Mathematics
Grade10
Easy
Question
Find the 12th term.
![left parenthesis x minus y right parenthesis to the power of 14](data:image/png;base64,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)
Hint:
Use the formula of bionomial term to find the 12th term of the following question.
The correct answer is: ![negative 364 x cubed y to the power of 11](data:image/png;base64,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)
STEP BY STEP SOLUTION
![open parentheses x space minus space y close parentheses to the power of 14
T h e space 12 t h space t e r m space o f space t h e space f o l l o w i n g space w i l l space b e space
scriptbase C subscript 11 space x cubed end scriptbase presuperscript 14 space y to the power of 11 space](data:image/png;base64,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)
![negative 364 x cubed y to the power of 11](data:image/png;base64,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)
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Mathematics
The following dot plot shows the number of cavities for each patient seen by Dr. David last week. Each dot represents a different patient. Find the number of patients who attended Dr. David last week.
![](data:image/png;base64,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)
The following dot plot shows the number of cavities for each patient seen by Dr. David last week. Each dot represents a different patient. Find the number of patients who attended Dr. David last week.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAA0cAAAEPCAYAAACJLr+rAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAHDhSURBVHhe7d0HeFTV/j18r7fYrwVpKl0EQcCGYBcbcO2K0rs0adJ77713QktCr6FDQg0Qeq8ptBRSpySZmWSSrHd/98xgQBT8/V81Z2Z9Hs8DZhJgzz5zzl5nt/tAREREREREYDgiIiIiIiJSGI6IiIiIiIgUhiMiIiIiIiKF4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhiIiIiIiISGE4IiIiIiIiUhiOiIiIiIiIFIYjIiIiIiIiheGIiIiIiIhIYTgiIiIiIiJSGI6IiIiIiIgUhiMiIiIiIiKF4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhiIiIiIiISGE4IiIiIiIiUhiOiIiIiIiIFIYjIiIiIiIiheGIiIiIiIhIYTgiIiIiIiJSGI6IiIiIiIgUhiMiIiIiIiKF4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhiIiIiIiISGE4IiIiIiIiUhiOiIiIiIiIFIYjIiIiIiIiheGIiIiIiIhIYTgiIiIiIiJSGI4MJDsbSHfkwJSWjQRLNmKTs3DDlKX/P019PUu9TkRERERE/zcMRwaRmZWDKwlObD/pwLzgNExYb8W4tVZMCLLCT/3/5qN2RN5wIkt9HxERERER/XEMRwZgtWXjcEQG5oekof9SC1pMS0adcUmoMzYJdccn4Uf1/30CzJi/Iw2Hwh0wp7MLiYiIiIjoj2I4yuPS7Tk4eDEDo1dbdQhqNlUdU5LRZPIvR1N1yGutZ6Zg5GoL9l1w6OF3RERERER07xiO8rjIOCembUpFy+kpureo4aQkNFcBScKQ55DA1GRyEuqNT1IBKRlTN6fi9NVMPUeJiIiIiIjuDcNRHpWT41p8YfsJO372M6HhRFcoap4rFN1+NJ0ivUpJ6DA3Bcv3pcPC4XVERERERPeM4SiPcmblICLOiXkhaWg5IxkNJrjmFv32kaJ/lR6kRpOSMHG9Vf18JrI5uo6IiIiI6J4wHOVR9owchF1yYMxaiw49EnhuDUO3H7+Eo/oqSA1ZbsbBSxmwqT+HiIiIiIjujuEoj5IhdTvPODB0pQUtpiejsQo9vw5Evz5kaJ0EqUFLzdh52gFzGofWERERERHdC4ajPErC0W4Vjob/H8PR4GUW/fOWdPYcERERERHdC4ajPCrDmYOjkRl6k1fZ10hWqbtTGLr9kBAlq9YNW2HBMfXzjkz3H0hERERERL+L4SiPysoGriU6EbArHW1muhZk+L2V6uSQ1eyk10iOqZtScS3B6f7TiIiIiIjobhiO8jBHZg72nHWgV4AJTVTgkf2Mcu9xJGGpuV6IQR3Tk9FkinxPErotTMG6Qzak2jnfiIiIiIjoXjEc5XHRSVkI2J2GTvNS0GBikj6aTHZt/Oo6UvT/S29RffWafJ98f8QNJ5fxJiIiIiL6AxiO8rhMZw7OR2fCL1gCkgktZ6To3iMJRrL4gt74Vf1eFm3oPN+E2dvScCHaqYflERERERHRvWM4MgAZXhd5w4mNR+2YuCEVPRaZ0XpmigpFSToUdV1owti1VgQdsiEyzqm/n4iIiIiI/hiGIwMxp+fgWFQmgg7bsWhnOuZuT8X8HWlYe9CmN3xNsrK7iIiIiIjo/4rhyGBkie80ew4s6dl6g1ez+jVV/T97i4iIiIiI/t8wHBERERERESkMR0RERERERArDERERERERkcJwZDDJ1mxcjHHiaGSGXoThSESGXro7wZLt1fsa2TJzcCXeiZNXMnFIlftQeAZOqd9fT8qCLYPzrYiIiIjo/x3DkUGkO3IQdcOJrcftmLMtDaPWWDB0uRkjV1swa2sa1h+x4Vx0pl6cwZvIPk+yCl+YCkQBu9MxYb1Vl3vYCjMmbbBiaWi6fi3enAVnFkMSEREREf3fMRwZQKo9G6HnMzBtUyp6B5jRbk4KWs9MRsvpyfrXdrNT0G2hCRNVcNhx2qFXsfMGzizowBe4Jx2Dlpn1Jrg/zUrR5W41Ixk/qXL/7JeCISssWL4vHRFxTvdPEhERERH9cQxHeVyqLRthFxwYt86KH6eloP6EJDScmISmU5LVoX6d7Pp/+XqzqckYscqqgpQDKanGDkg5OcClGKfex6mjCkAN3OVurMqry60O+X298fL1ZHSdb9IBKTo5C5nMSERERET0f8BwlIfJHKKz1zIxab1V95g0mZyMJioUSQhqro8kNFchQf5fjkaTktBmZgrGqyAl85FkTyQjkmBkSsvBChV2pLeomSqzlN1VblXmm4f6mnqtsbwv6ugbaMb6QzYkmLkZLhERERH9cQxHeZTEmpS0bGw4bMfPfiY0cPcWNZ+WhB+nJf/qaDFdwkOSDkgy7Mx/V5phe49sjhycuJyp51NJr1DjSa4w+OMdyy7hMEl/jwQkmYt09nqm+08iIiIiIrp3DEd5lMy3kVXoZm1NRQsVAiQcecLArwOCKxzJIUPN6o5Lwpg1FlyKdcJpwHx0w5SFtQdt6LHIdHMIoaucdw5Hckh4qjs2CR3mJmPHabthe82IiIiI6O/DcJRHyfLUBy44MFqFHAlH0iP062Dw60OG3UmQkkUKwi46kOYwXkiIuOGEX3CaXmyhsSq3DKe7U1lvOdT31FOhUBanWB2WjiSrSpdERERERH8Aw1EeJUt37zhl18tWu3qEJASk/DoU5DpkHk6Tya6hdQOXmXUPiindeF1H569nYuqmVL0qn5THNaTu7ocs2iDhaMmedMQkZ+m5S0RERERE94rhKI+ScLTnjB3DV/7xcCRD0WTp6z1nHbDajBeOLsZkYuaWVHSY61qE4l7DkazYJwtXLA9NR7yJ4YiIiIiI/hiGozzKkZmDE1EZmLzBqhdYaCRzju4hJEiYkGF1I1dZ9aIGDgOuTXAtMQtL9qajy3wTGk2ShSZ+LxS65xyp38uy3u3npGDTUbvXbYZLRERERH8+hqM8Kis7B/HmLL0BqoQiWWTh98KB/r36Pr3k9ZQkvZBDTEoWsg24IIMEm91n7egdYEJtVW6ZR/XrcnsOCUaueUkynLBvoEkvY55lzIX6iIiIiOhvxHCUh2Xn5OgNXXstci3lLSvRyb4+t4cDOSQc6JXdVDiSULHthE33PhlVVLwTUzda9Up1DWWZbhX4pHfo1rK7htzJkMNGE5P1ZrELdqTpniciIiIioj+K4SiPk4UFloW6hpjJggOeOTg3D3dAkBAhw8razk5BwK50XE10uv8EY0p3ZGP3GQeGrbDcDH53KreERRl6J+UfF2TFcT2UkEPqiIiIiOiPYzjK4zKdOboXRQJSn0ATWs1I0QsPyDC7uioM1VG/SihqMS0FPf1NmBeShvPXncjMMnhAUP/8REs2dp52YMxaq16FTjZ6lTJ7yi2HLPXdWQXHCetTsfd8Bqyca0RERERE/0cMRwaQrdr71xOzsPW4HZM2WFUIMushZLKamxzdFpowVgWIjUftuKyCVIbRg1Eu5vRsHLzowLzgNAxYYkbneb+U++d5JgxcakbgnjScupKJNAYjIiIiIvp/wHBkEBKQUlKzERHn1AsObDtpx6ajNmxTgemACg8Xop1ItmYbcgGGu5HQI/OITlzOwK7TdmxW5d5yzKaH3Z1UX5OhhxxKR0RERET/rxiODMqWkaP3MJJffYkMM0xV5U6ze2cQJCIiIqK/D8MRERERERGRwnBERERERESkMBwZkGxwmubIhtWWg1R7tvFXprtHUkq7Hk7oOuT3viJDhhOqupahlOmOHJ/Z5FbKKeWVckv55X0g7yZDZ2XYrOtcz4bTR65vvsye+cv1TYaKyx5/RER/F4YjA5E5Ntb0bITHORF2yYE95xzYf8GBizFOHRa8mdwwrydn4XhUJvaqcsvmuMejMhBvyoI330elYZhgycLZa5nYp8q896wDhy5lIOqGUzcovJXUqTSUIlU5D0dkYI8qt5zr8j4kpXKymTeSRWeSVd2eu66ubxfl+mbHoXAHLsVm6lUryfvIPe2GuoafvJypr+lybT8WmYErCU79AJCI6O/AcGQQ0miQVeqWhqZjyiYrRq+xYPhKC0autmDqxlQs2ZuOAxcz1I3Gu24o0lNwIToT6w/bMGtbGsats+pyyzFe/X5+SBqCT9oREed9m79Ko2H3GTsW7UzDxPVWXddS7tGrrZi5NRVrD9p0o8LiZQ1HaRRJ8F15IB3TN6fqfa70ub7KopeyD9yTjn0qKMWmZOkGNRmfPAA4oOp0iarbSRtSMUqf62Z9nZuqrncr9qfrRjNDkneQhz4SgHaetmPhjjRMCLJihPp8y+dctqWYpa5vQYdsKihnsreYiP5yDEd5nAwrSkmTzVDtGK5uHi2mJ6PBxCQ0m5KMpvpIQpPJSWg+LRmDllmw8YhdNxq9YdiV9BaduZaJudtT9b5OjSYlo/Hk5Fxldx3dFphUSErFmasZXhGQnFlAvDkLG47Y0H+JWddtw0muOm82NRlN3OWWjXHHq0bF7rMOHZ69oQdNhtZIr4GEwZ9mSX2r89tdXn2o+m8xPQUDlpmxSoUn2dfLV4YYeiM5Z2NTnHpbgqErzGg1w/UZl7qW813qvon6fzkX5MHIrjN2da6rDwgZlkOFnfMq9ATuTkOvABN+VNc3qWPPZ1zqXw655s/alqr3sEv3oSHURPT3YzjK4xKt2dh+yoERKy36JtJgQpIOR9JolKORHBMT0VB9TRoS/RabVUCy6V4HI99OZN7BicuZ+gniz+omKeFAyu0JSLrs6mtS7sbqa+1mJ2OOClHSy2T0gBSdlKUb/v1VXTZXYUjKrcspda7CsKfsUm4JTkOWm/VwlFSDD62UYYJ7z9p1b0HbWarOdbkTXWWVsqtfpf7laDY1CZ3mpeie1Dgv6y31Jaa0bKw7lI7egSa0nO56CCCHnNvSYJZfpf7laD0zBYNVKN5x2u5T8w29iYRhGRLsp67V7Wen6DDk+Uzrz7g6PNd6qXvZ7HvKRiuORmaon2WdE9Ffg+EoD8vKztE3hRGrrLqRLI1FeZoqIUkOaRg3n5akfu/qOaqvgpPcbAarxrLMTzHqkCP5d0vv16JdaWirbqCexrGr3Cnu45f3QW6i9cZLY9mEFfvSda+LEUl1pdpz9Oa2fQLNqsyuIChB4GZ5VQNSH+r30otUZ5yqe/XrtE1WPR/HqHUuQ2dkLp0MoZJySZ1Lr6ic21JWOb9d74Gr/uWzIGWXnjXpOZP5SWQs0kt4ODwDw1Zabj74kLp3nd+ez7k61P/L16XOpZd8smosn492+tweb94gyZqNjUdture/9lhXAPqlrnN/zl2ff6nz1jOTsXBnmt7sW3rViYj+bAxHeZQ8JEtWNxLpQWgzKwX1VPCRRrDrxnHnQw9DUY1p+f3Cnel6LooRH7bJ6mQytGrwctVoUuX2lOm3DnlfJBRKA2rYCosehmHEcsuNPzzWCb/gNLSakaLCrqtsroCQKyDlOuS9kXJ3nW/CuoM2ww4/iTdnY8MRO3oFmHVDWYbP/V65m6oyS9klPM/YnKoXbiBjkTqbvyMNP/uZ0EjqXM716RKGXA3lm4f+mtS36yFJ90VmPQdJHqCQschogDFrLfr6Jg9+fvue5vrs6wdEKkANXmbBzjMOmNMZiInoz8dwlEfJsDKZjDp9s/Vmr9CdbyK3HnIzke+VSa0yxEz+HKOJNbmGlXVdYLrZG3anst56JKHe+EQ91Cr4hAM2FbCMRoKNrMomT9Kl0SC9J3cu662HNBrlmLkl1bALcsiKixJyPD2Fd3sQIIeEQgnPvfzNOBKZ4f6TyChkFcKBy1xz6mRI8C+9Bnc+pL7l+2TO2bh1FnXOZLr/JDICuSJvP2nXQ+XkAcjd6lsOufZLOOrkl6IXppEhx0REfzaGozxKhoyEnnPoVZtkEYZfhpX9/iFP02Uoggytk6VRZeiK0YTHZmLOtlR0VDdRafRLo+hOZb31cIUjaVyv3G9DgsV45bbYcvQKdD39XZOUXcPK7lTWWw85N6RncZwKxNLzZMShdUdVQ3nYcte5LvV9L+FIGlcyNKf9nBTsPGPnwgwGI3UmDWW5Xkld3rWxrM4JTyDuHWDCicsMxEYicwrXHEzXdVl3/L1d2+Q6ICMiWs9I1ou0yL2BiOjPxnCUR8nQsl2nHXqY2B8JR64Jrkl6NS8ZhmAy4NK356MzMW1Tqm70Sti7t4ZyEupPUOFoVope1lzGpxttaJ0sU7xinw1d5pt0Q/HeesxcPUfSYJQlvs9ezUSWAR+uyt5NA2RlPncD+F6eKsv31B2nwpFqYG87YderYJFxyBL8bWYmo/49NpTlkPND6lzmrMh8TDIOmRcowyFliKTMEb1T/d5+eK4HLdTvZaEWGQ1BRPRnYzjKo2SIlaxAJnu73HM4muoaXiXj9wepcCSbxFoMOFH9YqxrlTp5qqzDkXuy7t0OGYIn4Wi5QRdlkHC0+oAN3Rd6wpHU+d3rXc4NKfuYNa6hlEbsOToSkYEh8iBAleduPUfy3niOOtJzpM6THafscLLnyFB2qjrrMCdFB/s71fOvDvd5Ied6L3+T3guLjENGQ6wOc/UcecKRfIZvqePbDh2OpiTrJd5l24JLHEpJRH8BhqM8SlbvOn01E1M3uuYc3VsDQlb/UQ1ldeOR4Xhnrxlz35/o5CwdcKQHRU/On3pv4UhuuDIUb+txO9Lsxiu3bH4qyxTLkEgJCK45R/cWjuSQDVONOkldegunbkrV4dYzUVuC0p3Kmzscyeeih78Zh8LZUDaagxczMMC9XL30kt6toSyfCc9qnaPV9U3OGTIOeWgjPbwyIkAPpVT1Kcft9ew55PMv54U8IJM9j2TD72uJXHiFiP58DEd5lAwJkxW8JCS0mZlrtbrcyzrfdkjjQSavys1kzrY0JFmMN7RMWG2u+VYDl1pQX91EG+sG0W8HBXlfpNEkjeqBS8w4ftmYvSeeRThk40N5UioN/7s1GD0bpMqKX6sO2AwZCkWcCnVrDtrQY6FJNZykTCm6cfRbAUnOdVnRTj4bkzem6rlWZCzhMU49t1B6j+RBgNTpnerac3g2hJWFWpbsSdMPUchYjkVmYsQqC1pOT0ETWXjlN+ZVej77ntXqBiw1Y7sKVimp7B4moj8fw1EelpmVo+diDFlu0Q1gGS6n97yZrm4gcuS6mcghT+PkZtI30IyQUw7d+2REMrH+elKWa0nrma6NIWW44G+FI2kwyVAb6TUK3G3cJX4lyMowyOBTdvRcZNINRj2s8DcajRKcZGKzNCplsvKJKOPucySTtWVI4IQgq24ES4NIAq8rHKXc7Cny7Iki743sc9Q7wNVokiGJZCwyByX0nB0Dlpj0YipS581v9hJ7Pu9yqPpXX5fQLNcCWQr65OVMPS+TjEWGO68Os6GTn+xzlOi+rrs+0/oz7r7WtVD13sy9z5EMK58bnKruCU5Drr5KRMbDcJTHSe/RpqMy1Mq1vLPcLHRYUDcOubHoOUbq/12bKCahV4AJa9TNR8KFURvKQoKdbBA5ZZNVzynRDSMJf1J2FRjkkN9LueW1NrOS9VLWZ65mGn73/KuJTizZk65XrZNQLOV2BSXXIUPo5P9d50GyXg55x2kHTGnGLrfUW8hJu34YID1nnnLrp8eeQzWgpb7lPZDhOf670nA90Zg9pORqLC8NTUOX+RKAXHX763NdvqYazKqR3DvQpDcRld5lMh7Z2FyWYJchwPIZl8+01K18rl2fcdc1vtGkRH0eyOqjEoYPXspQn3HWORH9NRiO8jjpRUm0ZGPzMTsGLTXrp2rSaPSMv5fD03iQ3oaV+9NxTTUWvWEncXkyLJsGTttsRTt1k5QbqIQiT7llWJU0pmSeitxsj0Vl6Em/Rr+FSo/hVVWHsrKTBCSpa6nf3OWW90Eai0NXmvUcK1m63Mhh2CM5NVv3esrQG1m+11PnEhL14a7/HupcD1DBSBpa3DXfuOT6JpvBrtiXrnu8pQfBVd+ungNXSEpGyxkpesEOCUaxKRxCaWRyjZZl2GdvS9X70nk+157PeBP1mZeQ1HZ2MiZtsCLsYgZSDTpcmIiMieHIIOJN2XqD0AU70jB2jQVDlpv1OGzpURqz1oq529P00rjXkoy5z81vkQUlTl3J1KFP5pYMX2nR5R6oDmlAT1OhSPYGOnvN+4bZSA+SBB+ZlzFqtVWvQChll7qXYXSL96bhYHiGDs/eROYVhF1yIHB3Gsavs+pGsSzzLeUfo879ecFpKkDZcSXeqYIRG01GJ9cr2dxz1xkH5qvrm1zPBrvPdVmcZHyQBQHqXDhw0YF4LzvXfZUMo5UHG5uP2nVIklVZpQdc6ly2r5i8IVXPt5WHY0adR0lExsVwZCAy1OyGKUvPLZGli7ccsyP4lAPH1P/Hqa9763hsGU1hTsvGhWin3th2yzGbCg027LvgwGXVQJZlz72VDDWTkCSrscnu8lLnO0/b9fBBb55nIw3mBEuWnlsi+3VtVnW+/aRND7WUxRu86QEAuWSr01l6hWRZdwm/0lsu57r0MiSqc4G8j/T6XktwYr+6lm87YdPXN9nC4tx1J0zqmk9E9HdgODIg6U2RhrE8YZdfjT7H5l7JcLNUu6vcKerGKb/3hUaylFF6xaSxIGW3qDo36mIbf5Sc67JIhZRbys9J+N5Phl15rm9yrksvA3kvefiVpq7lnuubLNTBhReI6O/EcERERERERKQwHBERERERESkMRwbmq5PRpdwyP8HXyPA6X12ZLVOV2xfnGcm57oufc6lrqXPyHXKac+VJIsoLGI4MRPb2kCWeT17JxL7zDuw6bdcLFMiKPlHxTj03wxvJvBNZiOLc9Uy9itmuM3a9ct+R8Ay94pHslSJLAnsbKZMsbS1LHR+NyMCec1J2h3oPMvTqfLJku8zP8EYyn+xaohOnr2Zi/4UM7DztwF73uR6h3g+Zc+aNMpxQ53q2Oq+deiXC3epcl+OQOu/la7LBsbfOx5A5J1Gqbk9EZehJ+VLnsuiKnANXEpx6Lgp5D5lrJCttXopV17fIXNe3i+r6pq71Mepc99brGxHlbQxHBiA3EdkMVhoMsmR3/8VmdJ5vQie/FPzsZ0KvALPeC2i3Cgw3VFDwpifsMlH31JUMLNuXrpfu7rbQpMrsKndX9R7I19aEpesA4U1PHSUYSYNw81EbJm+0ore/GZ3mqTpXh9T9wKUWzAtJwzHVqPC2RQok+MjqVX7BruXLu6jySn13VmWXc33iBqteuU8aVt60L2SmCkayIuPK/TaMXmNF90Wu+paj+0JZut6KpXvTcDE606seBkgdJqjrm+xvNVWd630CXee41LnUff8lZszaZtUPhEzpDEjeQOpcNioPOmzDGHWuy75lcp5LnXdbYMKwlWa9fLvsXcelvInor8ZwlMfppU4Ts1QAsOm9P9rNMelNYOuMkyMRtccmot6EJPw0KxmDlpv1bvNR8d4RkORJsjSIZCPAzvNS0GxqEuqOT9Tl1uUfm6Q3DZSNUmdvk6CQCXum+4cNTFbnkkZy4O509Akw6Z3kG6g69pS5tjpk89sOc016HyAJCklW72g0Ss+I7O00arVFbwIpm0HWdZdbDjnXW0xP0aFp+f50RMR5x4agqbZsvYT1nO1pqnFo1hv/1hvvrnN1yHsgG2V2nZ+CWVtTcTjcgTQvCMXSSJYHG6sPqOvbcos611NuOdel3HK9a6Oub6PWWPTy3jHJHHtlZHJvkt7AhTvTdBCWc72unOvuz7j8XjYB7uiXoq/9MkrAW65vRGQMDEd5nPQYySan3ReaUF81GhqrBlJzdTNxHUnuw7WzeAPViJAdx1eqhkacydg3E3tGNg5ccOhGspRPGkyeMv84TQ7XeyDllvekpWowT9+civMqVBh52JGrsZiFhTvSVePAFYSb3FLnrqOZ7CSvDmlEDFpm0b2K0lg2cnNZlm/eooKR9BRIg0nKfnu55ZD3Qw5pPMlGkdKDZOR5OXK+ykbHk1VDsM2sFDSa5Dqvby+3hCMpt4Rl2QRYGpgy5NSoslQrWYbESh1Kb4H+LKuy315uOdcbTXKdC30XW/Q5IkOIvamH3FfIFgSyb5tfcCp+Uue6XMPueH1Th3z+W0xP1qMDZPg4l3Qnor8Kw1EeJ5t/DlCNxcaqcSANhKZy81DBQMKBPtT/y9FsaooOR3JTGagay7JxppH3wpH5JjO2WHWDSXpJ5Ab6oyrjzXK7D7mRSjiSBmVX1cBasteGaAM/WZZ5FbIRogwZlEAoPSfNpty53J5A3GZmMqZusuL45Qy9F5QRSSNfAsLYtRZd11Kf0nC65Vx3H67GsqvepQcp+IQdyQZ9sizD42R40dK96egwx9VrIuWXz/Ht5XbVuXzOk/XQ0oDdruGkRl2cRIZPyvzBwcvl+uYKRnJO37ncruuAvC/jgiw4HOnQ89LIWKLVub7mYLru7W/o/gz/1rneRF37JCDJ/0tvqfQS++oiRET012I4yqOyc3J0g0+eqsqTYhlioxuK02+7kciNRd9cUtw3FNfXZW6SzD8yIhljLk8K+waa8MPYRF2mFqp8ctxSdvfhaTzJzVSC5JHIDEM+VZYhlBdinJi5JVUHAKlzVxnvXG45pOdIyt1ONaxlXlaqQcfny7kqQ0e7zE/R5b5TIzn3IQ0qV49hMiYEWREea8zhdTLhXM714Sstui49jcHfPlw9S3LO91tiwo5Tdj1XyYguxWbqRq8Mn2wwQULvb5/n0lusG8uTXL3jgXvSDP0QxFfJHEkZHi4jAOTz2/wOD7xyH/JwSEZM9F1swvYTdj3Umojoz8ZwlEdJr488SZ+6KVU3APUQozvcPG4/JEhIb8Ko1Vb980ZcDleeLi4LTdc9QdJbJkHhTmXNfch7I43q9iokyLAbIy5SIKFQJqUPWW7RZZLeQlfw/f1Dvq++KvuUjamIM2UZcmidrEQ4ZaNVNZRT9Dksjf87lTX3Id8j5ZYhp4cjMgy5OINZNfbkAYgsNuEJ+Xcqa+5DgqEMsWs1MxmL96Qbdu6RrLroGUIp5b5TD4LnaK7Ckcw5lEMCosw/On/dO+ab+Qrp4ZT5ke1muXpI7+V+pocPq3NdekrnhaTq1VqJiP5sDEd5lDxRlnkkI1db9LjrRpPv9kRZHer7pJEh4UiGG8nSqEYceqKfKG9LRYe5995QlgZTvfHJehz7iv3pSLCokGCwNqMlPRurw2x6lTJpOLgayr//ZFUOCUcSDMeuteplcY04zEoWIxiy3KzP9WZTZH7J3c93OS/qjk3S54ks+2zEIYUy0Xz29lS0UOWRhuA9hUJ1yEMD+ZzP3pqKlFRjPk2XXi89lPAeH/zIoQOxalj38jfheFSG+08iI0h3ZOshdXKu617xu53r6hrQXF0L5HogoyfGB1n01g1ERH82hqM8Sp4GS4Nv6EpXOJIhCHdtKEs4UjccaTgNXGpGiGp8GHEYwrnoTEzZlIp2f6AXQd4bGZojPQ9L9qTrITdGC0dSV8tCba5eBFWmew1HMtxIGpiy/POZa8Zc5tnTiyDl/kPhaJyrt3Dbcbsh59glWLIxbXOqq+fkHsORHPIZlxXdpqnPiVFX8pJhUq3dQ4bvVMY7HfL+SLllTp7s/UXGIYtoyAqTUo9/NBzJ/7t6CxmOiOjPx3CUR0nPkWx+OUo1eOVJWyMJR9Pv3lD29BzJsriyDLYR56DI/JE529LQcW6K7hX5veE2uQ+54f6kwtEqdQNOlJ4j959nFNJzJCsTyp4fUp577jmScDQhCeODrHrSshGHl8kmkMNWWtBSNZal3PcSEiRIybK/MuRGNo80YiiUYOMXnKaXsJbz/F7DkXwupM5nb0vVq/wZkTz8+Vl9xj2rEt6pnLcf8n1yfesTaNYbApNxyD1Nrm/SCyS9f3eq39sPqW/5XLSemaL3NzPq3EIiMhaGozxKJuefuy4rtqXpniNpELgWY/j9m4o0lCUkyBLY8vNG3Bg1NjkLK/bb9PK+0nByhYTfP6ShLPv/tJ2Vop9IG3GJY5knJY38YSssOhDfrbdQGg5SblnlS3oSZHK7UXsRLkRnYvqWVN0LJL2FsvrincrsOtRr6nVpNMn50TfArMOVIeccpedg1QF1ri9UgViVRxZl+P3PuKvc0sskQ0iXhqYbdhNgWYlTlqGX69q99JrphrL6PgnQ44KsuMAhVoYiDy9kTqVs9irXK7l2Nf/dhz/qXJ/iWu670/wULNyVpld2JCL6szEc5VHS0JOG7rqDNrSfm4L6ExNVo+j3G07SsJKbjjQ25oek6v1fjEgWJpA5KBISXMtZu0LAncoshzSa5Hv0cMIl8kTZmMNtZJnayzecqu7SdAOw/oS7l1vKLOFIdpZfd8hm2OXbE61Z2HTU1WumNzz93ZXLUvTrsnKZPFGesTkVl+ON+URZ9m6Rc33MWqsOhXK+3y0cSSCUgDR0uWv/F6Mu3y51tmBHul5pUXoSJPjcucyuQxrJ8n1dVZBcFWbDDRMbykYje3PJuS4P/Fzn8e9/zuW6LnUuw8RlDq30rhMR/dkYjvIwWY5aVpyTm0lL1QiUG4VryFGKfuKmD9VIaq6+Jg2LRupmI0MWZBGHUHUjyTDopnkSDJNTsxG4WzWcZN6RKpve80aeHEt55VA3T5mXIv/feLKrt0H2zli5Px2xKcZtNElDV3aE7xVodtX3ZGk0uoYduZ60esruOhekR1HmWc3cmobTV5yGHFomZBEJWUxCluWWIWNSdk9vgtSzrFbmKbfUuWufoyQMUQFahmfJqm9GpB+CWLLVeWvTvZ71VENQznW9n5kcN+tbznVXL6oEKNkAV3qNriUZb26dhzwE2X8+Q+9zJA1lz/VNf8Y95fbUufq6hGGZXyfnyCl1rjvYcWQ4sqn5hsN29A5w1bmrl9hVx676lmud63on54J+2Kf+3297KqJTuPEvEf01GI7yOHlStvO0XS/M0EQ1kqUxLA1DTyNCGg2e+QfSuBi01Kw3gDXq8CoPafCduZqJ6ZtT0UYFQxkqKDdKfTOVsqtDesrkqaJsDtnRz4TAPem4miCNJmPfQeNUuJNhhbKUef0Jibpub5bb3WiQhoU0pOUJq6xSdzgiE1ZbjiGX8faQxrJsCjpkmSsYysR7CUBSz3oZZ1VueR8854L0MklvmTS4jLw5pARDmWg+Y0uqXp679lhV56p+c3/G5T2Q80DmWMmmv/K9Z69lwmHgjZ7lMy6rSkrveE9Vl1JmqXMJQLnPdbm+6XNB/SrXN1nlTs51Mp5Mdb7KctyBu9P0XEE5p2U5fn2u6zp3fd7l8y11LiFp3FoLjoRLD6n7DyEi+pMxHBlAkjVL7w8h4+xlboI0jvTSv+rGIY1jCQ+ywpks3rD5qF1vHusNZALvsagMzNmWqp80ynwUGW4m5Zabpqx01W52st741X9XOs5He8dk3azsHFxJyNK9YLJhYicV/KSsUtdSbhmSIvNNJDzJ3kay5LvFSxqLyepc33nKoXtLu8w36V4xvbz3zXM9WS/dPXSFBavD0vX75A3kXD95JQNzt6fq0CdDaaUXWD9RV4f8XnpRe/qb9ffIMtZGnWuUW45KSNdUY1kCkizlLouwyLktdS11LnUvPWqdVEN69BqLnk8Yb9DNrclFerdljqEEJFmhUq7rcn2T81zqXK7x8rVuC81677OwixkqDHvHPY2IjIHhyADkCavsV3Qhxok1qkE4cb1FBQKT3uuj32ITxq+z6k1TT6gGkyU9x7DDbO5E5mTIJNwdqsE8a1sahq40o1eACb0DTRixygy/4FTsOm1HTHKWYefb3Ik0IKT3T+ajyEaf0jCUuu6t6nzgUhOmbbIi6JAEwkyvaCR76HNdBT1ZTGT9YZveBFn27JJQILvkj11rUe9HGg6qBpP0OhhxwZHfIr1A8lR9hzqf/ULS9Op98lCgd6BZ/37O9jQdDqLijd87mpuc6zI/8kh4hrqOpWGcup71X6w+56rOByw1Y/IGq77unbqaqVfm49Aq45NrtVyzZQjxwh2pGLnKgj7qmt5Lne9DV5ghi8tsPW7Xq2/avOj6RkTGwHBkMDKf5tSVDOy/4NA3FpmQffJyJq4nOvWQBW8loe9CtBMHw1W5zzl0b8nhCAfCYzO9epKuNCJkqOCxyAxd11LnB1Tdy5AqeYJuxA1f74WcyRJ+ZN+mAxcd2O0+16XH5Jp6P6SnxVvJU/Jw1SiU1dzkPJdDfi9zsoy4b9m9kjmS0UlOVceZehsCOdflOnf6SqZefMGo8+not8mDkKgbTv0QSM5zubYfvOTQD328+VwnoryN4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhiIiIiIiISGE4IiIiIiIiUhiOiIiIiIiIFIYjIiIiIiIiheGIiIiIiIhIYTgiIiIiIiJSGI6IiIiIiIgUhiMiIiIiIiKF4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhiIiIiIiISGE4IiIiIiIiUhiOiIiIiIiIFIYjIiIiIiIiheGIiIiIiIhIYTgyoKysLKSlpSE5OVkf8nv5mrfLycmBw+GA2WxGUlKS/jUjI8P9qneTsttsNl3fiYmJSE1N9Yk6l/qV8kZHR+v6lvfBF0g5rVYr4uLikJCQALvd7n7F+2VmZiIlJQUxMTEwmUxwOp3uV7yfXMulzm/cuKF/7yukjuXaJnUude9LdS7Xdanz2NhYfV33dnJtk+uZfLblPm6xWPRn3heu7XLPljqWcst5LnWfnZ3tfpXyEoYjg5ELyJUrV7B+/XrMmjULK1euxIULF3yi8SQX0YMHD2LBggWYN28edu/erS8y3k4unuHh4Vi1ahVmzpyJtWvX4vLly/qG4u0kFC1ZsgRjx47FsmXLdOPJF0jjMDQ0FBMnTsSUKVMQFhbmE/Utrl69ioULF2LcuHFYsWKFDse+QMLQ9u3bdZ3PmDEDJ06ccL/i3eSedunSJcyfP1/XeVBQkG44ejspt5Rz8+bNus7lnnb27Fn3q95L7mdyHd+6dSvmzJmDxYsX49SpUz7RhpHPuHyuAwMDddmDg4N1MKa8h+HIYOTCsmnTJnz//fcoU6YMateujS1btvjEE6eoqCgMHToUr7zyCipXroxRo0YhMjLS/ar3kkZxQEAA3n33XZQqVQo//fQTjh8/7hNPVw8dOoRvvvkGRYsWxaeffoodO3a4X/Fu0lCQQFi8eHF9DBkyxCceBIhdu3bhzTffRLFixfDVV1/h3Llz7le8m1zf5LMt5a5UqRL8/f3dr3g3uY7Jg4/XX39dl71ly5b6vfB20it+4MABNGjQQJe7evXq+qGnt5Pek5MnT6J79+6oUKEC3nnnHUyfPt0nHoLINXzp0qWoWbMmypYti1atWulzgPIehiODkQuLNJTlonLffffpkCC9R9Kr4u2kkSQXk/vvvx8PP/wwOnXqhPPnz7tf9V5yEx0zZgz++9//6jr/4osvdGjwhXC0c+fOm+d6kSJFsHr1avcr3i09PR1du3bV5ZZDGowy7MYXSM/BY489psstDYijR4+6X/FuZ86cQY0aNXS5//Wvf2HSpEnuV7ybPPyR3tEHHnhAl11Cgi9c1+UBiDzolFAo5X7++ed1j4K3kzaMjACpV6+eLrfc1/r16+cTowLi4+P16I+SJUvqsn/44Yf64TblPQxHBiMXFnnKVrVqVX0Dfe+997BmzRo9P8HbXbx4ER06dNAX0wIFCqBnz576a95OwtHkyZPxzDPP6Auq9BoeOXLEJ8LRnj17UKVKFV1uaShLw9kXyFj0Pn366HLL0b59ez0PxRdIg7Fw4cK63K+99pruJfUF8vBHekml3E888YR+mu4LJBzJEPF8+fLpsktvoS9c12X+7LZt2/D+++/rclesWFHf272dtGHk/tW0aVM88sgj+r4mI0J8YXiZzB+dO3eufuAn7bfPP/9cD62jvIfhyGDkwrJ8+XK89dZb+knbBx98oOeg+Eo4+vnnn/Hkk0+iUKFC6NWrl8+EI3myKj0n//jHP/RQSl8JR3v37tVDrKTxUK5cOZ8YdiIkHPXt21fXt5S9Y8eOPhOOZA7Gs88+q8stPeO+MvdGeku+++47Xe6nnnpKzzvyBRKOZs+erR94SdklIPpKOJI5ZtWqVdPlfvnll/W93dt5wlHz5s31g065rw0bNsxnwpGfn58eNivtty+//BIhISHuVykvYTgyGIYjhiOGI+/HcMRwxHDk3RiOGI4YjvIuhiODuT0cyYVVGozSmPJ2ERERep6RJxzJsCP5mreTOp82bdrNcFSnTh2fGWq0f//+m+GofPnyesiVL5BALOPwPeFIzntfWZBBhhp5wtEbb7yB06dPu1/xbrJiW61atXS5JRzJUDNfIKu2SYPRE46+/fZbn7iuy8MtWWBG5p1IuWWhIZk/7Avk/vXjjz/qcCSL7YwYMUIHB28ny9XLqowShBmO8jaGI4O5PRx99NFH+kmrL/QiyBLmXbp00eFI5iT0799fL/vrC2QSp9xEpLEsE1l9pcEoE3flXJfGw0svvaQbzr5i4MCButxyyOIMvrDoipDGwnPPPafLLfPNfGFyvpDl+X/44QddbglHMjfBV8j2DAULFtRll94zudb7AplTKfdwKferr76qR4H4Alm6WxaZkXAkK/XJgkOy75G3kxE+ixYtYjgyAIYjg/GEo7ffflt/uGSlG5m4KysdXb9+XYcFbzuuXbumyyb7GrVu3VpP3H366af1xVUmM3q+5/af84ZD9vmRp6iDBw/WE1clHMlqdRs2bNDLmHtruaVcUnZZnc6zIIOs5iRP02WZX8/33P5z3nBIuaUXQXqL/vOf/+iyN2rUSO91JI1Gb69z2eNIeoal3DL8RFZzkpWsvLncEoyknLJcvZQ7f/78eqsCec2br+vyq+zTJ0vVy3Vdrm8ySV2u9XIu3P4z3nJI2WXvOlmdLvewYbmXe3ude851WcJcVqWUc12udYcPH/b6OpclzCdMmKBHQTz44IMMR3kYw5HBeMKRrHAjHy4ZivD111/r+Qny9GXkyJG6i9qbDimTlK1Hjx56mVfpOXrooYd0MJR9QeR7Ro8e/auf84ZDNkWUlXzkIiorWMlNVFY1ateunR6nLQ0ob61zKbuUUxoNUm5pPMmQmwEDBujXpex3+lmjH1JuaSx+9tlnePTRR3WDUYbcyLwjb65zKdf48eP1KlaPP/64rnPpQZIVKmWTTG89z6XcUt8tWrTQDwCk3HJdl+Gz8rpc++70s0Y/PJ/f3r1761Ao2zP885//1A9DZA8c+Rx4a53LIXUu825k7zqpcxkNIaMCvLnOPfUp9SvzpeU+/u9//1s/7JX7u3z+vbnOBw0ahMaNG+vrmqzUJ203hqO8ieHIYDzhSMYpy4VFGk7SkJAhV3JjlfXzve2Qm4eUTTbDlKEXEgql3PKr/L98j7eWvXTp0ihRooTuKZOlP+UmKg1mmZMhX5f35k4/Z/RDyiVll3lWnlAoDSf5vdxYPN9z+895wyHlll/l3Jbe4dznunwGvLnOX3jhBd1r5DnXpfxS37LhtTeXW4YWyWfc01MoQUEay/KaN1/X5Ve5lkkPguxfJ4c8BJH3w/M58MZDyi7Xb6ljuY9LnUvdSyj2hTqXQ3qM5JruOd/lWi+f/9zf702HlF0OKafUuQwplCGkDEd5E8ORwdwejuSCKg1G6U3x5kPG4Eso8FxM5Vf5/zt9rzcdUm6pX7l53K8aDp6bqDQmvL3epZEkT9ekzHJIg1nKLI3IO32/txxSbimnPFH1lF3eB/m6HHf6GW85