Question
Expanded form of 89,562 is
- 80000 + 9000 + 500 + 60 + 2
- 80000 + 9500 + 62
- 89000 + 500 + 60 + 2
- 80000 + 9000 + 560 + 2
Hint:
Use the place value table given below to find the expanded form of 89,562.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAbsAAACXCAYAAACMcPXnAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAgY0hSTQAAeiYAAICEAAD6AAAAgOgAAHUwAADqYAAAOpgAABdwnLpRPAAAAAlwSFlzAAAXEQAAFxEByibzPwAASMRJREFUeF7tvfdXVEu77/v+Eff+cM64+4Rxztn77PSmtd4VzAiSJEsGARMIKiBizlkxY06YIwqYs5gDiiJKzjkqOYfPrW4MNOIidUJrjtFD6Z6zqub3qapPPVVPzfmnP8lDKiAVkApIBaQCUgGpgFRAKiAVkApIBb4TBdLS0khPTycjI0P5UfwtP/qtgbSXftuna/v51LYUdpNtSze2+xFs8CP3C4p7z8rKIjMzk6amJhTHV4jOy8sjNzdXCTrFiYq/5Ue/NZD20m/7dG0/inalaF8Ku8m2pRvb/Qg2+JH7BUX7qquro6ioiMbGxu5hp/hWQULFiLOwsFB5kjz0W4HW1tbPnad+l1SWTqGAAnCKxqiwmzx0o0BOTo5y5N/W1qabAmgh1+bmZmU/XlBQoIXc9CsLBeRqa2sl7PTLLAMvjYTdwDXUZgoSdtpUu/u8JOx0bwNNlkDCTpPq6jBtCTsdit+PrCXs+iGami+RsFOzoHqWnISdnhlEXcWRsFOXktpJR8JOOzr/US4Sdrq3gSZLIGGnSXV1mLaEnQ7F70fWEnb9EE3Nl0jYqVlQPUtOwk7PDKKu4kjYqUtJ7aQjYacdnaVnJwNUZDSm7tuaWksgYadWOTWemISdxiXuMQPp2fUo0aA+QXp2g9p83y68hN3gMqyEne7tJWGnextosgQSdppUV4dpS9jpUPx+ZC1h1w/R1HyJhJ2aBdWz5CTs9Mwg6iqOhJ26lNROOhJ22tFZrtnJNTu5Zqf7tqbWEkjYqVVOjScmYadxiXvMQHp2PUo0qE+Qnt2gNp9cs/tezCdhp3tLStjp3gaaLIGEnSbV1WHa0rPTofj9yFrCrh+iqfkSCTs1C6pnyWkOdu0tVObHE/f6Na+VnzjevH1HQsI74uPilH+/fv2KV7GZlNU265ksg784fYVdS2U+CW/jePWqw1Zxb+J5l5DAu/g3HX/HvSL25TuyS2ppa60lNyOZ9KIqWtoHv1Z9uoPWBsrzMknPfU/HS0LUc/QZdm21FGekkpRfQVN3zy1ub+JDYTqJmQVUa7F5tdWVkJ2SRtGHjqfKa+Job6qkMD2FnGJRF9WYQV9g115bQkrCG2JFe4lTto943or2kiDaS8ffivYSL+rJB7XWk4He7sAfBC3qVUE67+JeEvMiljeJ6RRXabGCDUAAzcGuuZIHW80ZPWoow0cZMHr0SIb++hN//dtP/D5ilPh7FCNHDeH332cT+aZsALcgL+1Ogb7C7v29zThajOL3YSMxUNhm2K/89Je/8tOQ4cJWBowyGMavP9uw9GQ8zR8eM8PhdyzX3KBYc32afhq2OpEjgU5Y+Z8kU40l7DPs6p8T4mDIz7PPk1vfTUFaczi13Ib/dFzEnTw1FrSHpOpeb2HySHNWh2eoFUSds23NucAS62H4ro+hQY231hfYNb06hI+jIb+I9qFoL6NG/M4/RHv522/DMDD42F5+MiNg43X06f0CA4FdU2kCNw5vxN/LCRsbK2wsbbG1s2PKvLWcvJPChxY1GkMDSWkOdq1NFL+L5vbtG9y8fYe7dy+we54rpmYerD9zm+i7t7klfrt+M4aciu5aqwbu9gdKsq+wayh4w8NoYY9bt7hz7xYXwpbi+LsxLiGniY5W2Oom16/f5nX2ByiNZrrjMGzW3aTkh4NdEkdnuWI78xRZaqxPfYddDBudTfh1bgR53cIul9Mrx/FXlyXczVdjQXuCXdw2fEZbsvZcpuZgl3uRZXYjmb7hhc5g11qWzLOHok3cvMlt0ZddDd/EpGGGWCwOU/59W9Fert0iJimXWu3J32NO/YVdY/5jtsww5xcjd+ZtPsm91+kU5WTw8uYR1gXbM3ToOGbtfcp7dU539Hg3fTtBc7D7qhyNvDkchLPjAm4V962Q8uy+K9BX2HXNoT4lEr+R9gTeKv868+KbTHMage3625Srcx6p77ep/SsaUzke7IZd0Gmdw26Tiym/z4v8JuzOrLLn765LidYi7JrfhjLV0Ip15zUHOwovs3ycATM26g52X1W88ocsMbLC7VSG9utkH3LsD+zam/K4tEjUJdPpnH5V2k1upTzc4cNvv41j7Z2s7qfV+1BGTZ2qRdhV8eJAIE4Oc7ma2/V2mil6e48zYTvZFrqTY5eek995tNpWwZt74UQ8TqSiqoTYq4fZtX0b+0/dIL5Yz31nTVmuh3QHCruKt2eZOnIc/le7mYQpviVgNxLHrdEU5CRy4/Q+Qrfv4uTVWAq68TIqs54ReXQPoVtCORAubFbUyWZtDeTH3uTshRgKVab+q0m9f4GLt+Io/ew9tlL8Nppzh3aI/Laz/+wt3hZ2HUo2kRcv6tLhvewI3cb2gye5+iiJis9QbqIk4TanLt8hr6aR7KfnObhzKzsOnOF+0vuvvZGmQmKvn2D39lD2iBmJhJR4Ti3yxG5mJ9i1V5PyKIqwnaFs27aX09diyOvj/Fp/PLu+wa6RzDuXOHHtNcWdy9ai0PkUEZcTqFbUqcZicb8Xuf4yn9qKfB6fPyh03E5YxH1SKr9+sWxj3ksuHdnNltDdhN9PJ/flHgLMFbDLQrGcm//iMudeZFAm6sCZQzvZfeIibz4buo6MJ5c4uncbW3bs4+zdRKq6Gzy9T+Hu2YOEhu7g6JVYMhOvst5lNDM6e3atH0i4d54DO4QNQvcTfutVl/rUc0PsyzRm19QaC++y0NAS12NJX2fUVk2GqB9HdoeyZecBzj9IoqrTWU3lqdw6fZHonCoa8p6L+r2TrTv2Cz0SqOi6HFaTzeOLx9i9TdTt3ce4+jyjw269PPoOu3Yq4o7gaGjE9MNp3/bWa14Km4xiuM8xkuqE5ZsKeHw2givJ5TSVvuHyiT1s3b6H49deUtSNq9tQ8JbbZw+IuhbK7uOXeJXTtSNp4336E86HdfQj+05cIja/b9NKegC7cmJOr2fi2DGYOXng5zsBV2s7Ji47yIuSjxZsSmFXsDE/mbkwc/EKZvpPZ6avF5ZiLWmc33ruZat3obqX9UavT9Mo7EpuM8PVkOGOEwkImk1w0EymTXLEZJQxfutFZa/4KE1LGbEXNzHR2Qpr54lMn+aHu70JNpPmcvRZAUrktb3nfogHv5ut4HFNZ0lzOO1vxtgJocQq06sn9UIo/h7OjJ/iR4C/H54uNth7hxAR/9H7bMjnyfGl4nsnxvvMIHDmVLwczBg+2pmgHU8pVWZYw6tj0/jzb2IabOl6Amf4McvfF2dzA4zs/Dj8KJu6T8X48IbjK3ywMBmL+6QZovwzmDFtEk6W1rjOOdvh2dXncHv/fNydnPHw8cd/mg/jba3wXrKf16W9d3v7DbslN1Q6zi8KVnJpgzN/E9OY0crxygcuelvzZ+ctPO+8RF6n0PlvGNqGkaM4reIFWyZZMtzKm7nL5+E/I5CAqc4YjzTCZcY+Xn6et26hKPYEwV6WjLF0xWfGNNF2gwnwsWXM7y5suZitLMqDtTb85jmVeYGzxO8+ePsv5VJuK+21udzdMR0Hk9FYu03Fx9cTexsnpm+5RkbVl6inmvQbrA90wMjMnol+04UNApnu446VWBecvfWjZ1edxqUdQbg5ueDlK2zgOwU3saY0bc1xEj7VxV60Vo3AriKd66HTRB0ag7W7j9BgPLbWTgSF3qToY19dlXSeqX/9DYNpS1gfNB0/8ZnqaoGBoTXT998n7yMcWgti2Lt4Io7OE/CeEcD0SeNxtHVkSZgYdPYyRqTPsGtvIO7QFIabe3Em9Y+i0Zp4vtkLo+F+RGTW0FLzlCW//cZvk+ezbpY/04JmMM3TFqNRpnhtuEDS+y9pFb88zYqJphgLG3v5TsPT1ZZxE5dy4sWnKcBa0u8dZJaXA65efvgHTMfbSbT9KfM4E1tKL29d+YZyLb2pvHvPrujJFjx/G47H4uM8yyihrractOgjBNoZ4Lr8IrmK/qIlnWMrnPinv5jhExLOs5RS6ms+kBK9DY8hQ7Hf9YKarwedvaje3+8pmoadv9to/vvfHVl05DapxTXUVeRwb89URv9mzsLoSqWwZU8P4WUgOrP5R4hJEzZrqCXvzW02TzXCwHEp9woU9Knm6XY/TJ028lxlxJdH5Hwn0cHuJ14xdP3wkNl2Q/Fcd5HEkjqaRFoFsWeYYz8Si0XXUOCuMmYvbmZGeIZcIEVEijY01fI+M5ZDcyz5deQsruQrKkkDiRHz+L9/HYZlwHYux2RSVVtHUdIlltkOZajfQV4rh8oNvN7njeEIZ9ZGvKRQrCtX5r7j/OYpDPtfP+G+4DyKuI+qJ1txtbJjzlHhmVY30lT/nqTr63H+eTSB59PobbXsM+waXrDVTayhGLsTtHAJS5Z0+SyehdvYXxg2ceVH2FVwPcidEVP2EPu+U72vV+hsgK3HCeX9UBlP2Cwz/s8QG4L3XCA2u4KGmiLiw1dg+cto5p5LVXYurRWvCHUz5Pfxq7n2rpDa+kqyY8+x3GMU//xfXdl+tQN2z7a6YzjkH/hsvEtmSSXvi4qpaa8TNliAsQhemxZ6i3cFov7UFPLm4iqcTM3xPxzT4Ym35xMRZMM/LAM5/CSDijoRgZp8l10zLfnX/2LOvO0vlQOmspursLVwYvm5OEpqG2msLSUuYil2P5sy/3rv53DVD7sqXh2dj8FIU2bsvkViYTUNVfnEhi/DbrQtQeGJykjNuqxrzP6PnxhmNo2dUc/IqqilrjiFqDVODBk6maMxivbUxrsDUxhlE8jx57lUNjZRV57G1ZCJAjATOJDQu5XBPsOutZq7640xsV5AdA9xhFkXfLAebsqup2XU18URMnwoQ0aIGI3jD0gpFe2xPIu7u/0w+NWOkIv5Ss+f4qesmfgbo8bP57ywcbloiyVp99g7yxYDt+XcKRLnVNxng4cx9tOPiFmhKhpb6ilLviXWbX/Fcu5pMup6N6jUMeyKCJ8lKrPtch53WRrKODcfKyNPDqaK6tyeyeFF1vxvu8XcUZlVy+bIRAtGBp4mp+FHi4H/Y1BrFHZiGnO6y0hGBJ9HyY9PR0k0i8eZ4b7/nfjmPZfXujDcbh53uqzRtiYcw0tMiwSIjrOttYbnO3uAncLjK72Cj+kIxi2KIKPmi62rs1/y7E1HEEBdYSKPn76loMsUYsP9VVgb+3IsSfFDIwlnZ/FvBk5seNB5MqmFF1t8GGa5kEtZojtvjGeDiLZzW3Odis5Sv3/BJndT7IPDUXSjFbeX4WxkyJzDr4Tv9OloITsmhheZ3UyLfsNsfYZd/Uu2uo8V0YDGOHp4MmGCJ55eHz8TJjDZwwXTYX9hxKRVfYTdW/ZOF1HSk0M+Qv9jgVtfs97JmLFr71DTJqaUHm7GXASibHvy2Q9WnlgcvQaHn6zYENUBuyeb3Rjz00QiMjpNOX14zW7PYRhNDCNNRY8mHm5ywch1FffEVGdb7jnGGxsw92yWyln1SSeYOnwUgZtfKgcT+VFB2BiOZfnZhE5ebgPpz2KIzekYePXmUDfsWkV7WOv+E2YzT3YMJD4fDdxZY8Uou628aWyjLvsKgX82wGWF0LbTWU1v9zJ5hAnLwlME1Nt5sdWG0eaiHj8v/jKIai7jzeOXJJX1bkqv77CrEmUdJWAn1n47D5K6ETQ3SsBOzACEPiyhvvoVa4aNxmLaaQo7n5t7gTmmYlZl6xNlcFFhVDBjf7Flw0NVALSmRxBobcS0k3m0lt9hlcsvGAcc5k2nMtRlxhETly6menvX9+sWdlWPme9qxPAZe3gUn0lWWhqpyWlkZKWK6a8NOA6zIvCGQoRsDi204pdJIapTMKJ7ubzYFrMZB0mr7d0N96bSfw/naBp2igCVcZvuUNZpyaylTIBgigmeu16LOftE9swYh92Cs10aulC3NYGt