Mathematics
Grade-8
Easy
Question
The y-intercept of the line
![](data:image/png;base64,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)
- 2
- - 2
![1 half](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAJFJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYLsAbiNUD8CYh/QaujaHIMOgjEkUDMA+VrAfFRqBjFQB6IL1HLyz+oYYgl1HsUAQ4gPgmNBLKBIBBvAGI3SgxRghqiQokhGkA8G4i5KDFEHIhXATELpYG7BeoimhZyWAEAI3M1I31CbrEAAABidEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj4xPC9tbj48bW4+MjwvbW4+PC9tZnJhYz48L21hdGg+ND6jrQAAAABJRU5ErkJggg==)
- 4
Hint:
To find the y-intercept, set x = 0 and solve for y.
The correct answer is: 2
A y-intercept is a point where the graph of a function or relation intersects with the y-axis of the coordinate system.
Related Questions to study
Mathematics
The sum of slope and y-intercept of the line 2x + 3y = 1 is
The sum of slope and y-intercept of the line 2x + 3y = 1 is
MathematicsGrade-8
Mathematics
The x-intercept of the line 4x + 2y = 6 is
The x-intercept of the line 4x + 2y = 6 is
MathematicsGrade-8
Mathematics
The y-intercept of the line 2 x + 3 = y is
The y-intercept of the line 2 x + 3 = y is
MathematicsGrade-8
Mathematics
For furnishing and tiles, the plain white tiles cost $80 for 6 tiles; a bed costs $160, the design tile costs $100 for 5 tiles. The costliest among the following is
For furnishing and tiles, the plain white tiles cost $80 for 6 tiles; a bed costs $160, the design tile costs $100 for 5 tiles. The costliest among the following is
MathematicsGrade-8
Mathematics
The cost of pizza is $8, the cost of 2 burgers is $7. The costliest among the following is
The cost of pizza is $8, the cost of 2 burgers is $7. The costliest among the following is
MathematicsGrade-8
Mathematics
The speed of the cycle is 25 km in 2 hours. The speed of the bike is 150 km in 3 hours. The speed of the car is 210 km in 3 hours. The vehicle with the highest speed is
The speed of the cycle is 25 km in 2 hours. The speed of the bike is 150 km in 3 hours. The speed of the car is 210 km in 3 hours. The vehicle with the highest speed is
MathematicsGrade-8
Mathematics
The cost of 17 dragon fruits, if 3 dragon fruits cost $3.6, is
The cost of 17 dragon fruits, if 3 dragon fruits cost $3.6, is
MathematicsGrade-8
Mathematics
A teacher asked to give a statement regarding the proportional relationship
Adam: “The cost of 5 apples is $2.”
Jack: “The cost of 15 bananas is $2.25.”
David: “The cost of 6 kiwis is $1.8.”
Now, the teacher asked George to choose the cheapest unit rate of those three, the answer George would give is
A teacher asked to give a statement regarding the proportional relationship
Adam: “The cost of 5 apples is $2.”
Jack: “The cost of 15 bananas is $2.25.”
David: “The cost of 6 kiwis is $1.8.”
Now, the teacher asked George to choose the cheapest unit rate of those three, the answer George would give is
MathematicsGrade-8
Mathematics
The cost of one hour stay in Mountain paradise is $200 and the cost of one day stay in Green Mountain suite is $4320. The cost-efficient stay would be in
You can even convert the duration of Mountain Paradise from 1 hour to 1 day stay and compare both.
The cost of one hour stay in Mountain paradise is $200 and the cost of one day stay in Green Mountain suite is $4320. The cost-efficient stay would be in
MathematicsGrade-8
You can even convert the duration of Mountain Paradise from 1 hour to 1 day stay and compare both.
Mathematics
The unit rate of the following table is
![](data:image/png;base64,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)
The unit rate of the following table is
![](data:image/png;base64,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)
MathematicsGrade-8
Mathematics