pHzyub7ffa5LnUsjwhfKLZ91CcGeOpdgKK/J12//fm865PMsdXy/u87lYYBc37z9cy6fcTnXPQ8C5J4mn3N5zVvr/Pb7mdR17vuZN5/rUjYpp+cBiDzUlgVYGI7yJoYjg7l9WJ30GEnXbLNmzfSwDFkBRrrqvemQcrVp00ZvDihPFOXCIjfTd955Bw0bNtRllu+5088a/ZByyzAjGZcuN1IpuzyF8vY6l/lkMmRShlF6nqzKk0YZVicbonprfcsh5ZahF9JbIuWWQ5a0lvdEzoc7/Yw3HFKnnjr3hGKpc1naWYZXenOdt23bFk2aNNEbHXvqXDbAlTJ7c53LOS1lr1Gjhm4wS7klFHlznXvuV1LfNWvWvLm5twRkeegpr7Vq1eqOP2v0Q8ol97NPPvlE9xhKMJTPuLRn5F4ur3trG0bOddnAXRZjkLabBCW5nzEc5U0MRwbjCUcSDOTJoix1O3nyZD2B9dChQ3p1L287pFxHjx7FkiVLdCiQC4sMP5DFGdatW3fze27/OW84pNyhoaF6tTLPak5yY5FJ67LMtTfX+bFjx/ReLzLERMotv8qS5rIMrLeWWw4pt3ye69evr8sthyzIsHPnTn0+3OlnvOHw1LnML/Is6yzzzQICAnyizoOCgnQwlHLLA4HOnTvrMnt7ncueNzIXQ56sS9mrVq2KpUuXenWdS7lkDzfZv05CsJRbhpQNHz785ntyp58z+iHl2rdvn97XyjPPTB7wyoIMskiDt5Zb6lQWnJCFlGTFXSmzfMblgS/DUd7EcGQwnnCUe58jCQhpaWnu7/BesrpP7n2OZCKvfM3byTLtU6dOvWWfI2kwZWdnu7/De0kwzL2ak9xcfIFsEJl7nyPZ/NgX9gER0kjKvQmsLPvrC2Tj09z7HMny/b5A7mlz5sy5GYil18gXruuy+a2stpp7E9gVK1a4X/Vesq+V3L+kh0hGgMh9TUJhfHy8+zu8l+xVN2/ePG4CawAMRwZzeziSbnhpMMqmkd5OljGWHhRpOEg4khX6ZFlQXyA9KLn3OfKVBqM8dZNeUmk8yPKnsqeXL5DgK/scecKR9CKkpKS4X/Vu0mDMvc/RuXPn3K94N1myX4bdSLlliJUv7XMkDUZPz7gERF/Z52jXrl039zmSFSnXrFnjfsW7yT59MoTOE45kJTfZINXbyV51ss+R1DXDUd7GcGQwt4cjWQ5TNo6TzcW8nTxZlSfonp6jXr166a95Owm+MvzC03NUu3ZtPfzAFzb+laEnuXuO1q9f737Fu9lsNh3+PeFIlvG+ceOG+1XvJgE4d8/RiRMn3K94N9nsVlavknLLAyB5IOILpAdFhlnl7jnyheu69A5v3779lp4jubd7O2nDyP1L5uJ4wpFsURAXF+f+Du8lvf9+fn7sOTIAhiODYThiOGI48n4MRwxHDEfejeGI4YjhKO9iODIYhiOGI4Yj78dwxHDEcOTdGI4YjhiO8i6GI4ORC0tgYCAqVqyoL6ivv/66vqDKWFZvJ40HWaFO9oOQlV4kKPnCfAQJR7JbvOyLIHX++eefIywszCfCkazQVqFCBV1uuYmuXr3a/Yp3S09P1/PrpNxyyDKwsbGx7le9m6zaJsvcSrllaWuZvO0L5FomSztLuSUUy6p9vkCuY7IKpWePJ1mN0xeu6xKOZPERWXFWyi1bNMjKjN5O2jCyepvMnZVyS0CSB0ExMTHu7/BesuiELLQim8FK2WXOuJwDlPcwHBmMXFhWrlype4yksSxLv8rT9NTUVPd3eK9Lly7pBqPsKl68eHH079/fJ1Y1knA0ffp0vZS1LH0q+0HI0r++EI5k2Vc516XhJJNYN23a5H7Fu0nPkSzIIA8B5JDz3hdWcxJbt27VjQepc1mMwxcWH5EVvOThj6xEKfUtC1LICm6+QK5vsviELDgj1zd5D3zhui7hSBYf8ezlJkuY+8LDH2nDyAMPWZBBegtlCfPRo0f7RM+49BzNnz9f94jLpreyAIssykF5D8ORwcgqVjLMRJ4+DB06VO/9Iyu2ydAEbycXFnmqLMt+ylNVaTibzWb3q95LbiYHDhzA2LFjMXjwYD2MUt4LX1jK++rVq7rhNGDAAH3Oy4pevkCCrwy3kP1fpM5l+I0EJl8gdSyfb6lzGYLiC40maShLIJD9y2TlLjnnz549637Ve0koNJlM2LFjB8aMGYMJEybocOwL13XpHZa9nGbNmqXrXPZ2ioyMdL/qveR+Jp9xKa+UW4ZUysM+eT+8nZzrMlRc9qaU833jxo2Ijo52v0p5CcORwcjNRPY0kvXy5YPmC70HHhIApcxSdl+4kHpInUt5ZalTaTT4QhD2kLLKkFEpu5z38l74CglDsny31Lk8XfcVck2TOZSeOpfGlLez2+26Z1AO+b2vkAc8ck2X+Sa+EIhyk3qWh1xy+FKdyzVcrulyrkud+9I1Xeo5MTFRH75U50bEcERERPQ3kpDgSw+6cpNy+0IAvp3UuS+WW/jCqIc7kSDoq2U3GoYjIiIiIiIiheGIiIiIiIhIYTgiIiIiIiJSGI6IiIiIiIgUhiMiIiIiIiKF4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhiIiIiIiISGE4IiIiIiIiUhiOiIiIiIiIFIYjIiIiIiIiheGIiIiIiIhIYTgiIiIiIiJSGI6IiIiIiIgUhiMiIiIiIiKF4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhyFBykO3MQKbDDofDoY4MZGSpr7lfJW+UjaxMVc9S33YH7I5MZGa5XyLfka0+51nZyMnJcX+BvI+q2yz1+dbXdnVkqN87VZ27XyVv47m257qfq/pWt3TyInLNzlbX77tfutVnXbXv9L1eH5n6fODp8PdgODKMTNiuH8L+gImYNaI/Bg8ZjiEjZmHm2uM4EJMDp/u7yJukIy36IHYvm47ZYwdgYP9B6NF3NqatOIZjN5xgRvIFmYDjGk5t2IuguftxMipZnRXklezhiNoRgMXjB2HksMHoP3QaZgbswuFr6jrg/hbyFg6kXQ3D3oDxmDFS7udD1P18IiYt34eQCAds7u8iI1NX6vijOLB/H5buvYKLcXb31+/Ehqwru3Bg5VSMHzYEgwYPwpAxczBj+WEci7Gzffc3YDgygJycVHUh3Y3DASMwumNLtG5aD42btkDTlp3Rvvd4TF2+AyejrbCyC8lr5GTZYLp8FMfWzMas4d3Qs10DNKz3A76uXhtf1+6HvtODsTvSDDMTknfLikHa8dkYU6sjvn93OhbsvoZk90vkLdJgjT+Hc1v9sXhUD/Tv2AgtmzdC7S9roV6jnui1+Bh2qIZVJh8he4Wc7AykRZ/BubWz4DfgJ3RpVV/dz5uiaYsOaNtrLMYt3Ym9V81IzHD/ABmEHQ5LLK6Hn8Xp06dx4mAQ9i3ojJ9790aNcaHYcP43HnE4Vdvt2iEE+4/GoE4t0ax5UzRq3AjNWrZDp16TMW7VCeyNtsGWzQvAX4nhKM9zwmE+jL1jO2B081boM2srlu4/jhMnT+HkqV3YOOknTPy5LkYvP4CQG6ot5f4pMjJ1IUw8g+0z52Pu8AVYF3oMh8+oOj8WjIOB/dH7f++j2qs/oMm4YGy+zmGV3iwzLgSHJnyGL595F6XLTsOEnXFIcb9G3sABxO/AnkUj0LXNUAycvBbbzp5Q1/cw7JnZFf2b1sI77f3Qe0sMUnhx9wJO2EwRCFsQiJXj5mPj7oMIOy3385M4efIoQgOGYe6oLuiv7uerI9T9nO1hA4lDwpl1WD6hH3p27472HZug45el8PLnX6D4iF1YdulOaVdVcEwIDi4dinrtR6Hp6HXYfOIkTpw4gZNhq7DHfzDad5qCnycfwqkkda2gvwzDUV6XFYuUYwsx9H+1UavGAEw9kqo+gh5OpIX0xqL2VVG9y2z0DE5AEp8uGJ81HInHl2Ly+MUYseAsInL3xqfuxvYeH+DzQgVR4p0B6LIiGnGscu9kOYvYkL4YWa8iCt33LgqVm4MJe+Jhcr9MxpeVcQnX17TGhBY18GWbBZi0MwlW/Uo20jb3xvj6b6Bs7VH4cVk0EhmOjM9xDYnngzBmxHwMnnYAkbePkb28AnvmdEWrfsswev0NmJiODCQZ5sv7sXvVfMyZPRsTR3VGny/yodzHb6HQ6N0IjLzTB9iCpB19saDLR3i33Rx032bNNaTyBhynZ6i2Xz3U+XA4/PcnII7XgL8Mw1FeZ9qHS0u64Jt32+LdBqux+Xr6reNPoxZjy7j6KP9ZH3w6IgynbZzAZ3Q5Vzbi3LI26DBmFn5eG4cIi36+5JaC6+taYuAHD6PQk1/go047sD+Vc868i9R2OqwnV2HPlEboXO9D5H/sBxR9aQ4m745jOPIWOXakXl2DJa1eRfMaNdBh8SXsN7tfgx3JOydgcZ/GaDNqJWYetCKNXcTGl3oY13dNQPN+c9Fk+llcSXV/3cN5FBd2zEHLzv7oO+cMbnAspYHIogvZyM7KQpY60qM2IqT3S/j4qzdRZPQuBITffpdWdZt5AYfGf4GBn5VB49Fr4B8pj0U8MuCI34r1tT5Ax/Kfodv809jDi/9fhuEoj8uOCMSeMe/jjZotULXPfuy/fSCyeQcOzOqMl8q1wWuN12J7olMGapCBZZyfje1DSqLaJ++jSodVWH46/ZahVKkHu2FWvX+i6EOVUOmHJVh1PQu332PJyKzItp3DzrUbsXDoUPgPqoNPKtVHsZdmY/yOWIYjb+EIR8zWEWj7xjt4553OGLvPgmj3SyLbdAU3Lp3A+agbuG5RDS7318nA7EcRvWkImn7bAR83DcSas9Zbr91p+3A6eCq+6r8MnZZEwMKnXsaVsBMHBr6MGt+8iaJ3DEd25CSFYFWLqmj+Yhl0mLwDwbdd3J2WozjY+x10/qgSvhy1FYvDeRX4qzAc5WlZsB0eixVdiqLc5/Xx1pijOJR82wcs/QCOzumJ14vURYUv5mH55QxY3C+RMWWG+2Fzz6dR+uF/4N/lOqHPlkRcyfUAMf1oN8xtrMLRI6+iYp3lWBnDcORNMpMvIW7vAgQE7sTiFdtxYvFPaPV+bR2OxoQwHHmNhE04PrkOPizyPV75YDoW7j+A/Sc2Y13gAixZEIgVuyNxgpXtXbKuI/nQVAyr+RaqFqmGz9tPwpjNZ3DyRjoyclKQELYEqyaNRJuFezD3jBlZ7C00LMfVLdjVtyI+/fqt3whHKcgKX4RJX5VDtWcrou3kfQi97UaeZT2NE5OqofX3ZfFSv2WYeJSPvv8qDEd5mgPJuwdgbpMCeL5abbwz+ggO3h6O0sJwdHZHvF7iA5SuMVpdUB1IdL9ExpSTsBsn5zbAl69WxosfDcSYncm4djMcmRCzviWGV38URYvURvU++3HAzmF1XiPHjvijIQiZMhYrtx7G8eiziAr6GT9W+Q5FyzMceRPnxdnY3KM8Xnu6Jip8MBlT183F3Pm90KHOV2jw9Zf4/qdhGLD0GI7GZ/Dz7TUy4UjagZChX6JRiSfwzBPP4ZlqndB2xlps3rMeK6fOxMTBi7H+eAyiOX/Y0O4ajnLi4Dw2Cb1rFkPJohXRZMo+7HdNOLwp26LC0cQP0fiz0ijYYQEG7rNw2sRfhOEoT1MNpZB+mFY3P0q8+4MKR4d/3XOUehhH57RA5VJFUOSjDhgfZkMMnzYZW0YSLJGHELxuC1ZtPI7TsQ73PieZ0m2EXX2+RMNixfHKl6PRb0siw7C3yHYACXtwYtsiTJwXgo3nkpDquICEjR3Q+DWGI++Sg7RjY7Gs5eOo9N8iyPdKD7SeuwEr9+zC9rUrEbRyBqb2/gE92tZD36WhCL7u/jEyvJycFJgigrB50BeoXfI+PPLvp/Fkmap484MGaNJ5AeZsjUFiBpvARnfXcJQdC+ehcehQ/Tk8Wawi6qlwdOC2YT/Z0nM04SM0/LA48jWYgu7b4zlt4i/CcJSnOXAjeACm1imowpH0HN0pHB1V4aixCkcPovD7DTFiTzqucViqd8q8jrSwQRj9/ft477UW6DDzAEKZjLxEDnIy4hG7YyHW+/tjzkELTsnkfNtJpAS1RUOGIy+TiaT9wzH3hwdQ/oF/49GKP6NZ4GWcvLl6WRqSN7XBtCYv4L0mY9B5dSLineoccb9KBpd2HBfW9UHfBm/g41dKonSBf+Gf9z2BwlVaoa1fKHZcNSOF3YWGdvdwFAfnwYn4qXpRPKLCUZ3fCkcTP0Lj955DgW/GoOvGGA6h/4swHOVpDsSH9L9LODqiwlFTFY4eU+GoKUbuZTjySjlZsEVtxr6J1dH6x/qoO2YvtkfY+BTJW+SYkBp3FJvmrkbgvFCcTXEPlbSfRnJQOzR6vRaKvjQX43bGu5d6JmNT1/Y9gzH9q4dR+v5CKPH+WIxTLaNY96vauZlY1v0TlK3UCtW678Jeaza4L6jRqYCbFouYkEkIGNcNHUfMxNhpYzGlWw188cLjePrRJ1Gw4lf4akwwgiKzuYedgd1TODo0AW1VOHpMhaO6vxeO3i+C/N+NRddNse5RJPRnYzjK0+xI2NEPM+rlR8n3fmNYXdphHJvbSoWjEni2WieM3m9DNB8vep/YUJxYPQh9e3ZAlxmrsSnKAQvvnF7Dfu04orb7Y+nKA9h8yvZLD0FOONK2dEKzyrVRvMIiTN5vkcGVZHhOmA8Px8KGj6LsA6+gYs1lWHHZM3zW7epyrO//JV4o/Dkq1gnAqlguvGJ41kjcOLwMY0YNQZtRi7H4YAwuxVxH3HnVkJ7bEV1qPItSj+fDI6/3Q6uFUYhSt3vezo3pXofVdarxHPKrcNTgN8LRyUkfodHHxZGvvgyrS1CtQvorMBzlaZkwhw7GwpaFUPqTOnq1urDbw5F1P47MbIfXi76Pkp+MxvSTGYh3v0ReIEddCq3hiNg+FbMnDkN3v31Ye/r2nQPJuKTpY0PcziXY1LsjJs0IwIKDZ3Dk9CmcOn0apw6uxI7J9fB5+U9RqGR/dJkTjP2R0bicnIn02y4FZCyZ56difeciqPhEdVT6fDPWxzpu7Rm6shgb+3yK8gXeR4Wv52BJhJNDKg0u89JyHPZrjLoDpqP16hjE5e76t19E5Ka+GFjrDZQtWAOftFqCtTeyYWU6MqS7L8gQD+fp6Rj8v5J46bmKaDZ5P0JvX5DBehLHJ1RDk/89jyJt52FQqIWLs/xFGI7ytBxknlQ30L5lUfGzRnhj2GHsTbrtuXGKaixNbotXitZDxW/9seqqk8NuvEl6BNJOBSBwgR+GLwzD7oj0X/a+yHYiO8upG1QcSWlU0v0Xg4jNszGnQX10bdYaPw8ciD4D+6PfwEHo17M52tauhBcLl8V/n6qJT+t3QO/56xBwxILr7EYwtitLsXtINVQuWBsVa25AUIz9DuGougpHH6hwNBdLVOOK4cjYkkKHYsuQ8ug6dS6mnMm5bYhUNnLSz+HU8n7o8dqrqPddH0w7mclh8gZ113Ak+9ldWwm/71/GF0VeQqsJexGiPuC5s3CW+QgODn0XrWqUQ9X+qzDzVAZ7Ev8iDEd5Xcw6HJn6Ld6t0hqvN9+B4Bv2Wz8ccUEIntgcZV7tgKrtt2KfJYtPFrxGElJjDuNI8EasCr6AQ7l3iMzKQOqh/bh88hiuZGVxHLJhyac5GQkXw7AvcAnWzFuAJYsDELA4UB1L4D+jJ4Y0K4pKBYsiX+FmaNBrKvy2h2FXeDqSOL7C2Mw7cW5uG9Qs2hxVqq3Auiv2W4fMXF2G9f2/QOnCX6JCncVYHcPPudHd2N4NQX3yYaT/XCyPlYHzv2a/tAEb6n2KIT/2wuzTGbjM4dOGdPdw5EROahi2dn4P7V4thWZjN2GNOidyt+8yzaHY0eJttH+lCupPCEVQDKPRX4XhKK+zn8H1DcPQ7OUG+OCDKfA/n3rLJq9Zx6dicd/PUPGHofhh9llEZvJK6hVy0mCP2oT9K+dg/MxtWLnjAq5GxyAmJhox0VdwLiwUawdPwAr/tTia4eTGv17m5i3QFIJT01/A58VfQLGX5mPSPits7pfI4LLDkbBzCnq+WRdffDACM46YblmQIefUNCzp8jHKv9EBNfrvQ1hqNuebGZzlyFjsHPMSeo4ci7G705Dwq14hK5JPBWFpp+6YOioAO284keR+hQwmfgcODHoZNWu9g2ITDmDZNffXc8u+jgsLG2J03fL4rOcCjD+clWsUiGoDXFmOmdU/Rv1yDTBoZQROcET9X4bhKK/LscIasQpz636Cph83waBN0Th583FTPCKWtMPYhm+iVr9AjD+UjlQ+WPACTjiTjyJsansM+OZDfF27ORq274aevbqia7dO6NqlJZq1+Ak1vhmKPrP24awKxGw0eSnbXlyYXRpfFCuNYhUCMO1wJlew8ho22K/txKbOn6N9rdpov/Qc9ia7X0IyYtZ0xNSmVfFFp7kYHGJGkqp4Xt6NzRm/FWeXtUbbZj3QbOAe7I+7bUU68yGc3Tod/QYvxMRlZxDryOG13ajiQrBvQEVU//ZtFB23D0uvur9+Cwdsx6di1eDv8XaDsWjtH/nLnHHHecRuH4YfazTFh9/NwOKzKTDxAvCXYTgyAKcjHJfW9seink3Rvd9EDJs+F/MXLMIC/5kY06cjBvfuiwXB51z7opDhZScfw6U1LdDhzXwoet99ePDBf+D+hx/Av/7zL3X8E//5932475HCuO/tIajvfxmxHJPuXbIscMYeQ1jIOsyb2B59v/0XSt7/H/zjwR/wTZdJ8Nu+H3siU5HMddwNLyfjBuL3jsbKcc3QeeBIDJo8D/PmLcD8RdMwfkA7DO7fFzNDzuEoJxt5h+w4mC5ux+LRY9Gn4zCMneqHeQvmYcHCBVjovxRLF8/BgiWBGL/+DILP2/ggxFDsSE84jzPrV2H9fD/MGdMBHd95FM8+mw//qNkRTUfMxvyl67Ek+AJOx6T/EnotZxG+cx76dh+Ilt1GYcKCBZg3X50Ts8dixpC+aNlnIfqtPI/zaYzJfyWGI0PIVjfRKFzZNR/zev6IdvW/wQ91GqBOw05oP3wJ/EOvIjY1i08VvUTWlfU4MOld1H77GTxbuBCeeaYwCqujkPq9HIXl19KvoVCLuei5K5G9hd4mIxaOU8sxb2x3/FDrU3z+bnFUKlUKJUq8hQ9qfovm6iY7NTQel7nyihdQH17VYL5xfDlWj/kJXZvVwve16qB2/ZZoOWQBZu6+hutW7nfjTXKybLBfCcX+gOEY2rYJmtb9HnXq1UW9Rq3RcsBcTN56CWeSM+FkpRuMGSmXtmB9747o/cN3qP1NdVQrXxplipZGider4ZOvv8UPLXujxajtWHcqJdfw6BxkWy8jKmQW5vRvhab16uD7H75H3SY/o8PAQASGXsMVRw4XXfqLMRwZSLb1Oq4cCsaeTWsRtH4j1m/agz0nY3CFq1Z5lRxLJOJOrMa29UuxePkKLFu2DMuWLlWH/LoMS5ctx/LVG7DiUASOJ2bwoultstKQlXgBpw/vxvr16xC0dhXWrVmN1avWICgoCNsOnsTx6HRYuCOo97DFI/7MLhzYHqTqeD3WbwzGjhPXcImTCb2UBenRJ3Bs5xZs2RCE9Rs2YMOm7dh64CJOx2Vws19DcsCechmRe3dgb9A6de0Owurlq7Fq6Sp17V7tupZv3YutB68gItF+28JZKgmbI3Dl+E5s37heX+c3qO/dffQaYvn082/BcERERERERKQwHBERERERESkMR0RERERERArDERERERERkcJwREREREREpDAcERERERERKQxHRERERERECsMRERERERGRwnBERERERESkMBwREREREREpDEdEREREREQKwxEREREREZHCcERERERERKQwHBERERERESkMR0RERERERArDERERERERkcJwREREREREpDAcERERERERKQxHRERERERECsMRERERERGRwnBEROQTctR/2chRR3ZOjjr0V4iIiCgXhiMionv2B+KECiDIyVK/cR3yk39rGMmywWmOQczli7h4ORrRZifS5Z/mFSTwAU51ZP2tb/LvcSLDnILU2ATYHJnq/+5VFjKtSbDGxMBktcGmvpJni0hE5AUYjoiI7lW2BRkxR7F91XLM8N+K4ItmJP9WS9UWDdOZzQjyX4oFK8JwNNaGVPdLf4vMOJhPrsbcMb3Qa8xsrDxhQmym+zUjsl/H9SPrsW7aKIwfNhDDJvth0YHruGhxv56XZKUiMyYUwQtHYWC/ERi8MgwhMRm/BCQVonOcNmRkZsKhvpjt/jKy05EdF4bdi0diQJ8B6LdoNzZcccBx8xuIiOj/bwxHRET3ynkVqfvGo83/3sDjL9RAjUEbsT7CeedegORQnF/YHF+/8iHKfjAKE/clItb90t/CcQkxG/vg26rP4pkqX6PXehUkHO7XjCbLDOuROVj480d4q2hhFCpSHOWqfYtm845gV5z7e/KSjDjYwiZgyA9l8dSzZZCv6WwMPpAGhw7WObDfuIhrB4Jx+lQEIlW4u1ktzkQ4j07HmIYV1M89j6fqTUGvvRZYvabHj4go72E4IiK6V84oWHcORN23CuO++x7Gwy80wI9TwhCWlKtB65EYglPTvsKbBcrh0TJ9MDg4HtfdL/0tHOdxbXVHVCv9b/zr+ffRfuUVnDNkOMpCluUQjg7/Fs0rFUXByrVQvctITFu0AutPxOJqmvvb8pLsZDhPL8T0lm/j5Qpv4PWuyzH9dIYecAlYcHXrDCxrUAuTRy3FphjAqr+u5JiRE74Efh2q47WK76JK58WYetqBdPYcERH9aRiOiIjulfMq0kJHofUXZVU4uk8dj+PZd3qh09oYXLo9aCTtxtm59fDp81Xw7OtDMHp3AqLdL/0tHBcRHdQN/6v0JJ6o9Bm6b0zAFfdLxuJARvRyLPuqDD55phKqDtqBFYnul/4qMp/sD1EnhyUc54OXYeV8f6zadxlnb46xjMXFOS3QJ/9TaNFgHBark8TufsUlBpdDN2DNwpVYq37ugvq5e5+vREREfxTDERHRvdLhaDRafV7OHY7+gX8+9jZebDAXfkcTYXJ/m+YJR6Wr4rnKKhztSVDNXCU7E1mWFKQkpCDZZIcjM1c3QHYGHGlmJCclwZRqR0Z2jmqHO2BLVd+fkgKr3QGHPRXpyXFIjIvFjSQLrBk5yJYp+pnpcCTHIzk2GrE3EhGn/uxU9drNZrwOR93x2ctP4clKNdFtdRTOpthhM8UiOT4WMTcsSLJkqb/T/f23cCLLZoI1Sf2d6u+NjklAfKIV6Y6sWxZAyLKnI139O5Otdlid2XA6zLBeuYToixGITrHB+ns9HlkZsJuS1b8/FnHqiIlNREJSKmzqH/TLj2WptygckVuGY/Abz+LNZ17HZ0O2YPm5VNhtNr0ow+92qmSp91L9HUmxMa6/I86EhBSHqxzqB+Xdysl2qn93GuzJ0Ui+fAKXzp7EsXAVUNT32T1/eLYdzjRVR4kJqg5VfWT++u/NzlDfn5Kk6tkEs0V9v90CS/xVXI68jMsJ6TCpes92qjqz7Ebw4C/QON8T+PqbvpgUasL5WJP6s+MQd0O9F3HRuH45ClGRV3A1IQ2mDPl3eqh/r9NTJvf7lmBGgtUJVaTbqPfOaYU5JQGx6vvkiE9S/7Z0dc45XasXEhERwxER0b2TOUd7RqFZ9Rfw8BNPoPxrFfFCgRfwxNMf45Nea7EiXDV23d+KxNzhaCjG7E1CvPpyVuIJXFw5EGOGD0efxccQFuPpJ1CtWfNpHFw9Hj17dMWwgN04mZINu/kcjgWOxcwePTBz9hzMnjEag1vWQpNatVGn4zj0XX4Ch86F4eTmcRjVuj7qfvcdatVtjPotRmLs4qM46hny57yA2PU98flrBZHvxSpoOWIWJowdgr5Nv0ODH2rjhwYd8VPfZVhwMA6XVQP8phwTUs+tweoxHdG2fi38UOs7fPttbdRu0gWdp2zDRhVMXCPZcmA9E4Rd83ujn/9SjNm4FSHze2D8j9+gbvNO6LPqLA6qf8sdqXJHBI3BrC6N0Ox79e9XZfi2Vj3UbdUTPebtwvYozxC0KwhfPwbDP3kVbzz5EAo9WhBl3qiJT76uhzbdBmLRARVifmOoYHbSCZxdMxxjOzdEwx++df0d39dHvVYjMGjRQYRGZ8GeqQLg+U3YMrUnejeqhXpff4rPa9bAp980Qt1uszBtcwTC0yRFJCHpyFIs6dUFvfvOxKz9N3A13fX3uJiQeGgFNvTphJEjA7DsUDQSog5h77Jx6DV0LEYFncHxiHBE7ZqOyf2/Q41XiuCFhx5EsWKV8EaNuviqVl3UrV0Ltb6vreqyKZq36YhuA4Ziwvrj2BerzxQlBxmxh3Fo4WAMU/VeT+pdylSnLZoNWIR5oVdxRZa20zKQfj0U+xb0xcDWdVFbfd936vihbku0GrQAC9W/P+rm9xIR+TaGIyKie6XCkXX3cDT8oBieKlUedboORs+mdfDJM/nxdLkf8NnoEOxKzlJNUcW8G+f9fglHY0OTVZNaNVMjlmNbpxJ447UKKNx6Jead9oyvygRi1mNh57fw9FP/Rfkmk7H2Wjas0duwullVVH/4cbzx3nf4vFFz1P6gIt6pVBKlyr+L0jW6o12vrhjQ9mt8WuV1VKxUAeVL5EfBB0vgxS+GoNdOC8LlH5RzCfGbeuOrN57FY4Wfx3t1W6Nxg3r4/u1KqFyhFEo+/STyPV0Nb3VYibnHbSrwSAhIR9rZDdgy8Dt8//qLKFbqZVR89TW89moFvFS+HMq/1xg/TtiOnclO2LOzYQruj+l1H0eJD99H0VoN8OOXFVD9xedQ8p2vUGfWEYTcviKF7LmUehHn1g/AiC/L4d2iz6JkmUqoUKkSKpUvjhJFiqJw1WaoP3E3QhNssDkv4uT8Puj+UnG8+OgD+Nf9D+C+fM+h0PMv4qPvmmL01ss