48ZiFvKA+sZKXuya9gee3T7eKDyt1kqe7A7A6PfhmNm5McUvmPWHLpOQ392abTMf8nNJffmEq6d3s2SyBSNGTOdsuqKwjbw7HcTP5h4cjle9Nun4LCwdg4hMEc2wIAL3saNZei1X1Ttry+XCuhnYBp4UtVKMt6tec2SeLSOGjsbGfRK+s1awJ+JJ90Ejf1Cx+g67GJRrdoGHicstoayslJLSko5PWRnlRXEcWGDNz27L+gy73dOGYh4USpJK/5nOIVdrRi+9yofGBlKOzsTQbgH3vxC+4+5yIoUHPpk14enKPxWwM3HcyNPSLxWlOjWKWUNH4rIkkncioi8tOVW0+1TSMwt5GOaN6VBvjsdVUP5oA2PNvDmV0qUjr4hh2xQPpq1/KqwpJn5Kn7I7YCzDh4/Bbvxk/Gav5sClGIp7O7/10S7qhl1V3CGmj/yZSSujiM/PJl1xn2IPYnpaFg92TxFTw/5cEGvONZkCdr+YMWH3S5U1sfb0cwTa2jPn+BsxiS9mzJPPMV+0u+EiEMZlwlRmLg3l3KM05W+9PfoFu/WjMbZayL1uYtU655sW7o3lMBv2x5aL2YCXrDYwwXb5TdU1xeJoVo23ZdKG++L7Zh4udcVw5AwOP3hHZka6si6kpWWTEnuFlc7DcZh5S6zj1hB3ch6WI/6Bgc14Jk6bxbpdkTzL7ZuBdQu7kjv4jx/Df/xmiJW12LNhY4O1tQ22tjZYmRnw0zBbpp9IFXrmcljA7h9e63n6aR1PqXIV11bZYRZwkHQJO5X6rg3Y2a6/pbL1oLkkhpDJYk5+zxvRMuPZ7eciOrTLKGYiVI8k9ttbYrT2PnUK2O1UwG4TMSpOQj5RC5yV60RvPg3Om8rJenGToxuXijl7U0aMHI6hqRtzQq90rDe1FHP/8EqmOI1jnKhDtg7jmRI4n3k+TmKvYIAK7H4yG0/Ya9XGknpmNlZuQUQpYJd9Cjux73DV7cKOtcVPh5hau7RpthJ2WR+/a6osIPbOSbYt8sXFfBRDR4xmrOMU1l9O7vWG4n7DbuElSrqdKy3m/FpH/qaIxlTOhlRwbaZiGnMvrzqP0MU6Z9SCztOYb1HAziRwK+9UetFsjrraYLTsOu8b6kkIC8DUfh2Pu0ZH5F9jnqO/gF2Hz/ZYAbup23hV9kXrD4mRBP35J341Givaui021tai3VtjY2uHpdlwfvu7J/seF5Bzex025sGcy+jiqle9YqdY/522vsM7UBwNH3J5fuMIm+d54yg8hyHCBpZu09h2O7PXU8nqhl1ZzGH8Df+dX0ZaYDPu033aiPu1wWLMSLGWbMXhhDqqMq4J2Il2s/OZalmzLhA0zlUJuw6Pr108qCORO+e2s3yaGxaGwxkiPKlxfis4F1/xVSvr7os+w048nCD13CyGmzixJ/aPoq5qiF7pwmjTxdwSi5FtdTGsGmmMrRgcqfjWpQ9Z6+ksYPdA3FMjt2Z5MPo/f8PISrRX0f8r6oKNjdDKyowR/xiGk99RlEuFzdXkxUVzYtcyfF3E/u2hIxhtJvb4hVwmu3YwTGO2JLJ94lhs/HfyICGNtNRUUlJTSBUeXlpKEu+SRXRXuRC4JYOwbmFXydUVEnbdVWpdws5z92vRLnM5Pt8GQ59NvOm6nCCmQYMtjHDbF0tzc43w7LwxclzCY5VWkS1C/O2w9hdrdorvW5tp+VSn25qofl9MXtpLToiR4e9mUzmVVkJqxHIsTVxYcPAuScnJpGbmUPS+iuyL4ntTf04qIPbRs+sOdimng7FyEZ5dsujla+6z0MqQyftjVEfO9amcmDP+89aDtpaWLzBsrOFDST7ZcTcJ8RqKoc12Xvdy2N1v2PVm64ESdpVizc6NEeO38aKzN9aYzYnAUZ3W7L4FuyyOCNgZLr0mpo1aKLy2FEMzN04mqc6oNL3dj5+RA+siOrbcK2HnvUUFdo25d1nlZIDj8igS08RoXrT5FNH20xQzOynJJCZkUlrTTO3rvdiINbwNd7ssFhXeZKW9udh60LGpvFWU5xPv2xuqeV+cR8bLSyx3+h1j54Mk9nLhVN2wa0wPZ671SDyXXuJt5/tMTxeebCLJySmU1bdRnXYR/390A7vMKGbauXyEXTstzSKw52Njb66toLQgh/jrO5gsHs7hseQO3W0K6No39Bl2IoH63JuivY7Gfl53A9eOHNrTIpluNRTLldcpUrTT6qes6A52JQ9Y4+EkYHdP1Mh2EvZMFlOkMwi7nyA8XuH5Kvr/VNH/p6WQ+C6ZjFyx/tfWgrj1T3dOzYdi8rPfcXGDGLwNcybsZXmv9nTq1rMTVfX59qlYWvkT/imiTnlLNSRFrMJrwiIRASRGhGLNTjGN+bVnJ2H3reGcTmG3PUbRBZF0bhnmwxxZdiGFuo/z6q0NVTzf54uxoT17YhSj0RYBqbn8ZujArmc1HZ2WeCTX+9hTBFr9K0bBR0kSw9q2dLGR2GcaO25ldtqkW8fro8GMEesYUXFpXFhpw39YzeFax3KR8mipy+P8EkvRKCzYH6cgTxPvzgSJyN6vPbsO2M0kMknhYoo1x/njGGO3lOtZVR/L1UjB80PMGPIzTmIzt2ItIvfKVib4riMy/sPnjojWEiIWGjLGQng0egO7NuL2T8XYaCpHP3UOQueil4eY+utwbMafVK5BUtkD7BZfoVwRWZ5zhWARYei89hZFDR09UUt9AfdCp2Lw/9mx+UqHEbqDHSIC9OIqB4w913C3qDOJ3nNnWwATpoWKGRzR7pvi2Oxsiqn/MRFV2eEZtolHhb09vwyr/27ErNBXopNrI/nMOjymb+VmctUXGzSIwdLMERjbHyCxdwN/1A076pI4PG8chlM28kRJgI9HWxE3Nk1hYuAB3ojgitqMSwR059l9gt2Jd6KnrOLeljm4LT5LaqdHlbTm3WKp7RDc5oolhW91Bp2+7w/sxGo4qZFLsRllyRwRHVpQVU/rR+q2NYvAraxoEXRmyW8mc0Xb6Rixtn540gPs7irXuJte7sTLypq5Z96qRBV/SIhisddE1oq+oyz/Duv8/Vl9Oo6GTjJmX5iN6Sh3DsToHewqebbbF2sRWXVROefUcbSJKYl9gS6YGI9n8Y7jREaeZdeKGdgZmeO1/Dw5iocvtqSxd/YY/t15JY9Ugh0quLjInFFT95DaKWihFzb/7k8ZKOw+vDnJhF/G4iOipr46iq4z2fofmIlRXOfHhTWLyKpV7iNx2vywY6T1Pl4EFrkwZIwDM9cdJCIynNCFHiIM2xjvUDES/biMU5V+lUUmozB2DGTLqQtEhm1kzuzJWAz5O44zRYegiCNpime/n+ggTTxZtCOMC1GRHN++EC/LsUxZdoGi1lZSojbg+qsB9jNXc/j8RSJO7mKFvyeOliP45edfWKNcYW8i/sQ0/nWUA3tjVacxk47PYIytH2ffdczNtYiOZJWHDebuQew6FsGp3Wvwdx/Nr38egX3QKeXUaXOCGL2LezZxncGmsHAuXDjFnuV+WIgIzdmn3/Y6LLrvnt1T1tqO5C8zw7/5uLATSyz4v3bzuf3RhA3xxwh0HsEQx3nsOBFB+OHNzJtgh+1oC8ydj3esrVa8IXTy3xjhu4F4FVBncMDOlCFzoyhSylZH+uW12Btb4j5/J+GRp9m+xA9X03/wb//bnU1RHZurH6wfxwjPEF6Wdta6nZqMW8L7Fbo5+rDuUCSXI46wZZ47Y0eaESyiMUuUvWk7H54fwNtKzP5MW8fRc+EcDJnLBMsh/PlfLAnc+Eypb+3Lw8xwHMlYz1lsPXJO1I3j7Fg4BVMR4r8k6g/2hnWp2AOCXcEtZg8xwu5QQqdU26lNEBvgJxhi7BTIxkMRXDp7lA3BYpuOiSlzT8XTKG6zNjUCn38fifPWx6rTmGLNzs/cloDDcULtNnIvL8dBrCO7Bq7iwNkLXDizh5V+9ox2CSBMDBx7E7XQP9gpGsN7nh9dgIOhBY6TF7Lz6BkuRZwlbNN8PB3NGG0/nxPPiz6Xv/n9Qxb9ItbX519UDfASa3bLHMXWndW3OuAs9qg+OxiIo4khExeHcjoiitO7lzHV1gALjxVczReBSjWJnFzqwi9iKjV4wxEioy5zau8qfGzGikjvs6RV9c5116JnV8u7iBDmBG/lYddFnOpM7hzaSLC3K87OznhOX8SeyJdfOtKWXKK2++O6+JBKNI7CA3y4N0js7