Maths-
General
Easy
Question
if
then the triangle is
![](data:image/png;base64,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)
- Scalene
- Isosceles
- Equilateral
- Right angled
The correct answer is: Right angled
Equilateral triangles
Related Questions to study
Maths-
Find x in the given figure .
![](data:image/png;base64,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)
Find x in the given figure .
![](data:image/png;base64,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)
Maths-General
physics-
Two masses
and
connected by means of a string which is made to pass over light, smooth pulley are in equilibrium on a fixed smooth wedge as shown in figure. If
and
, the ratio of
to
is
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)
Two masses
and
connected by means of a string which is made to pass over light, smooth pulley are in equilibrium on a fixed smooth wedge as shown in figure. If
and
, the ratio of
to
is
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)
physics-General
physics-
A sphere of mass
is held between two smooth inclined walls. For
. The normal reaction of the wall(2) is equal to:
![](data:image/png;base64,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)
A sphere of mass
is held between two smooth inclined walls. For
. The normal reaction of the wall(2) is equal to:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOMAAACWCAYAAAAsYT8+AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACp5SURBVHhe7Z0FXFXnG8cvLSEh0iUIgl2gKOZERXTYztk6c8asqTOmzna2TsXWze7ujtndCSagoHQI/P7neTgqKjpE8H+59/3ucz7IOedecJ7ffZ73eZ9QQCAQKAVCjAKBkiDEKBAoCUKMAoGSIMQoECgJQowCgZIgxCgQKAlCjAKBkiDEKBAoCUKMAoGSIMQoECgJQowCgZIgxCgQKAlCjAKBkiDEKBAoCUKMAoGSIMQoECgJQowCgZKg3mJMTUFKSqr8jUDw/0UNxZiK1/ERCL5wAJv+no/AwMVYs+cs7oXF4LXQpeD/iJqJMRVJQXsxuX1luFpbwtrOCQWcHGBjaQ5Hzx8xbvttRMqWMikxEZERr5AQn8DfCwQ5jXqJ8fVlzG1bGvnyOMJvwFIcvReK0NAgnPpnAPxcjaDv2hbzTz9DinTr/AlTUd7WHTP+GI+4mJi01wsEOYh6ifHCdDQtagy7hjNx9HF6nzQJh0f7wVHTHI3nnsTF5zFoU8UPhgoFWtUIwIPbd+X7BIKcQ63EmPz0PHYun481x4PxKlk+KXNuSgO4aubF97P+xaaT1xFQ1Asmkhh7Nm+PZ4+fyHcJBDmHelnG1FSkpCTjwwBqcsg2DPa1h5aJL6Ycf4K1G7fAx6YQzCQxThryB+Lj4uU7BYKcQ80COB+TFH4Ss9qVhbmeBXyHb8Wj5FTMH/8nPPJYshhXz18q3ykQ5CxqLMbXiLm1GSMbF0c+A2tU7b8CF8MpdAMM7NAdNgodOGkY4cC2XXxOIMhp1FOMyXG4v2sCWnpaw8isOFr8uQu3o9OEmCq5su38GsNUsoqVHIvi/InTfF4gyGnUT4yvw3B8didUdjSBWZGmGL35Bl6lW0M+DnqIRuVrsBhbVK+Lezdvy1cEgpxFvcSY8gonZ7aFZ349WFTqg6UnnyKO0m5SU5D8+jWSk5NxdO9B1ChUhteLA9p3x4vQMPnFAkHOolZijDo4Ct+7aEGhKICa7X7FuCmTMXH8OIwdO1Y6xmDCxNno2fsPlLYpDHNJjDP+mIDXSUnyqwWCnEWNxPgax8Y3RlkrE5iYWcDG1ha2Ntawtn5zWElHSbgWrQVXEydYSGLc+Pcq+bUCQc6jVpYxMeYVXoaHIzz8BZ6HhSE0lNLh3h1hYS/QqWFrWGpowV03P47s3i+/UiDIedQvgPM5pLVj25r1OXjj6+6Jy2fOyRcEgpxHiDEdd2/cwvdlqrAY29dpgqC79+UrAkHOI8SYjgPbd6OKcwmOpP7+cz/JpY2QrwgEOY8QYzqWzgxEKTNHtozzJ81AquS2CgTfCiHGdIzuMxjOGsbIr9DA9rUb5bMCwbdBiDEd3Rq1grkkxOLGdvj34BH5rEDwbRBilIl8+QrNq/jzerFuyUq4fvGyfCX7SaX/uJwrhb/SIRAIMcpcO38J/iUqshi7NGyJx8EP5StZh0SWlJSE+Ng4REdG4eH9IBzfdxg71m3C5hVrsW7JCk4s2L56Aw5u34M7127yh0JcTCwSExNZrAL1QYhRZqckEB+HIizGMX0HIzoqSr7y5VAxctCde9i2ZgMmDx2N7k3boFaRcihp4ojCBlbw0LOEu64F3HXyc3KBh54FCutboWheG47m0rbKmH5DsHLeUty4dAWxMTFCmGqAEKNM4MRpKG5kh3ySGJfOnCed+TLXkXJYX0ZEYP+2XejTsiO8bdxRKI85CmqYwkFhAFuFLuwUeVBAkZfPFdQ0g6t80PfOCmPYK/T5PvpK3xfSMUdJYwe08q2PNYv+xtOHj5AQL7oOqCpCjDJDu/aGoyQaGw0d7Nm0XT7731C1x+1rNzBt5FjULloeHgb54aQwYlGR8MgCFjGyRkX7wmj5XT0M794PM/+YIIl/OhZMmYV5f87AX2MmsSXsXP9HVHMtheJ5bVE4jyWL1E6hx+J00zVDJadiGPhTD5w+ehyJCaKFpKohxChBa7sO/k3YRfWycsWZoyfkK58nIjwC8ybNkFzL4nDSShMgWcFCevnwXaHSGNGjP7auWseuZsSLcMRER3MfVrKir6lkSzroK31P4oqV1oq0Zrx/+w53GJg2fCzqe1WTBG75VuD0taSJA4Z264P7t+4gJfmDzlqCXIsQo0TosxA0rlCTxdjI2xe3rl6Xr2QMCefQjt1oVskPLjqmb61gaTMntm7bVq9HmPSeJLyviZQmJSYh6lUkThw4jMGde0mWsSictU2kn6cHRw0D1HAvi79nz0dUZKT8CkFuRohR4uzxk6hZ2IvF2LvFTwh58lS+8jGhT59h2M99UUKyTiQKciGL57VjN/fWlWts3XJiq4LWiiGPn2DuhKmoXKC4vL7UQ0E9U7SXrPrFk2fJxMt3Kz/kDcRERfMHjiANIUaJDctWobx1WmvGyUNGIT4uTr7yPhQh7Vy/ORw1DVkIzjrGaFG9Ho7s2f/NAivk1t6URN+/TVcU0bfmNaW1Qgf1SvlIru3uXBF1pe4JU4aPgX9pHyyYPFM+KxBilJg+chwHTCiSumbh3/LZ97l6/hL3xKGucXaSW1rB1h0Lp8yS1oIv5Du+LbR9smvDFtT3rMpuMgmyqktJbF6+ltuHKCsP7z9Av7Zd4KhjxB9+7es0RrLYtmGEGCX6tenCD7SjhhEO7dwrn33HyUNHEeBVVXrgtdkS1SrixQEWCsD8v7l99Qa6NGgBWw1d/qAoZ+WGf+YskH435RPktQuXuPOeg4Y+rBRaKGdNv+tC+apMKmUlyX9WM9RejLS+o308+pSm1owXTp6Rr6Rx6cx5NCj3HSwUmrxP2Mi7Bm8tKBNPHz5ma+OgZSAJUhtlLVywdvHyHFm7ZgX6PU7sP4R6ZarAQVrrWkm/Y3XXUtgiWfH0PYaig89g7+atOP3eHBT1Qe3F+DgoWHL1qrEYf6xWF/du3ZGvgOsZKTpKLqCNZDlb12zAaXPKyMsX4RjR61cU0DLi/j3fl62c6S2anIS2Xijdj7Z/yKsg602u9Yn9h6X17TvRJYeeweKupeHgUQcjDqqn26r2Yjy+75D0KV2axUidxN+0ZiQXdNyvw1BQy4xdKtrvu3hKudtwvHwRgf7tunEPHwuFBro3aYOwpyHy1W8PRUr/mT0fpfI5vY08t6nVADcvXZPvkKxmcgIi7+3DrE7lkU9bAa0Cvhi6X1hGtWTV/CUom9+FxThr9J9v3aZ1i//hNY2l5J6WyufIwZLcwNXzF9Gssh+L0VHLEBMHjfi/rG2jXr3CtBHj4J4nP3sVzlrG6NWiA54+eizfIQkx7ilOL+mPBl5ucHFygUcBUxgVrInfDwjLqJbQw+qmnY/7pG76Zw2fC7p7D429fSUhSg+0tiHnrdL0qtzCzrWbeNBrfunvVN6mEHas2yxf+TY8e/QEQ7r2RgGdvOyW0hChET0HcAJDeqJv7MKYRsVQof1kbN2/B6u7F0Ee++8wTIhRPenRrJ0kOi0U0s3PLisxa9SfcNez4Ie5b5vOnKGTm6B1Gk1cdtJM2z7o37YbZwN9CyhPt2ujlrDX1Ofoc5l8BSSPY2KGPz8pNhKhj4IRHitZ7pib2NarKPSEGNUT2qhvUa0uP7A13D05h5RyQ5v61GYhUsL24V375LtzF7euXEfzKnV44GulAsWwb8sO+UoOkZqKM0f/lf7f1eK1IUVMKzsVlZYBS9+LmH6S6KvY1KOIEKO6Qq0Z65WqxGKklDLKJ10+ZxG33SC39VfJouTWWRu0nTB73BTYaupxK5EhXX7JsWQAyvrZs2kbfD28OGJKQqxTvAL2b92Z+Z8ZJcSo1mLcv20nqhQozpk3I3sN4Er8trUbcUMqN11z7N64Tb4zd3L5zHk09P6OraOve9m3bnh2Qul5axYsg5e1KwuRkieaV6uDi6fPfdk+pxCjeotx8fQ5KGXqyGJc9tc8duUopYy+/7lRa95MzxKJ4QgLi0BkTizTUpORSGutu2dxVHILLwfH4FOPLlmsqcPHIr+GBuw09DBz1ET5SvZA7UHmjJ+CogbWaRlMmobo1rhl1po/CzGqtxj/+GUgXDRMeBvg8K69WDJjLopIDxaLc2Zg1jNY4vZhct++GD7nGEKz+bmKvrQWw5sUg7OpCSzzmqFYzV6Yf/wJEj7hDe7euBWeli7IK/2daB81uxLJyX0f1fc3uOia8taFq3Y+DO78CyKeZzFXV4hRvcXYKaA5u6TFTexw5dwFDOvWl9c7zprGOLRjj3xXFkg6hDEBbsiTxws9Fp9GWHYt1VKCsGVEPRSUhGWo0IeTwgDGCh0YFPgOPeYcRnD8xz/o2sXLaFKxJouxVY0Arjz5Wug9+rTqCHstfd66oEDXpCF/IP5rKleirmBDVzdoWFbG4H1CjGoF7XlR5I+CNwFlqnIy+Jtqf2oedfXcRfnOrHAbK/vVkNZQCmiaeOPnucfwNBsEGX8mEJ289KBQOMPaoARcFUaSZdeHgfRzNHTsULnzdOy9F4v0W/yvIl5yIryRdE/1gqVxcMdu+UrWoFzd1jXrS25vHt668LZ1xxLJ3U9KTJTvyCLRN7B9gDesigZgzBEhRrWCKghqF/Vml/SXHztg0/LVqFe6Moux5w/t8OzxE/nOrJCCxBensaBHNdhqSII0LIMOM/fj0dckwqQ+xo6RAXCS3s+scg8Ur9IDDpJVr2BhhwB3GzjmUUgi1YZthQ6YtPMWopPeudiUCWMs3VtI15zXyVkhNSUVh3buQ91SlTi1jTyImh6e2L5mY/Zk+PBa+BUiXkYhTk3rjdVWjDvWbuImUSTGKcNGY/ncRVxBT2KcMnR09jxgSbew/veG8DDUha5hcbSevBv3smhAEi8sQjdvfUlwFmg25QB+m74MhTQMYaGpi+l92mHvtI4oaaohXZfEb14SzUZuwJXwBO5xt2bhMhTUMpX+bhqYMGhE2ht+AbQ9sfGf1fBxLMpCpMT5ht41cOrwsayvqwUfobZinDthGooZ2fJ+4rolyzkXlVLHSIxzxk1BTFQMu7JZPiKjEBsTjVdhl7BqQF3JKimgo1cErSbuwM2ISG5q/Dopk4JPfYbdYxtJLqnkjrq3wPxz8Th99DCqO5dg97Nv685IiLiLK2uHI8DDGHp6BjCx90Gn6ftAc7R2rV7H6zq6d3Sf39LeM5NQM+WFU//iJlgUMSX39Kd6TbmOUpC9qK0Yh3Sh1oyG3JqRGj5tXr4GZcydObL6W6ee6N6kLe9BVnMpiWoFs3qUQg33Mqju6IZShvm4FWQBI2eUdyqB2sXKYUXgYu44/l8kX1qCnj7GktUzQMVfluGGtKQKfxiEdn6NWGDfS2veS2cuSKJNRNC5A9i+ZS/O3HmGl9EJvO1Buar0d6N7R/YckPammYCykSYNGQU3vXxvk72pbjL0Mz2CBFlHLcVIrhW1eyAX1dOyoLR+vIwtK9Zy9QZFB/1LVEBZ6eF9U9mf9SMP7BVGcFaYwlXDFC6SmOyl8+TqUbodRXMp0eCzJD/DrlENpPeQ1oQO9TFqW1Bae2Xp70CJCsbS+WKS1SPr/iloXVfKzInFSNs5meFJ8CP+UHLSNuL/J9TxfFz/oZLHkPVO64LPo5ZipLS3RuVrsEtK1RmPHgRJD+wGbllBWx0DOnRHn5aduClx7WLe8CteIQtHRfiXqgT/IqXhbW4tiUkfttoWKGlfCtULe6NemUpYLa3l/qs9RsqNVRjo5wgTY2fUG7oGF17JFySWzZrHa0FT6Xee+ButBTNev1E1SlFDG97eoGbJ/8WNS9fQ8fsfYKdJ60Nt/pAKnDAViQlfGTEVfBa1FOPZYyfh6+HJlrF3y454RW35t+58O2tjVJ9BkmBDM14LZuqIQoy0Xox6cQe7xrVAGVMFtHQsUa33QhwPfoVI6R5eM2YiSBRx9xyOHTmGq48iEJPw+j25Hdt3kNPcyOL93KQNnoeEylfeZ/mchXDQMJBccE1MGTZGPvsx5DHQKDzqHZvW5EqbZ3+Q1c30+laQZdRSjG9aM76JpJIo7ly/ibolfViM5MJ+9RSqlEfYN7ktPPPrQkfXFjX6L8WZ8C/fbKSMmU/FK589eozOkqtLYvQrVgGnDn/cm4cENmHgcHZnS5jYY/X8pfKV96Gyqx1rN3LXg7SIqba0Fq3MDbpyQ/tHVUAtxTh9xDheA1Ekde3if/gcFQ+3qdmAxVjR3gPnTpzi81njMXaOaozCutI6T9MBfoNXSe5l9j/QJLSx0jrORHJTqf6SAkIfEvLkGbo1bs0uah3JdabtiA8hq/fP7AXS+tmVAzVkFWlj/8rZr0l8EHwpainGfq07c4DFScMIR3fvl88CQ7r2YXfOWkMbO9d/RXV80mGMa+AKDU0r1B2xHteic86yUL2gh74lC3J038Es0PTQh4p/CR+2nrQO/LBbOo2bo0E89OFEQqRk757N2+PRfwWWBNmO2omRHtaW1euxBaTWjJdOv2syRYniJU0d+BpVOGQ5xSthP8a0bYxWg1bhWuynnMzs4fSR4/CXLF6a2Jp9VGmy6Z/Vb4M3w37u955YaV08vGd/7ozOyd46Zhje41e8DA+X7xB8S9ROjI+CgqW1UBVeL1Jrfpr49IYzx/59G9hpXME36xvb8Q9w/dpdBIfl/FrreWgYujdty2L0LVQWx/YelK9Q1/E4Tn6nzBuqqlg87V0qHE2w6tGsLey00tonljC2Z/f9W7XnEHyM2onx+P7DvBlPghvUsSdehD2Xr6SlffWQHmxKBLDV1OU12IduX6bIymuyCP1+VDFBgnPRMuXtjjdQy5DKLsW5uLhJhVo8mIc4f+I0jyp4E6ipYOfBEdfMJCAIcg61E+PKedSa0ZnFOHvs5I9cUdogpwAOXW/tWx/BWSmU/cZsWLYSxYztOGI6ouevfI4Suyn1LZ8kUnvNPJgxcjxHTKm7QZ3i3m+3Lmgvddf6LUo9n0NdUDsxThg0HIW0zTmSunXVevnsO8g6dPq+OXeMc9A0wIalK+QryguNJAgoW5Vd1Xa1GyFcsvYX/j2NmkW92Co2LP8dr423rFrHyfFvhNi0cm12zbNk/QXZjtqJsXvTNvwguunkw8mDR+Wz70Ob3DSvggRLDzJNoFJmKGmhd4uOHKShAapUYTGy10De5HfQ1mcLmRaccpSEqAM7yVJ2adiCG3IJlAe1EmNCQgK3LyQXtEahMlzTmBEU7u/asCUHNqhciOboPw/NOLtFWaDgC3WBo8Gt37mVQWlqqa+hi3qlK3HRNHW842RvbWP81rknpwQKlAu1EuPdG7fhX9KHxUitGT+XpH3h1FkupKX2/pQsTbP7ldmd2ya53GUtnOGgMICzwpgrUspIa+NKTsXYCyCLSHuJE38biZjoGPlVAmVCrcRI+aeVpYeT3M/hPfpzS4rPsWbR3/CycuWyKnqwKV2MAiPKCFl5GldHlryAIi8K6eRH4TxWLExKcPCU3O5FU//6+vYYghxDrcSYvjUjTR1OSf78PiBV+4/pOwQumqb8kHvbeWDT8jUclVQ2Dm7fjRoeZVl4LgoTFNQwZVHS9zQLkTb//x8DcASZR63ESPV/JCyydLszOVUq4nk4ejZrBwdNfd6XK2XqhOWzF2Sq4uJbQK4zJXPXLeXD0V8XyRKSGFmIGnqoX646ju07JJK9cwFqJUbKzeTWjHltv2iQKPUIpbmHzlom8trLErPHTeZyqf8nVF9IRdHVXEvDXpGHBUhCpIOCN61qBnDhtCB3oDZijIqMROMKNdlFrVeyEm7K2SiZhSrcybK661pwlNVFx5jLlygRm4aCfkvIygXfe4AR0u9DvWnSgjZpQnRS0ORiDXznVhpHdr1LghcoP2ojRgpwUD9UEmO3xq3w9OEj+UrmSUxIwJTfx/C6kwRJIqDACFXZU4L2t8hiiYmK5gGvtQqX45HhTgpDDtLQQUKkwI2LsQn3Sv2vAJVAuVAbMVJrRsrBpEgqjQenSvusQFaQthFo/85Jy5DXkQW08nIh7qJps/E