4f+uYtJt/x5lVfdDvf6XwUtFn8MwL7r+jwvN4qco3qNEzCAFnnUhLj0bctiEYU68yKpcqg+fLvYyXK5ZF+aL58GQhVe56kzDj0A1YspJwI3gYhr3+BEo++xaqDgrFJlVXN9kPYv/Y+mj4VFFU/mQgRu2KQMwRP4ys8zzuz1cCpdovhf/+kyqs9UCXWhXwzFMP4f5//RMPPFEIzz1fAS+Wr4gKFSqq96AsKpQsjKcfuR/3PVoAL7ZbgGlnVdiV1e0sKvgu6YFO1V/FK8+XQVlVL6++po4XX0K5ql+jWufFmLbfAktmJrLSj+OIfw90ePcVvFrqRZSvrL7vVVWXZavgzW96YeC6KJzKi3O1iIj+BgxHRET3SsLRrmFo8G5hPFnufbSeG4odIauxsPUrqPzMk3iicnO0CLiAE2b1ven7cGl+fVS/PRyFL8PWjkXw2svlUKDlcvid8ky/l3AUhAU/V8GTjz+Mso0mYrVqcFtitmBt01dR9b5HkP+Vlqg7MRhb9+1G2N4ZmNWuBqqpxnahQm+iynfD0C8wBMH7QrBpWgt0fONpPFeuJl4eGoa116WvIQqJW/rg2yqF8M+Hn0eRb4ej/6I9CAvbh/075mFO2yr4pOCTeKp4C3w//gxO2FXKcBxC2JjmaFK+Aip/2Batp+/EltD92L9/E4KmtUanj0vjw+/aosPmWFxId6oiD8OMr+5DiccfxH3FXsObP3RAx36jMdl/BYJOJuDK7WuZO5KQFDoK4xq+jHLPvILXvxyIocv3Yce+fdi3ZRpmtv4Q7z9bBMXfaoNWSy/hZEqaCotHcGpeV3R55Tk8/Whx/Oeb3mg5aw0OHDyCKBWgfrWSm/vvGFO/IsoUehmVvhyAQUv3ISRU/R0h/li70h9zN13E/us5yEiLR+IBPyyfPhRDp69CwJYw9T6vxuYJjVC/fAEUL/kRvpkYil2mTNjCV2FTu6KoUrwYCn/jhwlhKSpK6r8QOD8Dc5q/h9KPfIq3W6zFtphEpJ/1w8BviqqQUxhFWy2C31krUuNO4Pzm4ej8VXk8/sR/UfLT1ug5dydWb96NnTt3Yc/mFQiZ0RENqubHfQ89heeazcGMS4DNfgMp23pgaL1XUaZqffyv2wIs3if1oo7lQzGmVU2Uq/wjqvffhz2xCTCfV+9lk2p4seB3+KT5bCwKC0No2H7sXrMeW9btwtEr6ty8/X0jIvJRDEdERPfKE47eLojHX6yGNksiccmWjBu7hmPcl4+j6ONPoXDNwRgckoS4lFOIXNQIX5Wtcms4ilyF4G5l8M6br6F4OxWszuTqOYrdiIDuH+DZwvnxSotpCLqeDWvsNgS1qIIPHiuKF76dhMFhrg1lZaJ+9LzmaP/gv/GP+6qg9E/bsVlCmbi2BOtbF0fF/GWRr3oAJh2SboGriN/SG9++/jQeKFgF7w3YoVdGc3HAtrM3xtYshAIPvIGXmgRhWUQ84k+Px6xaZVH6oSp4s8k8+F+0IcUp84xsSDg4GYuaPoaX36yMl4YcwIZoK9KOjcGcWo/gxUcK4emqP+GngIPYeykeKampsDnV23fLvJZsOJMP4+i4T1GrXAE8UL4d6s2+gEj3q7Jmm2nHMIz98AmUzFcRZZsFYcl52ZhJHRELMPeTF1D0qVfwWM9NmPmbK0v88nd8+2IBPPhiW9SfdT7X36ESQXYyEsyZSLEBORk22OIjcD02DnG5/6229Vj/fRlUfaQYiv20DBOj1Nfsl5AY1AQt3ymJ/C82R9tFZ3FZfTkn+wZMa5qgc40yeOiVnqg75yqSc1QAjliIQT+UwX/yF0eZ9gGYJ3+GSA3Gsh6qzgs9jddbzcBqVSe/9EGpsl5ZivGNK+Kh/EVRvMV8LIhywBy9Fwd6vI3PShZGwc+H4uc1EYjOzEJ2lhM5N7Zg59hv8W7+kqhUfQRmHryCyF0qEH78HP75r4/xaisV9lLUv9P9N7jcPmOKiMh3MRwREd0rTzh6pyD+W/ottPQ/hzPydesFRC2ph59efxD5n34Rr7ddCf/gXdg3qwm+LP8Oivy/hKOYbVjTrDJqFHwBH3ZaDr9w97cjFlfmd0T/p/Lh6ae/wRsjD+GguxMq8/pabO36At57sAQKlZ6OEcGqNYxriN3cC1/JggwVa6LLmmu4kHtuUfgirOv2Kl7MXwSlvp2OSbvDcWx1U/Sr9l8UeOIzVGs+FbO3bcfG4O3YHrwbGwJHYHrnF/HO56rB3XsrVkUmIPHwcMysnR/Pl66O1ztvw5aEjN9pdmfAdm01gpq8hPcKPY+nvpuNQeo9yj31xRm9Dnv6l8bHzxbHM5WnY9weKUcq0k/NwLRqpfDsU6/isW5BmHrpt9Zvc/8djcvjXdlfqP5CDD1gvm01uNup2JBphvnGZVy5cBZnTx3Gib3TMfN/L+HNx0vj4Zb+6HtKooUFiArE1IaVUfGZSqjZex02p2bBbjqKY4PfwfeVS6Focz8MCpMSmYBL8zBABaz/5C+hwlEg5ul6VO9OymYEdHtfh6PXWkzGMhX0fpm+pCo03B+jG0k4KoYSrRbC/5IJSacD4P/lS6iiAvNLdfuj6/z12LJ1G4K3b0HI1oVYMLQRGr34LL75qism7YrB+cOB8O+oQuxz6nx4+VvU7jMfM4KO4OD5WMQk239ZaIKIiBiOiIju2S3h6E20WHAGJ6QzA1nISdqELQM/wFfFHkK+Et/hi5b9MbJXXbxV9iMUrzIM4/f9v4WjmoXK4NPuq7DgZrdHDKLmd8LAfAVQsOD3eHPsERy2uvoDHNdUOFJ/xwcPqFBRYhqGb0tWX/0lHD316mfovSkOkbmHUqlAtW1QFVQo/B8U/3IQRm09h32Lv0PPD+5Hvieqo+r3AzFk1jRMmjoFUyeqX8cMw5hBbfFT96HoOe8gDsYnIG7/YEyvWwglqtbBe6NO4PjvTvK3IS1iMVZ8UgZV//UCnq6zAKOPmG4NUyl7cXbmS/i2RBEUen4Khm1NglOFktQT0zD1g5IqHL2iwtE6TLkl5eWm/o7wQKz4qDTeePI1FOy2BTN/M0i5ZVzDjaOLsXRES/z0v3dR7Y3KeKNyOZTP/xieLFAe9/20GAOOSaWrf2nmWewb8y2alH8GL9UfjSEHIxB9ajH8v38FH5V5D99PPIiNUulQ7//5ueivwtG/bwlH6t+SvAn+3d7T4ejVFpOwNErin4cZuLgIoxpVUOGouA5HAReTkHDcD3NqlkPlB5/Bq9+0R+vh0zB90mRMmzQJkyePx5jBPdGvVWMMGrUAK06lIdZ0DVd2jsOkFh/hw/LP4plnS6F4+Sp447Of8dPEHdhxNe2WUEpE5MsYjoiI7tWvwtFpHLs5kT0VKaf8sKLDm3gr/zMonL8cXnurEgoXeBul3x6BSWEpOhw5IlZgW5fSeOvtyijReQOWXMrVj5ESghX9PsFzzxTAyz9O/VXP0Uedl8Pvkvt7cR2R8zqif778KFDgO1QddRBhZle0sF9Zjc1dXsB7D5XEMy/MwMjbeo6eevVz9Np049ZwdDkA67u/iBeffAIvfD0B0/eF4+S6pujz4WN46snP8X7LufAL2YFt27dg6wYVBLfuxI69R7H/4CWcj0iAyWFGzM4BmFq3IIp/UA/vjTuK46bfm8iSAdvlVVj7lQqKD5dCvu8XYMyRm9ufuqTswslJ5fFFyaIoUHEqhoYkqxhqvTUcdV2Lyed/Y4k6+TuiVmLNly/grQIVUbDDBsy88FvhyAZ7zGEc9xuAcT/9gAYN6qDONz+g/rffo9Z3H+Gj4gVQNH95/EeFo4HHPFHCiqRtfTCjdjmUqvYzvhi8EGv8f0az96vhtardMXZnPK7pvKpq/szsO4ejpI1Y2PU9PCM9Ry2nYMU1+Zd4mIALCzGyYa5wFGlC4tlF8K/5Iqr8pxgq1B+G3oHbsXvbVmzfvAWbNgVj+4692H/oIE6EX0OUyleu1QpjkBS2DMvHdES7utVRs0oxFH3qORSv2gIdl57EEfV9tw61IyLyTQxHRET36nfDkZJ9HUkHpmJS7ZdR+aF/49//uB/3/aMMyr4/ClMPmV09R1HSc1Qab79eEc/9KAsyeP4AG5yRyzGnXVUULJgPr7Sc/qeEo69feRKPl/8E7ZdF4szNXJYB096+6t+dH0WeeAtVW6pGdkQcbhwejtFfl8UzT32Cah3XYO11G8yZ2cjJyUaWzM+xpsBkssBicyIzJx3xIf0wpU4BFH+/Lt4dewRHfzcc5SAjfhdC+1TFV2WKIN9HI9A9SObnuF9GNtLOzseaVkVQtWgZFP3GH1OOWdTXzUg9Pg1T7ikcqb/jhvo7elfB52WK4onqo9Fjw3Wk3Pw7nMjOSEdqmuwfFYnobUPRt0pxvFzifXw5fCvWnbUgzZKMlMsrsfKb11Dt0dJ49MeF6JO70qOWYtfIr1H15UYo92ZdtGhTFS992ghv/LQBG67bpT9QUTV/+rfCkaxQ+I4K0fnwcvOJWBypYvbNf1/ucFQMJVouwKKrdpiubUZww8r4+LGSKFpnKgbuioPVkQVntqqbLAcy0q0wJ5thsqjAlyW7N6mvZ2ciMyMTGQ71etIZXFrfF73Uefzi02XwXo+18Fd/7+/VFhGRr2A4IiK6V3cLR8IRiWsb+2JY9eIorDeKfQ4vqHA05bAZierl7Jit2D+0Ij4qVRhPvD5Eb8YarRrJGQlHcHJhG/xY+XE88t9HUbndHARF5/z/Go7itsqCDE/hXwUq4eM+QVgdngnVVEbmjT3YMfQDfFvuMfz3pTaoPS0SUek2ZJq2YF2P6ngn/3Mo/k4HdFgVjnOebo2UswgPWYDl6zZirQoRNzLsMO/qj2l1VTh6T4WjMXcLR+q9SI9C3NpW6PnJcyjw7EcqgC3F2ohMiQRAmnpv5zRD+3IPoHipj/DhiCPYHiNRIwnpR1UAvadwJH9HJG6sbo6O1QrgP4U/RFX1d6yLzFARSyWQ5EM4s2cNAtYdxuHDO3F6UTN8/ey/8GTRz9FqpUW9Y25XFmBB9edR5qHS+Hfzheh3PFelO47hytpeaF7xYxR7qCDKVnwSz9TtjYb+MbiU7k45Ob8TjpLXYUnnt1Es3xN4/vuBGL0rEeGXU5BqV2FGhtWF+2NUAxWOni6CEi384Hc5G+mWcMTOaoifKjyL/z5fDx8PDMauG/pPU+KQeCoE6+er+t18HhGWdGRYIhB98RSORNkgZ4J2LQALviiNtx4pifd+XoX5DEdERBrDERHRvXJehiW4H76p+ADuK1Ae9WadwOHbl6eWRnf6CZxe0Bo/Pv8EHr4vP56p2B+jQpOht/mxnsOVNa3Q9f2SKPbkG6j0RUf8PG4qxo4fhLHdv8GXZR/Voerd5jLEKgfm6xuxrHYZvP1AQbzROgDTz+u/RLmK8Bkt0O2f/8Z//lMd5QbtQ6jJFY5sUUsR1KYgXrkvHx4uOBEDN8ucoyjEbuyG6mUL4L5/l8Zr9fqh56RFmDVlOEZ3+xLfvF4EpcpVwzvdVQA7qRrU+k+KxeVtYzGh7ut4p8JLqFizOZr2HYdJ08djZPem+Kne56jTfRJG70/BNdWYt4Z0w/gvH8CTr3yBl4eE4VDKXZrb2TbkXN2EbSNqo3bF51H+ler4X/sR6Dt+HCYO/hHNa76GN8pUwUfNJ2LKQStidQaKQ+qBMRj5Wj48cn8p3PfTcoz+pQvs17LTVdHXYt3QL/HJS8VRolx11GgzHP3GjcG4fj+ibbuOaDZyCzaHHUHElv7o9nEhlC5ZHh+0noRhM/yxeHkgFs/oh941iuD50sVxX8t56Hog9/C/JKSeDMCsr8rhJR2Gn8Tzredg0pksWDzFz1Gx+MQUdKtZSL33T6FQ8/mYoeoxR+JI2gHsnvgDPiv+IAo+XwVv1uuD9j1nYn7IRVy0JCPrwgIM/a4o7vvXY3iy3lRMln2OstQbEb4Cawd8h/+VfwUvVPwaX7QbioETJ2DaqI7o0qohvqk1AL1mHcfxJAvSL2/E7rk90bN7b/QcNg1z547DtP4t0PTN91Hj7VbovegYDqrU5Dp7iIh8G8MREdG9cl6Ddc9oNPuoOApW+ABtA87ixO09R5oTtotrsL7XZ6hRpAqqvD8SU/YnQ6+crRrrzuvbETKhOZpUVY31ws/i2eKVUb7mj+gyfiQGtf0W9UqVQvMOsxAUkw1TbAiCWr+Lr4pXxP96rMJC3eMgohG1qCuGPFcUxYrVxfvjDuOQxd1zdHUdtvWsiE+eKodSFedg7A7pi7mCuODhqP1ONRSv8DV+7NEbP7eopcJSMZR6Lj8KlP0E1drPh9+hG4hzjQVTspGVpkLV3mnw61wDn79aHMWLqn9zyeIoVvIFVPi4EZpP3o7NsVlIy1FBbvdgzGpcDGU/aYyPJxzDcfM99EVk2VRe3KICUn00/ag0ni9RDEWKq7+jWHGUfPNLfNZlEfz2xiJWpTVX6eJhPTIDU6uXw/PPvokCvdZj+oXf7jnSstJgOb8am4bWQv3XS6