzHU67geZ7oDYAGoDHMShrJcRuYhMPcCX5JxCQc/GojOhNz+EYIL3LsRxn8+ILJ//jg6TTVAhOmkpKMx6TiaKkc2r9HVq9YJq9PGCdvvjFF9u3ld6qH5WDpQYkzjVjLtHvPPhk+YpQMGT5C9hw45IjOh3FSDRCdC+t/M+qJHgkSpBEQ6/CZL4xFZ24Cbxt5I8lKYcxzwVVgbgKvmpmei9WncV9//XU3S41Oq904TAjjO3+1fBUqViZrVy6Trp06ysMPPqA3zzQ5dOigxqNTyucVcE9qpWj7Tnlr2kyZ8977cqi84lg/Qutu9bdyA0/0NDzRGwBkNJeERmEbHdtYbibaYLX55jYThpjiiZ6Zblh8JscztRJrjvthsxZxYfg5VdqVUTInq9SyV8ne3UriNybL0089Ib16dpcNG9ZpXnRoKUe1HDp8VJZ8tFTeX/CBFO3cJZVankp1geJaJmht9achPNEz8/BEbwBBchNizU3Y5zjCbxSZc45rAskBIZP2WXsG/5rCEZc5x2PHjnVvLcePHydrVq+UygolXw0dWO0HqGWf9vYb0q1rZ5k9a4beHPtdemVlFbJ+wyZZuGixrNOQFc+YSx9LKNFTnuhhCJ7nid4AzHoj+OfmoyNGJIAfjl/ODDlcF0Dnk1+QQHZ8dM6lI4r7whOA+cVDhw6WTz9ZKnH3SQUcEFCj5F8hY8eMkhnT39aObonT7tt3QJavWCXbirZLZTwhleqzlx4td0R3H6/U4lj9aQhP9Mw8PNEbAAnSGFjvoGWHzLyu58UNIyuMsPDrFMa+ITPEZ3/MmDHOV+c1PG4OL3twXbD2hCUlxXL0yGFJqetSWXFESrUzelBlyYeLZPKkibJSO6ZHjx6W/erXf/LJMln0wWJH9FJ1YYp2Fsv6zVvlcHnMET3J5LO6+lNuT/TMPDzRGwHkNlcF0ChMu6Uj+sQTT7gfsGKhmdiP5WZMHd+cX2njl9OwvFCis8qIixHQUFOTks0b18nI4YPlkQfvl/va3y2vDBsimzauV3fliOaVfjLcfPMt0u6WW+WOO+6SBx58RF4eNEQ+XblaKtS6U206qlZ/GsITPTMPT/RGQCOYP27bjJvzQRnehrJqAj9pw5JjsbkBmBOO60KBGIFh9AXXhjicj+tDyHHWr9y2ZaO8NfV16du7p/Tq/oK8P/dddXX4qCV5lbiVyHr1ekle6t1HXnixu/To+ZJMfWua7Ny9Rzuj+pRhRMYPL34GwfM80RsBjYBVJ6RhzLpb4wT9eNvnOKEVirgI50I8iF6fZiLuRl1cZ7SuQypq5RNKdIYeWR0tDHyGpkrdlVhCO7BJvQG9Rf8Mgud5ojcAEqQRjJRGakLbhrx0NI3oxLM4bCMQn3h2k3A8fUzTSallr1G3iFUSEjFHdvaTCaw+6R6bThCsHl3XSiU4Fj3uLXoogud5ojcCEoW0ENRIith2UGfkthvBCsUxI7mllX75xGID2tisUKyWO8VSIkp2rHllJd/M5kewfL1XnyBatxr9w6t+TVkSGsaU5KxbGePLBCnyO1ZmT/TMPDzRGwAJBslrhLWhRiO3CQQ2MnPMCkTIvt0UpJEmOuRPKLkr1X2plBpeHOl2wq2KliY6689zM5ASwuSthJIaK84qZ1Vsa5rorf7k54memYcnegOgAcLIbNYZgfDsc8xuAjtm55CGSfYxrHqiqqLemkP0JJa8zj+3b2en58ZofN6E4q44stdKUivtpwCEI3ieJ3oDIME0yY4NMRqBAPogcbO3aUjOQzgPMcLbPkRmPksNrota9Br1yVPqm+O+pEluN0ua5JAd9yWlJI9rZzTtn2tagQawcgNP9DQ80XMACQcbIwjL2MTiBffDGtK29a+KkrIWH1tts/shhoqekz6WjodkklnPUuG7NKY/diydL/BET8MTvcCIKkiuunxgeVp6hJ7omXl4ohcYUQXJVZcPLE9Lj9ATPTMPT/QCI6oguerygeVp6RF6omfm4YleYEQVJFddPrA8LT1CT/TMPDzRC4yoguSqyweWp6VH6ImemYcneoERVZBcdfnA8rT0CD3RM/PwRC8wogqSqy4fWJ6WHqEnemYenugFRlRBctXlA8vT0iP0RM/MwxO9wIgqSK66fGB5WnqEnuiZeXiiFxhRBclVlw8sT0uP0BM9Mw9P9AIjqiC56vKB5WnpEXqiZ+bhiV5gRBUkV10+sDwtPUJP9Mw8PNELjKiC5KrLB5anpUfoiZ6Zhyd6gRFVkFx1+cDytPQIPdEz8/BELzCiCpKrLh9YnpYeoSd6Zh6e6AVGVEFy1eUDy9PSI/REz8zDE73AiCpIrrp8YHlaeoSe6Jl5eKIXGFEFyVWXDyxPS4/QEz0zD0/0AiOqILnq8oHlaekReqJn5uGJXmBEFSRXXT6wPC09Qk/0zDw80QuMqILkqssHlmdYelFED8Zt6PzmQlheYWU4nnIFz/NELzCiCpKrLh9wofgkRlh6fNqaC8uCuixDw/pL2eC84MVuCUS1R7Y+TNcYiJ9dHxZjgOh8xptV+h599NEMopugI2xphNUxrO5huii0SqIjfKudpWZmzZrllkfnO+x8wfeaa66Rk08+WZ588sl6orOW0oIFC9zXftFFlbu5ENUe2fqmlou4kJXv6gSxcuVKt/gCS1ga0cMIbd/laWmE1TGs7mG6KLRK1wXwqWo+Y33ZZZfJ3Xff7UgM2a+//nq3/CKLih04cMCtpdS/f3+55ZZbZPTo0W5RgqhyNxei2iNb39RyQV7ISj1Zn5UbHbCkTnqVkaGO6LQFX1XjJicey/Ow/pQRvSl5FgJh+YXVPUwXhVbrunDRZs+eLT/60Y/k3HPPdesq8c12iI6Pjl+6bNkyt3DBD37wA/nNb37jFi/gXHsqtBSi2iNbH6ZrCNSB+CtWrJDOnTu779XjvrHsDjc3q3LjyrE4A0+1t956y63DyoIOuDf2VbWWtuphdQyre5guCq2S6FgiPlyKVccXv+CCC+SRRx5xCxZA6NNPP13uuOMO6dWrl3Ts2NHpnn322frFxaLK3VyIao9sfVPLZXFZWue6666Tdu3auVW3WawBotMZvfbaa53rQgcVK3/mmWc6srM0j308tiVvehBWx7C6h+mi0OqIzoVhXSWEUZXp06c7twTfvGvXrs56/8M//IO7mFzgG2+80d0MuDZYO/swaqHKkwui2iNbH6bLBbgi3NDUGbJTX5bIHDdunKv/Aw88IO+++67cfvvt8r3vfU+6dOniLDxtaU+4lkRztEerIzqPWwgL0bHqrJ2E9brhhhvk8ssvl3/6p3+Sv/zLv5RzzjlHbr75Zrn66qtlxIgRLn/icy5hS17cqPbI1ofpGoK5HSymxrqv7du3d22A+/bQQw85i25tgPty6aWXymOPPeaW3sFI/CncONAc7dHqiI41huTWkSKcP3++3HnnnfKd73xHTjnlFPnrv/5rF+K7Y714TBOXm8Qe1YUqTy6Iao9sfZiuIVAX3h1wDp3sDh06yD333KM3/Y1y/vnnS/fu3eV3v7tVvv71r8tPf/pT584xUmXtVv90g+jk6/I+lr/tZUuoEskRYXUMq3uYLgqtjuikY5bMLBFWfdCgQe5CnnXWWfL5z39ezj77bGfNZsyY4R7TWHKLH1Xu5kJUe2Trm1ou6mPuB6Rds2at+uF95NvfPkdOO+1L0q3bC3Lbbbepu3K+ui8POguPmwNYnbuqis93JzVjbZca7ZAifOVYWcs/NQdu8eJsoYiumHzi2D5W70R1OaA52qNVEh3LjFXnAiMMlW3dulVef/11Oe+88+Rzn/ucXHnlla5jxjqoPNoRSAEhbLShpRDVHtn6MF1DSMdPP+X4pjxYuHCRWu+fyYknnqQuzI1u+8wzv6aW/j5ZvPhDdVnKlOCsQpKQZCJVZ8313GrWllJh+R23oI4aE/3LCL0JRz5LdNW4kAMqOSCsjmF1D9NFodURHWJDcogLYbnIRlqG1S6++GJn0XFlGDMG5E1cSM55hK2F6G7RhAQrk6TlyJGjMmzYcLXq58rpp58hJ510snz1q2dpR72bFBenV+aG5HGVlBK9Ws+vNZIHiK6