46CHi476is3YGUAT0xfPn2LVxC9rUagi3POa8dVGAmxibsBAdFPoobebEPVKvXbzEA0sFuQu1EePcCVPftmZcPnfhV+0Z0mtDnzzDn4NH8qjxN82nqASJOmz3bdUJh3ftwavwCJ4B+aXBHrKwZIXJCl48dVb68BjKmTVu+uZsCUmI5C6TFSRrSOtFH4fCWL1gqUj2zsWojRgHd+7FDy4VDh/8mjka6SCLdf7f05xaRjWDFEChvE/6Oe4GFvAr7o1f23XjDwKacPXgzj0O+sRER3OWT2xMbNrX6Bi21NRGg9pGLp01D8N7/sq9aEoa28NZw5jflyxgIT1zeFm6crI7ucn0IUCzEOn9lXHLRZB51EKMZMnaSu4dWcWyli6cWJ2d0Gi000ePcxvEqs4l4KZnxkJJE6YhXDXNeAOeUtKqu5VGM5/aaO0bgHZ+jdGmZn00r+rPowZIYEUMrOCmbS4LW7a42pLFtXFHrx/acxU+tccgt5Qipj9Wr8slUcqcHSTIHGohRsrDbOBVnYM3jb1r5FiCNLmWoU+fYcvKtbyN4mlREIUNLLlKhKwauZMk0DduLX1PB32fdp62J4zgppUPHnksWbw0QWrpzEDcuHyFm2eV4OipPuy18nBxMBUJC1QDtRDjueMnUaNQWbaMVN0Q+jRnk6TJSpH7ST/nrPSzVy9YgjF9B3PXuWqupTiJm7YkqLqevlLghdpENqtcG0O79uZMoSN7DnAwiKzui5AwjOk3GB6SsMlaUpuM37v3xXPpvEB1UAsxUvEtBVpIjFOHjUF8bJx85dtA+4JkNWltSC3zKbBDQ0XJYlPbDPqezlPAhgI+6Rsb0zqyT+tOcNQ24KoLcmOpQiMuNla+Q6AqqIUYaZQ2rdmopf66JWmtGXMDNMC1dc0A3tMkIVLgZtms+SJiqqKohRj7tOrMazNHDQPuwq3skCU9tHMPN86yUWizEKlGcdvqDaI9hgqj8mKk9duPVety8MbHsQgunzkvX1FOaE9y3dIV3FafOhKQVaQ0Pmq7LyKmqo3Ki/FxUDDqlarEYqTWjA9uf/1M+5yC9i0DJ07n8W0kQtq66BTwA25e/rI8WkHuROXFeFxyS6u6lOTgzYetGd+SmoJsqxlOSUJ8TDRi4t8fUvNfREdFYfyA3+GhZ8luqaO2IQb+1P2jpsQC1UXlxbhi7iK2NCRGKnuiSbxveB0fgXtn9mDt4nmYt2Q9Dl4KQnh8ujVZSjRCg+/g+tWruHbt2tvj6tVruH7jBm7evIUb957hVWzaa1ISnuDclkCM6tcTfYcHYsflZ4jPRBlhyOOn+LVDNzhr52Uhuumac/I5RVgF6oPKi3H8r8NQSMecI6nUE/UNr58cwoyOVeFqZQFrWwc4OtjA2soFlTrOwP77sTzxFzH7MPaH8rCzsoK1tfXbw8bWFjaW+WFmbATjcr2w4uxLybpG48CEDqhfryX6TwnE5F71ULlhf6w7mYElTsftq9fRiWYhaqR19qaKkAWTZ7DLKlAvVF6M3Rq15EAIpZTRXArm9W0s7VIO+XVt4dtvEY7eC0Xo00tYN6Qu3IzywvOXNbgcKTmZqQ9xattyzJ0xE7PnzMEcPuZhwfyJ6ObrAn2FBtw7zMOJ55J0k/ZiSIMm6DZpF55KhjI5Yh16+DfDksAjaT/zAygYQ60iaYwAtfQgi1jJqSg2LFsh2mOoKSotRnJJKZ2MgjfUmvH6xStpF+4uQ1cfWzjVm4T9QelWdi83ond5Myg8umPDlWg+lZoirSeTk3m7gVtXpCbh4ebB8HM0gG2dkdh6Kx7spKZexfzOjdCo0yTsfhCG+9uHIaB2Gyze9PG8Dtqe2L56A3w9ysoR07SWipTAzj9DoJaotBjvSms6v2LevF6k3qGPHgSnXXgdh8jQIDwMi0EiP/upSHmdiPgrc9CquDGMKg3H7jufcBMfbcCA6jbQtW2AiQcepQvSpCDu3l7M7tcEVTxLw6t6cwz5+ySeJLwvLtqwXzojEOVtCkki1Oac1FY16+PSaeXechHkPCotxrTR4EVZjJ9szZj0FBf3rsWcP7qjfmkr5LX0QZ+VV/Ayo1BoymNsHlQdVlrWCPjzIB59dE8qEmNf4UVoCEJfRCL+A28zPj4OU38fg2J5pTWn5Jo6aOnjl5YdubRKIFBpMdIINErEJjEumjo749aMj9fh13olYG1hBiNdAxT4rgfmnXiK+AzEGHNkPBoV1IJh1aHYdufL1nURYS8wtFtvuOrkY7e0oI4JRvUZxM2uBAJCpcVIE5kKappyV/A9m7bJZz8g5inu3bmNG9fOYPusn1HDzRQmhVrjr+OP0yKqb0h9jLW9KiKfZgG0XnAKLzKynJ8g6M59nqFIrRTJLS1qaIu/xk5G3DdOWBcoNyotxg51m/I0KZo/ce74uxn9qakpHET5aKM/OQZHR9eFi5YWKgzbhdvp5oam3lqMn0obQbt0X6y/njkRUcSUCpl/rEazENNm5VP1yKp5S3mOvkCQHpUVY3RkJE+Qokhq3ZKVcOvqdfmKtHa7dwRr587AP0cffLQ2jNjQGxXNFHDtsgYX3rZFTcXtRT+hjKEevAZtxq1MbAGSS0xrVv8SFThiSkL09fDC7o1bMnaXBWqPyoqRxrjVlB5+Wi+mtWZ8l1aWeGwsAtwMYFFvMg4Epcu4eR2B3UNrwkHDDP6TDyP4rVCfYE3PCsinXRK911/Bf9lFsnqr5i9F5QLFWIhUyd/UpzbOHDkhkr0Fn0RlxUjZNhVsPTjzhnI+32vNmHgJge3LIr+uFXy6Tse2Cw/w+N45bB7fWnIjDWBeaQDWXY18t2ZMOoARtWygyN8EgSc+PxqOunzTepCq+WnrgmYhdm3UErevfrzfKBCkR2XFSCPCqTUjiXFF4KKPLFJSyHHM+8UPxRwoHc4Odna2sLF2hlezkVh76TmS098eshEDa7kgf+Uh2HLj03aROr9RUyoPPeo6rsuj5CiC+uyx6GEq+G9UVoyDfurBHdZsNHRweNc++ez7JCdE49mtU9i3eTVWrduB41eD8SI26eNqi5QExERGICIyDknpvNr0PH30BH1adeQu3yRED738vKcY9SprzZIF6odKipGsYMsa3/OQG09LF55nn5PcvHwVbf0acrI3NYwiF5U6un3rGRyC3I1KivF5SCi3rKDgTVOfWgi+e1++kr1QHunx/YdR36uaHDHVQxXn4ti6cr1ojyH4YlRSjNQesbpraRbjL8074NGDIJ5/kf7gLmxfIRiqrKDBqTTt6U3ElOZtHNt7QERMBVlCJcW4fukK7qRG+Z9+xSqg5w/t0ad1F/Rp2YmP3i07YkD7n7FkxhyuJ6TepF8C1RoumDIL5azc0oSokQft6jTGlXMX5TsEgi9HJcU4acgfKJzHklvs09wLGhTz4UHn3bTzcdfun+o2xYHtezJV0EvCnTDwd47Uktipn2n/tl3w8H6QfIdAkDVUUoy9W/4kCc6AB8YUNbDmdDgST/qjiL41z72nzBgSZzFDG8wZP4WH0XwKajg8sGMPLlTmZG9dM97DpIbEAsHXonJipPXaD1X8eL1Ywc4dO9duwsN793HryrW3x+1rN3B8/yGeZUiz8AtqpYnSRdcUEwePwKvwj0utaKZFx4Dmb5O9qQxq/qQZ2T6LUaC+qJwYaT6Ff8mKLEZqzfgoSC4ozgAq9KWmT+TW0kAZcjuddIwwpt+Qt82gSNw05YnmYJAI7aTD27YQ1i1ZLtpjCLIVlRPjsb0HeXuBMm9+69gTES/C5SufhtaK8yfN5JFs1I+mkG5+HN69nxsKU+lV7aLlOVBDXcnpz9k131EgSI/KiXG53JrRQqGBueOnZrrLGglv0pBRPIqNrOrkoaOwcMpfcmdvLUmI+mhZoz4unz4rmcvsq7pIfR3PA3Hik8R2iLqjcmKkkdvUmtFSEuOOte9aM2aGy2cvwK+oN7+2on1hzqSh/UMHLQP0at4Od6+cxbMbx7Fx2QLMW7wW+87fR1hcumbFqTF4/ugTfVavU5/Vm7hx9ykiuM9qChJDLmHnwjHo37MPhv21Gecex6U1txKoJSonxi4NW3Kk01XLDGeOnpDPZo7QZ8+4mxx1BkgbbqoPZx0TjOw7BGEXN2Jp/3oobGcFK+6zagdrqwIo33oidtyKSqvwiD+Kae0rw8FKuufDPqtWFml9Vkt1wsKTUZJvfArTuzaCf5PemBQ4DX0bVsf3PWfhUIiodVRXVEqM1JqxUfka7GbWcC/7xTMq7t28hQDPKrCS3FJKMneX1o4zx0xFYuwVbBpUEzZ6lqjUfQ4O3A5FaOg1bB7ZEEXyGqB458U4HS7Zx9SnOLdrJQJnzMRf6fqsLlwwBb38CyOv9Hs5N5+GI3Tvv2PxQ9OfMGLjQ8kapiBq229o1KwLJu3+fImWQHVRKTHSePBaRcqxGKnlBkVWMwOlxV09fxEtfb/nsicSIglydN/BiJHcUIRtRr8aDrD1HYFtt9I5ktE7MaSaBRQF2mHp2TfR1w/7rL7G092j0MBFHxbVB2L11Zg0V/TW3+jVrAFaj9qGe8+DsXf0D/BvMQgrLonkcnVFpcTIrRnti3AkdWSvgRm3ZpShgA21SDz372ksmzUPNYt4sVtKQiQXlTJrtr9ZcybHIyo0GA9Do5A2ikPus3pjETp7mSKPZz9suPaJ/cZnOzDC3wF6FrUxYvu9dwXLKQkIPrQAvzWvBq/SZVGlyUAsPPwAccJLVVtUSoyLp83m1owkRpqL/7lE8H2bd7AVdTfOz6lzTnKKnIvChNPo/EtWwPULl+W705EcgquHNmLemF5o5GmLvOae6LroTMbd4lJDsGtEHdhr5UPNkdtx/0OhpSYhLvIFQkNC8eJVHERAVb1RKTGO6NGfWzOSi7l/2075bMbMmzidR4u/2T8kIRaQ81hJjD4ORbBy/mLEpG/XQYRsw/AmnrC2yAcjvTyw9+mImQeDEZtBpUbCqRlo6aENvXJ9sPqaGGQj+DwqJcb2dRqzEClV7eKps/LZj4mJiuZZja6SxSIhuuqYIaBsVdT3rMZToMhV5URy/Xw8rJTWk2+JDcGDu3dw4/p57AnsjTqFzWDi3BST9j3Ae/k4klXcNtgXlpq2aDz9MEKE1RP8ByojRmrNSGKi4E3dkj64e/2WfOV9Qp+FoG/rTiika85rRDc9c97gDwsJ4aZVh3fvYwEWNbThYmEHSayUv0p1ikkftlhMTsCpKc1QWFsDpfuux5V0Oeap91eiV0VjaBTpimUX0oboCASfQ2XEePXCJd7OoPXiz41b8wDSD7lz4xba+zeGowYle+tJ60t7LJkxF/Hx7wdfYmNisG31Bmnd6MOb/naSK1vUwh5jF2z5qM9q9M6h8M2vgEPrRfg3Qj4p8WBFT1Q01kLJXqtwWeSSCzKByohx+5oN8LZx5zQ4KmuKiXq31qNkb0oAaFi+upzsnYczbLauXPvJIA+9htortq3dEPYamtCWRG7g7o+NJ+7Id0gkR+HQ2AC4aBii+h87cfet4QzDloHVYanhji5/n4Owi4LMoDJifNOakcS4MnAxqYnPJ79Oxo51m9hqWkkWzkFyTf1KVMDR3ftZcP/FvZu30bhCNRhIYlQoNFGhzVBsPB+Mx0EXsX3yT/Cx04eJVw/8fS4i3bbFcUyo7wiFkT+mHPjYQgsEGaEyYhz4pjWjQgdH9xzgc9SdjdxQbzt3TvZ2kNzTFt99j8tnv2wW4qTBI+GqbQIzSZD5DKWfYWsHe3s72Fg5oXSDwfjnTMj72xLhOzEiwA3m5fpgzaUY+aRA8HlUQoxk4ah2kayip4ULbly8gsSEBK5TpHUhdfZ20jJE7xYdEZSFWYhUMlW9YEme29HRzw9rFwdi/abdOHb5AcJiEjPos5qI2MgIhEfGIvHTW50CwXuohBipNWPdUpU4ktqsUh2cO3GKx8FRXSJZSqrgH933N74vKzwPCeNJUqbS+1Ph8tUvtKwCQWZQCTGePfYvqkmWi6otOgX8iOZV/bmMioI1tEUROHEaoqO+LozSvUkbmEhi9LQsiH8PHpXPCgTZh0qI8U1rRoqSFs9ry1k4lE1DEdPNy9fId30dPZu1YzF6Wbni9BeWZgkEmUElxEib9oX1rdI6wsnZMyTELSvW8DCauNhYzrrJ6vH04SO0kNxUM2lNSs2RT+w/nOF94lCeIzoqir9S7CC3kOvFSLMQqYEwbc5TtQUd7rrm8HEoigDPqmhQrjqnumX1qC+9h6+HJ4qw2A1RwtgetYt58/mM7heHchz1ylTmf//RfQbnmlaauV6Me7fsQHkbd1hJ60WyjGlHWgUG7SmmZdB83UHZOpTDSu9H709/zug+cSjPQf9mFF33tvPAoVzSQCzXi3HNor8lMRaCq74Zu6aVHYuxVaSqi+w6KtoVhmf+gtLhzD+jkmP2vr84sv+oIImQ9pd/+bFDlqPo35pcL0ZaE65ZuAxbV69HyJNn3O8024+Il9zY+FV4BP85w3vEoVwH/TtJB8ULcgsqEcChNheZSW0TCJQZlRCjQKAKCDEKBEqCEKNAoCQIMQoESgHwPwFQg7XlxcKPAAAAAElFTkSuQmCC)
physics-General
physics-
Two blocks ' A ' and ' B ' each of mass ' m ' are placed on a smooth horizontal surface. Two horizontal force F and 2 F are applied on both the blocks ' A ' and ' B ' respectively as shown in figure. The block A does not slide on block B. Then the normal reaction acting between the two blocks is:
![](data:image/png;base64,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)
Two blocks ' A ' and ' B ' each of mass ' m ' are placed on a smooth horizontal surface. Two horizontal force F and 2 F are applied on both the blocks ' A ' and ' B ' respectively as shown in figure. The block A does not slide on block B. Then the normal reaction acting between the two blocks is:
![](data:image/png;base64,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)
physics-General
physics-
A light smooth inextensible string connected with two identical particles each of mass m, passes through a light ring R. If a force F pulls ring, the relative acceleration between the particles has magnitude :
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)
A light smooth inextensible string connected with two identical particles each of mass m, passes through a light ring R. If a force F pulls ring, the relative acceleration between the particles has magnitude :
![](data:image/png;base64,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)
physics-General
physics-
Two light strings connect three particles of masses
and
. If
moves with an acceleration a as shown in the figure, the ratio of tension in the strings 1 and 2 is
![](data:image/png;base64,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)
Two light strings connect three particles of masses
and
. If
moves with an acceleration a as shown in the figure, the ratio of tension in the strings 1 and 2 is
![](data:image/png;base64,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)
physics-General
physics-
Two forces
and
act at the ends of a massless string opposite to each other. Then
![](data:image/png;base64,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)
Two forces
and
act at the ends of a massless string opposite to each other. Then
![](data:image/png;base64,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)
physics-General
physics-
What is the relation between velocities of points A and B in the given figure.
![](data:image/png;base64,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)
What is the relation between velocities of points A and B in the given figure.
![](data:image/png;base64,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)
physics-General
physics-
What is the relation between velocities of points A and B in the given figure.
![](data:image/png;base64,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)
What is the relation between velocities of points A and B in the given figure.