HYM66/o3ip11Dhm97oHHgap2QImnqvQ0d/jcZV8qPwcyVRolQFVP7sZ7QYNhfTh9RSQeoDlBy0FP0O5E7Eslz4ERwc/xEaPv8AChf6DN8O34OdZhms6JajwunZeRhSvxL+W/RFVOq8FIsuusuTnYiY0CmYUac83n4uH/IVKoFnX6uFuuNDsONyMhwXV2Jqq8p4umhplG07H3POuOcQSZkubcHWkU3QrGpZlFZlKlq8BErIe1f1M3z68yLM3m9FvMMGR/gabB7xHRq/XwLlS5RAqVIlULLYq6j0UUe0m7wL+66lcsU6IiI3hiMionuVbUVmzBFsXzUPswNWYuf5ZCTcDBK3yYhH8pmt2LpgBZatOIwTMfZfViFTf445cj9CV6pG8chBGNZ/DEbNDcK2k2dx8tAu7Fm0CLt2nkRkWg4cadcQFbIcQfMCsDY0HOf0mDORCsu5vTg41w/z5m3GymM3cCPDNYwryxqJq6EBWD3TH/MDTuPodWlOW5B27TA2Ll+HRUu3Yu+BPQheswAzhw7GwIEjMWzmeqw5HIe4Oy38lhmNG8eCsHHuKIwZ0A/9+w9A/5ETMWnxNmw/k4AbTt1fBsf1MJze6odFq7dh9bEEJDjcw8ruJjsV6RG7sXfVNEweMRAD+vTDgAEjMXbhBgSdSELMLdknXb21p3ByjT8WzF2G2fuicPJuPVQixwTbpWDsDpyCCUMGY0A/dQydicnL92FvpFUW5lb/jhSkX9iOPYFjMW5wPwwZMASjZwZhRehFnDsdgsOHV8P/8EXsi7ntTcoyw6zC8M7AqZg7R9X50UQkqqL/Uno7kHwWB7cEYrrfIgTuUX9eiuf1HDhNl3B5RyBWTR6JMUOGYNjkhQjYHY6IZDucKeE4GbIEs/wWYNHOszidqP46/XMiDfbI3di3RL1v6uf69xmEfv1HYuTsZVi2LxIX1bnizMlCVsolRIQuw7o5wzF+QH8M7N0fgwZPw7QVB7D3SnqupcOJiIjhiIiIiIiISGE4IiIiIiIiUhiOiIiIiIiIFIYjIiIiIiIiheGIiIiIiIhIYTgiIiIiIiJSGI6IiIiIiIgUhiMiIiIiIiKF4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhiIiIiIiISGE4IiIiIiIiUhiOiIiIiIiIFIYjIiIiIiIiheGIiIiIiIhIYTgiIiIiIiJSGI6IiIiIiIgUhiMiIiIiIiKF4YiIiIiIiEhhOCIiIiIiIlIYjoiIiIiIiBSGIyIiIiIiIoXhiIiIiIiISGE4IiIiIiIiAvD/AZCOOKcT+HEhAAAAAElFTkSuQmCC)
MathematicsGrade10
Mathematics
The following frequency table shows the essay scores by students in Mr. Sonny’s class.
Essay score |
No of students |
1 |
2 |
2 |
1 |
3 |
5 |
4 |
3 |
5 |
2 |
6 |
4 |
The following frequency table shows the essay scores by students in Mr. Sonny’s class.
Essay score |
No of students |
1 |
2 |
2 |
1 |
3 |
5 |
4 |
3 |
5 |
2 |
6 |
4 |
MathematicsGrade10
Mathematics
The frequency table below shows the number of pets Smiths’ classmates own.
No of pets |
No of classmates |
0 |
5 |
1 |
4 |
2 |
2 |
3 |
0 |
4 |
1 |
The frequency table below shows the number of pets Smiths’ classmates own.
No of pets |
No of classmates |
0 |
5 |
1 |
4 |
2 |
2 |
3 |
0 |
4 |
1 |
MathematicsGrade10
Mathematics
The students in one social studies class were asked how many brothers and sisters (siblings) they each have. The dot plot here shows the results.
![](data:image/png;base64,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)
How many of the students have three or more siblings?
The students in one social studies class were asked how many brothers and sisters (siblings) they each have. The dot plot here shows the results.
![](data:image/png;base64,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)
How many of the students have three or more siblings?
MathematicsGrade10
Mathematics
The students in one social studies class were asked how many brothers and sisters (siblings) they each have. The dot plot here shows the results.
![](data:image/png;base64,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)
How many of the students have six siblings?
The students in one social studies class were asked how many brothers and sisters (siblings) they each have. The dot plot here shows the results.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAaoAAACTCAYAAADfjV0nAAAZdUlEQVR4nO3dZ3hUZcLG8f+khySkkNCCgIQQQkkISaiRvktRFFykKFiWIlZklbWuwiKKYn0Fu66LImJbBV0UAQFRFIwUUQihiULABEgv0877AYkJCSteBOcZuH+XfsiZMzN3hjNzz3nOOU9slmVZiIiIGMrH0wFERET+FxWViIgYTUUlIiJGU1GJiIjRVFQiImI0FZWIiBhNRSUiIkZTUYmIiNFUVCIiYjQVlYiIGE1FJSIiRlNRiYiI0VRUIiJiND9PBxD5/dyUH93LpszvySlyEdKwNSmd2hAT4u/pYCJyBqioxMu4OfTVC9x07XSWfHuQcjfYAsJo++epzJs7jb4tQj0dUETqmE1/j0q8iqOQN8e3YdSrh064IYi/vPAlr4xPJtTmkWQicoboGJV4F78gEvsOokVA9cU+TS6gd7sYglRSImcd7VGJ93EVs2PV2yx4bw3Zhx1EtEzlotFjGNCxEQEqKpGzjopKRESMpqE/ERExmopKRESMpqISERGjqahERMRoKioRETGaZqYQ72M5yd22hg8+/oI9R13UPy+ZAUMGkBQbqm9eImchFZV4GSe7ltzD6AmP83WuvXJpRIdxzFvwOKOTGqisRM4yek+Ld3GU8PWbL1crKYD8rYt468t9lOiqQJGzjopKvIt/CF3H3kBGbD1+nYTCl5j0qxib0VLz/ImchTQzhXghJwW7N7Bs5df8kO8kLLYDvQf0JCGmanmJyNlCRSUiIkbT0J+IiBhNRSUiIkZTUYmIiNFUVCIiYjQVlYiIGE0zU4hXcjlKyM05SGG5m4CwaJrERBJo6NbssheTm3OIwgo3gfVjaBITQYCvp1OJeA/tUYnXKdn7CTPHDqBLcnvatk0kqXMGI+9+lW1HHZ6OdgKLol0fMf3y/qQntzuWNfUCRv9jITsKTMsqYi5dRyXexVnE+zd3ZtgzO0+4oQFX/nsVT1/ZgRCPBKuFPZ+3b+zMZS/sOeGGGP668DPmjU4gyCPBRLyL9qjEu/j4Edn0PIJPXO7fmCZR9cway/bxI6rpeQSeuDygCU2jgtHon8ip0R6VeB1X6Y8s/9eTPPfWanYedhLeMpVhE25iwpBkwv09na46Z/EPLPvXkzz/9hp2H3ER2Sqd4RNvZvygDoQZ1aoi5lJRiYiI0TT0JyIiRlNRiYiI0VRUIiJiNBWViIgYTUUlIiJGU1GJiIjRVFQiImI077vk0HJw4Jv/sui9lWw7WE5IbBIDL/0LfZMa15wBwNMsOz99/QGL3ltF1s8VhDZLYdCIS+nTviEBns52IncF+9YvYdHi1ezItVO/eSpDRlxKr8RoDLuGFlzl7P1qMW8uXkP2YSfhLdO4cMRwMhIaGJi1jN3r3ufNJZ+x64iLyPO7cNHI4fRoHemFbz4RD7G8itv64f3brKQIXwuo/N+3cT/roU92WRWejleN09r1zhSrfbhPtax+Tf9kPbbqB8vu6XjVOKysRTdYbcNs1bL6NxtsPfX5T5bD0/GqcldY3y+41ooPoVrWwBZDrWe/yrGcns5XlbvM2vzKeKtVcPWsQecPt1765mfL5el8Il7Cy4b+nHy/9B225LuqLXUdXMWKb/ZS4DrJ3TzBcvDd0nf5rsBdbbHzwKcs37iPIpOyuirYuvRdthdVn6TE8dNyPtm0nxL3Se7nCc5ytiz9D9kl1RdX/LCMZZsPUmbSPCv2UrZ89B67y6ovLt/zER9vyaXcpKwiBvOyovKn68S7GJncmKDjyX0CiO05iQmDOhJt0iyftkB6TLyLSzs0JND2yzLfQM7rNZmJf25HpElZfYPJmHQXl7SLJqAyaxAt+t7IxP5tqG/SVuIfQq9Jd3FRQhT+x7P6BXP+gJuZ2K8Vobb/ee8/VmB9+ky6k8Hxkb8OSfrVI27gLUzq3Zx6JmUVMZgXzvVnYT+yk6/WbWbfUTvBMa1ITU+mRVSN+bQNYFGRl82XX27hp3w7wQ3jSOuSTPMIE/+4g5vy3GNZ9xc4qdeoNeldkmgWbtyRP8BN2c9ZfPnlt+wvdBHaOJ4uXTvSNMzErC5KDmbx1VdbOVDsIqxxAl26dqBJqHFHKUWM5YVFJSIi5xKTBnVERERqUFGJiIjRVFQiImI0FZWIiBhNRSUiIkZTUYmIiNG8croxy22n4HAexeVufOuFExURRqBJF9BWYbl+yVrhxu+XrAGGZnW7Kig4fJiSCjd+IRE0CA/F3yuyRtIgPMTcrM5y8g8fpsRuERASSYOIEPz0FVHklHnd28WZl8nTNw0nI6U98fHxtO/UkzF3/Ztvc+2ejlaD/ef1PHXjxfTo1O5Y1pQLuOLeBWw74vB0tBoqctbxxHVD6Z6cSOv4NnTo3IuxMxaxI9+8rGX71/LopAvpmtSW1vFt6Jjam6tmvcOuQqeno53AomTfah6eMJiuSYnExyfQMb0v1zz4HnuLTZpDS8Rwnp1q8PdyWGvuSqs2weex/yOsy/7vc+uI29P5qnCXWyumdaola5Q15tn1Vr5JWV2l1kdTO9SSNdoa9/Imq8jT+apyFFlLbkqsJWtD66+vfWeVeDpfVRVHrXcnt6klaxNr0ps7rDJP5xPxEl62R2WjXlQDQmosr094WCB+Js2dZvOhXlQDak7sFE6EcVlthEQ1qOXPpIQTGRqAUSNqNh9CIqNq/jkPWwQRpmX18SUkKqpmJt8IIkP8vW84Q8RDfKdPnz7d0yFOnQ9NOvchrZFFQUEp7oAwmnfowzX3zuaO0d1o4G/Sp78vTVP7kBrtJr+wFCswnBYd+zFhxkP8fUQakSZltfkRm9qbzlFO8gvKICiclskDmDTzYaYNTyHcpCOZPv6cl9abThF2jhaWQVAkrVL+xHWz5nDr0I6EGZU1kObpvUmuX8HRgjJswZHEdR7EDQ/MYeqQREKMalURc3nvXH+WhdsCm48Ngz7ya6esZ4ayipwTvLeoRETknKBhchERMZqKSkREjKaiEhERo6moRETEaCoqERExmopKRESMZtLlkafOsnCUl1DusPAJCCI40B8fUy9OsdzYy0upcFj4BgQR5C1ZA4MJCvQz95uMt2UtK6XC6QVZvYnbRUV5KRUu8A+sR1CAr65RO0t53fvFXbyDRf+8hn7p7YmLa02HLgO5/rEP2FNo3iSfrsJtvH7f1fRNbUdcXDwdug7mpieXsq/I7eloNTjzv+PVe8bRu3Mica3j6dhtCLc89Qk/lZiX1X5kC6/ceTm9UhKJa92GpO4XceszK8kpNe+SwIq8jbz099FkdGpLq9Zt6NTzYqY9v4ZD5eZl9SalOet5euoIuiclEBeXQMoFl3L3v7/kiF2v61nJs1MN/l5Oa93