ee3r9KN0zgeye6AHkqssHpANJ7XENgXFL8FUZPmQ8mdEHHtOskUocbgyL25p8dJBk+Zu6OtLB5PwtW7a64dZTTjlV/uzP/kzdl9td23CM+LQdN0hcXRekGvelWgmOuDWk9EmpzGWrcaIHBF0OCKtjWN3DdFFodUSHpCaMnnCBIbpZ6pKSEtf5pHPGcdwajmH5IToXOarczYWo9sjWN7VcxKU+1It2oK60S1lZuYwdO1a++93vqmX/trvpAcfST0I6oXULqulToAa3p1opzCJoGifttqSJDrmN6J91XbIkx6KH1TGs7mG6KLRqi451touMsB9E+qKXOWvPtnXcClWWXBHVHtn6MF1joE7c0HQsKyur3D6yZcsWN6kLwnPj0z60FcaA+IS0RQ3khuR1VtmVQf/httCaCGRHPNGzkKsuX5AW1siEi4ilIuQCmnBB0dsNYDdIIcuSC6LaI1sfpmsM1L+iolxv6KNa37p1Wt1NnXQT38rLy5wFj8V4qtEJZ2iRRdXqiK5xXZ78V4GvdGsRI3paID62njKm42aQ3BM9jVwLnAtIC+tklskIjWC9jfgIx7HqDDEy6QliFLIsuSCqPbL1YbqGQFyIG6ss17qVajvElLyMj6cXJ2Y17liM/ku56um447IckxSrBOr5LIDGMvQpRNMNSrJWn5zKYgR3xlHdyumJnpsuX2CJzN/GWptlZxsdYvvcBLwJZKiRyU/48y2NqPbI1ofpGoTGZdlKFiJOsFCxkjmRxI0rd/u1tSw+rJ1w1bGOazwey5CU3hQp2pLlLZWoVWrGqzSMaxESytq43gRx4tTqU6KO7hCdfNNCGQKSI5qjPVqtReeRG9wOpm/HIDtDjqNGjXJTVpcsWVJP9EKWpzGE5YUuWx+mi4bG07g1NbwhZjSJjrn2RyrVhYlXqKWO18XDEKSJTliDZU+pxU9U6DGstEhM/5Rrk5VrWKbOOFKp/jrruiZIXz10uqXprqlG4gVTOvsMyRXN0R6tkuiNgbwgO/O0mb7LPPRFixa5GXy4MxanpRDVHtn6MF00qCPWHDdFXTQlLiRPJGJSVl4qy1YslfETxsrcubOlqGiTrFm7QmbNeltmzHhTNm5aq67Oflm9dqVMmPKmTJm1QDaWHJLD6quUqxxJ1ki5ShVPRkd07Lsnet3eMeSqa04wX/2jjz5y1nzevHluTH3Xrl3Oord0WaLaI1sfpotGmugxteIVsSPqntDpZt5LUg4f0Rt8yni54peXykMP3yfvzZstU9+YIE89/ajc/8DdMmnya/qkWy6jxo6Qa9rdKrc92EFmLV4rBxJKbk25TF2WMnUNY/pETKjrU1PL0yEwyJhNdFea3NEc7dFmic7wGiSfNGmSfPrpp26OB2Sns2qjDS2FqPbI1ofpokE8Rleq1CUpV3eEUacjjux0UNetW+5I/eRTD8u892fLB4vfk6HDBsgLL3aSUaOHyfvz58ibb0+RJzt1kUe79JHpi1fIvni14NgdTqbkiHbiKxiO1PRraqA/ZEdCiF4nuaI52qNNEh0i45szPfftt992RGcsmTeHdE7ppLZkeaLaI1sfposGcWvU5+bHE1hziM6oUroPUrxri3Tu8ox07fasrFj5sWzZulaGDO0vDz50twwbPkDWrvtUlny8SPoOeUX6jZ4kS7ftkv2pWjmonskBJfyRRFIqlfApdV1qnUU3YZ8+kd5mAcm52IrmaI82SXSGF/nBNBZ94sSJ7kcXWHP0CCM2LYmo9sjWh+miQVxGmfTGrVYrrpJU96VGO6FY9vkL3pHHH3/AkfrAwWL1y1dJx05Pyh/uuEXefGui7Nu/U95f+J50f3mQjJ7xnuyoSkqppnpQjXWpEr5CO6J0Rqs1j7TLEk50hiWRnIutaI72aHVEtzwbSo8O5+LFi2XIkCGO6EzuwpLb+DpEL1R5ckFYXmF1CNNFg7gpJVtCqmsqlewVjvS4M1u3bZDefXo41+Wdd2aoWxOTD5cskMcef0h69Oym1n2dI/rEyeOkS6/eMmXuItmdUCuuWZdpCjEVhhjj6t5VO4tu/jlCp5Tx9ADRdZv9XNEc7dHqiI5vbWPlUfkw2jJ37lxn0RltoWPKefaSqaVfGkWVM1sfposG8aBYUskYk3jiqLovlbpfI0uXfqQdz6elc+cusmrVandzz5w5y/3KaOobkx3xdxVvlYGD+krHrs/LG7PekeJDR6VcLbjzxjXphLI4qW2cSvE2ldEWLDvC5IA00SmqE7ZVckVztEertOiQ1ghPaDoIzFtQfiyMJYfs/IAaHaMtwZdKLYmo9sjWh+miQTzqARErlbzpt5+agKxauVoGDRouUyZNk93FB2Tv7lKZOGGqPP98V3Vp5ruzN21aqx3Vh+SOu26T1ydPkv2l6t/Tpno+BE+m1Jiw7/oz5EPnHTn+69gc7dFqfXSIDWmDRMc1wZrzmYuZM2e6X8PzMzs+80DIceJGPQ2aC1Htka0P00VD4zrrmnZdqmsYHUm6SVr79h6U1as3yvZtJVJRlpBDB8tlxfK1smD+Ytmxc5fmUS379hXLjJlvqIWfKGvWrKxvGzMYSdq2vjyFbauwOobVPUwXhVZLdNLLJiyuCSMrTGZilIURlwEDBrgfT/MreBtDb01Ex0enA4okk8z9YYYic83V7UiqdU7oraD7CPvVdDDV8qf9+fQLIHfDuA5mum0genO2UVi6YXUP00Wh1RIdBNNkG2vEBcLSM4GLkRfejPLqHz8Vq8VFJF5LIqo9svVhumgQF9eNjnVaYrEyV8dUUq2yI7Y++dTrgOSVMX46hw7XTW+O2rimQIjge6fzpv2a2xCEpR1W9zBdFFo10SGskRthm3yw7BAb684PMOwHCeghAjMaW5LsUe2RrQ/TRYO41JkbNy1MxU2/J2DSG4TWOFpNfhtaGUvPWafu6Sm6PAmw7GzbkGF4mQqNsDSj8s41/1ZJdMvXOpZBK4RAaMSIzzEseesiOqBu1IuXRuk6OyLT6VYXhTrWKNmrU9zk6foTpodamZ/OTQHZj/V1DE0vS+4ISzcsv6aUoVUTPWjFDWybjtB1rOrcFeLbzRE8p7kRlhe6bH2YrjHYTQxZOZf6IaTCfk0NabJdR3yGDdV94Uca6fOO+efBvLP3C4mwdMPya0oZmpXoHh7/v8AT3aNNwBPdo03AE92jTcAT3aNNwBPdo03AE92jTcAT3aNNwBPdo03AE92jTcAT3aNNwBPdo03AE92jTcAT3aNNwBPdo03AE92jTcAT3aNNwBPdow1A5P8B3aLJLTsiAy4AAAAASUVORK5CYII=)
In the given figure
|| m then the value of x = ....................
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)
Maths-General
maths-
In the given figure AB is parallel to PQ then x = ...................
![](data:image/png;base64,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)
In the given figure AB is parallel to PQ then x = ...................
![](data:image/png;base64,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)
maths-General
maths-
In the figure AB is parallel to CD, then x = ....................
![](data:image/png;base64,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)
In the figure AB is parallel to CD, then x = ....................
![](data:image/png;base64,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)
maths-General