The typing speed of Sophia is 35 WPM (Word Per Minute). The speed of Catherine is as follows.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOMAAABVCAYAAAC7HVMkAAAVgElEQVR4Ae2dB7AURRPHMaMioiWCoiRBgpgQkaBlAhFUTGDCHFBRMaGUWTFiQjGjaIEICmZBERRzICgICqiAEROKOWGYr35dX2/t7bu0d3Owz+2uem9vZ2d7envmP9PTuzNdwxmZBkwDidBAjURIYUKYBkwDzsBojcA0kBANZAXja6+95h544AF3//33258nHTz22GNu7Nix1UKfjz76qBs3blziZX3ooYfc448/nng5wRGyzp07Ny/sq4Dx33//dR07dnT9+/d35513nv150sE222zj9tprr2qhz7Zt27o999wz8bIeeOCBrnXr1omXExz17t3bHXPMMfHA+M8//7hevXo5jkb+NHDxxRe7CRMm+GNYQU6DBg2SEaeCRXhhjQV31llneeFVaSbTp093ffv2zVtMlZEREB5wwAHum2++yXujXYyngXPOOcc9+OCD8W5aQbnpyTGtkk7PPPOM69evX9LFFPmee+45d+KJJ+aV1cCYVz3+LhoY/elSORkYVRN2jKUBA2MsdRWV2cBYlJosU1QDBsaoRso/NzCWr8NUcjAw+q92A6N/naaCo4HRfzUbGP3rNBUcDYz+q9nA6F+nqeBoYPRfzQZG/zpNBUcDo/9qNjD612kqOBoY/VezgdG/TlPB0cDov5oNjP51ulw5/v333+7TTz91CxcudPxeXmRg9K9pA2OJOn3zzTfdyJEj3QcffJDBYerUqZL+3nvvZaTPnDkza/6MTCWcLF682LVs2dKttdZa7osvviiBQ2m3lALG+fPniw4mTpzoli1bllHwt99+65588kl33333ydKszz//PLj+559/uvHjx7sRI0bIdfLw98ILLwR58v0o5dtU6pX6ffrppx3lK7311lsZMiAH+ViipzJzT1TW559/XlnkPMYF45IlS+QDeGRgidhXX30V8P7kk0/ke1zVFUdkQlaeAeJjb87DeeDz008/BXxy/UjUt6ksyapRo4Y77bTTAnl/+eUXt8MOO0g6S3aUGLEOPvhgSefhfRJK32STTYT3Z5995pN1Xl5xwEjHdMIJJ7jNN99c5GzRooVbunRpwJ/VCttvv71baaWV5Dp63W677dzLL78seWhka6yxRnCN6/x179494JHvRxww0mHwATQdHGVsttlmjkavdOaZZ1aRQ+WhIVPXa6+9dpU8Xbp0URY5j3HASEeEzrRsju3bt3cMEtDDDz+ccS2cj7qAaKPhdH7XqVOnygAjmSP/EgXGUaNGyYO0a9fO/fXXXyLqhx9+6FZbbTVJb9CgQTBS0etvu+220tiiI2bkGWOffv31165Ro0bCW3vm2ExKuCEOGG+88UZHYzz99NNFN6yFDINxzJgx7uijj3azZ8+Wnr5+/fqSD7Cx6oYRn4bSuXNnN2PGDDdv3jz5K/Z544Dx1ltvdbvttptT0LVp0yYDjKz+YVEtf8gBAGvVquWQedGiRe7HH38UWemUGXlU1mI6yjhgZDQ75ZRT3KxZsxyLpzfYYAMplzWR0M8//+zoWFRW9Ibe0aOutkGfNWvWFOCqnAsWLKhitWRrHokC45w5c9x6660nFcGcDaJRaU+D2ajr/TALVl11VdehQwfH6KmEsgD13XffLY0wvMwLJTOKwptK4jcKhjChhg8fLuVNmzZNRhxGFa1wzAxWjMMXpYXNLC273GMcMP72229S3BNPPCH6iYKRBeBhYtEqetx6661FdvTCec+ePcPZiv4dB4y///678MXUpMwoGKOFXn/99ZLv0EMPlUuMotxX7Kgd5hcHjFGdHXXUUVIuI3o2omPAumjatGnQuQBGRvFiO7Uw30SB8Y8//nB77LGHKICGD2G6MiJiYlEhF154oaQzn+D8ggsuCJ7nzjvvFBOIdP0DrO+8847kwfwlHV4AmT+A+corrzjMPL0H5deuXdutvvrqsmaTUYTeceWVV5Y8dAq33HJLUK6vH3HAqGWyTQdyR8Go1zliZey3336SjyOkI+O6667r9t13X3f44Ye722+/PWN0DfOI/o4DRr2XbUWQNR8Yma/TuMnHPBjCpOZ8nXXWkc6jT58+ov/vvvtOWec8xgFjmAmdbbdu3aRcystGOk1iUbhSp06d5J5ddtlFplEXXXRRwa009N5EgRGhWJWN4gcOHCgy0sgwR4cOHSpmI9tSYGbRcMmHSQMxFwIkjKyTJ08WBRx55JEZyjz77LPlHBDS8DA36HXVzqdM0lTJmBu//vprMFfALKSxAICbbrpJyvX5r1JgnDRpUjDnYp8VCJMW07F58+auXr16ohf0yaJxzMJCVCkwYnkgByOMjqjIQycdlXWfffYp2HmUCkY6AqZHq6yyisP6iBIdPCMg80EsLqUBAwa4Vq1auY033lg6c56FeT3WViFKHBix1RmB9t57b2n49Ib03Az7PDiT/48//licOhtuuKHY8DwkIyQPToNWQkmYEeSDUBR5Tj75ZM0ic6r111/f1a1bN5iPUhbKRA4aAooEwMwhMKHUcxYw8fSjEmBkzqVWBU6GXFulAFJGSUzzRx55pOATVQKMmN7qrLvjjjtyyoAjhU6XutTOJVfmUsBIh8zoDX/mueq/CJeh81/2rYl6sTUffNgrCD7M7QtR4sAIEADGlltu6a6++mq35ppruiuuuEKeg02w6KnuuusuydO1a9fgPeDxxx8vD33vvfcGz4zzB6ABaEhHRvgqTZkyRe6j11ViPtWkSRNpmIyE0OjRox2OJRSroNT8vo6+wcjop2Z/jx49Co546JPnGzx4cMFHqgQYn3rqKSkfTzbvePMRFhKyatvIlTcuGDGJd9ppJ+HNIJDNSmBq07hxY2kfhToDHG3IyXw3OieNypw4MCLgzjvvLL10s2bNBEgABrr88svlwehtAGV4FLzyyivlGqap0rPPPisKw2kBKRjho/T++++7jTbaSMp79913JRlXNiYvZsqXX37pmJvoeyJGDZQLWMPeS+VXzrEUMGJOIQ8dRZgYZdRpc8QRR4QvyW+80d9//32QjsdP5804WgpRKWDkvSCyMvWINkxG7P3331+us2dN+Dp6Duv6o48+cltssYXkzWZChmWPA0amJMydkRFPdC5iikIeBgxtF+Tl/vB7SZ5Bp0rnnntuLnZBeiLBeOmll8rD8sCMkjpR11GMdJwrOASUMB0xXTAtaSj0SNq4cK1Dp556qvCFvxITdeZJ8GROOGTIEDFRMNcAPE4l5quYephOOJDIS4MKe3GVXznHOGDEBEIuGg3y8BrgmmuuCbzNWA+k80cnhOzk54iHGDc+zq1rr71W0nU0YP5czHPFASOeaso+7rjjRB6mDVdddZV8kKBmM0405mBMK1566aUMNeLlxnxlxIYPzhGei/oKgyHjpv+fxAEjda86oy5UZzgG1TtKW8SHQT70HSbaIA4c9I2cxx57rORjyqNOxHD+6O9EghFnDPMXRqaDDjookBnzkd6I+dtWW20VzPE0Az06o6oqlInzzTffHLy+wOsFz+uuu05vkSPvKZmjch8gZ/6JEwcTGTOFEXPXXXcN+NIIiv1SJaOgAidxwDhs2LBAHp5JX+6r+/+SSy4RPXFN9aFHGiiNi1cHmobpzbxGG10BUaXDK3Z3OPJpOcijXmkcSPq5IfKSjmkYfW3ESMiIpc/I1APPuL7+yidrHDDyjpG2FdUZ5QIUiNGdPA0bNpR3oOGyaStYXXQ2+rx44aOdS/ie8O9EgpHekt4bR02058O8Ij1sDoQfiPxc54+8YUJZpGebB2BicE0/f+P9I+faWPQ6X+fou8kwbx+/44BR5UPG8J++V9VnDV/jN/LrO0qeDfCRjjkeh+KMjIy0UTk45+MKJeQmLWw66zWOtIlSZI0DRkzhbHKiM/Xs0r7oHPLpS5+FzgLLqlhKJBiLFf6/li8OGFf0s8cB44qUNQ4YV6SclG1gXNE1ECrfwBhShqefBkZPikwbGwOj/xo3MPrXaSo4Ghj9V7OB0b9OU8HRwOi/mg2M/nWaCo4GRv/VbGD0r9NUcDQw+q9mA6N/naaCo4HRfzUbGP3rNBUcDYz+q9nA6F+nqeBoYPRfzQZG/zpNBUcDo/9qTgUYe/XqFXy36V+F6eTIh+y6x0/SNcAH0bo1SpJlZZc8do+oDsSeOrHDiLNOiy/u+cqd3tz+/OiAbQLZSqI66JMlTSzwTbqsDBosd0u6nMjHCqXwLhTZOpAa0UTAyLo39ithizr786MDgMgypuqgTza2Yn1o0mXlg3Z2O0i6nMjHWtmTTjopCreM8ypgZDkLPU6c5SEZHO0kqwaoDHYArw7EAu1i9spZ0c/C2tgzzjhjRYtRVPlvvPFGfDMVMLI6XtfOFVWSZSqoAUwVesjqQLaEyn8t2RIq/zotmaOBsWTV5bwxFd5UGxlz1n/JFwyMJasu540GxpyqsQv5NGBgzKed0q4ZGEvTW+rvMjD6bwIGRv86TQVHA6P/ajYw+tdpKjgaGP1Xs4HRv05TwdHA6L+aDYz+dZoKjgZG/9VsYPSv01RwNDD6r2YDo3+dpoKjgdF/NRsY/eu0bI4EHiHasQbRKZthEQzYqp7gPMXGWjAwFqHUmFkMjM658ePHO2Ki80eQTpaGEEORcyInzZgxw02dOlXSCZBaSQKABFklkA0xG0slArjwHG+//XZRLIgHsummm0pI8mICyvgEI7Eg4IfutR44FoonWNSDORcr8E0hngQ/DctIKDtWLxDcZubMmYVuz3vdBxhnz57tCAdO3c+fP79KecR0IeoX18tpyxX7NpWQbLVr15Y/jcjDkTRCtxEYU6MNE6mnkqSx5ImVx0fupRDRa9u3by/RheKEENcIt8Xc4xOMr7/+ehAJSeuBYzj+fCl60Ht8fig+aNCgoK0gY61atQLZx4wZo0WWdCwHjATmYeAgmpm24fCCagIHEeWMiGhETSMPYeBKpYqBkUaPsPxpEEzi1mkaayJffPFF6f3K6U2KeXBGBxRF71UOYebSWzOqF0sEbCXUGes/s4WjDvPxCUZWuPPMrBxH1xB1UmpnFJaT3z7BGG4r/CbcHrEasWY0Kli0/GLPywHjnDlzZAE90bA1OCsWnxKRwC677DJ3ww03iAWCvllwXypVDIxhgRj5EHTgwIHhZEfvTdqrr74q6ZgrAId4iAQ4JeIuEYmXLFni5s2bJwtv6anGjRuXwYd1lSiM/MTxGzVqVLAlCOHPiOlI5WIWQ4R3gy+jBJGLBwwYIGbSiBEjJD47cR4pp3///m7atGlBWazfQ16NC0jAUcwp4jtSIZTNOj/kVSK0XZ06dSTs9KJFizQ569EnGHVkxHSqBPkEY1Q+9E574VgulQNGLRvQtWrVSmQKgzHcsVF31QKMGhkYgcPEqnYeQE0nwMQ5kV4bNWokkYM5J1IsocDr1asn12vWrBms+1u2bJkE/STAJaYC4b+5zip0RgTi7RG8smnTpkEgUADCObzpfQkjzm+CYHbu3FnSMKVJa9myZTBP2HHHHSWNgJkQK/PJQwx65oaUyzmBVjWuJDLAA/mIzpuPfIKRDg5Z+ENvrVu3doSy5tl9UKXAyJyMYKhEMI5jgeR6Jh9gxFzNBsZwmRqiPvEjYy4wsgKbxkJIaQgHD+eEiSYgpYYGJw3zkICVjGicH3bYYXIPoyTnAADCDNboxUy8cbbguGEfFA2SSvBLRksi0rJZESPlbbfdJnwIHc48hTSNVswICLHvD2Wpd5QyOe/WrZsAnVFWo9Yyuiuxtwn5oiO6XtejTzAyevft21f0xDSB0RkZevbs6SXYa6XAqPXLth7UZblkYIxoMBcYAQINJArG8KSdUYU8OqpMmjRJztkQCcIpw/V27dpJw+vTp4+MUqTBh1cagJGR9YcffpB7aKjwxVEA6CHmB9zTpk2bIKb9+eefL2nshAbtvvvucq5g7N27t5zr9hNE6EUO+IRjuGu47tGjRwufXP98gjFaBk4snCOESZ8yZUr0cuzzSoARr3ezZs1Ef2PHjo0tU7YbDIwRrcQF48iRIwMOmFc0bib1EJNczgETpM4hTBvMsbp167oWLVqIuck9mDqYj4yMajqGwaiuauak8AW0+i4SLx9pOtfNBUbdKoP3ipjU3MOorHTIIYdI2ooEI8+uDd2Hw6wSYBw+fLjoCWdJvjDdqtdijgbGiJbighFHipLa6tqbT548Oagw8qhZ069fP71FQIcTBscOoGBEgI/GkA+DERBCOGEAEW5qBSPOGNJoeFAuMOpInguMnTp1Ej7IlI98joyMzJjNSji1mIcxH2ceXS75BiOONp1eqA+hXBm53wcY8UtgMdEW1CqKyqav6Zg7lkrLxZvao0cPeZDoLl3MA3lA3MOQmpz0kEo4csiDoNDEiRPlHAcMtHDhQte8eXMZ/bp27Sq71tH4mbsxR2REaNy4sTgFdLRizghf5oxz584VPmqmwouXuJCaqXhbIZw7yKIdA/MvzvkYAAKMalbPmjVL0jBd69evL84lTZMLWf75BCM7zeGcoiNETjokXrHw/tcH+QYjnnR0iZxaTz7kLAeMbLhGm+3evXvgTORdM47GBQsWiHi8LsM6a9iwocjfoEEDOS/FzF4uYMSLh8MkPOLxJMOGDctI5/UA+VCgEvOyDh06yOsO0jA727ZtK68eNI++DwJ09PxsrosLWt+vdenSRYCn5hlzR0xH5p3qXWTuSNl8/YHzBrrnnnskTTsHej3y6FchNHjO1btK744TijQ6CUgdSMi8dOlSScv1zycYFy9eLOZ1kyZNRCd4fpnbqk5yyVBsum8wUveYp9rxFStHoXzlgJG2gTUEwJguUa904vxWnwB6oM0xBeA6nTnnQ4YMKSRalevLBYxVSl3OCYMHD5ZeS+d+y7P4oUOHStmFNqdFJp9grPQz+gZjpeQtB4yVkikX31SAkbkTJhrzxvAL+VxK8ZWOiRp9N5mPt4Exn3ZKu2ZgLE1vFb2Lho6nM+zUqGiBzsm8gneVmL7hrzVylWtgzKWZ0tMNjKXrLtV3Ghj9V7+B0b9OU8HRwOi/mg2M/nWaCo4GRv/VbGD0r9NUcDQw+q9mA6N/naaCo4HRfzUbGP3rNBUcDYz+q9nA6F+nqeBoYPRfzQZG/zpNBUcDo/9qTgUYCSNezIts/+r973JktcKECROqxQOyvCy8OVNShWYvINbNVgeaPn26LAjPJ2uN6EU+Nu7YsaPsUcI3ivbnRwesueQj9+qgTz58Z5OtpMvK/kt82J10OZGPRRF8rZWPqoCRzPQ47JbG8iH786MDVuOz9KY66JMVMGwjknRZ2SeWETzpciIfsuqSvlyAzArGXJkt3TRgGqicBgyMldOtcTYNxNKAgTGWuiyzaaByGvgfgjwKz83F6xIAAAAASUVORK5CYII=)
The true statement among the following
The typing speed of Sophia is 35 WPM (Word Per Minute). The speed of Catherine is as follows.
![](data:image/png;base64,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)
The true statement among the following
MathematicsGrade-8
Mathematics
The table represents the cost of bananas in kg, and the graph shows the cost of bananas in kg. The true statement from the following is
![](data:image/png;base64,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)
The table represents the cost of bananas in kg, and the graph shows the cost of bananas in kg. The true statement from the following is
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfwAAAC/CAYAAAAb6W5lAAAgAElEQVR4Ae2dCdhVU/v/S1EhQ2aJTCEzmTOUKFNCyRivWcaMmUWmhJB5SimK4hWZM5NKRDJkyCwZ38x+rP/1ud93nf95Hmc+ezh7P991Xec5++y99hq+az/7u9a97qGRUxICQkAICAEhIARSj0CjpPTwhRdecNttt50bMmRIUpqsdgoBISAEhIAQqBkEEkP4Y8aMcY0aNXJ9+vSpGfDUECEgBISAEBACSUEgMYQ/btw4I/wjjjgiKdiqnUJACAgBISAEagYBEX7NDIUaIgSEgBAQAkIgPARE+OFhq5KFgBAQAkJACNQMAiL8mhkKNUQICAEhIASEQHgIiPDDw1YlCwEhIASEgBCoGQRE+DUzFGqIEBACQkAICIHwEBDhh4etShYCQkAICAEhUDMIiPBrZijUECEgBISAEBAC4SEgwg8PW5UsBISAEBACQqBmEBDh18xQqCFCQAgIASEgBMJDQIQfHrYqWQgIASEgBIRAzSAgwq+ZoVBDhIAQEAJCQAiEh4AIPzxsVbIQEAJCQAgIgZpBQIRfM0OhhggBISAEhIAQCA8BEX542KpkISAEhIAQEAI1g4AIv2aGQg0RAkJACAgBIRAeAiL88LBVyUJACAgBISAEagYBEX7NDIUaEhQCc+bMCaoolSMEhIAQSA0CIvzUDKU6AgK33HKLW3311d0jjzwiQISAEBACQiALARF+Fhg6TDYCd955p2vSpIlr1KiRu/vuu5PdGbVeCAgBIRAwAiL8gAFVcfEgcMcdd7j55pvPNW3a1EH8SkJACAgBIVAXARF+XTz0K4EIeLJndc+xkhAQAkJACPwTARH+PzHRmQQhwGqelT1kr5V9ggZOTRUCQiByBET4kUOuCoNC4K677jKih/CHDx8eVLEqRwgIASGQSgRE+Kkc1vR3CqW8+eef3xT0JMZP/3irh0JACFSPgAi/egxVQsQIjB49OkP2t99+e8S1qzohIASEQDIREOEnc9wabKvHjx/vWrRoYSv7m2++ucHioI4LASEgBMpFIDTCv+eee9yee+7prr322jptevnll92BBx7ounTp4s4991