![](data:image/png;base64,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)
physics-General
physics-
In the figure acceleration of bodies A, B and C are shown with directions. Values b and c are w.r.t ground whereas a is acceleration of block A w.r.t wedge C. Acceleration of block A w.r.t ground is
![](data:image/png;base64,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)
In the figure acceleration of bodies A, B and C are shown with directions. Values b and c are w.r.t ground whereas a is acceleration of block A w.r.t wedge C. Acceleration of block A w.r.t ground is
![](data:image/png;base64,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)
physics-General
physics-
What is the relation between speeds of points A and B in the given figure.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAU0AAACcCAYAAAD75fn6AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADahSURBVHhe7Z0J2FXj+sa/OI55no/ZkRyRTjIlQhElQ2Yph9Ips4qUoSgZG1CdSChTSCoaaPBXlFBJKqKBlGQIJRE9/+/3tt9ava39fXvtYe21137u61pXfWvtYa293nW/z3A/z1siCoVCoUgZSpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhSIr+Omnn2TSpEmJv+ILJU2FQpExXnzxRTnyyCOlcuXK8n//93+JvfGEkqZCoQiEv/76S3777TdZtWqVjB8/XurUqSPbb7+9/P3vf5d27drJd999l3hlPBF50vzjjz/k+++/l99//z2xR6FQ5BPDhg2To48+Wo466ijZbrvtZJtttpHGjRvLp59+mnhFvBF50nzrrbekZs2aMmTIkMQehUKRT3To0EFKSkpk2223lfr168u7776bOCKyYMECQ55r1qxJ7IkfIk+aPXr0kC222ELuv//+xB6FQpFP3HXXXYY0+ddiyZIlMmDAANlrr72katWqsXbRI0uaxExeffVVE1yuUKGCmd0UCkX+0a9fP0Oar7/+uvz5558mCVSrVi2zr0qVKnLfffeZkFpcEUnSJGZyySWXmJvwt7/9TTbffHMlTYUiIrCk+Z///Mds/H/PPfeU9u3by2effZZ4VXwRKdIkfnnZZZeZwDI34vrrr5dbb71VdtppJ3nggQcSr1IUAj7++GO56KKLpE+fPok9irjAkqY1am644QZ5//33E0dFfv3118T/4olIkCau+L333iv/+Mc/zI04//zzjZQBkACCNLt06WL+VhQGRo4cae5l3bp1E3sUccGTTz5p7u155523gZh9+vTpJjF0+eWXy7fffpvYGz9EgjSJizzxxBMmS/7aa6/JypUrzf7PP//c3ARmM00EFRbefPPNdROgIl6wpPnss8+av4lfXn311euMnosvvlhjmmEAwSxiWbB06VK5+eabZccddzTxTESz6p4XFixpnnnmmYk9irjAkub//vc/eeyxx2T33Xc3z+m///1vGT58uCxfvlwlR2EBk/6RRx4x7vhWW20lxx57rLRo0UJ23XVXueeeexKvUhQCZsyYIYcffri0atUqsUcRFzz11FOGNDfbbDPjBR544IHSs2dP4zEWAyJBml9//bUx9Q8++GBzM3jYIM/Vq1ebmWvnnXeWu+++O/FqhUKRT1jSRJPZpk0b+fHHH83+jz76yMiNkCDFGZEgTTKs3IRDDjnESIu8QeTu3bvL1ltvLZ06dUrsUSgU+cTTTz9tntdevXqZv+fPny8PPvig8RDZH3cDJxKkiSvHD41MxeLLL7+Uhx56SPbdd19zI9Q9Vyiigf79+5tnkuTsCy+8INWqVTN/I3DHClXJUcggiNytWzc55phjzI1ANItuUy3NwsIvv/xi6pAV8YO1NK1BQ0yTZ3bRokWJV8QbkSFNsueIZo8//nhzI/bYYw8T1+zdu7fssssu0rFjx8QrFYWAiRMnmhJYVT3EDzZ7Tjs4WsF98skniSNrwbMcZ0SCNCn2P/XUU03GnIwcN+KLL74wx0aNGmViJd7mAIrog/vGg3X66acn9ijiAuueE1LzSovmzZtnBO9NmjQxXdzjikiQJh1RateubcruyMBZfPXVV3LllVcanSYllcQ8OR6VbcqUKfL2228bTSLtsdjHwPn5558TV1C8UHF7fPHSSy+Ze/v888+bvxGy33777UYauOmmmxptrlYE5RjMVsTALL755hsTZMbC3HLLLWWTTTYxNymfG+dAFp8NEvd7DRuD5oQTTpD33nsvcTXFiTFjxpjfo169eok9xQ00jLNnz47FRsiFe8u/gwcPln322ceI2w899FBDpBSpqLg9JDA7kX074IADzE0hJta8eXPZYYcdjCYMsTvbcccdF+p20kknmQFhiZFWdWhK3XOhmzWJK15DTJbS0GLtOD937lw58cQT5Y477kjsKV6QTaZ6xo6fuGyE0viX5xVX3Wv4xBmRIE3IEpMfC42bgLidbDlxERZpynciiMHQsmVLc260+Ec7iiTKD7jptLWz1jFdmmwtvaL4MHXqVGnWrJnxQIjZU2pInLdhw4bSoEEDqVGjxrqabTYMhHPOOceMIUIbUdyssoXz5rmYNWuWuVasy5dfftk017E5iTgiEqRpW01xE9q2bbtBT74RI0aYGnRiJvkA8Una1XF+TZs2NTHL8kAlE5URZBd5H3X07FMUDwjPMNEjx2EMQILPPffcRuOHeP7o0aNN8hPvhTGDPjnKGDp0qLkmb49bwjFMDuwnrEabx7giEqT54YcfGjfOu9YIoDP0ySefbNyA6667LrE3XNjW/syoQS1GQg0Ex3m/dmkqHkAYtiSYcA1kmcqkCdESA+Z9jHc0y1EEgnbOkfglcqNrrrlmnYFA4vaNN94wCyLGFZGKaVrQow/rzpZl4epS4xo2PvjgA2P9Eq9Mt9XV448/blbswzUjrlUswD274IILpGvXrok9xQEIY//99zfjFisTCywIkN/hnvN+xksUNY+QJedHJVClSpXM/8866yzTJ6IYPKpIkSb9M3GBSfpwI4if4OYS08R9CRutW7c254E7ki7ImtolAVi9r1hIBJeTay4mnSbjhAQg181igMT30sHChQvliCOOMI1q5syZk9gbHVjSZCNZO2jQIFm2bFni6NrYZpwRGdJ85ZVXZLfddjOtpgiO0/mbBAwuO/tvueWWxCvDAT09aYpMUmrx4sWJvekBLafNqpMQINMY9zZaxabTJJGJR2HJBDfV9odNB3379jVhKcJDUbM2Bw4caK4Rt9y76iT/v+2220yhirePRNwQGdIcN26cycqxDOiKFSsSe9fuZ8YlmRImiC/hmiN5ymTwA66HVfrQs9l6XSYBlvmIK2xFUDHoNGlrSAhp7733NhYikjTc9EyAcoQJ+1//+lfkYpu0fuPeEnoChBQIJfC8YGGjEHjnnXfMsTgiMqSJSe9aX2j9aKOPmJysepggPsMAyNbaRFjPFStWlMmTJ6/rCnPttdfGVtvGQlvoVrE84gwsQu4lhIEFRgkh5JmNVRmpkKO4IxXFRpiwFUGEzFie5qCDDjJ/k/yiGxnxfxW3hwwqgmgKYG8GM3fYMU3CAwzYzp07J/ZkBghkv/32M//ngeJvrg2ZRhzrdHlo4ty4get79NFHzT0kBo9ljTwNrTGifqyvTMGEQxwcrXKUYC1NK26nDy7L99JMvBgQKdLEDUbOUKdOHXMzcHWIDSH4Dds9x1LCnSYxlakbjTXJLEwW3lYIkfRCTsV1ouGL80JUcQMeERIy7h33lRASoDUaHgX3NRu11+g8iZOOHTs2sScasKSJSgBVy8yZMxNHigORIE00Xa+++qpceOGF5mZAksxcn376qWmCwcJNN910U+LV4QCrgfJJBgaNQzIBVgh6zRtvvHED64t+kzQ34JqRmWTDOlHkFkygd955p7lnxO5ogWdBuSTSm3/+858mtJQprrjiCuPt2IqbqIBsOdfPM+oCxQAFKXFGJEgT95RMNTeCxIt3IKLZRHIUNmkCqpA4J6zfTMDgJ8RAFt0F1gmxK76HNcKRmyiiCTwGLCvuFRbltGnTEkfWA5ka93rChAmJPekBr4uSXbydqIVvULrwG3jlc4QQ0OWiR2Ycx7nnQiRIE0EshDJs2LANfmy0fri0yJDCds8By3DQjAAXLN14DQklOs+fdtppSZcBwDUnDMBAJB4Wh7pdJCdY6vnsGZBN/PDDD+v6D9DGMJn1B6FAHJBnJkJvngVccxKhUROMW9Kk3BOLGh2yldQ1btzYFIXEOZ4dyUTQ9OnTTTNTb0VQPkgT0Mafc+B8gsYdiYsiGSGYj8VcFpCV3HDDDea7SBJB2IUMJDdcSxwkR+h0IQOuhyYbZWWzmRiZIFFeeD2mIMCi5TMY9xBQ1ABpYk2T2MSo4P/kIYjtxllGZxEZ0iS4joWFYJYBR99KBijLXVBlAaHkA8RbCRnYB4Za2/LkFNSoY2HSTo6YFA1JUoGNlyGAJwkG6RYq4iJup5uVLWvkWlJZBwcZDrXYuNdBvQY8LTS8fB8dsqJYlogulfPDAySuSxzT25eBKqY4rxcUCdJkoKDvgixxbZBtDBkyxBxDnkNFUL4adgCsBzrHY/miwbv33ntNPAsLBAsRsiPuRGKHWBYxTJqyct6I9YMAkmY5VMgWKUehdouxlmYhl1FCeFbJgaUZxNNgPEMq9FxN1VqEaFq1amW+Dws900q0XAGStL+JXfMcoAixeQAIP66IBGlSt0rmvHr16mYNdAtkG+gksTrzSZoWp5xyihkQdqPulngOhIr7TtaU/VgZkCYPXDpBfCxZLGxiWmTv6fZUaCDmRyaZ3gGFCM6fZA/386qrrkprCROIE9E7Ok5+B8jTW6MNmHCxzBDGswQukyWJQdYSjyowaPhdbOcuzpVFEFG5sJ+kLgL4uCIy7jkWm61jJXPIbOYlqXy55xZ0q6EyCXeEAYJ+lIQA1jHnhxAf64DzRJLBg8Z+XptudQRLpdJLlCB7nAdh1IAXUbVqVXP/qNpKlsBLBdbyYiMhePbZZxvROrFyehBcfvnlxqOwryFbjswuyrCkSZKK5xTjgb8pg+7Ro0dGv1chIHKJIILMSBe4CWgbGzVqZCy3fFqaWANYwcQaiVVaELA/44wzzLmiTfNm/nHtiGkSKHeXOA0CBiW192z051TkFiRv7NImJB9X/Z5+TJFQCxM/iUCIkhLLww47zHy23ehFgESH9XYI67CP8E+6E20YoJsToQfGJOeLwUC5caZ65kJBJEiTAYK8iMoY3BNuRIsWLUzGmWoDLC3+zhdwszgnrEsXnDPH/AL+jz32mDlG7MfbhCQoSCwwgWCpULqnyA3I/tpO60ilTCPdP76T94c/J3379pN+Tz0jr0+aIz8neHTNqq9l0pDn5PHH+slLo6fJ907jKls19N///tf8TbITVxxrk/29evUyVqWNlRKOIgbKeI9yEpDxCGlShELSytvRiBwEcfw4lgZbRII0+YGJ5zCQyFTiCpsBWwpWv4Mw7MALG8ifGMRsflITW8XkV0pGHIy4HhYqurtMwKTCORArLYQu8FjnUU1k+IGqLeKP3Et+X5u1XrN6uXw14WlpeuQOsmvN/8oL03+QVQkJ4prVP8m0oR3lnJOayBPvL5ZfPdJEqtm4X8Qz3fWkcGv5Hj+tJ2EYxgvEijY0ioA0OX/vM4lLzkRTqVIl87wWYhw+VUSCNCFIsq3UtHpnKAYNbjmDKB/SFSxguz4QVqMfyiJNYFvMIZD31iOz4BZNSAhHIJzHtS/PJSMzjzvH78H6LFF24eiDSlcnRN5RB+4msWN0kcSgN+51+qOM6niy7LTvmfLEVO+SJ7/LvDe6yPX3viVeP4L7cumll5pxQRckFzbe7WdNEs8nuYj2EWlPFAEhcv7I4/iteDYIaWB9oi7hb2+fzbghcjFNgIyBXn1kjrGsGEAXX3xx4mh46N+/v3mQiDklczfKI02A/ILXeDs1YYVhhRKOIOtI9Qy1vMziSJf4Pj+NHhlYCJjPMzG3DHt95gq2nya19VEGlh1jDKkbSy4nm4hWzHhWzjtoD6nbcaRY+2/18nny/B23yLOfbSjopuyWDkCMG7/Wf2WRJqCwgQmHcRFU5xkGiOvzXNCYhHACyVDkeFiadCiLOyJFmpAli88j7OamMHCsPhKBeZjAKkQvysM0fvz4xN6NYS3R8mrGSQjwWd7KIKxrb7dvNmZrrB4y82ReIVFCFJyPLU2jdM0uo0oxQBQX4CoEcTvqBM6R8cXiZ2Vjobxw7VGye5Vm8vr8tZPZD9OekNYdBss3njXE8I4YN8jkklUElUeagBJFXhP2uE8FjEmrGqEvBG66d1kOxqfXq4obIkOaBJNpk8+NQO+IFYWmjWUnmHH9kjC5AhYeq2NyLmQ9bXwVoEmj16bdqBXndehLvfu9G+SIdAWL+fjjj1+3HyvHyjXK2shSIhKHRAlh4PriUtINnuPUrbv6v3yDuDTnhrUVNWBN0mmc8yN0QoetVLDkrfuk5l77SZN+00od8z9l/IOtpfvbi0v/txZ8ru2AxPjxjhsvUiFNKmyYOHkdVnuUgFIES5rO8t4mNHhIkD2TUL7KnsNAZEgTlwa9GgPKSnRIpFAdQ9YYYggLuMAE8YnTuCJj23g2X5sNF2AZEeO0reUIX0QpjkTyg3uGSD9KYEKkOw+/GVIZEmwp49fZ8tAFlWTfOp3k3enDpUuHfjLjx/UyM5aiph6bcVyW/CYV0gTcX8Y+mtF0xPW5AhM+52/DTUzYyOGstpUmOyy+FldEhjTJvnn1jJCCJQQ2BloYYADgUiJk93PZyIpi8dnNavpwUbz7/TbkGZAxszSJApIk/G2v0W/Dpcca5fVYMZwTD5vNrEJODRs2NK8lRhpexnq1LJkzQ2bOW1r6v8IAGX0E5fxWWOnprGMzf+CNUmXvw6TBOedLx+GfycrExTNuqORhUiuvlWCqpAlsKzoWWIsKIE2uk9AQ3hI9GThHJiHkeXHv4B65RBDVNDz83AREwWQSEbcj/A0Dtis1CR6/IL4L2/0m1QC41W4iBsbNsQJhu2FZEFwnlkV1BVIlkkw88MnAd1NZwvuxQnNdgvfz7FHS+74u0v2Rh6T9dVdJq4eGyNwcFIGsWDRL3ntvmixYljktE/dlnSl+I7pIYRWmhZ8myC0n7SmbH3iZjFi4/p7YdmmMm/KswiCkSXgKGQ/jhPWlogDCTYxTrGqUHCTScMeR5xUDIkGaxIIgECxLmxghAYQsh6Ay1hjklGvQMIEKHgYDUqFUkEr23AtE7szMTAiUzJEwIC5Kk2USEySdyJh6u8akApJozPycC4kIkke5wOIJfaT5RU2k04AxMuOLeTL5qVZSveJRctuwuZI1AdRPM+XFbnfKnfd1l24db5RLG10vT09Kv6u997dBpZBJhZbIHzK5a3Npet8Q+SohXCAJSNKScVNeC0AQhDQByVFef+6550ai6xGkiSHDOfFcehNeTEZ+zbbjhEiQJq4Ng5mbQDba2xUGF4rKA0rQcgn0ZhAX54AbnCqCkiZgUDFDo2nDksSlzoZ0CEK21hRtydK2ppJgxfQB0vjYKtKwyxixaac1s1+S8/fdXk6683Xx9gCiMoTS06CriK75Zrx0ueJcuaLzczJl7iJZMm+M3HF6JalyWS+ZnUYzcLK4Xis8G8tQ/Pnzd/LDilUmAYSigdCLHTfJJEteBCVNEkpcAy4xCax8A2UEKg9KnK0HhHcDgZJY45nwlhTHDZEgTQgLoqRlvh10WAfovsjEMcAYNLkErg8DAbIJ0gIsHdLkQSO2hlvjXTIgG2Cw0hmKTD11zpkuu7AOKz+S+8+vJLsfdYOMX7q+9OWHSX2l7g4V5Li2r4hXdEWChd+lfv36iT0p4LeZ8kjjo6XKWXfJ5KWJfaWf+uI1lWW7Kk1lWMCoA56DN96b6VIiTEquBzBlyhQT/yakgiudCoKSJkC7ybNAxjobywNnAu4tzwqFJ0xKTIzI5JAh4eV4n+M4InIxTbvwPI2HEX7jLnODiG3mCsyWtAGDxFKVn1ikQ5qAkkwImnAEEqJsgkmIeCiDGPkWgfvMsFpmPt1CKm6zk1zcd0apg7oeswa1lgNKtpKzuo6R9Z0V09FprpKJj1wq++5cRW5/w0Nuv8yUPhftLhUq/0cGf5rYlwKQv2BZcg7co1QJzQuSkxAtYSIqe5C9cV0WjBs8JEiTWHyqSIc0Ac8F1iahq2RypjDAb0BME5UAoTOSlXT/Ih8Q1WKLbCIyMU2ywJSN2WoXstJovphhMflxBXKFnj17mu8kNBAU6ZImYJAx4OjFmUlDj2SgqorYKQObuFjaWD5R2p+2p5TseZEMmv29/L5qpaz87Xf5Y8U8GdT2GCnZ9HBpP3hD68fKUlLVaf72+UBpXHlL2f2sHjLHk1T668uxcu2hJbJtrbYyLsWwJs1w0cPy/YR1UtWwYkUymTGJse4+TWKQ0TBp81lYUd4kGx352R+0Wi1d0sSqo6sWxInAPF+w4nbOo3LlykaGF/d2cF5EgjTJbFrZAgF19F+2XT5JEawxhO+5AJ9PUwUsWx62oMiENAnq23ZgqS6JERR0nMF1YnvmmWcSe4Nh0Wt3yTE7lMiOJ7WU7v2el+cG9Jf+z70gzz56p5xdcVPZotR1HjxnwxgW8VQecGq5y8dyGXtfQ9m5ZAdp0neSLF25Qn7++RdZ8esymTmysxyxyaZSrUU/meuWhPuASZZYKr8pCoSyJiPCJMQ4cTdRNdBIAzcbj4P3ezcSH96epsShiUljbQVtrEGhA58ZlDQBnfxpiEEJY9A1q7IFxPYQJr8VFn2xIRKkySzVqVMno3UkRmSBtYJ7xwBjgbKNGylkDktaqT3cGyMT0gQ0vIW0CUPkagDSk5NyNzL1WJ/BsEReuvVk2bpkb7n8gf4y/I1RMvz14TLyjSHSp1092aJkczn+pudksXNrcB9TVQCs+fYtubX2TlKy9dHS8u5HS628x6XPY0/Ik4/3kNbnHSQV/l5Rruk3vVw9KGPHVkmxxrz7/fyNLIbfg/6VkCrWI4lG3pNsIz6MtU6ikA7sbFZDzPfhEdn9ZW3IzPjXkno6pAlsso++m7l4JsoD2XKIO9+NwfOFyMU0AXIfXBjiJnbgIu7O9gChFBErlgcnFU2mHzIlTeCtM85VAB2XinJU3CrinSlj2TvS8YxdpGTvxjJ8rndZ1u9k0NWVpMJuteTBtzOrRPp61H1SY+sS+eclXWTw+Eny7oS3ZfyEd2XMoK5yeqmFu1XVK2RQot47GXCpbQd0Gp/4xdaIQWKp8bDbpUlS2SBNv/2ZbumSJpMr/RnQbuZj1VLCHTTtINYb54RPMkSKNIkn4bqgd2NQ0cEdVwCLMxtSES9IOEGWfE8murJskCaETQyOh9ObaMg2cEOxaqlIwkpJCXOGylVVNpEdG3ST6Z5Mz48fPCon7riNHHt9qZWZUU5ihbzd8yLZoWQ3aTpgWmLfWiwe1Ub2+/sucvqdo6QsuThESEcs7gMeS1lJEo5RDADZWLecMcdYcJunuBsNp1nLh8oX/n744YeNqD3oZnsspEuagDJFJkDCWqla9IrsIDKkSWyR2ZPBRO0qPfty2f2Zmna0kpQyZrKwfTZIEyBqJylERj1dqzcVIEGiOznXjr6wXHz+qjQ9fFs5tOULsq6aesUc6dX4CNmvxrUyYmHybCmeQfm/7SJ5tX1NqbDNSfLIeE9V1YpPpMtpe8rO1ZvL0IXJSZAJFQuaCQf5Vjrib0iHLDld1Fn/BqkbEiV6lxK74/6ysY94O8m1TJZfySSmaYG0zIau0o1VK9JDZEiTYDp1q8Tcch3gxv1neV0y9Okkf7zIFmkC+zDlus4YTSxZT76L8rcy5Su/TpUHGh4ilc97SD78cYUs/+lrGf1IczmlTlPpPy15VhrXDXKmEqdsfCtDbztRttv3Ahk404ZffpOpT1wplQ+qKXe8tmBdFyEXyMMI4WBxIcfJZPLzArLHBYVIqfBhWQrCRfY3o6yRHgTpIt3suQuqvoi1Qu5xr/eOEiIZ08wlsESaNWtmLC1kJZkim6SJ24ibicTKmxDLBUiIUIPNuUPWybPMf8mCUQ/JJWc0kKvv6i7dOrWSa27uKm/OKbuHp9Vp4j6WjT/lkxeul8Mq1pS7hnwmS5cukk9GPiJN6p4hbQZMLaVPf9C4BH0kWW3KT3MNfh+0wlieNCvOBNkiTYDHxGdFse9mXFF0pIlshEEG2SVrrPDnmr/kz9WpWS3ZJE2ASJrPY62kXMeqsJbsMslMJGXpGX/5eqa8M+4t+WDOElmZwk9j+2mmJG5f9rH0bXOpnH/lLfJg93vl5la3yxNj524gorcg8QBpQV7IxIKIyjMBiTSuh/rvTD2hbJImyhPCWVjcUeu7GVcUFWmS/KlWrZrJOiZvC/aTfDjyBRkweKqkUtuQbdJEswrRkKwJY8leEmx2dUQSHUE6buMOE94gc03pHAk1mkkTiyZGy2emKm6XNSvkq5kfyPvT58vyJKRMGIHMP5+LRIvGEWGAPqU0VWHckHTKFNkkTYAEyJZy5ku7WUwoGtIkTmW7apfVkOOvHz+UTnX2l33O7CxTUsjHZJs0AZ+Fi04MzW8FzGyDQgIqrrgO3Ony1q8m1kfWmYefWmivGBzBNwkTCJglOfx6kqYDJER2KWVi0VmrqS8HhHNQGvC9rPWUDWSbNBnbJDT5TPoOKHKLoiFNROTUslMja6uNNsZq+Wr0vVJ901IC2LG2dBtbft1eLkiTBxXxNZ/bqlWrUDrGUJtNXIzvrFOnzgZrvlhg6VHqaqVaZJGxJBF9MxGhj4R8bcLktNNOM9pIrFey3CRUiMF169bNVCql2n+ReCKfzWfSkDnMvpIss0s1FdeUreKDbJMmYEwzgTHZeruEKbKPoiBNSIg1drCIqPdOil/mysudz5bDqx4n+5VsKTVuflG+LkeDmAvSBHR5gryoVkFPGAaI8dr2eOhGkeBYEDvjGL8h1UVUtqBCcJfYgCRx2SkcIDOP1UnCyXarshuJOPoMQLpl1S7j6tOggvfQVAX3PywwWdEliWvOZqgkF6QJ6BjP52Ll51K2VuwoCtIkccBgguCSVxWtkSWTn5SrL7lenhoxSFoeWiIV9m8kL31SdhfuXJEmsI0RqDMmHhsGSD6xmBzXhFWO1ULs0hIX15uqhcjiYpAjbjqfSdJm3LhxJmEBURK7JftNPI5rdBMZyNDIWPO9HA+7JZpNGkL82ezekyvS5BxpoQjJq3Yzd4g9adJYgZI5gvhldjP/Y6mM6NJIzmk3WlavWSqD2taUv5VsLec/+o6UJbHPJWniDiOi5vOpPgkLfK+N41EnzTVC3nSBSrXFGhYnBMmGNeqnoSTpRVEDaych7Meqxv0HJDSseBsvIezGEFj66DFxzbMt/8oVaQIapVD1RUmpX4hFkTliT5o2Tkd9d1n4dcFIad3wQuk9Y+3D/f34HlJ71xLZ7Lh2Mumb5BqbXJImgFSIVRE/DLPOGGkPRG2TPFQqBWniizqBSp2WLVsm9iQH1v/YsWMNSXGdeAa26xWZ/VTXX8omiCXz/UG6+KeKXJImIG5MhRThkWKsDc81Yk2axAKxFHjgy17s6g+Z+viVckLDe2TyoiWlD+kS+XbucGl96j9KB/eBcvPrXyStSsk1aQKqXXgIWO0wjKSQF3w3NdlY6tRNpwrkQPwu6E1TBRadretmo09l0LZr2QCxWuK2JH+wOLONXJMm52wbMIcVDy8mxJY0edjoqo2lVK62bvlU6VC/qtS67BZ5oHSWvv/+B6Xbww/ITedWl+03KZF9L+4rc3/zn7HDIE1AXI3vKW952FwAlxnSREBN1jsVBO/cvrZhC9lx3lerVq2c9h5IBkIGlnBYvykXyDVpAtQKtAIkoZdqE2ZFaogtaXbv3t0MTGqfywviLxp+s9Q9u628NG6CTJw00Yi13530gXwwpqdceMQOUrJNDemZpM46LNIkIUPShIxzPtxVrEx6KJK0wfosD1g4/C7IjlIBmXpLmLQBzJdshmUt6NRO/DabyR8vwiBNYJN3999/f2KPIhuIJWlCYCR/aFxMTLBMrFkgfS5vINc+6xcv/E3GdTxTdi61NqvdPFL8RBxhkSagkQffla/mr3SeQgdIRhytZVlAN4gsKZU1lyAPFoHj2ojDhR2CsCBRSFyVpZXRZ+YKYZEmRQqshMBkm9myxQovYkeaSGboAM+gxGooD9+O6SCn1L5G3rCLWDv468MeUmvPClKyaz3pP2vj9hFhkiZxWciFZEk2yvnSATXlNBWBOOlEnimw6u26UCRdcmXdlQcSJm3atDHnwYSQrY5JfgiLNAGhFb6L2HIur6mYEDvSpKM08hWyrsSnkuKvH2Tq0O5yYZVdZLOd/i0tHxggkxdu2ItxxZdT5KW7zpUDtiMxsYnse1Jz6T30Q/GmJsIkTYCWke8j7pYvATOZcSwymmagxUz3YSRjjlXH9WCV5svCBJwLFhnhhFzXb4dJmtwb4uEkEsPoZVAMiBVp0lOQTDnVJ+gDy8bv8tM3X8jHU6fJ9I8+lk/nLpQfV26Y7Fm9cpl8/cUsI/WZMWO6TJ06Q+Z9s6z0nesRNmliEVlLujwZVS5BzBHxOw8jFlpQCxHhPveJxiSsz5RO8+BsAe0pZMm5cF65RpikCXDNSQrhpbDqqyIzxIo0bW9BxNJhuSJhkyYg9kZShniVt9QxbDCZ0P2H66cnp9fypd4c2ZFbZglY2AxvgGw8PU3zrSWk8TXkTyFBGOMmbNIEhBz4ThKj6qZnhtiQJg05yOySgS2vS082kQ/SBDTe5UFnNc18xQEBVScs1ctvwLlYXSXuLnFP75rgPKy4iNwndJDeJXHzBXqKci5U0IR1D/NBmljT9ABAtzxixIjEXkU6iAVpUlFCc1ge0v79+yf2hoN8kSYPQf369c13Y7nlE7h8LILHuSDAx8ok7snfVtyO+029OfeIOGZUHlwIjHPi3MJCPkgT0O8U6546/nwUDcQFsSBN293lvPPOC93VyxdpAprPskYMDTHyvUYMDUVscw0mMJQL/L9JkybmOIkeLGMSSPnK/LtAAM45UtuefLmP7CNfpEk/ANaD57tpPagllumh4EmTmBmSFdyOMNuGWeSTNIHtSEQWu8wF0kIAagU0pJyPXVcc150adjLthE5oKBEF0IquatWqxvLKZAnndJAv0gTz5883q76yTDaL3ymCo+BJ0/Z/pKt3PpBv0qSJBmREhyBqpsMACR/cO3eDNLF4bWcm3F4sYTK3xNNYEoP4K7XR3vehP03esi83uPvuu805Mn7CRj5JExBX5vvpu1l2TwaFHwqaNHkI0dYxc+arvjbfpAkIT9CV/tRTTy1bm5oFYM1eeeWVJiQAWXu36tWPkpo1Tyj9fzXzm7BVqLD2XyqJatasaSRh3vfwNw9vmW37sgw8EpZwZonhfJSk5ps0IUp6AjCpRSEZV2goWNLEYrGJkHwmFUh0cA75LFNDFG7Jm7V7cgm+i7gk30VDFDaaa7CdeMLxZmXEWrVONFKkrbfeVvbYax9p0KC+iRt6X1u7dm2j8+RzSAyFtYQFcTySVXxvttYvCop8kybgu1kvnequIC3/FAVMmgiiGXgIvfNZScL3Y0WF3VXcBTX2LGrGsrasMJkrMFnRMg2hNG76+u1nWThjhHRodKo0aHqH9H6sp7S7rrncdM/TMmvpMue1azey7HQaJ74WVoMO1BVYWGEskZwMJMcYu5MmTUrsyQ+Ig3Me9A5V7WbqKEjSRFtHY170dWG6dX6AsEkqRGHQ2cXYIKJcnQ+kyWqQJFE2xkoZeO0Jcv4944QVf9YsGCU3nX+GtBo4f+1hH9CJB4snDNJEpoUlTO1+truxBwGNVwgp5buJBooBfg9UDeVX0CksCo40kU1cffXVhhyo5FCsBwRO/0R6iA4ePDixN7uwpMlDvzF+l5dvrCXn3jlMFpdankumvizXnltfrn/Gv2MQ58u9DIM0STS1a9fOjBsajahltRZ0rqIVHuQZpuyqkFFwpEnDCpv0CGuxsUIConLcT9b2wf3NNsomzVXy8g0nyilN75chI4bJgy3rSfXaLWVokqXbwyRNXGHCKFjI+da0Rg3NmjUzkwnrQinKR0GRJt1nsKTIfKo74Q8sKtviLBfr25Rrad5QS85s84x89NksmfhaL2nR4Axp2m2MbFyBHh5pImsihsnicKn09yw20PuUCYV4eD60zoWGgiFNsp49evQwZIC2Lp9dcaIOLHCIjZgv/SqzibJJc7W8UuqeX/zgu6X/A0ukf+Mj5ZBzHhS/yHNYpEmWnHFDrFddUH+QIOM3olcA90WRHAVDmiR8WN2wSpUq2t6qHDDBPP/88+YhQIqUzbV2ykoE/br4PelQr6JUa9hOnh70ijzV/VZpcklzefiNBeJXq0Rcke5IuSRNxsoBBxxgFmzLZ0eoqAOipActzVRoBqNIjoIgTZI/CKDJ8uVahxgXIEKnFpwekSyJmy1Y0kS9wHd4txXLFsnsqe/J5CnTZfann8kn06bItNlfyS9/rJE/ndea15dafUi2ckWaeCOtW7c2k0c2uszHHWhlIU30s59//nlir8JFQZDm0KFDzcBHzK6uQ+og+WHbniHTygb4/SFM7gfWm3erePAhcliVqnJElcOkcimxVj7s8NLXVpZDDt7wdea1FSsaC5DMLf/mQujN9TNpIKbXcsHygYfCImzcW+Li/K3YGJEgzbJuDuWRLJBG5UK5i6QpNgKyLBr+ZmsxNizE5s2bmzJKSiDT3ahF519KKRF7Z4vULdDOkjSk7h1ZjSI1EM5AfoRsjSbSio2RV9Kkywo3hrZhxODIiLubbf5AD0C60fi9Rjf/jRZs1KVjafIbsvSu3+vCbNocFnr37m2umcbIimBgyQ8awFD6muv1kgoReSVN6+bplt+NcrpCA/0G6IfpB6wlJDRk+LE4U0U+XXjiu1jxYYKYb7IGL3bN9PKWai5G5JU0iZ8gVCf4jEXJmtdsrPFDgoCFt0j+tGjRwuyzx/kbTRk3tVGjRuv233rrresaV9Bjk5pae8wet80acPm9x9q2bWu693CMdmbue9nI3HMct889xvnZXpL0aGzatOlGx5FzcJx4nvcYG+fG+zhOAsd7jJ6ZJF84xsqC3mO33367EbJzjNid9xi/IWsJ8RvyO3EOXCcWBK/nenhd2P0k0wUPOfIhkjr0T8X15vrxVLwbi6Rxfbj/LD7nHvfb2rdvb+4Pv5Hf8VxunTt3lsaNGxuRud/xXG2EWRgXnTp12mA/5bh16tQxvyGTD7+N9zjbhAkTEnel+JBX0mQWI1APYbrAraRGmIHkApcSMqhXr95GfRiZISHhZGueI3HhYRswYEBiz3owODgfv0wrcVeaVJTVnINlJxhol112WWLPhmBRK2JFft11sJqIPdK01wXW0rHHHmva4LkdaehNScs1fg+3qez48eMNuTRs2HADXWuDBg0MQRdarI9rgAj5jXXL78ZzVKzIG2nSMJfKHjKnbkwNPR37kaK4BIUUAgsJKxRS8AIS4IZCCn6uFi4dx1mOwXVL6M3JMYLgEJELG1vFKvDD4sWLjfWLlerXW3PIkCHm/ZR/IqHygnJHOgdRseInvcEa5L00WnaTZlhaHMNa8E4gCxYsMJ9J2zVvNx3bHerSSy8tSCUCzS4oEyUR9eKLL8orr7xiNmrtWY2UyYPJlvit9xjW0XbbbWfuD+sB2WPcF7sEBF6K3e89bn9/Wtt5j1FdhGXKMSY17zE2vrdatbW9RfEe/I7b2CuTMfpI73E+37rJ6GK9x3gvhgXaZa7LfS+KkxNOOMG8F6/H+75BgwZJjRo1zLEOHTpscAzvD8OBcUPHffbzG+C18Hp7nbNm+fcTKAbkjTRxC7gJzzzzTGLPelg3lwHlkgTEwTHcWa/1BPHgwvJQQIAuCGhjKXLcdS3QHjIYsPT81r2GdLBOGbjJ4l5YxJwXro0LWpBhIWEB+1Xo2IcSAnSBVc0EQZbZrbW3TZgJF3jrqfnNIHc+k3ilbU4BsdM+jsmqEAc9JE/zXMINb775ZmLvenTt2tVY8h07dkzsWQ8IADJwO/zbe0+yzK9jFmOMsAfkRN8DF7ix3J8xY8Yk9qzHvHnzzETK5JUsoYKOlKVAkk3GeFNck9+47NWrlzlGF3oXXAshKpYdcY0Sxg2TC6Eetz1ez549ze/rxrkZY4w1v+ssNuSFNCFKbgwPgGvxMTgY3NxQaoa9QHwLsWFlMCC9wNKCJBiEfhImXG6OE6t0YddLZ0Z234v1ZmNkfgMXMJA4L2Q0fmV6ZS2tQDyRAQzhQ2pekBjAIuS9WAFeQN42fuuuRsk6PJwPA93btINMMq8nzleIgPg4f5r4ukkTVBhMbHgKbkMOJh6seBofuxOPvTdYon6giQXH8TTczkhW09iyZcvEnvVg3PB9jPNk3dEZN0ykxKT9JmPOic/nvrnjcvr06WYCxBBw15bnuwkR8V53dVbGGEoUrHWWWfYCrawdN97fkLAVn0V4SZEH0uRmEIPj5rjdunnAmbkZSKNHj07sXQvICLfabyDQl5DPw23363yEi88sScdxmhN4QcNeBh8WKItOuejTp4/5TsjLa9laEG/kehBp83C6wKJjWQXcL3fGx01n4uC9uDwucLn4blw7l4xtrTAE4j0vzoe4KJ85cODAxN61pIIbB7HnM0ucLgjLkA0nRuuGP5h4WYmUa3YbchBqqVu3riEJ3EwvaE7BBA1J+P0mdlyh8nBjyWiGsSJpoOwn2cJi4/6QXEo2biB4zsvPguXzGTdMqK4+2VbIce5+Eznxer6bseUtoYX07cTjGheML8JaWL3I/yz4jTgHdNLaHWotQiVNBo/tFu0mW7ihuFccI8Prwi7Ty2DxWhnceKxS92Z7weDhvf369UvsWQvvjOzXmxOCxSX3e1AtrJXKLOw+HLh+NInguEv0gPJGjvEa1+LmIcWiRi/nVstA7lTVEHdyV3e0ZArJW/DgEI/DlYvK8rlBgFuOh8B1ueuTM27sxEbzDzdOiwvLMTdxwftQEWCBDhs2LLF3PThOBRqW4rPPPpvYuxYcsyqMJ598MrF3PYgnM0HvvPPOSUX71oJl0uPzvGAc2e7uXJsLO5niGbmSKtY8IpbJuPHGsgFjmDADyhE3PGN7FRA2s2D8QqTs9wujFStCJU1cUcr6CI67Vt2MGTPMICP+4yZ/IC8IAmvQJQluNoSJFernlmNdQBZYsK5Lx8OCBXrKKadsRFp8ln1QIUZ3YAMeCOJGWBs8KC74fJISWDruwm9oCYlzYoG6jSR48InL8d1urIvzwErAQnHjp/ymWM18pjc+ZycjXEyXVAoBJPywkiEDN4SBBYpFhiXktjVjHBFvJF7pjik/kvACkuA4ygN3XBEqQX3gl9SD8Gx8m5i8H7g3THp77bXXRmEmgPXIuGSic5utcP3EYHkvz4wXjG8SZXw3YQfveXNeSPWwTplIvOAzSboybry/IRYrzw7E6V5nMSM00uSG2gycG4NjRsOCZNb3m7ltdtMNeM+ZM8cEuiEmP0uQ5Q1IoODuu6EABgoZROJgfkvfkixiYNK8wK+ZLyRorVS/rjDM+CQQmPHdLD/Bd5t19YsvTps2zbwPUnU7OlkFAAuXuVl+uwa6l0yxKLB60Ib6PaBRBwkUHlpI07UIGTdoDSECP4KCEJlcXPkZ94bfg4SYX2MKrHxIjXvgWmRM4MQgIU2/xeC4PxA1cUO/7lKcM5pM7pNfIxVrKTKm3YQlEx5eGO/FzXaBQcE1YZS444bEGe/zm8Bt4tXr/TEBE+7CkNH10TdEqKTJDM1AcV0K4lDcNL8ZbeLEieYY5OfebLKAkGayNc+tHAfLzIVNHDEIXeuLwY6FwXGkG36ASLFQzzzzTN+Hw1p3fDcPihe4yMTfiKW5lhPXyHdD5n7hBqwErKrhw4cn9qwHDwbaV5sRZfEya/W4oYlCgbX4cEXdTK+dQHCz3XtgNbOEbtywiSWJZAkxK/PxO27VGyRH3M+FbCE8CDWZ+JukEBMA58z9cWHHDYoKd9zwLEDITMbuRM5n0WiZGKw3lg2YXCFSv+w354mnxnHvc2mTP66UTZGHRJAfmCHpqsKgcIFbxQ30C5bzEGEluiRsAbFAWm4QH/B5EKaf9cXnEeMke5ksaYLrg1vtFxxnkJI5JXbkZ8lwTUim/Boi4B4xWCFOP5eIhyXVNmokMrCWsS4KMfkDuFbW9nGvmYQfbjfhHpb48IL7jSUJObmhD+6N7QfqTsKAcA4eD+Tn/mZ4DFheTODumGI8WJkXXkSyMAjkTxWc630AFnvjfvH5bvgKCxfvAuJjsnBhY/4XXHDBRs+DNTzw9FwQYoKgvUlMwmhYrCQ487EufNQRCdIE7qztRVnHykNZ72UGdeNVXvjFMVMBFgKumxtj84Lv9ft8YqsMWjcGlw6wPrDG/eKthQS/3wnSJI6NONsFDzpWl5+MiIkIAk6mU2UyxZJz5TgAcibOmExCROEA51RWNy5ICq2uOyFy3wk1QG5+1WxcL8knJls3Ns8x4upsfo2WmSj4Tj/jAXgJHpkfxMt5+Ck6FBEiTYUiCCBSXHI/L4MJiYc/naQXkyyxcL/JlEkWTaRLWhbIdvys11TAZ0PGJHL83HbOh892E5aA34A4djYadHNtJIDQoLrhEMVaKGkqFBFBMu8jVWTyXi84D79JQ7EWSpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCEQBKmgqFQhEASpoKhUIRAEqaCoVCkTJE/h/ZPrvK7ErncgAAAABJRU5ErkJggg==)
What is the relation between speeds of points A and B in the given figure.
![](data:image/png;base64,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)
physics-General
physics-
What is the relation between velocities of points A and B in the given figure.
![](data:image/png;base64,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)
What is the relation between velocities of points A and B in the given figure.
![](data:image/png;base64,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)
physics-General
physics-
What is the relation between speeds of points A and B in the given figure.
![](data:image/png;base64,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)
What is the relation between speeds of points A and B in the given figure.