YoUDb43pv7uGff5BgcKu+q0m6yaGMT6h91MjpSLcOE5E5h5SPXxQC3v33FomS+LTsV9abQNRTwX++OCvd1xHOeEZ+ASDt1No1alfrZRlXybHfOm4GTviGfQOi4lJvP04HrWrD2r9OyU7aIylRv71xI02QUnZxfcfOax7dSjLxu4W6tIuL6f2d5uyry8pi3iwLVXFGQ/YHuAH2uvZClhl3FzI85+C4lKVg1Qyb6+Cf+5G7iT8WXetaU4jtPrg0SDdsTFdwFHoq4RuX+LaHRXPz7zUHTcWY85GRLEJDcXHB1F8EzQGg5Hp/cpcKDPsGt8x9G5vozfdrf755MqvId9s3Cat+vLflXRYZa+ucym2WKvoLifyXO2cvllMs9PbWTWoqsox5E1aZxd44lvyHHSVeJCCrg4L5ApOx9Q/jnWpJGcJydYNX089o6uTF1xRDwWMIoN8zYQdqvjyRFxx+bju0Kx9/LrQKIGEURzYfs8fCe4Ms5Z6CaCe07cT6FaxRMTkZ9iE/n2eZNFmZ2ZIMocdfMGYWvXsl5AoKOIYi0r5S5H1gQy0dUZRyc3vGdv4OTjnF6vmSpSGQjsmspi2D7Fn3mXv35iam3uc8K3zsVnvKgfYh3Zb94qTj/OVoJOcdTmRLPO1ZfFp+NVp+Py77IhaC5broiZEeWZzeQ/OyvWJX3Evk4nnF298F8Zxi2xsbW3vV+/Yfcx/w/JDziyYS7eYt3NwcGVCX6z2R5+n8wuD8ZsqYpj70QRRLProUqEqZiy4cDCOSxVbC/53FvVknL7EGuDJyn7f+cJvizbdZ43nUbS7dU5RJ/egP9kD1zsHcQ+2iBWHb5HVi9Bp8hKi7D7cUCjD3c6UNjpwz38SGXoM+x+JHG0dK8DgZ2WijjgbAYGuwFnr9MEJOx0Kr/mMpew05y2mkhZwk4TqvYtTQm7vuk12M6WsBtsFutleSXseimUnpwmYad7Q0jY6d4GmiyBhJ0m1dVh2hJ2OhS/H1lL2PVDNDVfImGnZkH1LDkJOz0ziLqKI2GnLiW1k46EnXZ0/qNcJOx0bwNNlkDCTpPq6jBtCTsdit+PrCXs+iGami+RsFOzoHqWnISdnhlEXcWRsFOXktpJR8JOOzpLz65Z+aSagoJu3lOpexNotAQSdhqVV3eJS9jpTvv+5Cxh1x/V1HuN9OzUq6e+pSZhp28WUVN5JOzUJKSWkpGw05LQf5CNhJ3ubaDJEkjYaVJdHaYtYadD8fuRtYRdP0RT8yUSdmoWVM+Sk7DTM4OoqzgSdupSUjvpSNhpR2e5ZifX7BTQa2zseNDcn7oeii+bmpqUC5uFhSrvnf123Wlvo0G85ys/P4+8/Hzxbz4FhUXK55MViP93fCd+yyuntkk8u7ypmjLx4slq8ebeH+1ob66lorSMqrruXkTaPzUk7Pqnm66ukrDTlfJf8pWene5toMkSaM6za67k0XZLxhiOxMDQCCOj0YwaMYwhQ4cxcrR4/YmRIaMNxVt3hy3gUoJ4K/GzzdiLd5xtEq9n/9Fw15BwkFkWVqw6mdrrF032VCkk7HpSSL9+l7DTvT0k7HRvA02WQHOwa20k73kEZ86c5PTZcM6fP8z6GeLdTkaOLNp7Rvx9RvnbyVN3SX/fQFn0asyNhrDuXtmPB7u3e5huZMySI8kSdpqs7XqctoSd7o0jYad7G2iyBJqD3VelruNV2Eycxbu0bnQzE1p2a5V4z9kIQh4o3jn2Yx2tifsJMDFj2bEUCbsfy/Sf71bCTveGl7DTvQ00WQItwq6alwcCcXKYy1XlWyJVDwXsLE1Hse3pByoyX3HzYjjnLt7iRUa5eJd1l6OtiuxX0eLlgeGEX7jGs8TCj++16jivpTqf108e8DpH8dbPL0d7RSbP7j8jqaj2i/fYUkbi09tcCBf5iXeVPUkq+vodWC0fyHj9iGuREZw7F8HlO09JKeh4wafyEFO2GbFPeZ5cRlNDJUkPr3L+3Dmu3I8jr66bN02Jcjy/eYGz4ZHceZVPSfxh5liYsfToF9i1vs/kxZ1LIr9zRFx7wNvcTvn1okbIacxeiKRHp0jY6d4YEna6t4EmS6BF2FXx4hPsOt7rqHKU316D5ZghTFy4jkVzZuI7yRU7cxMMbQI4dCeNT119U2E8UVum425jhZ2TOy7ONljZTGT10YcUfHzZZLV4e7SftQFTD79TyaMldjf2w+xZfjWzA6CVaURuC8LLyQVXNw/GO9pi5zyFkMhYSj6m1VKeQGRoAF4ubri5T8DDxRaTMYZYTV3D2bfKd+2KdN6wx88WA/tZrN+2ikDvyeJ8CwxGmDFp0UnelX95C2ZV5h22BLuKN25b4eg2nolTF4j79cJmpB1rTqYoIVybeZd98ybi5OKA+/jx4oWGjth7LeXkw7xev4xSwk6TzUb9aUvYqV/TvqYoYddXxQbX+XoDu/d31mEy8if+zdqX7ZdekFdeQf676yx3GMko15U8qRTCtpVxOcSZEWNsWH70ASlFFbzPi+OigJHV0LHMP5OihFhdygWCXS0JOpmkCru4MDzNPFl/O09ApZ2M8/6YDpvE7rvvKKyqpiLvLWcXOYr0PQiLU7ytuo7Xe30YYSwAefwp6aWVVJXnEnttD14mv2MaEEG5IoeaJI4vsOaf/2HM5DUHuBlfSGV5Fk+OLMDs76OZG57c4Xk2pHNi+lj+bh3I4YfJlFeUkHT/KPOch/K//qsjG8+ni5M+cHmBDZaeS4mKy6ayqpLipNuEeI3hJ4c1vFTo0ItDwq4XIunRKRJ2ujeGhJ3ubaDJEugN7MrFNKap0TCmhWer3G/2heWYG09hn4JbuafwMxnJxJ3PaVA5q5TIBZaMdgrhbb1gStqlP4RdyO18sTbWTuxOW4YYTudEsgJsH4/aLB5fucbLXMV39WQ+vkrU43Q6nSG+byF6mRGWtvtQ4ImaZI7MGslPrkt49NHZU6bW9paNbmMwX3GN8pZ26t8cwH6UsfAsS1RKX3h3LfZ/MWPVmUzxfR773c0wm7ST52VfpkDbC2OIvB5NpurM7DfrhoSdJpuN+tOWsFO/pn1NUcKur4oNrvP1BnbKNTsRoLL1UYXA0KejnYKboTiMmkDI2xbqHqzGwdyDfY+V/lSno43sK/MxNHflnFgP7Al262/mKqcLaxLOEGj7M7+auuI3axFrth/jTnzXtD9l00xlSQmpbx5x5cRGfK2HY+l0mKyPsDs0cyQm09YTL2D75cjmhKctI+ZFUFjfTN75eYy2DuBakWrp2/MustBhvFizSxL33kT6uVU4DB+Ckf0kghcsZ9ORS7zM/zIV2psqJmHXG5X05xwJO93bQsJO9zbQZAn0CnbKaMz7nbcetJN3fRv2BpPYnNBAxc1V2Ln6cTyuoosmrZTcCcHA0oYTwjn6DLtTySrntb451DGNeTObZuUvzRQnPOLcvrX4e1kx+tdfGDbaErc5O7gm9v4pj7J4IrbOw9fLXUSSOuLs5cX0gABczEdi5XwEpR8qPDsF7Ix81/JaxQXM54yXHQbzIimoayT9RBCmtquJ/tCl+CV3Webuz5LDbzuiMZvLSY25wKHVc/GyMWLI778yysKV4I2neNf12m/UDgk7TTYb9actYad+TfuaooRdXxUbXOcPEthNZNO7NppfbMRttB0h1/K77MVrIv74VIwspnJNzBA2pF0k2MEc/8MJKufVv9qBu4krITdzugR6tFJdlkfa21junlyB08jf8Vp/m5rGQi6u9sJs3Ay2nLjG/QcPePb6HZlZqZxbZIS10yEVz+5r2OVxWgG7uREUNbRSfnMFY8a6cSJJibTPR2vaSYIt7JWencovrfWUF2SS8Pox5zf6MeY3K2ZfzulVDZOw65VMenOShJ3uTSFhp3sbaLIEgwR2E1j/WmCg+iFL3UYydu5x0jqtXTWXP2eTqxHmk4+SLU5rK75PiMsvOMy7xOe3NontCk92+GD8Zxs23y8QPl2NCCBZzZy1F8ntcPM6jorHrHUbhdOS65TkP2SuzX9it/IKKqts5U/ZYDsM03HbiVfMuX7Ts/sIuznnKRCRM235lwkQkZxumx9S8Wmutr2GtyfnMfZ/WLD6XCbtLSkcWz+DdRFv6ByLUv/uGJN+N2WCCMLpzSFh1xuV9OccCTvd20LCTvc20GQJtAq753unY2czi+6ck9IbyzAx+I010aWdvLF2cq9uxnqoO6