z3zTff1Lme78e4cePsJX/EEUfky6LzKUdgwoQJbsEFF7Tn4IYbbkh5b9U9ISAEhECwCARO+L/88os7+OCDXcuWLe3FvMcee2RaPGXKFDu/1FJLuU033dSud+/e3f3111+ZPPkOPOEfe+yx+bLofIoReOqpp9wiiyxiz8xVV12V4p6qa0JACAiBcBAInPC/+uord8kll5iJFB7P9tlnn0zLDz/8cHthv/jii3Zup512st8zZszI5Ml3gCiX8jp16uQ+++wzmyQgRYAISEgORowY4ZhwfPHFF27YsGHunXfesWv333+/Y3VIev31102j+4cffnDffvut5Zs2bZpde+ihhxx5SW+//bZdoz/z5s2zeyZNmmTXnnzyScc+8t9//+0+/vhjy8f377//7kaNGuWefvppy/fcc8+5kSNH2vkvv/wy0yYmOPfdd5977LHHLN/UqVOtfOqhXZiXTZ8+3a49+OCD7t///rcdc45rtPunn36y/vo2Pf744+7ee++1fLNmzbK6wOGPP/6wNtAW0rPPPmu/f/3110zbP/jgA/d///d/bsyYMZk2US6a79Tz9ddfW70zZ860Mh544AEHViTaBNZz5851P/74o91Df0iPPvqo9ZNjjyc4/Pbbb4aTfw6eeeYZq5s2fPTRR2ZL/+GHH9oY0/ehQ4e6JZdc0sZ/0KBBVrb+CAEhIASEQHkIBE74kCDplVdesRd0NuFvvvnmbrnlljPCIs+AAQMsD2TuE/cj5odoIRo+/EYTG8LnA8FAZBxvueWWduu+++5rv5kMQEZcu/zyy+1aq1atXLt27ez4lFNOsWtvvPFGpo0nnniiXWvbtq1bbLHF7PjSSy+1fBApBEp5bEWQ6Ae///zzTyNPjiH67777zs4zKSH5CQ0EzYSDfJdddpndxz70+uuvb/n8RAjiZUJCvtNPP92utW7d2i299NJ2zDmugS2EyPH+++9v1zbccENTZAM/CJJr4AAJc7zzzjtbvq5du9pviJcJE9fwP89ECfO2DTbYwPIdcMABdg0CZrJAvosuusiuQb6rrLKKHZ966ql27fnnn3dMCMh39NFH27X27du75s2b2zH95ho+7hlTjnv27GnXOnfubL+ZhDC2XLvtttvsWps2bew3GvmUoSQEhIAQEAKVIRA44ftmeJLwhM+qDgJYb731bNVIPk9M2X7Peel37NjRLbHEEg7RP59lllnGiJiXfuPGjY3IWCWz2mMFTWLSwASCVTLEiX7A5MmT7do111zjbr31VjtmNXneeefZipQVMPkmTpxo11ACIy8JUuXa7Nmz3ffff29lP/zww3YN+2/qpg2Q3DnnnGPftP3iiy82IiXj2LFj3cCBAx3nIWjKo1zuQywNuZFY6Z9//vlWD2RI+1iJk66//nrDiWPOcY12Iwmgv36lzcr/iiuuMKkDEgvqAgekDhdeeGFmpY0UgDaxckcCQj5W6UxeBg8enGkTfaVN1PPpp59avUhRSOhleIU58KQMJlpMzLjniSeesHxo0HvxO/0GJ3D4+eefbfLgJRdIS5ic0YY333zT8oE7khQmDEwAmETRFiUhIASEgBCoDIHQCJ8VHy9qT/iQXIcOHdzyyy+fWeFDRORB9OsT5NitWzdbQbKK5EP0M1Z6vPxXWGEF99577/ns+k4pAkxuFl98cXs+kLrwnPiJREq7rG4JASEgBEJFIDTCR0GPl7QXg9OLXr162Tm/7wyxs2Jn1ecTImnEy6xAWQnyYZXK/jLlHXbYYT6rvlOKAHoZiy66qI03Uge2ORh/xblP6YCrW0JACESCQOCEz55x79693RprrGEvbPaqt9lmG4ciF6s2fJ5na+kfeeSRJXUU5TUI/6ijjiopvzIlEwG2V9jOYawvuOAC6wTbQYjzUepTEgJCQAgIgcoQCIXw9957b7fddtu5XXfd1aEktvXWWzuvkQ1x9+jRwyYB7DnzMi8lecI/7rjjSsmuPAlEAOsGT/boJ/jEJK9Zs2YZvQZ/Xt9CQAgIASFQOgKBE37pVZeXEwUvVn3HHHNMeTcqdyIQQPqD5IcxRgkwOzExxFETon0lISAEhIAQqAyBxBC+d7yDCZtSuhBA+3/ZZZc1sj/rrLPS1Tn1RggIASFQIwgkhvBx9sLqr2/fvjUCnZoRBAKYEK600ko2tv369ctZJD4YUNbEeY+SEBACQkAIVIZAYghfe/iVDXAt3/Xaa6+Z2SUTuXxkT/sPPfRQcwrk/SXUcp/UNiEgBIRArSKQGML3In0Fz6nVR6m8duFgB/8KkL33zJevBCw/8AyIeaaSEBACQkAIVIZAYggfH/eQg8zyKhvoWroLz36e7JnA4WGvUHr33XdNQ1+e9gqhpGtCQAgIgcIIJIbwvUj/+OOPL9wjXa1pBCD7VVdd1SZv+GAoRvZ0xsdJIK6BkhAQAkJACFSGQGIIXyv8yga4lu6C7HGVjKQGsi/VkQ6e94hxgL9+JSEgBISAEKgMgcQQvvbwKxvgWrmLPftKyN6330dh9L/1LQSEgBAQAuUhkBjC9yJ9edorb4BrIfeMGTPqiPFLXdn7tjPmhDgmAqOSEBACQkAIVIZAYghfnvYqG+C47yIEb7t27UyMj3lduWRP+4mquMkmm1g8hrj7o/qFgBAQAklFIDGE70X68rSXnEdt1qxZbs011zSyP+SQQ2RWl5yhU0uFgBBIIQKJIXx52kvW0zd79my34YYbGtn36dPH/fHHHxV3YPTo0eaY5/3336+4DN0oBISAEGjoCCSG8LWHn5xH9ZNPPnEdOnQwsj/ggANKjoiYr4f777+/lfXEE0/ky6LzQkAICAEhUASBxBC+N8vDnEupdhHAdG7LLbc0giZMcqnhjwv1iDLfeOMN99NPPxXKpmtCQAgIASFQAAERfgFwdKk8BCDmrbbaysh+jz32cPPmzSuvgDy5P/74YzdlyhT3n//8J08OnRYCQkAICIFiCCSG8CXSLzaU8V7PXtnvtttugZKzF+nL0168Y6zahYAQSDYCiSF8r7RXLNBKsocjma3/4osvMmL8XXfd1RHsJsjE2J933nnuww8/DLJYlSUEhIAQaFAIJIbwvVmeouXV1vMJ2Xfs2NHE+N27dw90ZV9bPVVrhIAQEALJRiAxhO8d7xx77LHJRjxFrf/qq68yK3vE+EHt2deH6Mwzz3SrrbaamzRpUv1L+i0EhIAQEAIlIpA4wj/mmGNK7JqyhYnA119/7bbZZhtb2e+8886hatCfccYZ5sDn5ZdfDrNLKlsICAEhkGoEEkP4XqQvT3vxP4/ffPON23rrrY3sd9ppJ6c49fGPiVogBISAECiGQGIIX0p7xYYymuuYxm2//fZG9jvssIP7/vvvQ694woQJ7tJLL3WY5ykJASEgBIRAZQhUTfi///67++WXX9yvv/6a+eRzo8p5n497/vzzz5JbLbO8kqEKLSNk37Vr1wzZf/vtt6HVlV3wPvvsY3U+9thj2ad1LASEgBAQAmUgUBXho6TFKm/ZZZd1yy23nFtxxRXdGmus4bCbrh8VDXer2267rVt55ZUtL/f069ev5KZ6kb487ZUMWaAZf/75Z7fnnnsa8bJ3j1g/qoQ5Hvv3QZv7RdV+1SMEhIAQqAUEqiJ8VvdXXHGFI175ySefbETfqFEj17lzZ/fXX3/V6d9rr71mZEFAlXPPPdeddNJJ7p577qmTp9APudYthE6413Bp26tXLxs/3OZ+/vnn4VZYr/TvvvvOffrpp4G46a1XtH4KASEgBBoMAlURfn2UBg0aZKQwatSo+pfc66+/7uabbz6H0h222/nE/v+48X8n8LLGZOL444/Pl0XnQ0Agm+w322wzh0e9qNO//vUve3aeeuqpqKtWfUJACAiB1CAQGOFjk7300ku7du3a5TTRevPNN12LFi2MtJs2bWqi/dtvv70OkDNmzHAvvPCCiW8R4frP5MmTnZ9MIE1QigYBROh77bWXjRnbMWzLxJHuuusu17dvX/fuu+/GUb3qzIHA888/7wYOHGj/l/xvpu2D5HLo0KGp61f9cRo8eLC77rrrUt9PxvLKK69MdT8vueQSe2YLbbcGRvg8OKzAL7/88hyvB2dOWe677z7HhzyQ/0ILLeQ++uijTH5WkJSR74OEoG3btu7FF180HQFCr15wwQV2Pw8tAVsQ/yJN2GWXXdzDDz9s14466ih36qmn2jHSB5zEICL+4IMPLB+EQmJbgrykhx56yK4xUZkzZ47r0aOHu+GGG+zagAED3IEHHmhteOmllywfkxP2uYkQB/AkMEEUziqZaG+0iXLRbzj00EPdWWedZfmY+Oy+++4O23Y00XFPSwx4EhIN72yIc7SddpOXe3ybzj77bHfwwQfbPU8++aTVxTYKypGQNm0h8Q9PmzCle+WVVyzfM888YxIX7qcc0siRI90mm2xiY7HMMss46U4YLPrzPwT43+M5ghjrk0jSf/O/csIJJ7i11lrL3lW8r5Lep1ztp5/9+/e3RdpFF11kfc2VL8nnGDv6ue666zq8tKbxec0eH/pZSBIaCOFDHijjtWrVquT9XcS0EDuE6RNkA4lBrtkfXixEYVtggQXsnhEjRhhBMWHo0qWL3e7LY7vg0UcftXxDhgyxaygTojtAgmSp96233nJTp061Yx560jrrrOPatGljx8wGyTdx4kQjWI69D4BOnTq5li1bmpXBmDFjLN+9995rJmpNmjQxEqUQvzpmEuK3JK666iq7b6mllnJbbLGF1YXUgvKZ/DDB4Bg9BxISk1VWWcWOOcc12j179mw7ZuJAwr0t+P/999/upptusmvggGY999AWErg2btzYIZEZO3asXRs2bJhZTyy66KKGJyFtN998c7vGSw/CRxmTCU0c6cILL3SbbrqpRcyLo37V+U8EmAA+++yz/7yQkjPvv/++452S9sTCASXrtCeeVyJupj3hmI73fr4UCOHfcccdRg71xe2QJStqFPj4BwJwzPLee+8985wGgWev8PM1kvOYZEFcmGixYobYpk+f7mbNmmW3sTJmRYtuAKLoV1991VbBXITc33nnHcv35ZdfumnTplk7IDDyeSW0t99+2/KSkX8ErmGJgHIi93iRNnVSN23ADp18fLNyR7rACpyEdjlt4jzEm90miB0cSOyLc416wIdj2kmaOXNmpk2c4xrtrt8myqJMEiId8lEn2NMGH3jGtwmTSN92zOvIR//Bad999zWskbhwDmkGQYvK1buwxgTw58QTT7RJB9s9SrWBAC9QpFVpTfwf77fffva/m9Y+0i/eyyyo4prMR4Ut0sunn346qupiq+ewww4zrszXgKoJ36/uIWNIxidIDvE751mN8nKYf/753WKLLWYKWJxnFV1qGj9+vJVVjilfqWUr3/9H4KCDDjKckYgwbrWS6lt91Eq7Gmo7RPjpGHkRfjrG0fcidMJnfxtf5zfeeKOv075Z/bI3zt6QX5GyB4053jnnnGPKeXVuKPLDB8+RL/0iQFV4GTG+X9mvvfbaGa92SAkITcvkrBxHSRU2I+dtiI55vrwkJmcmnYwUARF+pHCHVpkIPzRoYyk4dMKPqlfytBce0mwPoISF1AWy9+J/akQnYsEFFzRdAiYFcSREjrRNnvbiQD93nWETPs8ayqznn3++baf5VrBdhR4MyleFtJF9/kq/wxLps4WJxji6RNdff70pD+drI1toKM+iJAwOTLy5Dx2moCbfYRE+Flcoy1199dWmL5Svj5z3Fh++j+hyoYjmtzUL3VvqtTBE+mx38izS3muuuSazvZyvTeirsQBmPBlLFr4oeAfpMlyEnw99nTcEEJWjjAihEoLW6x94eHixoB/AJACpTRyJly8SnjBf8HH0K8l1hk34PHfepTIeHr3+CCTJs7r++uuH6nkxDMLHUgflU9rvTZQJQgVx5Eoo+66wwgqWv3nz5mbVhEkzVjxBTb6DJnz0nFAkRsmXfjZr1qyOYnaufvptRBSeF154YVPORnka3aOgUtCEjyO41Vdf3dpLP/mwWHruuefyNhnTYvJhbeb7iYdarM6CSqkhfC/S9yZqQQHUkMuB7P1DiDVArhcPL16UHrGBj2sfnS0hFAuDWtU05DEPqu9hEz7tRAl1iSWWMN2fJ554wkxMN9poI7MyCVthMGjCh6A9sbF6hRgxE4MA0EvKNZnmmccF+QYbbOBYMbN9ijkx53Plr2RsgyZ8FOMwTWZ1v+SSS7rFF1/czH8LtQ0rAUgQqyGUpdm6Y3XvJ3mF7i31WtCEz/Y0q3MkNphB+4kZfc+X+J9hvFFkz+4nEtagkgg/KCRTWI43B8TsD2uAXAmRPquLVVdd1SwIcuUJ+xz/KLShIWjZho1lUOVHQfi0FZNZXpKEYYYoOca0NOzJX9CEz//XIossYnFE5s6da8MwadIkm8wwicklvvaEj4lsWHEkgiZ8vyigXEyPUdLG30ehBOGj0B3kSrd+fUETfv3y/ZYo5uP5JmP8z2ASXchOvn655f5ODeFrD7/coc+fnwcSxyK8PLGkwK4/X8IskdC0ODYK+yWbrw2IcXv27JkxO8yXT+ejQyAqwmdFiy8InlX8biAChSjDTkETPo656AOmrojqSazy8X3B6tCbF2f3C8KHNLkPHyH47WCSnksSl31fOcdBE76vG+kMK/xSCN9v3eDLhS0P/tcfeeSRvMTp6yjnO0zCZ5y80zict+VLkDFjudJKK1k/cRSH5DrfBCFfOYXOp4bwJdIvNMylX+PhwnsfD14xsi+9VOVsaAhERfjgeuaZZ9rzyjPLSzKKiWfQhM8khfazWocgSChrQYj5CB8vmaeddpr1eeedd3bLL7+8ldGhQ4fAFL1qgfDx44KeBl5EMQcGJyZCvPODSmES/i233GJtxvEZbuDzJRQwcYBGPxlD+slefjlB5PKV7c+njvBllueHtrJvdCB40Eole8SPrCzwgBjkXlM5rUfTF5Euzo6UagOBqAgfp1Qbb7yxPbM8t5Betr+PsNAImvD9Cp//JU/4SC/Y427dunXGCVeh/tBvFGvBAalXEKkWCD+7H2xdsMKnj7179w7snRMW4WM5BNHT3vqm6dn9qn+M8zgcmnFf9+7dTT+lfp5KfqeG8CXSr2T4697jxfiIlAqJ8bPvgvAJicvKKi7CJ74B+5/4/FeqDQSiIvyLL7448/L3Cqa4vMWxV5gpLMJne8KL9PFqickrFgel+pjA+x8k4V1vV4tBrRE+/bnzzjutj9ttt515Oq22j9wfBuGjl4GmPuNx+umnly2a967N2Q7A62kQSYQfBIoJLyN7z74csq+VbjPRQFPfKwTVSrsacjuiIHxMRDHPYu8exS9+sy+MglfYfvyDJnzE9yjHoo3uldPQi4EseEkzgUFxD98D3rQLDfDsiTnuvSmDe4jNEUQKi/DRT0D/gNVvtkIw/8vjxo1zxCBhlYtjL+zTvWtfzvkVPg7dgvqfD5rwmaARv4SxINZH/YSFAYvUu+++2yYt9I9+euVLrDb69Olj97MQC2oCmxrC93v4EunXf7SK/8a7IQ8me4XZL5Didzr7p8TLHvtUQT2UpdSbnYc284LAlEWpNhAIm/DZpz/kkEPsufUBoug5cRV4lgnXHNSqKBeiQRM+k27MuGg7q0Je9l5r38eI8AG71ltvPWsShAHBs52GVMOTPbgEJW0LmvBxx814oXNAX/kQ4AznNMQJQZnPn2eLjv9pNNvRbaBf22yzjV3HFNHHGsk1PuWeC5rwib7q+8EEBV8meCpFCuUjsTIxJQ/6G7igJ+gae/f0s3PnznYNiY+PgVJun3LlTw3hS6Sfa3iLn/MPJnuf7COWm5jJsipBMsA/bBzJRx0sFAUqjnY15DrDJnz27rt162ZEAPn6xDEEgTZ3mDodQRM+7WeVh2khDlrYt2ebzJM911nUQACQBonVLp7cID/yI/rFoxur4qBS0ISPvwD0DIhQSqhWPhzvuOOOtrpFisHKmDH0Tr4IY77DDjtYH3HYwwIFvx9BpqAJH6+A7du3N+sJJmL0kTFC6RAM2LZhosOYeasKfEkwESIfkz4sLsgbZBLhB4lmwsry4XQRrWWHIS6nG4imePkhlgtKvFZO/eRlhkxcBkL6KtUGAmETPit8CC+XRzm/xROmtn4YhO9Hjokz5J/LHIvz9SVp9BcsglrV+3bwHTTh847AuoB+8O2PGUffX47r94X7uCesRUXQhM+z5/vnv337/XuSPtbvJxh4bLLHIajj1BC+RPrlPRIXXHCBiYyWXnrpzJ5heSX8NzcPNnuJiKn8P2wl5VR7T5x1V9v2NN4fNuHHjVmYhB9337LrD5rws8uupeOgCb+W+pbdltQRvlzrZg9v7mMc5bB3hC0rgSmqSYjgsBVGDBnW7LtY+1BqwcWoV2Yqll/Xw0cAwkcUm9bEdgEe4NI+0SRGBu5g4/rfjur5QQeiIVj5oEtQKMhYo6gAr7Ye7eGXhuBll12WIfsgNHnZL0RblnLDFKEW6h1+uVFyCTKYRqH6dK04AhA+3tDSmgh0g7vUtCekd3i6Szvho0gYtmVHLTwrxGdIBeF7kb5W+PkfK+9rvGXLlk4Kbvlx0pXqEYDwN9lkE7NvhhjT9EGDHm9oOKfCOQqfNPXP94V+ojiIQi72/WnsJ30iaBGxQLp27WrHvv9p+vZjh8JkIX2txKzwRfiFX9J+ZQ/ZT5gwoXDmMq7iFYxwnOyB1VdAKaOYqrLeeuutVj9R+5RqAwEIH41xTIpYDafpQ5/uu+8+e+4R7aepb9l9oZ9IabCGwCVs9rU0HdNPJjb4OEjj85o9Vlg0Eb0vX0oM4Uukn28InbviiitMjI9db9BiVuxkMTXhpZBLYzp/q4K7wv4bOglhRpkKrrUNoyQIv9CLJeko4AWvT58+Se9G0fZjdov9eNp1FdjbLrTyLQpUQjLglbSQdFeEn5CBzNdM9rchwzDIPl+dUZ/HphVPZXFNOKLubxLqg/DDjkkfJw7S0o8T/eDrlpb+fzFNDOF7kb53ShH8I5G8EocMGWJkH7QYPxsJbEZHjBhh7jDr2wdn5wvzGFE+iijeB3mYdans0hAQ4ZeGU63nkllerY9Qee1LjVmeRPp1Bz6b7MePH1/3YoC/sj3txbXCxmwIKUYh7dMAu6yiSkAgbMJHxOwdmORqDtfDFEMHvcIPsq3ZZWUf58Kp2DkRfjGEknVdhJ+s8SqptTfddJMRYIsWLQKNGZ2rckh+4sSJ5ryn0As4171BncMlJS5Gcf6jVBsIhE34SHMQwxIxLdv/Aq5I0bZGCQsfEWGlIAgfiRimpKeccopFnDzvvPMKTlLwpodHSdzQEkGP75tvvjnjShfTOaKyEWIXd7vkwT/G0UcfXbFZXbWEj/dLrIO23nprRwwAdH2IdpdPwRf33oQ7Ji994IObXT4sYkjEh6c88tFH3PPyHHgXtZWMeVAifZQ5CdW9zjrrmHtnfudKTMQI+IQ5IH0k4ihuzmfNmpXJfv/991vsAPzr008wIaYAz16lKTWE70X6Dd0sjyA2rHYhe8Irhp14cOfNm2euPatdTYTdVpUfHQJhEz6TSx/OuVevXhkfEPiE4PmH8MP0CxEE4UOEK6+8sgWtos1Yu+CqOl+64447zFkWpAkJcA8fgu6QmOBADJxjMrDLLrvY5Oecc86pWL+lWsKHxHDwhd94H/hmgQUWMNLO1U8mQJg80kf8yoMJ99MnJjMkP+4bbbSRxYpngoevAO97P1e5xc5VS/i8+1COJq4IJn5gj598nJzlei8SCwJ/+eRhrJo3b259BCPep6QzzzzTzkH03bt3t7Hcc889q5rYiPCLPQkJus7sn38M/qGiIHug4SVDSFIeyricc/AiIEBFJcF/EjS8idbLszIAACAASURBVGpq2IQPGChqEuGR8Livvvqq++abb8xmnJfnlClTQsWrWsKHBO69917TmCZ8Kv+3mEwVInxMAL3lA6t9oqtxH06n0KWh/1jMEKglqFQt4ePJM9uDHWROm/v3719SE+kTK3j0kBhjko/uGeT/e7WETzwPnkMmIdlRO5FE5SJ8ouM98MADGXL3ytULL7ywe/rpp62fTNTAKkjLqtgJnxCWDCBODtiLZbZOHOhyExrBgMPsryEm4io3a9bMNWnSxJToosKAB5eHiJl8oZdVmO0hCBAvBURkSrWBQBSET099ACgmfT5+PGaaYW8vVUv42aN0+eWX27urGOFn38MxDmN457HCZWtt7ty5RjgEw4KAsCnPJp/695fyu1rCr1+H17chlkcpyY8pK35PnP369bN+s3WJwi7eAKtN1RI+2zGMBSGMv/jiC9uq4bvUhG8U7kea4SMkEjKYc0gO6Gc1EgzfjtgJn5jGdAqzMfaeEEkxsyk3oZhGOYQUbGhp5MiRRvb0H7GfkhCIG4GoCJ+XICvaxRdf3KQ8fEdhTx0k4fvYFuUQPkTOapL/eS/qhvAJC8w5/+F9Onz48AxZlvtcBEH4vJshbhZ2vOcRYZcSy57VPfv09GX06NGZpqPz4PvH9zLLLGMYVGOlUy3hE8OetiBhWWKJJewY0f6oUaNKwh6JB/ejc+HDGxNiN7ufTOROPPFEm9hlwCjzIHbCR0mBTp188slF99xYvaOsse2229b5bL/99jZRYIWLiA8REvt3u+++e0Z0xMyLfHiGmzp1qu0noRRBwu3gMcccY8fDhg0zURniQh5K6rrtttvsGi8xJBGkcePG2TX+8ZnJUbZXKuEfkD1ElHJQKGJfhm/2ZtiX8hOagQMH2uycAZ42bZqVR7nc17t3b8dMlnT99deb2A4FGGaztAlTOBKY0O/555/fPEXZyQj/8E9GEJHjjz8+thU+LwOwylZ4iRACVZUDgagIn6q9SJz3CA5UojAPjZvwvbgXUsEJEIl3HiJ/3ld4n+S9BiaIibPF6jmGK++pIAjfbz148mKVj3VPscSWB/dAgnPmzMlkRzETr3gsblgFt2rVyvINGDAgk6fcg2oJn+eOtjLBuvbaa+0dz28CixXzAPriiy9mJgnoYPnEuNJHOAnyZ2JDmUhTK02xE75f4bPvxsCifAEh50oQHR3O9WnatKk92I0bN3aItxEvM9NCeYLEC4g87DkTNIYy/NZBu3btTLpAPj+rIr47JEw+HioSs00ULUi4DeUa/0hElEKU7icNaGkSdpZ/QPbSyQeRs33BXhSKFyQ8WKFcB2niJY58PCzcx6oFzVMSkyGUQWbPnu142Dm++uqrTQOfe/jceOONljfqP0xC8CmOdCYuszz/YkNbX6k2EIiS8NnbJVoi75CoIvTFSfiQAu8bxL+FTFHRhEe7nfcDi4tKUhCEz/sRvLDm4X1Me3hHFlqRsyVDHvIyoSuU/OSH92Wl76BqCZ/7aSsTEZ9QtOPcmDFj/Kl/fEPq7du3t3wQeaHJqnePjqKfV+z7R4FFTsRO+IhtEPWwQkMjE4BQwIJI6idPeJhfZH9Y2UF43MsKHAUW9nuYTHhTLYgecCFTFF4gdP/AIRakbBJiMcrmweFDPr8Pxura76NwL9eoi8kF9/g2Uyd10wZW7+Tjm4f43XffdWhokpjl8ptBphzfJu7jHw0pA4nZLeVTD//En3zyiU1WmCwwe0dqgCiJiU7UibZ6Lf2o6/b1+bEFQ6XaQCBKwud/iJUuqym//xk2CkESvlfYYuVbLCEe53+exYyXUBa6x5MOZFFJCoLws+sFNxZlvKvRMciXiFxHP1EIzrcA9PcOHTrUykPKms/cz+fN910t4eOylj6hj+ETXMS5fH5QeG917NjR8iAh5V1aKLHSpzxM+H755ZdCWfNei53w67eMfSw6Va4GJv6BuY89jrQnHqAFF1zQ+oudJ6saIlp5MX+U/UczH21TVhphK0rl6xcTIF4Klc5685Wr85UjECXhIzLFvI39Ya/hXHnLS7szCMLnf4eFAwpsvLt69OhhCw7/MucdyPsQQiMRBGX55Zc3CR9blOTjfrYp+d9Dd4HVMAsOznvdHnCpVK+hGsKHfPETgPUQbWThhLSSviL6ZnHFebyjYk7tF0z01RMoUtDs9woLRBQ1UdBFYooZH3bslIkuRKWpWsL35tCYS7KQQ2mSCSgTFhZuvJvYfkX0Tz9ZTCLNpt1YLkD+LArBhHFlUYq0GSsH+snkCBt88nuJcyV9jZ3w6WS2GAaNUzrFw11O8p720m6HD8GzZw9GaKnGnXi4aUubNm1iM8vjpUAb2KpRqg0EoiR8trnYx2XlyAsyihQE4aN9zdYfW408v3zoB6RI8j4F2MqE9Px2I/lQ4GIbA0Lhw+SASS8TAn5TLvnY98UpVbHVYz7MqiF82oyCHZJI2uT32nFK47ff+KadjJ03paQf3MN5tkKzE+QHHpApfcMEGfzQI+Japalawoeo0RmjzbSN9qNA6rda2afnGh+2inlm/W8Wb61bt7Yx5R4wQxINF7JtQz/ZrgKjnj171tFnKLe/sRM+XpMQxwGW18jkBV6uaMYTfpq19NEH8GR/ww03ZMaaf5CLLrrIHqTMyYgOamGFz9izSgrCPCci2FJfTZSEzyoRkTWrW1aAUaQgCJ8JKgsUtjRR9OVFz2+vkc6ih/PepwZ74OThHJJM3nX+w5YfiXcBJmLoE7ESJqxtNakawqdeVqq841nd0jckE+zp+8R4sTJnWwOpBAl/A+RHPO6lHT4/3yhJo0NF39kKZmsje9GYnbfU42oJn3roCwRPP9mPz558Yr5MH3GS9OOPP9oqn3E67bTTbIKHSJ8P4wZeJCQiKGxznvFGiTEXHqX2kXyxEz7iJ8QcKM5B+Aw+D0m5Ke2Ej9icWR6zQhT7spNX5sjeP8q+HvYxk7O4bPDD7pvKrwyBKAm/shZWd1cQhF9dC6K5u1rCj6aV1dcSBOFX34rwS4id8IPqYpoJH/0Ev7JHO79+YsaLkgv7QFEnFAqR0KANXO0su9K2I+pksljtaqbS+nXfPxEQ4f8TkySeEeEncdTyt1mEnx+bmrjCHhd7Qqzs8b2dK6EHgfUA31EnxHDsK/GCj2uVj4gTM8ZyFT2jxqoh1cfz4N3AprHfWPz06dMnjV2r0yd0dNhirVQHoE5hNfwDKXNDeH8QSIkFZL7UKN+FWjufxhU+e3ae7H2AjFy4s+rPJerPlVfnhEAUCGCSxPYcCkooY6Xpg90/mufYfbNnzidN/fN9oZ8EJUN6h7ljmvuJ9z/2y+mz73/avhk/+lnIN78IP4q3Y446MC9CExciR/mmUGJigKgmKpOk7LaggIKCDWL1uFb4PMDoL3i/Bdnt03E8CPDyxHEKxI8GdZo+9IlVL5KtNPbPjxV922+//ayf/lwav+knY4mZXJrHk2cWM89CHklF+DG8LyFwT/ZoctZywqZ0ueWWsz30uPbwvT1rIa9jtYyh2iYEhIAQqAUERPgRjwIudj3Zs2ouJWG2Q4yBUjxvlVJeOXmwtcUcxZvUlHNvUHnxtIZ0oxo73KDaonKEgBAQAklFQIQf4cixssdBBWL8Usme5hEsg6BBcUTKwyQPL17sfWV7xIoQNrNpRYmqWhvVKNusuoSAEBACtYaACD+iEWGF6qMhVSLGj0uLFpNAvF0R/wAnPHEkHzwH6YiSEBACQkAIVIaACL8y3Mq6i9C53hVmJX6S8bKFL2fvbausyqvMTMAaQnHiHapQpKcqqyl4OzEE8L2NaF9JCAgBISAEKkNAhF8ZbiXfhY9l/F8jxu/fv3/J92VnxPyJ++PytJfdFh0LASEgBIRAMhFIDOFjLwrpJcmXPnaRaLjTbnwqV5rwTY3CXhy+5PG0t+aaa5pNcrnxDyrtb/37mOh07tzZImfVv6bfQkAICAEhUBoCiSH8pDnewRd327ZtjewJnlFNIrISCmt8R53Q0CcOdSUBj4JqK+E1F1poIXMvHFSZKkcICAEh0NAQEOGHMOLENg6K7GkewXQIEXndddeF0NraLxLdAaQLcSku1j5CaqEQEAJCoDgCiSF8L9InNGEtp7feesuCzSDGx994ECT18MMPW+xkvqNO+O/HqoCwl3FIGOgvSo833XSTw++3khAQAkJACFSGQGIIPwki/WyyR6s8Lq32yh6F3HcRoa9ly5a2jx+XWV7v3r1ta6RQUIjcrddZISAEhIAQ8AiI8D0SVX5D9quvvroRE37vg1RwY2W/2267uQkTJlTZyvJvZ1WPOSBhNIOQVpTfAufQh2DChz6BkhAQAkJACFSGQGIIv5ZF+niB82RPGMYgyZ5hJVBJ48aN3Q033FDZKFdxFwFzIFwmNHF52vvpp5+M7OPaUqgCPt0qBISAEKgZBET4VQ4FZL/GGmvYyp49+6DJnuYRtGbu3Ln2XWVzy74dT3vNmzd3q622Wmye9o444gjXrFmzWKIFlg2YbhACQkAI1CgCiSH8WtzDR8ztyZ6VfVjhYz/44AM3evRox3fUad68eW7QoEEmXYhLJ+Hmm2+2sJZIGZSEgBAQAkKgMgRE+JXhZjGH27dvbyv7Qw45JNTVt/e0B/EqCQEhIASEgBCoBAERfgWoffLJJ26dddYxsj/ooINCJXuax7bBnXfead8VNLeqW9hK2HLLLd0ee+wRynZFKY0bOnSo23333R3+DZSEgBAQAkKgMgQCIXzEvthJYz4FMWCzjf12rjRs2DDLt+uuu7pddtnF7bfffg7Tr2KpVkT6kP3GG29sZI/3uShM1VCWQzcgDqW5r7/+2vq78847x0b4WD00adJEe/jF/kl0XQgIASFQAIFACB9zsVatWrn11lvPLbzwwpmVby6C2nHHHe36uuuua/m33XZb9+mnnxZo4n8v1QLho8DWoUMHaz+TmyjInt6zh7344otb1LqiQKUwAxH7vv3229gc/6QQUnVJCAiBBohAIITPKtAHdvHE3KZNG4c5Vf200047WfS4H374of6lgr+ffPJJI9qTTz65YL6wLiKFYHKCB73u3bs7SCiqNHbsWLfFFlu4cePGRVVlph7GEJE6kpm4lPamT59uPgjYXlASAkJACAiByhAIhPCzq8ZJDKS4zTbb5CQICJ/r7dq1cx07djQbcy8JeOSRR9xtt91m5ALB+M/IkSMdRI9Yd4cddjCJAPfcfffdjokA6aWXXnLDhw+3IDO4YL3jjjsy8eMhSu+WFptyymXCwaqRfNOmTbMyxo8fnyFVnM1wjXxfffWVRYuj3WxD5JrIZGOQpmOkGi1atIjVLK9nz572zMjTXpqeLPVFCAiBqBEIlPC/++47t/nmm7v55psvQ7D1OwSJHn300e7ggw92Sy65pL3IR40aZdkQ80Oq+T6LLLKIXWNSgAkc+Vj5kvbZZx/7DdlD3FzzWu2Iw5lgkE455RS79sYbb7hXXnnFjk844QS7RsCbxRZbzI69ZjzKcni5o7ytttrK/fjjj3Y9yj8TJ0507GM/88wzUVZrdYHzq6++agpzfmIWdSOeffZZMwtk8qEkBISAEBAClSEQGOGjVIZiF8RIdLdSkhf/E/6UxMr77LPPdueff36dz8CBA80OmxU+EwpW35APcdL9ZOGhhx5yF154oUOBEHt1Ar5MnjzZykUkzSSBBHkMGDDAHNkgpicfhEq65ZZbTHzNMRrhBOpZaaWVrE+I81944QXLF/Uf8KTvcUTLQ4zPJAopR1yudXE8hBJoXFsKUY+36hMCQkAIhIFAIISP8tqBBx5oIVw9sfrGEsed1TREzAsb4vCJ1TMThP79+/tTeb+j3sNH3M9ePe1jIlOuzkHejlRwgS0EFBvj2EpgUoRCJtKXqJQU60PExAvpDlHzlISAEBACQqAyBAIhfFbQECMx23v16uUwuePDSnvEiBF27ZJLLjF7dcTinTp1cuzlk79169ZuxowZRVvvpQHHHXdc0bzVZpgzZ47pF9AntPGRHtDuOHzZ0xdIF7LjO+rEFsYZZ5zh2OKIy5f94MGDXefOnd1rr70WdfdVnxAQAkIgNQgEQvgoz6FM16VLF9tT32yzzRwfiPzFF180gr/33ntNJIwEgJc319nLL9WZSlSET0S27bbbziYp3bp1M12Bp556ymLcQzxxJLYumHxcccUVcVSvOoWAEBACQiAFCARC+FHgEEW0vO+//z5D9kxgEOvXQsKKAAXEOFa4TICYyOFkKKxYAcUwRrfj0EMPjcXTYLG26boQEAJCICkIJIbww17hQ/bbb7+9raTZcsi2+Z41a5aZD6LV39AS2xtrrrmmTYTCiARYCp4HHHCAjYs3wSzlHuURAkJACAiBugiI8J0zDXBW9IjN0cbPJnvgYoXJtRNPPLEuehH9YhtkhRVWML8AEVVZpxosIuLS0Kch6BFgkhfXhKMOGPohBISAEEgoAokjfDS2g0xYD/To0cMIfdNNN82pGIdlAe6DWenHkXA8RBheb4IYZRuwsrjrrrvc/fffH5tZ3Lvvvmt+9JHCKAkBISAEhEBlCCSO8IPU0sc9rvfiBtljb54rYQeO++Ao3enmakcc51hZ40gJfwRxmeV5p0qPPfZYHBCoTiEgBIRAKhBosISPTbsnkvXXX999/PHHeQeUFXbjxo3dWWedlTdPmBdwG4yHQL6jTkx2cHmMl7+4PO1R/2WXXeaIVKgkBISAEBAClSGQGMIPUks/m+w33HBD9+GHHxZE7+WXXzZJAKaFcSTM8dAhuOqqqyKvHpJHUx+3yXHu40fecVUoBISAEEgZAg2O8Nmzx5kOBArZ+yh/tTyuKBFOnTr1H8qEUbQZ/QWcI22yySbmOCmKOuvXgSfG1VZbLRYJR/226LcQEAJCIKkIJIbwgzDLY2W/9957Z8h+9uzZJY3b008/bc6DCPwTR4Lwp0yZEgvh41KYwD2nnXZabHb4xEgghgIYKAkBISAEhEBlCDQYwofs99tvPyP7DTbYoKyV/X333ecWWmghRxCfOFKcIv04+qs6hYAQEAJCIHgEGgTho3i2//77G9mjoFdsz74+zOxjY54WV7Q23BOfeeaZsYi0MYUDu+OPPz62Ff7YsWMtwBKxGZSEgBAQAkKgMgRST/i4gz3ooIOM7Nu3b1+RLT2i/+HDh7vp06dXhnKC7/J7+B06dIhtD99LZh5//PEEI6mmCwEhIATiRSDVhM/KvE+fPkb2a621lsOBSyXp9ttvtzJY5caRcLizzjrruHvuuSfy6tHMR7oRlw0+HcY/AkGW2JZREgJCQAgIgcoQSDXhE40Pbfx27dq5t99+uzKEnDP7b7zNlRrZr+KK8tzIhGPppZeOxbWut8NHcTGuLQ2kDHg5bIiOj/I8EjotBISAECgbgdQSft++fY3sV199dTdz5syygcm+AaJjdRlXtLjstkR9zOq6adOmrm3btrGt8r2DJHnai3r0VZ8QEAJpQiCVhH/CCScY2UNSr7/+etXjhcOdli1bugsuuKDqsiopgLC4aOoH0Zdy60eUj5UCsQTi8rQ3evRoC1z0/vvvl9t85RcCQkAICIH/IZA6wu/Xr1+G7F999dVABvrZZ591Xbt2dXfeeWcg5ZVbyODBg61PV155Zbm3BpKffXx52QsEShUiBISAEIgNgcQQvnetWyh4DuFr2bNv06aNmzx5cmygBl0xAWzwZc931ImgQSg8durUKTYt/fPOO8+tvfbaqRrTqMdR9QkBISAEEkP4xTzt+ZX9iiuu6F555ZVAR5agNbjjHTNmTKDllloYymqfffZZLEpr+NDv1auXQwEyLh2G008/3aL1xRE8qNQxUj4hIASEQK0jkArCP/XUU21lTwjXMFb27CEvuOCCjpVmHOnqq6+2/g0dOjSO6lWnEBACQkAIpACBxBC+F+kfe+yxdWAnbCxifFb2YflaZ2X77bffxqalPnHiRPNnj2lc1Alf+kceeaR5uotrhU943EsuuUThcaMefNUnBIRAqhBIDOHnEunjbhayX2GFFQIX42ePMnbgkE5DdO365ZdfuiWXXNKtt956se3hs6XAOMssL/up1LEQEAJCoDwEEkf4J510kvXwnHPOMRJYfvnlHfHqw0xEyYNwUAqMI2EWuPHGG5t5XNT1Y4oH6aO8F5emPhMtxvjHH3+MuvuqTwgIASGQGgQSR/iI8G+88UYjYFaeBJYJO2H/ff3114cqRSjUB/qLH4Cbb765ULZQriHGh2ynTZsWmx0+2ynEM4jTvW8o4KpQISAEhECECCSK8Bs3bmwmd6y2l112WTdp0qQIoYq3KvzZx5Hmzp3rWrRoYe6J41rhH3744W6++eZzzz//fBwQqE4hIASEQCoQSBTh89KH7NGYx0Tu999/d5iNhfmZN2+eQ0t/tdVWcxdddJHjdxD1sWotpRzqw8PesGHD7Duo+kupmzZ++umn1m8sBSD/7PuK9cFf59sfZ9+f6zhXPrwMdu/e3cID57qnls/5/sQVhyAVbyl1QggIgUAQSAzh33///Ub2EH7z5s3dyiuvbKt8VvrFPssss0wmD8f+d/YxZfjz2eW1bt3atWrVyjVp0sTE6vzOzpddRvZxvvJ82fXLyD6ffQ0dBVbY9JstDEwPfdk+H98E1/FlcFzoWr58/h6u+zLoL/oDG2ywgZUJFksttZTVtcQSS1ibyM85flMGH46z8/E7O58vP7sM+ufzcZ1jvldddVW37rrrmiUG56L8+P7izGm55ZazZ6Hc+lEqfe+99wL5h1UhQkAICIFKEUgM4T/55JNu/fXXN/JBY3zNNdd0a6yxhn1zXOon+x6Os3/nKgMvc5j8IVWAsPidna9+GcXK8/cWypd9jWNPdkg4aEP79u1NxO7z8U1EQF82x4WulZqPvhJ8iHqbNWtmdayyyip2jjI4how5RgLCb+rlUz8fv8lHeRz7NnLMvVyjLJ+P60zqKIuYCEx45p9//kw95IviQ9uYdFA/Ey/fz1Lrpg/0jWh/SkJACAiBOBFIDOH/+eefFpedvWwi10X1ob7bbrvNXvgnn3yytSGqun09tAFvc5DOLbfcElkb8PD34YcfukUWWcRIC/G0b1Oub7Yb/Pn6x/V/189HXf6c/+YezhPLgL7vtttumTxci+JD/V66dOihh1p7Kqk3rsBDcb5cVLcQEAK1hUBiCD9O2EaNGmWEc9ZZZ8XWjHPPPdfaMHLkyEjb8M0337hFF13UfNnHtQ9NECQIf88994y0776yJ554wurHvbCSEBACQiCpCIjwSxi5ESNG2Au/f//+JeQOJ8vZZ59tbRg+fHg4FeQpFRt8CJ9thLjM4oiNAOH36NEjTyvDPY3TJerH46CSEBACQiCpCIjwSxg5Eb4IX4Rfwj+KsggBIVDTCIjwSxieWiB8thMgnYa4wsfxD33faaedShit4LP4Ff4RRxwRfOEqUQgIASEQEQIi/BKA9q51vVvfEm4JPIuPCIgCYZTpiy++MO14tM3jEulPnz7dNPL79u0bZdczdY0fP94mHAcddFDmnA6EgBAQAklDQIRfwog9/PDDpqWO85m4Eq5tce8btXkXzna23nprU5jD0VEcCQ9/WCrEFa1vzpw5GcdHcfRfdQoBISAEgkBAhF8CihAOZoFKDRMBLBWQdBBTAWnDzJkz9Tw0zEdBvRYCiUZAhF/jw0eEOFb2vXv3tlX25Zdf7r7//vtIWo0ZHuT20ksvGdHFscJmokUY5H322SeW4EEA7cPzokfAB+dHn3/+eSRjoEqEgBAQAkEhIMIvAUmcrwwePNjtsssubuzYsSXcEVyWBx980OFed9NNN3WLLbaYEc6BBx4YSaha9szxMAjJEbgIO3hWu1EmYgh4oo1Laa9jx47mbY+tnccff9zh9fG3336LEgbVJQSEgBCoGgERfhEIP/roI9e1a1ezRYd4BgwYUOSOYC+zf/zxxx9boV5bHLeu7GmHmfAMd9lllzkc/RClbvvttzfihfSiSvgAwJf/HnvsYT7sd99996iqrlMPOgz41L/77rvdc889F8lkq04D9EMICAEhEAACIvwiIKIsRzx6yA/Cv/TSS4vcEd7lCRMmWBu23XbbyGLTo7/AFsKuu+7qFl54YTdlypTwOliv5IMPPti081977TVz70vEvDhSz549re/48ucZ2GqrrRwTQSUhIASEQJIQEOGXOFqQfpyEjyh9s802s6h9Tz31VImtri4bRIs53kILLWR9P+2006orsIy7J06caAF78KOP+JzgPXvttVcZJQSXFXJHl+HNN990+++/v2ExaNCg4CpQSUJACAiBCBAQ4ZcI8tChQ2MjfMT3O+ywg9XPxCOqhGIaEo1TTjnFIgYiXh8zZkwk1aMvwASrX79+Dp0FwhOjy0BcgzgT+/e0K864CnH2X3ULASGQXARE+CWO3XXXXWcvekT7USYix6Elzgo36sA52f30EQOjUpwjbgFhgQlHSzx5SJbwtMQUiDJ9/fXXbsiQIWapMGnSJNelSxdry+jRo6NshuoSAkJACFSNgAi/RAgJSwvpXHnllSXeEUw2P9FYYIEFHEprKBBCOtiDh5lwuMMqFisBxOpYKND/M844I8xqM2WjO4AZIN8zZsywujt37py5HtWB30qh73yaN29uZoJxOSGKqt+qRwgIgfQhIMIvMqbs3Xbq1MnMsnjho6294447us8++6zIncFcRoQO0aGo16FDB7fRRhvZZ+rUqcFUkKcU7P8xR/NE17RpU7fvvvs6JgJRJ0gXhb3zzz8/6qqtPurHHA8Xu2+//XYsbVClQkAICIFqERDhF0HwnXfecd26dTOzNFbYmKfttttuDcLxCroDkydPds8884yIrshzostCQAgIgVpHQIRf6yOk9gkBISAEhIAQCAABEX4AIKoIISAEhIAQEAK1joAIv9ZHSO0TAkJACAgBIRAAAiL8AEBUy2tZUQAAAHhJREFUEUJACAgBISAEah0BEX6tj5DaJwSEgBAQAkIgAARE+AGAqCKEgBAQAkJACNQ6AiL8Wh8htU8ICAEhIASEQAAIiPADAFFFCAEhIASEgBCodQRE+LU+QmqfEBACQkAICIEAEBDhBwCiihACQkAICAEhUOsI/D8k6EugoBMoRAAAAABJRU5ErkJggg==)
MathematicsGrade-8
Mathematics
Train A covers 700 km in 5 hours. Train B travels at a speed of 120 km/h. The fastest of both the trains is
Train A covers 700 km in 5 hours. Train B travels at a speed of 120 km/h. The fastest of both the trains is
MathematicsGrade-8
Mathematics
The speed of a subway train is 150 km/h, the normal train moves at 75 km/h. The difference in time for both the trains to cover 300 km is
The speed of a subway train is 150 km/h, the normal train moves at 75 km/h. The difference in time for both the trains to cover 300 km is
MathematicsGrade-8
Mathematics
The cost of 18 apples is $9, the cost of 3.5 dozen of apples is
The cost of 18 apples is $9, the cost of 3.5 dozen of apples is
MathematicsGrade-8