![](data:image/png;base64,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)
physics-General
physics-
Four rods each of length 1 have been hinged to form a rhombus. Vertex A is fixed to rigid support vertex C is being moved along the x-axis with a constant velocity
as shown in the figure. The rate at which vertex B is approaching the x-axis at the moment the rhombus is in the form of a square is
![](data:image/png;base64,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)
Four rods each of length 1 have been hinged to form a rhombus. Vertex A is fixed to rigid support vertex C is being moved along the x-axis with a constant velocity
as shown in the figure. The rate at which vertex B is approaching the x-axis at the moment the rhombus is in the form of a square is
![](data:image/png;base64,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)
physics-General
physics-
What is the relation between velocities of points A and B in the given figure.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASAAAACPCAYAAABavgYPAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADZCSURBVHhe7Z0FeFRHF4YDlOJFUihe4C/F3R1KcHd3d4cAIbgWJzgEC55A0EJxK24haLHgwSFIguT77ze7s7lZEkhIdjeUeZ/nPrBzZe/d7Hx75sw5Z+ygUCgUNkIJkEKhsBlKgBQKhc1QAqRQKGyGEiCFQmEzlAApFAqbYXMBev/+PUaNGoVhw4bh2bNnxlaFQvE9YFMB+vjxI9asWQM7OzuxbdiwwbhHoVB8D9hMgLy8vNCyZUuT+ESLFg179+417lUoFN8DVhegJ0+eiOFWkiRJhPBky5YNMWPGFAJ0/fp141EKheJ7wGoC9ObNG7i5uSFLlixCeJIlSwYXFxdcvHgRceLEEW3//vuv8WiFQvE9YBUB2rdvH6pWrWoaanXs2BGXL18W+54+fYpYsWIpAVIovkOsIkDdunUTAlOxYkXs2bPH2GrAz89PCZBC8Z1iFQG6evUq3N3dxTDMHE9PT/zwww/CMlICpFB8X1jdCS05efIkmjVrJiwfbtGjR1cCpFB8Z1hdgHx8fNC7d2/Ejx9fCM9vv/0mxEcJkELx/WE1AXrw4AHGjx+PFClSCOFJnz49pk+fLpzRcePGFW23b982Hh1xrl27huPHj+Po0aPw9vYWviaFQhG1sLgABQQEYN68eciaNasQmZ9++glOTk6mmJ8XL16YpuGXLFki2r4WDut69uyJEiVKIGXKlIgXL54Qt8SJEyN37txo2LCh8EW9ffvWeIZCobAlFhUgxvjkz59fiAuDDTt06IDz588b9xq4efMmYseOLY7h1qhRI5w5c8a4N2ycO3dOnBcjRgyTyOXIkQPly5dHlSpVUKhQISFI8j1y5cqF1atXIzAw0HgFhUJhCywqQPTpZM+eHZUqVQoxzWLz5s1wcHAQosCZMBmkmDBhQgwePBj37983Hhk6ixcvRvLkycV5tHxmzpwpRM5cXHitdevWoUmTJkIMeXynTp3w6NEj4xEKhcLaWHwIxo5vPuQ5e/assFgoAtw4BU9ROHXqFObPn2+yVuigXrhwYYjT92Tq1KniOA61pkyZIoZzYYFiWKRIEXFunTp1RDCkQqGwPlZzQhPGAw0cONA05CpatKiwWMyd0ByWMXhRWioMYDS3oJjWwX1M6TAPbgwLtHxq1KghrtG0aVNRFkShUFgXqwjQq1evMHHiRPz666+iw6dJkwaTJ08WnZ5O6tAioQ8cOICaNWuKffTvtG/fHrdu3cKNGzfEbFqCBAm+SnwkTIwtVaqUuP7cuXONrQqFwlpYXIA4DU6HMDs5LZ8ePXrg7t27Yh9nwigqHIKFFgnt7++PFStWmGbR0qZNa3Jsz5o1y3jU13P69GkkSpRIXFdl4ysU1sUqAkQnceXKlXH48GHR9vLlS4wbNw5JkyYVQsLtS4GIjx8/xogRI/DLL7+I4zlso38oMhg0aJC45owZM4wtCoXCGlhlCCYz34m+JAeFqU+fPkJMwpoLxjgfKVrcateuLeJ/IgLDBWidcbr+9evXxlaFQmFprOaEpj+H0/EUDVo7bdu2FUMezlxJp/SXBIhT63Xr1hWzXrRW5BQ+z3d0dBRpHl8D/Uryvvh/hUJhHSwuQPSxtGrVSnRwbqwLtHv3buNe4Pnz52Eux8Ep/UyZMok0DkIH9pw5c5AhQwZxPqft6Uxme3hg2oa8P1dXV2OrQqGwNBYXoObNm4uOTUc0h1/6mB5Ou/ft21cMv8IiQBcuXBB+I0Yy0yckuXPnDgYMGGCazv/jjz+EyIV1ap2CJf1AHB5ylk2hUFgeiwvQjh07hMNZH3FMJzTjf9KlSyc6PbewZMMz5SJVqlRCsOgLMoeBjJzN4vUYYBgef86qVatM98KhHS0zhUJhWazmA5IwHaJgwYKiozPlgvlhTEYNixOa+znM4rkMVNTDfUytYJkPXiu8M2T0KfG6LJLPfzls5LJBCoXCclhNgDgdX69ePdG5uTVo0EDkbDENIqxF6Wk5lSlTRhwrLSA6sZmSIaf08+bNi/Xr14v4ofDQpUsXcf62bdtM9au5eodCobAcFhcgpl/06tXL5GguWbJksAUIHz58GK6a0K1btxbHcvr+0KFDKF26tHjNkhuME/qavC6eQ0c2h4EUNPqA5Otly5YZj1IoFJGNRQWIBcHos6FAsEPPnj37k4TR8Balp/DwWF6X0/H8P60pJrh+LX/99Ze4DnPP6NAmFDcOEenYjki6h0KhCB2LChBnuRgB3bVrV1P6hR5ZrIx5XmHxATGrXiaQcuOUPJd2jgicKatVq5a4HoVQChBh8TKWCaF46oMpFQpF5GDxIVho1Qf//vtvlC1b1iQmX5oF279/v5hel8dzYxR0RFmwYIEpDIABjXoBIpMmTRL7ChQoEKb6RAqFIuxYzQktYSwPZ5hkp2dJjs8ty3Pv3j3069cPP/74ozie1Q75r9wYAf21lQ23b98ufEfyWuYWEOG1O3fuLPbTiR7eIEeFQhE6VhMgduwhQ4aYBCRnzpwiy51WhfTl6AWIHZ8O4MyZM4t9//vf/8Rwq127duJ1hQoVULx4cfF/zoiFN26H4QCsJUQfD6sv8jrcQkrFoN+K5V25nwGPCoUicrC4ANHJzBgbGb9jb2+PMWPGwNfXV+znLJi0bqT1wYDC6tWrizZaRpxFY5Ey0r17d9HOwvb0KzEqmq+LFSuGnTt3fnH6nbNy8hp8X5m6QWuIzujQhoy0xPLkySPOozNdoVBEHIsLUMuWLUWnpY+HtX8uXbpk3GOYJeNKFdzPYRjLdTBqWqZUMOZn165dxqMNyHgd1hUiTECV6R7cWGCMcUH0MTFLngXumQi7dOlScS/S2qIFtnXrVnGNsMJrsRwI73Xjxo3GVoVC8bVYXIBoYdBZzJQMCYc5XJxQBiByY6eWqRlMp6DVFFItaHMBknBIJWez5EanshQcudFi4vpkXKfsa2CgIqOtOXyLaBkQheJ7x+ICxHSGDx8+iP/Tl0JhkbFB9O+MHj1alFbla4oQUzOYnR4aoQkQ4VCKw7dFixaJ46pVqybCAFjzmSVhmaDKIV9EYSVG3gOHZF9bAkShUFjRCU0LhTNe7Lh0RNOZy4x2+mykJUSn9Jf4nAB9LUzx4HQ8S3GwfnVY4Mwc74NpG2rVVYXi67CoADHI759//jEVludGfw2tFAnrBdHy4b6wLM1sCQHi7Ju8v7AWJKNwsjgaz+E0vUKhCD8WFSCKj7RumAOmd/rS+uHKGHJRwbCU4yCWECBWZuQ1KYTmcUCfg8/A5+K5dJ4rFIrwYVEBYg0gWgf0v7x7987YCqxcudK0sgVnvCg+36IAEaZoMEaJ4QJ8LoVCEXas5gMinA7nWu3s7Nw6duwoptnDWo6DRDUBInRuc2aMvi2mjCgUirBhFQHiqhNSOLgxB4xxOoRT7WEtSk+iig/InCVLlojzWdBMrS+mUIQNiwvQtGnTTGt5MfiPHVU/HOMQRi7BbCsB+ppZsJAYNWqUuDf6hbjqqkKh+DwWFyCWSWW1wpEjRwarC82YIHZ6+k/YaW3pA4osmL/GOCbeX5MmTYIJrUKh+BSLCxBniswDCzdv3mwqrcqNDtz/ggCRZ8+eiURZ3iOTXBUKRehY1QnN+B99Xej69euLnCqZ+/VfECDCxFlZ3J5WnkKhCBmrCNCVK1fQv39/U9Y7C8evXr1a7GP2uWy3lQDREc5MeOZ5hZYNH14YA8WSrkwz0efBKRSKICwuQLQAZJJp6tSpRUyQdPQyG15GE4dWkMwcSwgQS3Twmtwic2lmT09PIa6//vqrWAFEoVAEx+ICJP0h2bNnD7YaBq2C33//3dTxo0IgImtTf00c0OdgIiyvzVIgtubr6kYqFJbD4gLEwDwWIJPT0ixhIWsEcWOdZ1oJtrSAIhqI+DlYyIz1pHl9pp7Yio/3D2PKRFdc/fooA4Ui0rGaE5qzYcyAlyVZWcqCQxRWNbS1E9qSAkRYhI3hBrSw1q5da2y1LqcXdUOSOL9gzK6IlyNRKCILiwsQS6+yhGmaNGlEJ2dQIhM35QKCnLaW64J9rg6QxBICROHjNblFpg9ID9cWo9AmSpQIBw8eNLZaiQAfOFUy1GAq2mkhVPEQRVTB4gLEDHjZuZn7xbQMPSxKL2fB9GU6QsMSAkQxHDp0KIYPH/7JwomRyeLFi8W9Z8yYMUxiG1nc3eeCwsljaZ+zHWKlKYfN/35aaVKhsAUWFyB2aK6xzmluc2gJlCtXTvh/2DHDssigJQTImsgVOCpVqhTulTy+jmeY2qo8GvQdje5VM2rvHRONp+yCoUalQmFbrOYD0sO1weRaW3LjLJi5dRQS35YABeDa6QPY5OmJHYe8YPD/fkCzZs3EM7Rt29ZUrtZSvDq3BGXyl8Waa+9wfUVnxNbeN0G+jjj3Qs2JKWyPVQWIQx3OiMnkVDqip0yZYsqGZzzOl/hWBOjh2c0Y0Ko+6jdti64dmqJg5t/g0H4Crmkq9PzZM5QuXUo8B3PkLMc7uA+sgeJN/sRLvvQ9gNrpWX3yZwzeYL0hoEIRGlYRIArPwoULhe+DnY7JqQxI5NQ8gxJtXQ+IxexZGpZbxBNIA+G9YQKKZ82CZsOW4Mrdp9r13+DobIYexESrmYZ6QTevXxfVAfgslkrX+Hh/P+oXzgPnTYY11QB/rB34B6Jp75mxzjg8VEaQwsZYXIA4xKhRo4boaHQ2c+ilt3T0s2C2EiA6hHlNbmGpS/05rm0ZgwyxYqBs35UGq8PI+7seKBDDDvYOA+FjzPY4cuQIkiRJImbHIj9dIxDHFnRG/gq9cP2jsUnj1ZnlyJdQe9aEueF60nIOd4UiLFhcgLgsD2sAsS7QiRMnjK0GKE5MRqX/x5YCJOOAeB9fGwcU+OEZPMa2QsZk8eHQbS7umU00PT8zHzliah0/YwMcvx/k9zl06BCyZs0qhqVcijrSCPCBY9m0SF24PpxHj8BQZ2c4Dx2OMYO6IH+qGNrzRkfFQavx2ni4QmELbOKElnTr1s1UjCwqpGJEJBDxw5W1KBRPE5iYeeFxKcDYGsTdDU5IrL2HXaYmOHVfZ5JocFlovj+TVyMrZ+z2jrEomLM4hsxaiqWLFophHrdFS90wrV9tJIymWaQZ62L/nffGMxQK62MTAWJskH6pHm7fugCdc+sN++h2+ClvG5x4/KkfyWtBBzEDFTNfB5w3K5ZIHxRXiuU9sFxJxNcZe44pzUqg6oA1IU+3vzqJZjnia+8XDx1dg1ulCoU1sZoAMeaFK4rmyJFDiA3LVHANdxaqt7UPiO/La3L7mkjoe8fcUOTnOLBLkhdzj4eUbHUdfcsaIsHLOS6HX3ADyETr1q3FMYwRikhJ19dey+BQyAFLz4We+LXrz3qIqb1XsuK9cU0VblTYCKs4oZnzJVdFpfgwIlo6ornf1gLEUrFt2rRBu3btTCkiYecNVvYtIe7pxxSFMGT2QsydPVukn3CbNWcu5o7ogAzxNYH7MR3Gbb1hPC84+/btE2U7eB1utIRCWhv/iwQ+x/QWeZCqZH987kmenZmLjOK9EqHT/GPGVoXCulhcgBwdHU2disMufR4UKwe2b99eiJIts+EjwvsnR9EkEwU0OgrV64GRI4bByWmwiHgePMQZo4cPQJV8hsUXE+VpiiMhGDacCZRT8nTW16lTR/y/b9++xiPCxqtrBzGuaw2kTfgD4qctgI6Dp+Pg1aA63AY+4PJ+d/RrUhrJ48VG7Fg/IHHa3Og4bA7O+kZOMTaFIqxYXIAYeJgrVy6sWrVKLNVMmBnPOCC5Kio3W/qAIsL9XWORKpr2DLFywtUrhGntt5fRtXBi7Z6jodqQjSH6ZBYtWiSeSdYMoh8qd+7com3mzJmiLSx8eP0U169cwjWf27h94youXbmJp6/NHeKBePX0Pq5euQKf23fEe928dgWX/72FlwGhjA0VCgthcQGig1Vf5pRClC9fPtG5fv75ZxEXxCHYt2oB7f+zvgjsi1ugMy6EoD/Xtw5FMm1/tGSl4PlvyBaGrI8k10ojTMylQHPBQ/2S1grFfwmrOaH37t1rqo7IjQ5X1oqmD8jW9YBomTE/jXV7eD9h5wMWdzb4tvJ3Wojnn0QW+2J09Qxif/WRWxGar7dixYoiHSWk1UNoGTJGiFHa3zv823yVXywU3j2+CHfXWRgzchichw7DsGFDMHT4KEx19cD5u7r3+eiHI5uXYvK4URjqNEQbWg/D+BkLcOCiWvstolhcgPhLTucuOyG30qVLB/ul5ywYp7+5z1YCdOPGDWGFxYsXTxRICztv4NKCvpvoaDb90wzzezvGIrU2PLMv3BFnP5P3ULt2bfEZhFSOZM6cOeJ5mTdnqVpF3wpM23F2dhbDdy6HzWqTESHwQwBeProB92ENEF98P+OgzuAluPzgBQLe6/9eH/H21VN4/T0FuRLFRrqy3bHv0n28fReeHytFSFhUgPirzQJc7EBcpob1cBgZTTjzNGjQINjb24v9tvQBfX0qxges6FpQOy8Weq0wi6d5fh4dCyWEXfKicDtp7ggODusQ8b0nTJhgbAmOk5OT2E9HNR3ULVq0EBbl98jYsWPFZ8EAVq6uwsoCdNzzuxY+61XHxRUokFj7+8cpBHevz8Vg3USvyoXRaZaaNYwsLCpAjGXhdDJLscpVUWlCz5s3DxkyGIYmFCCWKrWlAOkDEcNnAQFXVnfHj9q5dSbtMrZovLmFaW2LIGHKQnDZ+eV14s+dOydK1bJsa0glSWgZyVK2cqP/bMuWLcYjvh84c/rbb78F+yzk50ErsWvXrvDw8BBLfod5me1r7iiZTLtOkpLYeO5zAnQbg+v/gd6uajgcWVjNB0TYYTgE4xeGPo+BAweK/DAOfdgWFQQo/BUR72JkzRxIkskBY5d4wGP5fHSqWwYlq7bHzithz7RiUCbvoVChQsIXpYfLW3Of+cbP8ntEWoyf25jkW7lyZVEMb/369fDx8TGeHQJX16IEBShxCXh66VOIzbmFQfXKoNfCL1fuVIQNiwsQh1xnz54Vq6DKLwetIpmYSivJ1gsT6tcF45LRdArLrVq1aqKutR7WtJb7K1WphlJ5MyC6dm7lGvXQx9EZizfswpodh1GvdnUR1ay/HpNv9Rw7dkwcw9VBaAnyHtKnTy9+xQnLgxQpUsR0f/qNfiuKkP76//WNnxWHXiF9Hp/bWJO8ZMmSGDFihBiucR1/E0qAbIbFBYiJllJguDwNf40kjP6tWrWq2GfLaXjWpeZ9SEvMfDOfndLP5uk3b6+zeGcMpVmzcnmIx4waNcpwgBGWoQ3pOLmuPDuK/IzUFrTJMr5h2Ti8T5s2LUqUKCGc2EePHg3uL1ICZDMsLkC0LmrVqiVmLmQgopeXF5o3b/7Jl8RWAiTh7BzX7tJvdHC+fBn8S0lRNT+OlR31x/FZzI/hdubMGeMRBjj8C+k4fekSd3d3U9UA/cbPMKRz/8vb9OnTha/H/LMw3yg4tLQZCLtp06bPTy4oAbIZVvUBcdq0X79+IhGVXxL6O/iFsnUcUFSHVhCn47mSLH0bXOKa/jM5o/g9wbSVLFmymISGG/2JHGI5ODiIIdauXbtEaAWDYMOEJkDCCa0EyOpYRYCY4KlPveBa8bQY+AWhKSxrQisB+jxMYaHP6GtLhnzrUHCZH8e/P/1kHJoy15DDeg6jv5prHij9iyZAiYp/QYBuwrFuafR2DW7FKr4eiwsQa0EzBohfGk4lM/aHU6kSNzc3MfxSAqT4EgzhYFE1ri7LcIVgjuSIcG8LKqbWBChWXrgd/8zKsYEX0LNaKTitUgX9IwuLCxCz3WnhMPWC6Q4S1kPWFyWLCj4gRdTGYkNO/+NolpULIyTH2L8/szLL4x1oULI0pv+j1paNLCwuQEwfOHz4sPGVIeqYwWJyypmJqZwl+1aTURX/BfywoJ0hQdrByQOh2VUn5nZCnpJtcfpVJFleCus5oVkRkTMS0g/EqN+lS5eKADHlhFbYmqfn3FHuV+1HMXoGDFl+EM9eGR3Yge/x4vEdbJ7ZBzkz5oLT6rOGdkWkYHEBYmQxV3vgyg8UDuaGMcbl4UPDWJszY7ZORlUoyM0DbmhcLBt+TpgUOYtWQONmzdGscT2ULZYPOQuWx+gVh6FK+EcuFhegnj17CsHgxsRBfRwMZy9klK8agimiBK/v48jODVg8fxamTpmC6TPnYeWGnbj6yN94gCIysbgAMc6HaQb6oloMsmvYsKFJmOiAVk5oheL7w+ICpJ8qZTQq4zhk3A+Faf78+TZfmlmhUNgGqzih/f39ReAhw+MpHizFwRUjWC6BU6tSkPRLNocGFzPksVxHS6FQfNtYXIC2bdsmUi4oGgxEZOSqvpIdM5NlnhNLtLJ+NHOquDif+UYhY1wRj2Utab4O6ThuvIYUOIVCETWxuABJX0/Tpk2DJVgyDcPFxQWZMmUS+zkM4zrpXDOMJTGKFSsm1hLTbyw9IafxU6ZMKV6bHyM37mMJkPBVOFQoFNbE4gJEq4ZZ5tIXxNwvFluXs1+cgmdQIld/2LFjh