MCyz/GpN8NrLGPvelle/peNXYrTX3drd8a2Rtal3zr2+sQk/Hq8pVZq24K92y1cjazJr42rdWsafzVeUstj6e1rmWiV5bWNe/ud0q9XS+quwF1gdTk2rJer518392WuWezuetSg9Ziya3rfm62hKs25ftt5yezid1zuv2qKxaJ9Kwjv9nlNqzuk+y3MNO9roa96qCVWsm90mWe9ZJt1c5LbX+W1smbgFSF7xuUtrYzj2J9ztKTu5RytwBRLdK47LbHuAfV/ehSZBJvetLs849aO1zlJyfj1JuBRET14VRt8/mH+MyaBhoUFabH8069yCOwxzIzaeCIBrGd2PMnQ9xz+XdiQ4waOTfJ4DmnbvR0p13LKstmMZtujP2H3O4e2QaUSZN9usbSIvOXTnPlcuB3ALsPvVo0jaDK++bw10jUgg3agp9L+IfQquUNBpXHOJAXiFO3xBi2/dh/P2PcvvQREJ89bqebbxzrj/Lwl5W/MvJFMEEB/lj7LZpuakoK6HCy7L6BgYbf5LKr1nrERzoZ2xWy+3GXlbyy8kUZmf1JpbbdWwbcIFfYAjBgb7ed9BdTol3FpWIiJwz9AVERESMpqISERGjnZGiKisrIz8//0w8tIjIOcfhcFBYWOjpGB5TZ0VVWlrKunXrmDVrFunp6cyZM6euHlpE5Jy2detWOnbsyLRp01i+fPk5tyNwWidTFBQUsG7dOj788EPWrFnDjh07KC8vB6BNmzZ069YNu91eN0Ft5p8mVZcZz7Xf90yo63ym/75gfsZz7d+kLvL5+vpy6NAhFi9eDEBAQAAtWrQgIyODwYMH0717d5o1a3baz2Oy05rrr7i4mC1btrBu3Tq2b99erZQOHjzI2rVrcbtPfwoebzgx0fSMdZ3vXPt965rynT7TM9ZVPpvNVu2z1W63k52dTUlJCTabjfPPP/+sL6o6OT3d4XCwfft2li1bxvLly1m2bBmTJ09m3rx5lXtYIn8k0z/ERE5VYGAgn3/+Ob169aJ9+/b079+fgQMH0qNHDyIiIjwd7w9R59dROZ1Otm3bhs1mo0OHDnX50CIi56S8vDwyMzPp3r079evX93ScP5wu+BUREaPpOioRETGaikpERIymohIREaOpqERExGgqKhERMZqKSkREjHZaM1N4hoWjcC8bPs9kd14pBETSqlMXUuIbEWxs7ZZxaGc2Oc4GJLSNJdjTcWqwKD2Yxcatuzh0pJCScge+ITG0SelG0vmRmPQHfsGiIm8XG7dkk3O4gJIyO7aAcGLbpdK1XTOCjd6iS/jx+61kF4aTlhJP/UBfTweqwk1Z3ves+ngTuS4nv04oY2H5NqPXiH7EBZuUF8BB/o/b2bh5BzlHi7C769N+wCDSYuth1CYrp83Yj/aTKcl6k+uHDufO+es4cLSA/Zve4e5xf+GWF77gqNPT6apz2Q/yxVvP8+g/bubSfkOY+sxycjwdqjZuJ7uWPsdTC5fz7Z6DFBQeZsenL3L98Iv42ytfU+TydMAq3E5yVr7IQy8u4ZudB8gvzOfHTe9y79hBjLz/Q/IqPB3wJMpy+GTu3xk1IIP+1z9LlnFBXeR+/ypTrv478786jMtRTmlJCSXFxZSUluM07HJLd/Ee3pk5kRFX3c3ra7ZxKL+QI4f283OxA7OSSl0w+vtnTQW8P/NO3iu9lA/nP0IXfwAXPR6+jNEPPkCv3vO5om2Up0NWstn8qd+kFe0cpWRGfMROh9vMN5GPP+3GzmHhNX5Vvon+iYChw5n1/FKmXNKJsChDNhUff1oM+ydvjwzg1+/332JtGcacTzM5OnUg0YGGZP1F6YHPeWb6bNb4tKNrr3R27CrH5TZxS7ARHNGIbkOuYvyF0VgWGDnnqyOfT5+4gTveCuHO+a9wZVI4Nmz4+PhoT+osZdY7+rc4trP2m6NE9uhGmv/xhb6079iexsVv8NXefC5rG0WAJzNW4ePfgA4ZA+jwcySbX32WHUZ+OB3j6199U9i/4gOWf1tCxvhuNAgzazOxBQTgi50DW5ex6JWP+CZ7GwfDL+PlOVOICzcpq4ucL+Yz48GF2DOm8sLtA9k6Yyiv77Tha+BHqm9gKGE++Xz6/N8Y/6aTojI3kXEZjJpwFX3iwowZfinP/463Fq6iLHw4O96ZxY1P5VFQWIpPg7YMGXcto3s0w9e8l1dOg0nv6t9mVWB3gq9/QLU3jY+vHz42F3a7oXsslhuHy8hkNVhlh1j54nTuffYLmlw9l0en9ifK/7fv98fzISSqOUk9etOobSyfvLuM+a8updO9I2lZz4yP1J8/uo+Lr3uLZmPu5tY/n8fhbWv5dt8RHMVBbNmUSURgOvENgzwd8xd+NO58C+9vmYgLCzdQuv9Lnpo2lTEfZ/HW8sfoZciG4Cjbw55DAcT26sfVky4kMsAXd9k+/vvgDUy57DOOLP2Qm5JDPB1T6pB3FZVfPB1a+bN0705+Ao5PbH9g348c9mlMu2ZhmPFWOoHNBz9fGz5+PsZ8K63BcvDjV+8w7/EXWO9K4rqXlzKya1Nj9k5r8iO8aRL9L00CoPlPn3LpY8/y2eQhtGxpwqSdblzOYBL79CPGuZl3XvkGm7+D3VtzKM8v4eN3F1FWL464/k0N2SZs+PqH0qBR6K+LGg1j7IBnWTBzI1klDmOKyj+oOS0a+VIQEEHz8xpTD4AYxo+6gAfeepnM3RWgojqreFdR+TRh1NSJLLruZW574DymXpSItfcTnnhhLbGX3cXFbRoZ8qY/xmXPZdOqL9jzw3ds+vEQh5zrWPJmJG1bdSIjuQX1zHjfg/soi+/6C9c/vZGIPldx7cjeROVt4MN37DjcoST06kNSo2AjBqvcznw+mTebzMAU0pNa0zDYyYEtH/Hckj20GnUHPWJCf/tB/hA+NLnobuZfVHVZMR/cmcXK91ty64yH6NrcnA9Ty17Ilwse46OieHqktqVxPSc/bVzC02/spt2193NhQ3POVQ2KTmPybSOYMPtBrn/QzoRBHQg8vImFjy8juPtNXNvLhC8qUpe8b/Z0y8WBzPdZtGQdu38uwQqKJK7rIEZe2J1Yw46lOMt+YNkrr/PNUfC12bDZLFwOBxFJlzB2UDLhgZ5OeIzlymft/Hl8esCPekF+WE47TjeAhdsdTpcxV9K/lSHHKNzlfL/sNf6buY/cI/kUl7oICG9E224DGTYwjUbGnUJdlZ1da/7DBzvDGTGiP7H1TfmmArjK2blmEe9+toPcI4WU2C2CwpvQPuNChv8piagAI/71f+UqY+/6D3l36Tp255Ziq9eAVp36MnxYb1oa9jkgp8/7ikpERM4phn1NEhERqU5FJSIiRlNRiYiI0VRUIiJiNBWViIgYTUUlIiJGU1GJiIjRVFQiImI0FZWIiBhNRSUiIkZTUYmIiNFUVCIiYjQVlYiIGE1FJSIiRlNRiYiI0VRUIiJiNBWViIgYTUUlIiJGU1GJiIjRVFQiImI0FZWIiBhNRSUiIkZTUYmIiNFUVCIiYjQVlYiIGE1FdY67/Y57SEhMZtyV4yuXZWZuJK1LTxISk8nM3Fjnz5mbm8e4K8fXeN7/5Ykn51au+8ait0lITOaJJ+fWum5tt4+7cvxJ1xcRs6moznEPzb4fgG3bt7Nq9WcApKamMPaKMYwbO4bU1JQ6f857p88kNTWFtWtWEBoW+rvvP3rUCMaNHfM/b++SnnY6EUXEIH6eDiBmGHvFGGb8cxZ9VnxUuSw09PeXyKnYsOFrRo0cQUxMNM/Me/KU7nPLlBur/fx7s706/6Xftb6ImEN7VALAFZePpqioiDcWvQ1AaGhItdtzc/O4f9ZsEhKTSUhM5robppCbm1frY2Vn76wc2kvr0pP7Z82uvO32O+6hqKiYayffSEJico37fvDhUvr2H1T5PG8sertyKLK2YcInnpxLQmIyffsPOukw5YlDgVV/rnr/7OydJ81RdZjyiSfnVg6NpnXpeUaGR0XkVyoqASAmJprbbp3KI48+Tm5uHq1bt652+4LX32D9hkzWrlnB2jUr2L//AI88+kStj/XPmQ/StGkTsrZt5rln5vLe+0sqC/D4UONzz84la9vmGvd99LEnueLyUWRt28y0227h4MGDpKamMP2+e2qs+/7iD+jUKZmsbZvpkp7GjJkP1JrnxKHC4z8fv//aNSsA+PC/x/Ymc3PzmD7jfm792xSytm1m2CVD6devD6/Of4ns7J088+wLPPfMsfzp6WkUFRf/1ssrIqdBRSWVRo8aQVhYGAtef6PGba8tWMikiX8lJiaamJhoJk38KytWflpjvczMjazf8DW33XoLcOx417BLhrJ6zWenlKFZbCzZ2bvIzc1jwvhrKof8ahvq69+vD316XwDAhPFXk5W146SPe+L9Q0NDK+8fExNNs9jYytu++34bRUXFXHThYAAGDx7IypWrAIiIiCAsLJSNmzYB8My8JysziMiZoaKSau67925eW7CQgwcPVVteVFRc7cM+NDSUoqKaexLH9y5iYqKrrVtcy7q1eezRhwDI6NWf+2fNPunw4vHHPS4+vvVJ1zuV+1fVvl0iQOVe4Nq1n1eenBETE81zz8xl9eq1pHXpyYsv/et3P6+I/D4qKqmmT+8LSGzbltcXLqq2PCwslOIThrjCajljL+yXD/8TC+ZUz+6LiYnmodn388Hid1i/IZP3Fy856bpV81Q9vnS6YmKiuW7yRB559HESEpNZvyGz2skcqakpvDr/JR6ZM5tnn3tRx6hEzjAVlQDVi+WWKTfWGEbr368vz7/wMrm5eeTm5vHY4//HsEuG1nic1NQUmjZtUnn8KjNzI68tWMiFQwZVW+/E0juub/9B5ObmER/fmtjYphQXl1Su/9P+/dXWXbFyVWVBvfjSK/Tr1+ekv19xcTE5OQdP+vOJmVZ+upqv139O1rbNLH7vrcrT9Fet/ozrbpgCHNvzCgsL0zEqkTNMp6ef426/49hJCvdOn1l5qvjx40pV3XbrLdw7fSYZvfoDMOySoVw7aUKtj/nIww8yY+YDJCQmExYWytgrxlQe7zn+fNNn3E+Txo1rXKcVFhZW+Rxd0tO44vLRlesXFRVz+x33VJ6QccnFFzFp8o0cOJBDl/S0ymHDNxa9zfoNX7N+w9dckNETgFdfWwhASkon4lvHVfsZqFx/8KCBlZmqnpXYtGkTHnn4QcJCQ9m+PavytnFjx+gYlcgZZrMsy/J0CBGTrFr9GS+99Eq1a6+uu2EKCW3ia1zPJSJnnob+RE6wadOx0+aPD4dmZ+9k//4DNa4tE5E/hob+RE5wxeWjydqRXTkEeXz4csL4azycTOTcpKE/ERExmob+RETEaCoqERExmopKRESM9v+J2DGYH0R1sAAAAABJRU5ErkJggg==)
How many of the students have six siblings?
MathematicsGrade10
Mathematics
125, 80, 140, 135, 126, 140, 350, 75
Find the median of data
125, 80, 140, 135, 126, 140, 350, 75
Find the median of data
MathematicsGrade10
Mathematics
125, 80, 140, 135, 126, 140, 350, 75
Minimum value of given data _______________
125, 80, 140, 135, 126, 140, 350, 75
Minimum value of given data _______________
MathematicsGrade10
Mathematics
Box plots show the center and spread of a distribution using a ____________
Box plots show the center and spread of a distribution using a ____________
MathematicsGrade10
Mathematics
Histograms show the distribution of values within a data set in ________________
Histograms show the distribution of values within a data set in ________________
MathematicsGrade10
Mathematics
Dot plot shows the count of values ________________
Dot plot shows the count of values ________________
MathematicsGrade10
Mathematics
________________ is often used to represent data over ranges of numbers.
________________ is often used to represent data over ranges of numbers.
MathematicsGrade10