2lxPk7XM/EyceLEpo1V77hPbnyt389NnsP9jC8KqcKgQqGIGljFByRhHZbGjRubBITlJFglkXV4WFyLWcwst8nlm5lcyOBFFiyTG4dczC3jKqZcS4uv9fu5MVua/7J4FX1LLM2pUCiiJlYRIGZv02ksC34VL15c1GghHIpRfJiOQQFihDSHXxFNNORKE7yuEiCFIupicQGipZIqVSohPJwFmzVrVrBi4Rwi0QktLSAKEIdnYa7lEgpMdOU1OQRUKBRRE4sLUIcOHYR/h4XIzNe1Wr58OfLnzy/EidaRJQTo6rUbxhaFQhHVsLgA0ZfDovR6uKZV+fLlTb6g6NGjC5GKTAGqU7cuYsSIjv69e2D4sOEYNmwonIcOxagxY0VRea4vNXm2Gw6dv4XXan05hcImWNUJTSGScTzcWNFuxYoVwZzQkSVAtWrXRvyf4mOxUyNkTsD3i4dyLYdg8YrVWLt6OWb+6YwmDrmRMG4iOLQYiqO3VI0XhcLaWEWAmPnODHg5PZ49e3axSiqL1LPKHcVH74SmkzqicAXR2D8lxYPDi9AqP53fv2LS32ZlO1/fgkv74uKeUlVwxCW11LdCYVUsLkBLliwR9XvZyRmjM3LkSFMpDsJ60RQfKUCchs+VK5eIluY+82n2L208h9cvV64c4iZMirvHlqFTccYPpcW4TSGsUnp/GyqkYzkQezh5BlVsVCgUlsfiAsQhF0ttsCQrlyDWwyVpunfvLsSJQYM7d+40LbvLpVcKFiwo1hILz8ZzKGB8z0RJU+HOkSXoWIzrz4ciQDiPzoUMAY4Np+yAStxQKKyHxQWIqRBcgFAPp+G53haXUmHH50Y/EI9jACGXnfnll1+QLFmyr9p4LlM1ChX/A76nVqJD0STae/yK8VuCiuGbuLEepVOzPGxiDHT3CrUcp0KhiHys6oRmYqinp6ewUig69Am1a9fOVBOaQYNMJGUEdGRsL1/6IfDpYbTMRx9QGkz4KygJljy55YUJLQw+oLQV+8PrkZIfhcKaWE2AmGhao0YN0dm5MSWD1RGZTiHrAYWlHEe4eXEMLQvSAoqDnKVqiXpCXbp0QqsmdVAwY1Kt/QcUbzICZx+8M56gUCishcUFiCtUsniYrPnD9bn/+usv417g/PnzwgLivrAUJAs3z4+iZYGE2vUTo16vyVjv6YHVK5dh9uQRaF27DFLEj4fkGYuj78TVuOuvLCCFwppYXIA4HU5x4bLCc+fOxbt3BkuDWfFM05DF6sNaEzrcUIDEECyEaXh8xFnPEcgYl1ZZbFQevAavVNVxhcJqWFyAaO1w6l2/nDDLc5QqVUoIjxQfRkNbVoBCmwULgGuHwoZ7SVoeW++8NbYrFApLY1UntJeXF1q2bGkSngYNGmDjxo2mLHnbCBBwamZzROM9/ZALCy88M7YqviXe+r1AwJdG0B/f4AHjy/yUv8+aBLx+idf+Iec7WUWAmA/GSOgECRIIoeEsGNf3JhySMRLacgJ0zBgJnRYTQpqGxzss71ZSvP8PmZrgyGP15YwI75/fwK5N6+C+fgO2/rUN27ZtxcZ17lizcSeuPtRZl5oYeB/Yon0P1mHz1q3YvHE91npswMnr4f8BuH14KWr8UQItRq3DC2ObOVcOrsf4of3RtHpZFC5bC0Pmb4fvN7LSTuCr+zi2Z5v2Y70Ze49645n4in7E/Tv3Qu3YUYEn105g+aS+qF2nAzade2xsDY5FBYhT6jNmzEC6dOlEB2dZjqlTp4poZULxWbZsmRh+WUyAXh5Do+ysOf0rxm/2MTYaCPR/iWOrhyJjTFpkP6Pj3P34oPzQEeLDm8c4f3wXxneshKQJ4iN+vIQo09IZm/7xxsOXOnEPfIe7V07BY2YfZP85IVLlr4u5mw7B59Fr4wFhx8tjEOy171DG2uMRFGMfxIVN41CubAMs2X0cJw+4oVKGaOL71nnxiSge9/UBpz0noWqx/ChVsQYaN2mIKuVKo3jpSmjQtC6qthuLmy+jZujsk5snML1PXSTXPmc7u2xYdMzXuCc4FhWgI0eOiD806/1wgUK9H+jgwYOoXr262M8t0n1A757i3OGdcHVqisTG9/i9WG30G+yMkaNHY9jg3mhUqSiSJ4iLNFkLo6/LJjw3nqqIOAEn5iF7fH7umTF7v7nzX89FtC2eDfVGbDO+Dj+BAc9x/sQxXHnwaULxh+fn0SFffPzWdIFpVdM7++eiaumSGBGlA08DcXnDSPyeKAEq9V2Mm89f4e3bN3j56Brcp3VHOu2zjZGnK3yiqMvy43t/vHrhjR5FE8EuVm4sPR7ST4OFBYgxPpzp2r17t7EFItaH6RmsA01R4HBMBiJGqgAFPMapfVuwZP5szJm3AAsWzMfMGdMwadIkTJw4EZMmT8WseYuwdvMuXLzz0niSItK44Yk/UmgClLAY1nt9rtLAXQxpUAY9558yvo5cfE/OQ0bte1bccZM22A7i44f3Udv6eXMNfcokR4zUtXAyhBs9OL0VMpfuiCtRuoiDH8ZXT6EJUE7bCJCeBw8eYLRmeTAhlcKTMWNGUZCMSacWDURU2Ibr61BGCFBRuJ8JzTND7sCpfmn0mBe0Ykpk8nDfSCTSvlsVRu83tnwj3NuP2hntEC2FA7beD0GBHuxA5y5D4e0blX2WAZhYM6VtBYglN1h6I1u2bEJkmH4xfPhwkx+IwzRpDdFZ/V9GPvN/gRcvPicqGhEUoNd3vbF589/a0IOv/HBihzsWurphn1fQMD6Itzh38C9sPXTJlEz84vYZuM2cBMfWZfGj9t3KVLEjJk+djOkLPXHjeVCn9bvlBc/lC+Eycw7c1u3Q3i8kp+57/HtkO7YduqhZUYG4uH8Dlrtvxy1RWfg9Lh7age0Hz4Nnvr17DuvdFmLh8o24cP8NDxA8vHwYqxYvwNK1fKYwOI5fX0G/8oZSxrkq98LeT2rF+GL33wfh+0JXN8v/EQ7v2IRj1+lHe4MzezyxaOFibNx7RvsEQ+au934sXzgHM2fNx4Y9p/AyFLPw/oWDWOE6VztuHtbvPIHQHsH30j9Y6ToHM2a5YufJcxhbKw3s4uSyjQB5e3sHi/dp1aqVqUYzc7WcnJxE8iiHX9xfsmRJkYz6X9y4DHXevHlD3PetbfybspRuvXr1xAKQIRJuATopXr319caCYV1QPHsaxEpVAgvW78Ss/nWQJa3Bco6fpgTm7L0mjqXwnPnLFZ1rl0Aa+zjI1Wq2SYCe+5zA4imj0KNpacTSzsvo0Aojx47HOJdVuPqcR/lj51xHVK1cH04TtWH6xCGoUSQTfs9dGbO3y4UM3uPKgVXo2bg8MiSNizxNR2D5nNHIncTwfS3Roh/6tqmCdPbxUbDpWOw9uBKty+VDikSM7I+O9H90wuEbD3F0zWg45M0M+3j8oY2NXLUG49zTL4nQB5z3GIYMIkhW++FOXwQDXNbjtl8IkbJvfbFj6XjUK5UbSRMkRbcZW7BocH2k/yW+ONcubgpU7T4TN4L0EAh8DPeJvdCkdReMGDsaHeuWQnL7VCjZfBhO++ruLfAZNkzriyYtO2H42DHo0qAsUiRJiSKNnXD8vt76eoUtU7uidOmq6Dd2BlwmDETdciXwq31s7TtQAMtO2ECALl26JJZhpp+Ha34RJqQuWLBAFB7jhyMz38UHpbZvbtPXdgrGV1pA/q8ew3uvK8qljan9cqZA5YZdMXnuCpy6eAEe45sIMUlbZzwMI48A+N48hwUDqoh7yd5m/id+nRubBiG+tq/csL+NLeQjTi/vhzSJUqH/mnMm5/Tz8xtRPrUmLr8UgusRztp8xJO7V+Axuglia9ew/70wuo9dhIWTBqNC8RLoM9sDa0Y3FftS5K4Cp1kLse3oNTy4dQrONX/X7ikmitZqjn4jpmLL0at4cPUw+lXmjPCP6OoWltpT/ti32An5Uhvi5OzsYuB/RWph4uoDeKQvGOr/HNfP7ESPclxTLwZylmuELr2GYrH7OrgMbYU0sXluAjSfskO7ojgB26d0gEP9wfB+Jj+xN1jSrYR4nxI9F+OZ+FACsNulM8rW6Y8zj6W0B2BF7z/EcYU7z8djcdw7HJzdESns/wfnDReEJUh8dk1EDlYjjZvfNgJEKEKcjifMhKeVw5vnsGvAgAEiPYO1gJiSwfXj+/btK/bJ4mUs28HiYjyHK55OnjwZI0aMMAUv9urVS7RNnz5d5JmxrUqVKqKN12P1RbZxZVa20QktV2NlICTDAlg4n6/pl+J+nidFkcmrvIeyZcuK16zWyP0DBw4UrxnDNHToUPH+Mu2kcOHC4r3kfXGZIbbzOdjG9+QyRZwd5HM4OzuLNoo1j6OTnseNGjXKFDvFz4rvO2jQIPGanxmHsry+vDeuBivfl/fMkrds5z3L96UVyjYuAKm/Ht+H15Pnyx+IFi1amNoYUsE129jOZ+UKJ1xKO0QiNAR7iBGVtM4UMyVGb9RNTDw9gGrJtWtmaQ7vx0FS47N7MlJp95Sl9acCdGW9oxCgss5bTR3j/dNTaJU9NmLm64nbZrPYx2e2QEzt+PR1x+Ce8dECzi1Elph2+ClnCxx7Evwd/A7ORAbt+BQOA3BVZxDc2zoECbX2tNVH4bbOoPBa3QdxtPZSjhuNLV/m/tmdGNKqIpLGoJBwi4cidfti5wX9kP4jNo+uKfaX679aFw/1Dn+NqitEMnaeNrjErvhkP2rnsEfhZmOx3mMtVq1ciTVr12F6jyr4gddPVxNHH2nHPT+KBrntka/RSKwzHrdaO25m7xrienapq+KgptMffXejXKqYSFN1vNlQ7yGGOvwMux9tNAST0LdTrVo144dnJ7LimR1PKleuLNpkYOKff/4pXnMNecLa0PzSs6MfP35ctG3dulVM21eoUEG8JhwKsNPY29vj5k1DwCGn/ZMmTSqKnEmfBfdR3FilkRUUieyU9FUR1iVi8iyHGoT3QCFjpz91yjBbw87McygWEg6zuNIri+5LuFAiOzt9X/olgigQ+vMvXLgg1s7n0EbmyzGNhc/Jz0tCRz7P69atm7EFwsLk53Ps2DFjiwGuyc/70bc3adJEnM8FHsmYMWPE6/79+4vXhEsl8V74uet9PZyl5OfJz+7x45ADy0zcWI+yKbW/908UoM8FONzG4HqaAM03DMEM+GJkpTSwi58P7meDlnDCM2+0yqpdM0N9HPcNGorc2DkFabRnyNLqUwG6vG6AQYCGbDHNgvnsGifiU35rNhN+Zif4X1qGvBz2/FwWp28YYpL8zsxHpujaD1TDSZ/EGb3QBCh9NDtkazQZ+k/E9+BEIYr5u7ppg5MgLmwcip+19kI9VhtbwshHP5zbsRhtKuQUAsa/WdJ8zbDrhvwB8MeGkQxriYbuK4NH/H+4pf3wc9gYuyDO3X2n6bgLfo9vh0q9XbBiuRuWaN/7JUuWav+6Yu6cWZi1bAseah+W74HZyKod59Bjmpgw4nGLjcfN046bvXSLZol9wJll3YRlWmVM0PfewCtMrJXK9rNgtILYAemIXqmpqFx0kAXp+UFSSNjGTshfYq4f5utrCFxiBDWPoSVC6MilpcCZM32hM+7ncbSaJLRw2DZ79mxjC4R1xDb+ehOmgvA1rafXr18LIWM1RnZ8KSTSSmD1RkIhSZgwoeiMUlSkIHG1Vw4zJVzFle202iT0jbGD83wfHx9xvPSVeXh4iGMoXBROip4Uaxb1l+/LapJkyJAh4jz5+Ui46gfbad1JKPJsoxXKyQGWQ+F9UCDlGvq0aGhJ8Th+6SS8R/ljQav1i9zZgopptI4SOx+WH/+cWF1Fv5ol0W/peeNr8sAgQPFyY8WJoMjowKfeaGkUoGMREKAz89uK58jYaCqEO0jHx+f7USut1llj5MapCzQDKEALkFkToN/qjcddM9eNFKAs9SZoshnEgwN/CgHK03FRsPiy857OsNfaC/X8ggC9e4EHD5/gbdBjGgjwxZYZ3ZAxscEPVXnQOtOwSgpQx8Vmw7u3l9AxL7MNcuDC7ee4ummIdg/R0MFN+tJCxttjCJJp79HS9ZKxJSTewn2A4fvSYPI/xjbJS0yoYeNZMMnp06eDBSLS+siZM6cYbh04cEC0NWrUSDzInDlzxGv+EnOIwuqGsqNzmMBj2LFlR+eSz4wlypw5s0m4GHvEa+fOndvkKOUQkMLC0q2sysihoVyjfts2QyAchxl8TSEhLJJGsaOvSnZ67uMxtEYIRYT7uZ69vuzsnj17xD1QePW+EvmcjEciS5cuFa8pjnI1EGnp0EKSgi2tlwkTJojXFGwKOz8f/ZprvE+um08HP8udEDr9adHw+WVclhwyys+bMG6LbXQ2M45LsmbNGtHO4RwXEvgir/9Bw0z80v+Kybs+szbbmyNo/UdxjN2m/4JaVoDOr+guZsYSFuuNm2bpGIEvD6N+Ou09kpXH6ZuG57SJAD07rv2ozYf3AzOFFHzEptGGYVXaco4wfLoBoQtQwHX0KKj9LX4qifOP3uPOttHCCsvT1tUoXsHxf/saH7TnvLp1rLAUszWbjZD+4gHa9+PDez9NgAw/nqX6uhv3SPQCpP90grCaAJkjLQYOfwgL0vM1/SfsLCzX0axZM9HGYQKhGNA3w2EWxYnwl1wO71xdXUUbOzGtKratXm34Q1Nw6ENim1wWet68eeI1LSXCoSLTRbhGmby+XMueQ0NCsWQnptjJYQiHLzyGlpKEnZdDMrYz3USyfft20UYri1YONw7vKFSHDx8WxzAeiqLCoSKtR0LR4PtSRKSgSkGiH0hCsZJ1tvX3M378eNHGcwiHsXxN/5T041C86YvjsO2ff4J+zfj34I8F21nJIGw8xLia9CNFR8PpwUvy6nm8+08Uyl8D2+7pf+ofYNQXBCj4EGxqqAJ0Zb1BgByct5oE6On5VSgUT7tOgjxYdiF46keg7yYUjaN17BojTT4gKUAZ60+IPAHq9QUB8juJHnVrYcqekENTfPfNQErtOhlqjYfBTpMCZIdOS8wslhf/oNovdkhcqrfwR727uAaFEmnPnzg3Ju8Inp6El2cwcdxknNJ+D95d24jiP2vH/ZQN47aaWUtvvDF5wjScfeCH00s7Cr+Zfb428ArmEgzA1LqpYRczB5aeNNylOTYRIBYp468zhxL0K7CzSuf0+vXrxTEc/tCqyZIli8lX07VrV3EMrSDJhg0bRBvPl7/YvAbb6JylQJH58+eLNq4ZTx49eiSGehyCyIUT6RjmMbLjynugQHDox2vJYQitFkKLh1YahzEMqpRQdHgcHc/SqqE/hRYE26XPi4sk8rV+qMS0FbbRuU0oxmXKlBFttEQIhYCv6TPS+2noo+Iwlvl30hqkRURBo4UmP2+GBFD09ILCYSKvaT6ck+LFH4TwcGPbOKSPbYdY6SrD8/ynax7dP+2JeoWyos4wT82Q1/MEoytpX9y4ebDmrE4gXl9Gm+xah0jfAKd0Oat39k0TApS1jeEHSM+19f2EpVBm8BZji8b7Z3DtZpgYKNB+PvSu3HOu7ZAgXjqM3hpktb27sBhZNAHKUHfCJz6gN0fmIAMFqMGkYNd5emSKEKC8nZcFe7Z/t4wwCpC5tWCG/wV0K5UcyfN3wBEf8/y411jlyIkZe/Rfa/ihZGffOMpQcbTyUN2zalxa2R0JYtijt9sZgyP+wwNMb51PHPtj6gJwdFmF/UdP4OD2NejTsAKaO6/U/gIagY8wu30hcdwPKfKg37QV2HfkBA79vRYDmlRC00HLxDP7+2xHtXQsOBgHlfotwz2j0r+9exit8zEUICVGbb5oCJH4+Aiek3qhZZtBOHjbzzYCxJkuPhT9F0QOQWjJcFjFji5nvugnIidOnBAdhpYHo6oJfTYcTvE4rqhBODxgp2RsEa0qQrFhh+RQSjqROavE8/r06SNe0x/C/fQv8Xh2UgcHB3GMtKLon+FrioEUu7p164o2vZ+JQ00OyXi/0pKgZcKhDo/lc/I1HeIcKkkhJhyqUvQ4IycFTYoZrTqKES0WObNGH5ae+vXri3ZadxIO49gm/WMc+vE1ZwZ5PcLhHAWKCwVcuxb0aycFlvukVRh23mLv7B7I/FNsJEmTF826Dca0WbMxc+p49GpbH/mzZkH17i7Ql2D6EOCHu5c2oFpaTWjsEqD3/L24/+QlXvs9wZX985D3R7b/jol/n8eLV2/w6sk9rBtreOY4eVrj0M37eKs9UuD7N7jvcxEubQwd7aeiXXDo0nXce/xCdMJ3z7wwqG5+xI6TEOU7jMD6nfvguWAMyhfIhw5TtuCVMKU+ate/i/1zOoghm90vZeF26F888TP8oLzW3nvbxJaIru2Lmb0Rtl2+A783AXjx6A62TjD4H+MX0d736j34aX+zZw9uYbmzwVpPUqIHTt3yhf97c5vNyBsv9CyfHrFjJ0bGwhXRZdA4uC5biZVL5mBAm0pImzwtmo30QFAuqj82jqmt3Us0JM7igHGL/8I5Ly/sWTkJ5XJkQs2By4xZ9Abe3t6PrhWyIgafi9uPcZEo4U/IVXMQvAxz8AJ/TUR6VclhmB3jFtNwXLYqfXHqibzge3hvGIOCqZj0bYfUucuiYZNmaN2mLYql4zA8JrL80RyLd13B+1f/oGoyw7W6rLtsGwHiMKRz585iyEPLgtUSOeskZ7noqOYNssOxs3H4JJdylrM3RHYkDiukP0j6cDisktYP16VnG0vDEvqM6MzlcIu+E74HLSMeIx2sFB2+rlSpkpiV4lCJvhxOnUthk05dzkLprRBaVJyR089UcT9FkKJEMaUAydk3TrcTCip9L2ybOXOmaKMYUnQpStJXJmcK6cPRs2XLFtHO2S8Omwhn0tjGa9CSpN+Llh+fg6JD+PzSLyWHmhIO/Wjd6Z3o4eWu125MHdIDzZs2EgLZqGkLdOk7DCt3eZmGRZLXjy5gydh+aNKgHurVq4+W3ZyxZt9ZXD2/F1MdO6F+PUN7mwFTcOrydVzasxID2jcWQZH1GzbDwOnuuKWpx4fn17HWxRmtG9cX++o1aAHHkX9i1Y7TeGXQXM1oeIBtruPQvnkjNG7aEt36j4C7JjBBkhCAi3vc0Lt9c3GNunXro53jROw5bxhOXNm7HP06tTBcv2ELDPrTFd4+vji1zRU92jQ1vm9zDJyyHBdu38Hh9XPRo3Ujw702ag6n2Rtx76W8GTNeXcXmDZtx3OsCdqydB+d+3dCyaWM0atwE7bo7aZ9JUNS3ATqha2gCFBP1nebBZXhftNW+X+0798Ycz2NmFqaBwJc34DFrBFo3qoOadZvCeYYHbpsbW8TPB55zRqFNY+24Oo0xeNoa3NRP7Rm5e3orRvZsiWpVqqNt3z+xz/saNrgMhuN4V5y8+kAT53fa9/45trg4omXnYTh2/63tfEASOQSRnZUdlUMe+htkR6dIsNPQh0MxkvAPSZ+QtGoIOxIds9KfImeYUqRIYZqep4jx+oz5IbSoZMCkdLBSpOjoljNhctpcL3aM5KYwyJkrPRz26B3PHIZxml/6qSgEXL+MM13Sl8Rn4/1zRk76eRh/w/flvUjo86GFpH9uUqtWLXGsHN4ROt75eTL4k1Bs3Nzcggk5rS7+APA4+b56OAEgBU0RVQmaBeuy/POzW1EJmwsQrQFaJvLXmNYGrRj6P+TsD4cJ7ATSISvhEMW8E7KN15TwGpylYieTsKNTYKSYUVA4vJCzXBL5/oTnUySlv4jQKmIumxzGhAe+J31hnJLXw3ui1SPh83Xq1Ek44CU8V+9vknC4RJGTPicJhdC8TQ/fk36z/fu/sYRNhQ6DBUQB6rQkvENl22FzAVIoFJHBB2wcafAvdVisBEihUFiJwHdv8NjnGByrGlJ5CrSain8fP8e7j6E4uKMQSoAUim8c/ztnsMxlDAYO6A9HxwHoP2AQJi3ajLt+4XcNWBslQAqFwmYoAVIoFDZDCZBCobAZSoAUCoXNUAKkUChshhIghUJhM5QAKRQKm6EESKFQ2AwlQAqFwmYoAVIoFDZDCZBCobAZSoAUCoWNAP4PgiDTiHZDRE0AAAAASUVORK5CYII=)
What is the relation between velocities of points A and B in the given figure.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASAAAACPCAYAAABavgYPAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADZCSURBVHhe7Z0FeFRHF4YDlOJFUihe4C/F3R1KcHd3d4cAIbgWJzgEC55A0EJxK24haLHgwSFIguT77ze7s7lZEkhIdjeUeZ/nPrBzZe/d7Hx75sw5Z+ygUCgUNkIJkEKhsBlKgBQKhc1QAqRQKGyGEiCFQmEzlAApFAqbYXMBev/+PUaNGoVhw4bh2bNnxlaFQvE9YFMB+vjxI9asWQM7OzuxbdiwwbhHoVB8D9hMgLy8vNCyZUuT+ESLFg179+417lUoFN8DVhegJ0+eiOFWkiRJhPBky5YNMWPGFAJ0/fp141EKheJ7wGoC9ObNG7i5uSFLlixCeJIlSwYXFxdcvHgRceLEEW3//vuv8WiFQvE9YBUB2rdvH6pWrWoaanXs2BGXL18W+54+fYpYsWIpAVIovkOsIkDdunUTAlOxYkXs2bPH2GrAz89PCZBC8Z1iFQG6evUq3N3dxTDMHE9PT/zwww/CMlICpFB8X1jdCS05efIkmjVrJiwfbtGjR1cCpFB8Z1hdgHx8fNC7d2/Ejx9fCM9vv/0mxEcJkELx/WE1AXrw4AHGjx+PFClSCOFJnz49pk+fLpzRcePGFW23b982Hh1xrl27huPHj+Po0aPw9vYWviaFQhG1sLgABQQEYN68eciaNasQmZ9++glOTk6mmJ8XL16YpuGXLFki2r4WDut69uyJEiVKIGXKlIgXL54Qt8SJEyN37txo2LCh8EW9ffvWeIZCobAlFhUgxvjkz59fiAuDDTt06IDz588b9xq4efMmYseOLY7h1qhRI5w5c8a4N2ycO3dOnBcjRgyTyOXIkQPly5dHlSpVUKhQISFI8j1y5cqF1atXIzAw0HgFhUJhCywqQPTpZM+eHZUqVQoxzWLz5s1wcHAQosCZMBmkmDBhQgwePBj37983Hhk6ixcvRvLkycV5tHxmzpwpRM5cXHitdevWoUmTJkIMeXynTp3w6NEj4xEKhcLaWHwIxo5vPuQ5e/assFgoAtw4BU9ROHXqFObPn2+yVuigXrhwYYjT92Tq1KniOA61pkyZIoZzYYFiWKRIEXFunTp1RDCkQqGwPlZzQhPGAw0cONA05CpatKiwWMyd0ByWMXhRWioMYDS3oJjWwX1M6TAPbgwLtHxq1KghrtG0aVNRFkShUFgXqwjQq1evMHHiRPz666+iw6dJkwaTJ08WnZ5O6tAioQ8cOICaNWuKffTvtG/fHrdu3cKNGzfEbFqCBAm+SnwkTIwtVaqUuP7cuXONrQqFwlpYXIA4DU6HMDs5LZ8ePXrg7t27Yh9nwigqHIKFFgnt7++PFStWmGbR0qZNa3Jsz5o1y3jU13P69GkkSpRIXFdl4ysU1sUqAkQnceXKlXH48GHR9vLlS4wbNw5JkyYVQsLtS4GIjx8/xogRI/DLL7+I4zlso38oMhg0aJC45owZM4wtCoXCGlhlCCYz34m+JAeFqU+fPkJMwpoLxjgfKVrcateuLeJ/IgLDBWidcbr+9evXxlaFQmFprOaEpj+H0/EUDVo7bdu2FUMezlxJp/SXBIhT63Xr1hWzXrRW5BQ+z3d0dBRpHl8D/Uryvvh/hUJhHSwuQPSxtGrVSnRwbqwLtHv3buNe4Pnz52Eux8Ep/UyZMok0DkIH9pw5c5AhQwZxPqft6Uxme3hg2oa8P1dXV2OrQqGwNBYXoObNm4uOTUc0h1/6mB5Ou/ft21cMv8IiQBcuXBB+I0Yy0yckuXPnDgYMGGCazv/jjz+EyIV1ap2CJf1AHB5ylk2hUFgeiwvQjh07hMNZH3FMJzTjf9KlSyc6PbewZMMz5SJVqlRCsOgLMoeBjJzN4vUYYBgef86qVatM98KhHS0zhUJhWazmA5IwHaJgwYKiozPlgvlhTEYNixOa+znM4rkMVNTDfUytYJkPXiu8M2T0KfG6LJLPfzls5LJBCoXCclhNgDgdX69ePdG5uTVo0EDkbDENIqxF6Wk5lSlTRhwrLSA6sZmSIaf08+bNi/Xr14v4ofDQpUsXcf62bdtM9au5eodCobAcFhcgpl/06tXL5GguWbJksAUIHz58GK6a0K1btxbHcvr+0KFDKF26tHjNkhuME/qavC6eQ0c2h4EUNPqA5Otly5YZj1IoFJGNRQWIBcHos6FAsEPPnj37k4TR8Balp/DwWF6X0/H8P60pJrh+LX/99Ze4DnPP6NAmFDcOEenYjki6h0KhCB2LChBnuRgB3bVrV1P6hR5ZrIx5XmHxATGrXiaQcuOUPJd2jgicKatVq5a4HoVQChBh8TKWCaF46oMpFQpF5GDxIVho1Qf//vtvlC1b1iQmX5oF279/v5hel8dzYxR0RFmwYIEpDIABjXoBIpMmTRL7ChQoEKb6RAqFIuxYzQktYSwPZ5hkp2dJjs8ty3Pv3j3069cPP/74ozie1Q75r9wYAf21lQ23b98ufEfyWuYWEOG1O3fuLPbTiR7eIEeFQhE6VhMgduwhQ4aYBCRnzpwiy51WhfTl6AWIHZ8O4MyZM4t9//vf/8Rwq127duJ1hQoVULx4cfF/zoiFN26H4QCsJUQfD6sv8jrcQkrFoN+K5V25nwGPCoUicrC4ANHJzBgbGb9jb2+PMWPGwNfXV+znLJi0bqT1wYDC6tWrizZaRpxFY5Ey0r17d9HOwvb0KzEqmq+LFSuGnTt3fnH6nbNy8hp8X5m6QWuIzujQhoy0xPLkySPOozNdoVBEHIsLUMuWLUWnpY+HtX8uXbpk3GOYJeNKFdzPYRjLdTBqWqZUMOZn165dxqMNyHgd1hUiTECV6R7cWGCMcUH0MTFLngXumQi7dOlScS/S2qIFtnXrVnGNsMJrsRwI73Xjxo3GVoVC8bVYXIBoYdBZzJQMCYc5XJxQBiByY6eWqRlMp6DVFFItaHMBknBIJWez5EanshQcudFi4vpkXKfsa2CgIqOtOXyLaBkQheJ7x+ICxHSGDx8+iP/Tl0JhkbFB9O+MHj1alFbla4oQUzOYnR4aoQkQ4VCKw7dFixaJ46pVqybCAFjzmSVhmaDKIV9EYSVG3gOHZF9bAkShUFjRCU0LhTNe7Lh0RNOZy4x2+mykJUSn9Jf4nAB9LUzx4HQ8S3GwfnVY4Mwc74NpG2rVVYXi67CoADHI759//jEVludGfw2tFAnrBdHy4b6wLM1sCQHi7Ju8v7AWJKNwsjgaz+E0vUKhCD8WFSCKj7RumAOmd/rS+uHKGHJRwbCU4yCWECBWZuQ1KYTmcUCfg8/A5+K5dJ4rFIrwYVEBYg0gWgf0v7x7987YCqxcudK0sgVnvCg+36IAEaZoMEaJ4QJ8LoVCEXas5gMinA7nWu3s7Nw6duwoptnDWo6DRDUBInRuc2aMvi2mjCgUirBhFQHiqhNSOLgxB4xxOoRT7WEtSk+iig/InCVLlojzWdBMrS+mUIQNiwvQtGnTTGt5MfiPHVU/HOMQRi7BbCsB+ppZsJAYNWqUuDf6hbjqqkKh+DwWFyCWSWW1wpEjRwarC82YIHZ6+k/YaW3pA4osmL/GOCbeX5MmTYIJrUKh+BSLCxBniswDCzdv3mwqrcqNDtz/ggCRZ8+eiURZ3iOTXBUKRehY1QnN+B99Xej69euLnCqZ+/VfECDCxFlZ3J5WnkKhCBmrCNCVK1fQv39/U9Y7C8evXr1a7GP2uWy3lQDREc5MeOZ5hZYNH14YA8WSrkwz0efBKRSKICwuQLQAZJJp6tSpRUyQdPQyG15GE4dWkMwcSwgQS3Twmtwic2lmT09PIa6//vqrWAFEoVAEx+ICJP0h2bNnD7YaBq2C33//3dTxo0IgImtTf00c0OdgIiyvzVIgtubr6kYqFJbD4gLEwDwWIJPT0ixhIWsEcWOdZ1oJtrSAIhqI+DlYyIz1pHl9pp7Yio/3D2PKRFdc/fooA4Ui0rGaE5qzYcyAlyVZWcqCQxRWNbS1E9qSAkRYhI3hBrSw1q5da2y1LqcXdUOSOL9gzK6IlyNRKCILiwsQS6+yhGmaNGlEJ2dQIhM35QKCnLaW64J9rg6QxBICROHjNblFpg9ID9cWo9AmSpQIBw8eNLZaiQAfOFUy1GAq2mkhVPEQRVTB4gLEDHjZuZn7xbQMPSxKL2fB9GU6QsMSAkQxHDp0KIYPH/7JwomRyeLFi8W9Z8yYMUxiG1nc3eeCwsljaZ+zHWKlKYfN/35aaVKhsAUWFyB2aK6xzmluc2gJlCtXTvh/2DHDssigJQTImsgVOCpVqhTulTy+jmeY2qo8GvQdje5VM2rvHRONp+yCoUalQmFbrOYD0sO1weRaW3LjLJi5dRQS35YABeDa6QPY5OmJHYe8YPD/fkCzZs3EM7Rt29ZUrtZSvDq3BGXyl8Waa+9wfUVnxNbeN0G+jjj3Qs2JKWyPVQWIQx3OiMnkVDqip0yZYsqGZzzOl/hWBOjh2c0Y0Ko+6jdti64dmqJg5t/g0H4Crmkq9PzZM5QuXUo8B3PkLMc7uA+sgeJN/sRLvvQ9gNrpWX3yZwzeYL0hoEIRGlYRIArPwoULhe+DnY7JqQxI5NQ8gxJtXQ+IxexZGpZbxBNIA+G9YQKKZ82CZsOW4Mrdp9r13+DobIYexESrmYZ6QTevXxfVAfgslkrX+Hh/P+oXzgPnTYY11QB/rB34B6Jp75mxzjg8VEaQwsZYXIA4xKhRo4boaHQ2c+ilt3T0s2C2EiA6hHlNbmGpS/05rm0ZgwyxYqBs35UGq8PI+7seKBDDDvYOA+FjzPY4cuQIkiRJImbHIj9dIxDHFnRG/gq9cP2jsUnj1ZnlyJdQe9aEueF60nIOd4UiLFhcgLgsD2sAsS7QiRMnjK0GKE5MRqX/x5YCJOOAeB9fGwcU+OEZPMa2QsZk8eHQbS7umU00PT8zHzliah0/YwMcvx/k9zl06BCyZs0qhqVcijrSCPCBY9m0SF24PpxHj8BQZ2c4Dx2OMYO6IH+qGNrzRkfFQavx2ni4QmELbOKElnTr1s1UjCwqpGJEJBDxw5W1KBRPE5iYeeFxKcDYGsTdDU5IrL2HXaYmOHVfZ5JocFlovj+TVyMrZ+z2jrEomLM4hsxaiqWLFophHrdFS90wrV9tJIymWaQZ62L/nffGMxQK62MTAWJskH6pHm7fugCdc+sN++h2+ClvG5x4/KkfyWtBBzEDFTNfB5w3K5ZIHxRXiuU9sFxJxNcZe44pzUqg6oA1IU+3vzqJZjnia+8XDx1dg1ulCoU1sZoAMeaFK4rmyJFDiA3LVHANdxaqt7UPiO/La3L7mkjoe8fcUOTnOLBLkhdzj4eUbHUdfcsaIsHLOS6HX3ADyETr1q3FMYwRikhJ19dey+BQyAFLz4We+LXrz3qIqb1XsuK9cU0VblTYCKs4oZnzJVdFpfgwIlo6ornf1gLEUrFt2rRBu3btTCkiYecNVvYtIe7pxxSFMGT2QsydPVukn3CbNWcu5o7ogAzxNYH7MR3Gbb1hPC84+/btE2U7eB1utIRCWhv/iwQ+x/QWeZCqZH987kmenZmLjOK9EqHT/GPGVoXCulhcgBwdHU2disMufR4UKwe2b99eiJIts+EjwvsnR9EkEwU0OgrV64GRI4bByWmwiHgePMQZo4cPQJV8hsUXE+VpiiMhGDacCZRT8nTW16lTR/y/b9++xiPCxqtrBzGuaw2kTfgD4qctgI6Dp+Pg1aA63AY+4PJ+d/RrUhrJ48VG7Fg/IHHa3Og4bA7O+kZOMTaFIqxYXIAYeJgrVy6sWrVKLNVMmBnPOCC5Kio3W/qAIsL9XWORKpr2DLFywtUrhGntt5fRtXBi7Z6jodqQjSH6ZBYtWiSeSdYMoh8qd+7com3mzJmiLSx8eP0U169cwjWf27h94youXbmJp6/NHeKBePX0Pq5euQKf23fEe928dgWX/72FlwGhjA0VCgthcQGig1Vf5pRClC9fPtG5fv75ZxEXxCHYt2oB7f+zvgjsi1ugMy6EoD/Xtw5FMm1/tGSl4PlvyBaGrI8k10ojTMylQHPBQ/2S1grFfwmrOaH37t1rqo7IjQ5X1oqmD8jW9YBomTE/jXV7eD9h5wMWdzb4tvJ3Wojnn0QW+2J09Qxif/WRWxGar7dixYoiHSWk1UNoGTJGiFHa3zv823yVXywU3j2+CHfXWRgzchichw7DsGFDMHT4KEx19cD5u7r3+eiHI5uXYvK4URjqNEQbWg/D+BkLcOCiWvstolhcgPhLTucuOyG30qVLB/ul5ywYp7+5z1YCdOPGDWGFxYsXTxRICztv4NKCvpvoaDb90wzzezvGIrU2PLMv3BFnP5P3ULt2bfEZhFSOZM6cOeJ5mTdnqVpF3wpM23F2dhbDdy6HzWqTESHwQwBeProB92ENEF98P+OgzuAluPzgBQLe6/9eH/H21VN4/T0FuRLFRrqy3bHv0n28fReeHytFSFhUgPirzQJc7EBcpob1cBgZTTjzNGjQINjb24v9tvQBfX0qxges6FpQOy8Weq0wi6d5fh4dCyWEXfKicDtp7ggODusQ8b0nTJhgbAmOk5OT2E9HNR3ULVq0EBbl98jYsWPFZ8EAVq6uwsoCdNzzuxY+61XHxRUokFj7+8cpBHevz8Vg3USvyoXRaZaaNYwsLCpAjGXhdDJLscpVUWlCz5s3DxkyGIYmFCCWKrWlAOkDEcNnAQFXVnfHj9q5dSbtMrZovLmFaW2LIGHKQnDZ+eV14s+dOydK1bJsa0glSWgZyVK2cqP/bMuWLcYjvh84c/rbb78F+yzk50ErsWvXrvDw8BBLfod5me1r7iiZTLtOkpLYeO5zAnQbg+v/gd6uajgcWVjNB0TYYTgE4xeGPo+BAweK/DAOfdgWFQQo/BUR72JkzRxIkskBY5d4wGP5fHSqWwYlq7bHzithz7RiUCbvoVChQsIXpYfLW3Of+cbP8ntEWoyf25jkW7lyZVEMb/369fDx8TGeHQJX16IEBShxCXh66VOIzbmFQfXKoNfCL1fuVIQNiwsQh1xnz54Vq6DKLwetIpmYSivJ1gsT6tcF45LRdArLrVq1aqKutR7WtJb7K1WphlJ5MyC6dm7lGvXQx9EZizfswpodh1GvdnUR1ay/HpNv9Rw7dkwcw9VBaAnyHtKnTy9+xQnLgxQpUsR0f/qNfiuKkP76//WNnxWHXiF9Hp/bWJO8ZMmSGDFihBiucR1/E0qAbIbFBYiJllJguDwNf40kjP6tWrWq2GfLaXjWpeZ9SEvMfDOfndLP5uk3b6+zeGcMpVmzcnmIx4waNcpwgBGWoQ3pOLmuPDuK/IzUFrTJMr5h2Ti8T5s2LUqUKCGc2EePHg3uL1ICZDMsLkC0LmrVqiVmLmQgopeXF5o3b/7Jl8RWAiTh7BzX7tJvdHC+fBn8S0lRNT+OlR31x/FZzI/hdubMGeMRBjj8C+k4fekSd3d3U9UA/cbPMKRz/8vb9OnTha/H/LMw3yg4tLQZCLtp06bPTy4oAbIZVvUBcdq0X79+IhGVXxL6O/iFsnUcUFSHVhCn47mSLH0bXOKa/jM5o/g9wbSVLFmymISGG/2JHGI5ODiIIdauXbtEaAWDYMOEJkDCCa0EyOpYRYCY4KlPveBa8bQY+AWhKSxrQisB+jxMYaHP6GtLhnzrUHCZH8e/P/1kHJoy15DDeg6jv5prHij9iyZAiYp/QYBuwrFuafR2DW7FKr4eiwsQa0EzBohfGk4lM/aHU6kSNzc3MfxSAqT4EgzhYFE1ri7LcIVgjuSIcG8LKqbWBChWXrgd/8zKsYEX0LNaKTitUgX9IwuLCxCz3WnhMPWC6Q4S1kPWFyWLCj4gRdTGYkNO/+NolpULIyTH2L8/szLL4x1oULI0pv+j1paNLCwuQEwfOHz4sPGVIeqYwWJyypmJqZwl+1aTURX/BfywoJ0hQdrByQOh2VUn5nZCnpJtcfpVJFleCus5oVkRkTMS0g/EqN+lS5eKADHlhFbYmqfn3FHuV+1HMXoGDFl+EM9eGR3Yge/x4vEdbJ7ZBzkz5oLT6rOGdkWkYHEBYmQxV3vgyg8UDuaGMcbl4UPDWJszY7ZORlUoyM0DbmhcLBt+TpgUOYtWQONmzdGscT2ULZYPOQuWx+gVh6FK+EcuFhegnj17CsHgxsRBfRwMZy9klK8agimiBK/v48jODVg8fxamTpmC6TPnYeWGnbj6yN94gCIysbgAMc6HaQb6oloMsmvYsKFJmOiAVk5oheL7w+ICpJ8qZTQq4zhk3A+Faf78+TZfmlmhUNgGqzih/f39ReAhw+MpHizFwRUjWC6BU6tSkPRLNocGFzPksVxHS6FQfNtYXIC2bdsmUi4oGgxEZOSqvpIdM5NlnhNLtLJ+NHOquDif+UYhY1wRj2Utab4O6ThuvIYUOIVCETWxuABJX0/Tpk2DJVgyDcPFxQWZMmUS+zkM4zrpXDOMJTGKFSsm1hLTbyw9IafxU6ZMKV6bHyM37mMJkPBVOFQoFNbE4gJEq4ZZ5tIXxNwvFluXs1+cgmdQIld/2LFjh2lxPk7XM/EyceLEpo1V77hPbnyt389NnsP9jC8KqcKgQqGIGljFByRhHZbGjRubBITlJFglkXV4WFyLWcwst8nlm5lcyOBFFiyTG4dczC3jKqZcS4uv9fu5MVua/7J4FX1LLM2pUCiiJlYRIGZv02ksC34VL15c1GghHIpRfJiOQQFihDSHXxFNNORKE7yuEiCFIupicQGipZIqVSohPJwFmzVrVrBi4Rwi0QktLSAKEIdnYa7lEgpMdOU1OQRUKBRRE4sLUIcOHYR/h4XIzNe1Wr58OfLnzy/EidaRJQTo6rUbxhaFQhHVsLgA0ZfDovR6uKZV+fLlTb6g6NGjC5GKTAGqU7cuYsSIjv69e2D4sOEYNmwonIcOxagxY0VRea4vNXm2Gw6dv4XXan05hcImWNUJTSGScTzcWNFuxYoVwZzQkSVAtWrXRvyf4mOxUyNkTsD3i4dyLYdg8YrVWLt6OWb+6YwmDrmRMG4iOLQYiqO3VI0XhcLaWEWAmPnODHg5PZ49e3axSiqL1LPKHcVH74SmkzqicAXR2D8lxYPDi9AqP53fv2LS32ZlO1/fgkv74uKeUlVwxCW11LdCYVUsLkBLliwR9XvZyRmjM3LkSFMpDsJ60RQfKUCchs+VK5eIluY+82n2L208h9cvV64c4iZMirvHlqFTccYPpcW4TSGsUnp/GyqkYzkQezh5BlVsVCgUlsfiAsQhF0ttsCQrlyDWwyVpunfvLsSJQYM7d+40LbvLpVcKFiwo1hILz8ZzKGB8z0RJU+HOkSXoWIzrz4ciQDiPzoUMAY4Np+yAStxQKKyHxQWIqRBcgFAPp+G53haXUmHH50Y/EI9jACGXnfnll1+QLFmyr9p4LlM1ChX/A76nVqJD0STae/yK8VuCiuGbuLEepVOzPGxiDHT3CrUcp0KhiHys6oRmYqinp6ewUig69Am1a9fOVBOaQYNMJGUEdGRsL1/6IfDpYbTMRx9QGkz4KygJljy55YUJLQw+oLQV+8PrkZIfhcKaWE2AmGhao0YN0dm5MSWD1RGZTiHrAYWlHEe4eXEMLQvSAoqDnKVqiXpCXbp0QqsmdVAwY1Kt/QcUbzICZx+8M56gUCishcUFiCtUsniYrPnD9bn/+usv417g/PnzwgLivrAUJAs3z4+iZYGE2vUTo16vyVjv6YHVK5dh9uQRaF27DFLEj4fkGYuj78TVuOuvLCCFwppYXIA4HU5x4bLCc+fOxbt3BkuDWfFM05DF6sNaEzrcUIDEECyEaXh8xFnPEcgYl1ZZbFQevAavVNVxhcJqWFyAaO1w6l2/nDDLc5QqVUoIjxQfRkNbVoBCmwULgGuHwoZ7SVoeW++8NbYrFApLY1UntJeXF1q2bGkSngYNGmDjxo2mLHnbCBBwamZzROM9/ZALCy88M7YqviXe+r1AwJdG0B/f4AHjy/yUv8+aBLx+idf+Iec7WUWAmA/GSOgECRIIoeEsGNf3JhySMRLacgJ0zBgJnRYTQpqGxzss71ZSvP8PmZrgyGP15YwI75/fwK5N6+C+fgO2/rUN27ZtxcZ17lizcSeuPtRZl5oYeB/Yon0P1mHz1q3YvHE91npswMnr4f8BuH14KWr8UQItRq3DC2ObOVcOrsf4of3RtHpZFC5bC0Pmb4fvN7LSTuCr+zi2Z5v2Y70Ze49645n4in7E/Tv3Qu3YUYEn105g+aS+qF2nAzade2xsDY5FBYhT6jNmzEC6dOlEB2dZjqlTp4poZULxWbZsmRh+WUyAXh5Do+ysOf0rxm/2MTYaCPR/iWOrhyJjTFpkP6Pj3P34oPzQEeLDm8c4f3wXxneshKQJ4iN+vIQo09IZm/7xxsOXOnEPfIe7V07BY2YfZP85IVLlr4u5mw7B59Fr4wFhx8tjEOy171DG2uMRFGMfxIVN41CubAMs2X0cJw+4oVKGaOL71nnxiSge9/UBpz0noWqx/ChVsQYaN2mIKuVKo3jpSmjQtC6qthuLmy+jZujsk5snML1PXSTXPmc7u2xYdMzXuCc4FhWgI0eOiD806/1wgUK9H+jgwYOoXr262M8t0n1A757i3OGdcHVqisTG9/i9WG30G+yMkaNHY9jg3mhUqSiSJ4iLNFkLo6/LJjw3nqqIOAEn5iF7fH7umTF7v7nzX89FtC2eDfVGbDO+Dj+BAc9x/sQxXHnwaULxh+fn0SFffPzWdIFpVdM7++eiaumSGBGlA08DcXnDSPyeKAEq9V2Mm89f4e3bN3j56Brcp3VHOu2zjZGnK3yiqMvy43t/vHrhjR5FE8EuVm4sPR7ST4OFBYgxPpzp2r17t7EFItaH6RmsA01R4HBMBiJGqgAFPMapfVuwZP5szJm3AAsWzMfMGdMwadIkTJw4EZMmT8WseYuwdvMuXLzz0niSItK44Yk/UmgClLAY1nt9rtLAXQxpUAY9558yvo5cfE/OQ0bte1bccZM22A7i44f3Udv6eXMNfcokR4zUtXAyhBs9OL0VMpfuiCtRuoiDH8ZXT6EJUE7bCJCeBw8eYLRmeTAhlcKTMWNGUZCMSacWDURU2Ibr61BGCFBRuJ8JzTND7sCpfmn0mBe0Ykpk8nDfSCTSvlsVRu83tnwj3NuP2hntEC2FA7beD0GBHuxA5y5D4e0blX2WAZhYM6VtBYglN1h6I1u2bEJkmH4xfPhwkx+IwzRpDdFZ/V9GPvN/gRcvPicqGhEUoNd3vbF589/a0IOv/HBihzsWurphn1fQMD6Itzh38C9sPXTJlEz84vYZuM2cBMfWZfGj9t3KVLEjJk+djOkLPXHjeVCn9bvlBc/lC+Eycw7c1u3Q3i8kp+57/HtkO7YduqhZUYG4uH8Dlrtvxy1RWfg9Lh7age0Hz4Nnvr17DuvdFmLh8o24cP8NDxA8vHwYqxYvwNK1fKYwOI5fX0G/8oZSxrkq98LeT2rF+GL33wfh+0JXN8v/EQ7v2IRj1+lHe4MzezyxaOFibNx7RvsEQ+au934sXzgHM2fNx4Y9p/AyFLPw/oWDWOE6VztuHtbvPIHQHsH30j9Y6ToHM2a5YufJcxhbKw3s4uSyjQB5e3sHi/dp1aqVqUYzc7WcnJxE8iiHX9xfsmRJkYz6X9y4DHXevHlD3PetbfybspRuvXr1xAKQIRJuATopXr319caCYV1QPHsaxEpVAgvW78Ss/nWQJa3Bco6fpgTm7L0mjqXwnPnLFZ1rl0Aa+zjI1Wq2SYCe+5zA4imj0KNpacTSzsvo0Aojx47HOJdVuPqcR/lj51xHVK1cH04TtWH6xCGoUSQTfs9dGbO3y4UM3uPKgVXo2bg8MiSNizxNR2D5nNHIncTwfS3Roh/6tqmCdPbxUbDpWOw9uBKty+VDikSM7I+O9H90wuEbD3F0zWg45M0M+3j8oY2NXLUG49zTL4nQB5z3GIYMIkhW++FOXwQDXNbjtl8IkbJvfbFj6XjUK5UbSRMkRbcZW7BocH2k/yW+ONcubgpU7T4TN4L0EAh8DPeJvdCkdReMGDsaHeuWQnL7VCjZfBhO++ruLfAZNkzriyYtO2H42DHo0qAsUiRJiSKNnXD8vt76eoUtU7uidOmq6Dd2BlwmDETdciXwq31s7TtQAMtO2ECALl26JJZhpp+Ha34RJqQuWLBAFB7jhyMz38UHpbZvbtPXdgrGV1pA/q8ew3uvK8qljan9cqZA5YZdMXnuCpy6eAEe45sIMUlbZzwMI48A+N48hwUDqoh7yd5m/id+nRubBiG+tq/csL+NLeQjTi/vhzSJUqH/mnMm5/Tz8xtRPrUmLr8UgusRztp8xJO7V+Axuglia9ew/70wuo9dhIWTBqNC8RLoM9sDa0Y3FftS5K4Cp1kLse3oNTy4dQrONX/X7ikmitZqjn4jpmLL0at4cPUw+lXmjPCP6OoWltpT/ti32An5Uhvi5OzsYuB/RWph4uoDeKQvGOr/HNfP7ESPclxTLwZylmuELr2GYrH7OrgMbYU0sXluAjSfskO7ojgB26d0gEP9wfB+Jj+xN1jSrYR4nxI9F+OZ+FACsNulM8rW6Y8zj6W0B2BF7z/EcYU7z8djcdw7HJzdESns/wfnDReEJUh8dk1EDlYjjZvfNgJEKEKcjifMhKeVw5vnsGvAgAEiPYO1gJiSwfXj+/btK/bJ4mUs28HiYjyHK55OnjwZI0aMMAUv9urVS7RNnz5d5JmxrUqVKqKN12P1RbZxZVa20QktV2NlICTDAlg4n6/pl+J+nidFkcmrvIeyZcuK16zWyP0DBw4UrxnDNHToUPH+Mu2kcOHC4r3kfXGZIbbzOdjG9+QyRZwd5HM4OzuLNoo1j6OTnseNGjXKFDvFz4rvO2jQIPGanxmHsry+vDeuBivfl/fMkrds5z3L96UVyjYuAKm/Ht+H15Pnyx+IFi1amNoYUsE129jOZ+UKJ1xKO0QiNAR7iBGVtM4UMyVGb9RNTDw9gGrJtWtmaQ7vx0FS47N7MlJp95Sl9acCdGW9oxCgss5bTR3j/dNTaJU9NmLm64nbZrPYx2e2QEzt+PR1x+Ce8dECzi1Elph2+ClnCxx7Evwd/A7ORAbt+BQOA3BVZxDc2zoECbX2tNVH4bbOoPBa3QdxtPZSjhuNLV/m/tmdGNKqIpLGoJBwi4cidfti5wX9kP4jNo+uKfaX679aFw/1Dn+NqitEMnaeNrjErvhkP2rnsEfhZmOx3mMtVq1ciTVr12F6jyr4gddPVxNHH2nHPT+KBrntka/RSKwzHrdaO25m7xrienapq+KgptMffXejXKqYSFN1vNlQ7yGGOvwMux9tNAST0LdTrVo144dnJ7LimR1PKleuLNpkYOKff/4pXnMNecLa0PzSs6MfP35ctG3dulVM21eoUEG8JhwKsNPY29vj5k1DwCGn/ZMmTSqKnEmfBfdR3FilkRUUieyU9FUR1iVi8iyHGoT3QCFjpz91yjBbw87McygWEg6zuNIri+5LuFAiOzt9X/olgigQ+vMvXLgg1s7n0EbmyzGNhc/Jz0tCRz7P69atm7EFwsLk53Ps2DFjiwGuyc/70bc3adJEnM8FHsmYMWPE6/79+4vXhEsl8V74uet9PZyl5OfJz+7x45ADy0zcWI+yKbW/908UoM8FONzG4HqaAM03DMEM+GJkpTSwi58P7meDlnDCM2+0yqpdM0N9HPcNGorc2DkFabRnyNLqUwG6vG6AQYCGbDHNgvnsGifiU35rNhN+Zif4X1qGvBz2/FwWp28YYpL8zsxHpujaD1TDSZ/EGb3QBCh9NDtkazQZ+k/E9+BEIYr5u7ppg5MgLmwcip+19kI9VhtbwshHP5zbsRhtKuQUAsa/WdJ8zbDrhvwB8MeGkQxriYbuK4NH/H+4pf3wc9gYuyDO3X2n6bgLfo9vh0q9XbBiuRuWaN/7JUuWav+6Yu6cWZi1bAseah+W74HZyKod59Bjmpgw4nGLjcfN046bvXSLZol9wJll3YRlWmVM0PfewCtMrJXK9rNgtILYAemIXqmpqFx0kAXp+UFSSNjGTshfYq4f5utrCFxiBDWPoSVC6MilpcCZM32hM+7ncbSaJLRw2DZ79mxjC4R1xDb+ehOmgvA1rafXr18LIWM1RnZ8KSTSSmD1RkIhSZgwoeiMUlSkIHG1Vw4zJVzFle202iT0jbGD83wfHx9xvPSVeXh4iGMoXBROip4Uaxb1l+/LapJkyJAh4jz5+Ui46gfbad1JKPJsoxXKyQGWQ+F9UCDlGvq0aGhJ8Th+6SS8R/ljQav1i9zZgopptI4SOx+WH/+cWF1Fv5ol0W/peeNr8sAgQPFyY8WJoMjowKfeaGkUoGMREKAz89uK58jYaCqEO0jHx+f7USut1llj5MapCzQDKEALkFkToN/qjcddM9eNFKAs9SZoshnEgwN/CgHK03FRsPiy857OsNfaC/X8ggC9e4EHD5/gbdBjGgjwxZYZ3ZAxscEPVXnQOtOwSgpQx8Vmw7u3l9AxL7MNcuDC7ee4ummIdg/R0MFN+tJCxttjCJJp79HS9ZKxJSTewn2A4fvSYPI/xjbJS0yoYeNZMMnp06eDBSLS+siZM6cYbh04cEC0NWrUSDzInDlzxGv+EnOIwuqGsqNzmMBj2LFlR+eSz4wlypw5s0m4GHvEa+fOndvkKOUQkMLC0q2sysihoVyjfts2QyAchxl8TSEhLJJGsaOvSnZ67uMxtEYIRYT7uZ69vuzsnj17xD1QePW+EvmcjEciS5cuFa8pjnI1EGnp0EKSgi2tlwkTJojXFGwKOz8f/ZprvE+um08HP8udEDr9adHw+WVclhwyys+bMG6LbXQ2M45LsmbNGtHO4RwXEvgir/9Bw0z80v+Kybs+szbbmyNo/UdxjN2m/4JaVoDOr+guZsYSFuuNm2bpGIEvD6N+Ou09kpXH6ZuG57SJAD07rv2ozYf3AzOFFHzEptGGYVXaco4wfLoBoQtQwHX0KKj9LX4qifOP3uPOttHCCsvT1tUoXsHxf/saH7TnvLp1rLAUszWbjZD+4gHa9+PDez9NgAw/nqX6uhv3SPQCpP90grCaAJkjLQYOfwgL0vM1/SfsLCzX0axZM9HGYQKhGNA3w2EWxYnwl1wO71xdXUUbOzGtKratXm34Q1Nw6ENim1wWet68eeI1LSXCoSLTRbhGmby+XMueQ0NCsWQnptjJYQiHLzyGlpKEnZdDMrYz3USyfft20UYri1YONw7vKFSHDx8WxzAeiqLCoSKtR0LR4PtSRKSgSkGiH0hCsZJ1tvX3M378eNHGcwiHsXxN/5T041C86YvjsO2ff4J+zfj34I8F21nJIGw8xLia9CNFR8PpwUvy6nm8+08Uyl8D2+7pf+ofYNQXBCj4EGxqqAJ0Zb1BgByct5oE6On5VSgUT7tOgjxYdiF46keg7yYUjaN17BojTT4gKUAZ60+IPAHq9QUB8juJHnVrYcqekENTfPfNQErtOhlqjYfBTpMCZIdOS8wslhf/oNovdkhcqrfwR727uAaFEmnPnzg3Ju8Inp6El2cwcdxknNJ+D95d24jiP2vH/ZQN47aaWUtvvDF5wjScfeCH00s7Cr+Zfb428ArmEgzA1LqpYRczB5aeNNylOTYRIBYp468zhxL0K7CzSuf0+vXrxTEc/tCqyZIli8lX07VrV3EMrSDJhg0bRBvPl7/YvAbb6JylQJH58+eLNq4ZTx49eiSGehyCyIUT6RjmMbLjynugQHDox2vJYQitFkKLh1YahzEMqpRQdHgcHc/SqqE/hRYE26XPi4sk8rV+qMS0FbbRuU0oxmXKlBFttEQIhYCv6TPS+2noo+Iwlvl30hqkRURBo4UmP2+GBFD09ILCYSKvaT6ck+LFH4TwcGPbOKSPbYdY6SrD8/ynax7dP+2JeoWyos4wT82Q1/MEoytpX9y4ebDmrE4gXl9Gm+xah0jfAKd0Oat39k0TApS1jeEHSM+19f2EpVBm8BZji8b7Z3DtZpgYKNB+PvSu3HOu7ZAgXjqM3hpktb27sBhZNAHKUHfCJz6gN0fmIAMFqMGkYNd5emSKEKC8nZcFe7Z/t4wwCpC5tWCG/wV0K5UcyfN3wBEf8/y411jlyIkZe/Rfa/ihZGffOMpQcbTyUN2zalxa2R0JYtijt9sZgyP+wwNMb51PHPtj6gJwdFmF/UdP4OD2NejTsAKaO6/U/gIagY8wu30hcdwPKfKg37QV2HfkBA79vRYDmlRC00HLxDP7+2xHtXQsOBgHlfotwz2j0r+9exit8zEUICVGbb5oCJH4+Aiek3qhZZtBOHjbzzYCxJkuPhT9F0QOQWjJcFjFji5nvugnIidOnBAdhpYHo6oJfTYcTvE4rqhBODxgp2RsEa0qQrFhh+RQSjqROavE8/r06SNe0x/C/fQv8Xh2UgcHB3GMtKLon+FrioEUu7p164o2vZ+JQ00OyXi/0pKgZcKhDo/lc/I1HeIcKkkhJhyqUvQ4IycFTYoZrTqKES0WObNGH5ae+vXri3ZadxIO49gm/WMc+vE1ZwZ5PcLhHAWKCwVcuxb0aycFlvukVRh23mLv7B7I/FNsJEmTF826Dca0WbMxc+p49GpbH/mzZkH17i7Ql2D6EOCHu5c2oFpaTWjsEqD3/L24/+QlXvs9wZX985D3R7b/jol/n8eLV2/w6sk9rBtreOY4eVrj0M37eKs9UuD7N7jvcxEubQwd7aeiXXDo0nXce/xCdMJ3z7wwqG5+xI6TEOU7jMD6nfvguWAMyhfIhw5TtuCVMKU+ate/i/1zOoghm90vZeF26F888TP8oLzW3nvbxJaIru2Lmb0Rtl2+A783AXjx6A62TjD4H+MX0d736j34aX+zZw9uYbmzwVpPUqIHTt3yhf97c5vNyBsv9CyfHrFjJ0bGwhXRZdA4uC5biZVL5mBAm0pImzwtmo30QFAuqj82jqmt3Us0JM7igHGL/8I5Ly/sWTkJ5XJkQs2By4xZ9Abe3t6PrhWyIgafi9uPcZEo4U/IVXMQvAxz8AJ/TUR6VclhmB3jFtNwXLYqfXHqibzge3hvGIOCqZj0bYfUucuiYZNmaN2mLYql4zA8JrL80RyLd13B+1f/oGoyw7W6rLtsGwHiMKRz585iyEPLgtUSOeskZ7noqOYNssOxs3H4JJdylrM3RHYkDiukP0j6cDisktYP16VnG0vDEvqM6MzlcIu+E74HLSMeIx2sFB2+rlSpkpiV4lCJvhxOnUthk05dzkLprRBaVJyR089UcT9FkKJEMaUAydk3TrcTCip9L2ybOXOmaKMYUnQpStJXJmcK6cPRs2XLFtHO2S8Omwhn0tjGa9CSpN+Llh+fg6JD+PzSLyWHmhIO/Wjd6Z3o4eWu125MHdIDzZs2EgLZqGkLdOk7DCt3eZmGRZLXjy5gydh+aNKgHurVq4+W3ZyxZt9ZXD2/F1MdO6F+PUN7mwFTcOrydVzasxID2jcWQZH1GzbDwOnuuKWpx4fn17HWxRmtG9cX++o1aAHHkX9i1Y7TeGXQXM1oeIBtruPQvnkjNG7aEt36j4C7JjBBkhCAi3vc0Lt9c3GNunXro53jROw5bxhOXNm7HP06tTBcv2ELDPrTFd4+vji1zRU92jQ1vm9zDJyyHBdu38Hh9XPRo3Ujw702ag6n2Rtx76W8GTNeXcXmDZtx3OsCdqydB+d+3dCyaWM0atwE7bo7aZ9JUNS3ATqha2gCFBP1nebBZXhftNW+X+0798Ycz2NmFqaBwJc34DFrBFo3qoOadZvCeYYHbpsbW8TPB55zRqFNY+24Oo0xeNoa3NRP7Rm5e3orRvZsiWpVqqNt3z+xz/saNrgMhuN4V5y8+kAT53fa9/45trg4omXnYTh2/63tfEASOQSRnZUdlUMe+htkR6dIsNPQh0MxkvAPSZ+QtGoIOxIds9KfImeYUqRIYZqep4jx+oz5IbSoZMCkdLBSpOjoljNhctpcL3aM5KYwyJkrPRz26B3PHIZxml/6qSgEXL+MM13Sl8Rn4/1zRk76eRh/w/flvUjo86GFpH9uUqtWLXGsHN4ROt75eTL4k1Bs3Nzcggk5rS7+APA4+b56OAEgBU0RVQmaBeuy/POzW1EJmwsQrQFaJvLXmNYGrRj6P+TsD4cJ7ATSISvhEMW8E7KN15TwGpylYieTsKNTYKSYUVA4vJCzXBL5/oTnUySlv4jQKmIumxzGhAe+J31hnJLXw3ui1SPh83Xq1Ek44CU8V+9vknC4RJGTPicJhdC8TQ/fk36z/fu/sYRNhQ6DBUQB6rQkvENl22FzAVIoFJHBB2wcafAvdVisBEihUFiJwHdv8NjnGByrGlJ5CrSain8fP8e7j6E4uKMQSoAUim8c/ztnsMxlDAYO6A9HxwHoP2AQJi3ajLt+4XcNWBslQAqFwmYoAVIoFDZDCZBCobAZSoAUCoXNUAKkUChshhIghUJhM5QAKRQKm6EESKFQ2AwlQAqFwmYoAVIoFDZDCZBCobAZSoAUCoWNAP4PgiDTiHZDRE0AAAAASUVORK5CYII=)
physics-General