ue1QgdWkiIWIqL8e/Yz9jIqRuPuHflAAvGjxUekwhiefpxva85j2ubPfjzbzYEhZ7j4ZNoTmwKZoazMT/9xZ0t0YpozFayIxcxWgSMuC3ZzcXbz3h89yJ75ntgaDaFzXdKaW1OJWymHUPGeLH80CXuP3rE5aNbmD/REoOff2WE5XIeKKYtBewOzPidEZNX8kplGjOXE26WDA06S5Yioqa9luTwJVgYWjNlzQnuPrzDaTFF6mH6E//yP51YdyZVnFPJ1SXOGBs4MGfrKe48eMKDi0dZMsUMS4d5XMrpTOZvVw0JO002G/WnLWGnfk37mqKEXV8VG1znaxF21cSdWIy3AMKdbl6S+/7+Ftydrdn59L0K7Arv7meSXQChrz7utGupJyfmLJuDvBhnZYXFOCf8Fu3hbkrlx3U4hQHaxT7vDK7umoublTnmdu4EbYwg4XkkwVMWsCM6p2OfXXMVibcPMHe6F/aWVtiMs8cjKISTDzKpV84nttGYG0PYmqkiLwssLZ3xnrOR8HuveRG1BkcPf6IUi3Z16ZxeYoPD3FDe1nWuAIVE+U/EbsUl8j4FrggPM/HGHuZ4jWOsWGN0DdzE2XOHWOy3kE1nk5X33lKdQ/ThEPw97bG2tsbG0R3/VXuJTqvu9RNWJOwGV0OUsNO9vSTsdG8DTZZAi7Brp625kYaGJlq7eahIe2sTDfX1NHf5sb21WXzfSFOX71ub6qipqqKqupaG5m4SVLKqmfqaKrFXrZr6j+c0i1c7NLV0ftS0AGNDHdViP1uVOK+u8es3D7SL53zWinSqKquorW/6GC3aQn2DorwKtrbR0lhPfWMTbSpFaRffN1Df1EK7yvdtNNXXiPyqqGkQvykAJ94q0dTcqVztrTTWdZyjvEexdaEvh4RdX9TS/bkSdrq3gYSd7m2gyRJoEXaavA2ZdlcFJOwGV52QsNO9vSTsdG8DTZZAwk6T6uowbQk7HYrfj6wl7PohmpovkbBTs6B6lpyEnZ4ZRF3FkbBTl5LaSUfCTjs6/1EuEna6t4EmSyBhp0l1dZi2hJ0Oxe9H1hJ2/RBNzZdI2KlZUD1LTsJOzwyiruJI2KlLSe2kI2GnHZ2lZ9dMWloaBQXdhMTr3gQaLYGEnUbl1V3iEna6074/OUvY9Uc19V4jPTv16qlvqUnY6ZtF1FQeCTs1CamlZCTstCT0H2QjYad7G2iyBBJ2mlRXh2lL2OlQ/H5kLWHXD9HUfImEnZoF1bPkJOz0zCDqKo6EnbqU1E46Enba0Vmu2ck1OwX0GsXDRRTHn7oeii+bxBM+FAubhYWFuq+VsgQ9KiBh16NEenWChJ3uzSE9O93bQJMlkJ6dJtXVYdoSdjoUvx9ZS9j1QzQ1XyJhp2ZB9Sw5CTs9M4i6iiNhpy4ltZOOhJ12dJbTmHIaU05j6r6tqbUEEnZqlVPjiUnYaVziHjOQnl2PEg3qE6RnN6jN9+3CS9gNLsNK2OneXhJ2ureBJkvQa9i1tLQoA1QUF8hD/xVoF+8UysjIIDc3V/8LK0vIJ9gp7CYP3SjwCXa6yV07uSoGwT9qoGFxcTG1tbVKhn0zGrOurk75XrX09HRlo1T8LT/6rUFNTY0SdtnZ2dJWg6C+Kjpahb0UdpNtSzdtS9FWMjMzv2sb/Mj9+Cd2/SHskpOTSUlJUTZGBfAUf8uPfmsg7aXf9unafhTtStG+FHaTbUs3tvtkg+9Z/x+5X1Dce714Qfgfwq68vJySkhIl6BQjUMXf8qPfGpSWlio7z6ysLGmrQVBfFV6Fwl4Ku8m2pZu2pWgrCs+urKzsu7XBp35cUd9+tHr2aZarx2hMuWannTl1deUi1+zUpaR20pFrdtrRuTdbD3RfEs2VQK7Z9bBmp5BePkFFcxVQEynLaExNqKq5NGU0pua07W3KMhqzt0oNzvN6HY0pYTe4DCxhN7jsJWGne3tJ2OneBposgYSdJtXVYdoSdjoUvx9ZS9j1QzQ1XyJhp2ZB9Sw5CTs9M4i6iiNhpy4ltZOOhJ12dO7Nml1bW5vuC6OhEjQ3y8eF9RigIqcxNVT7NJSshJ2GhNVQshJ2GhK2D8lKz64PYg3CU6VnNwiN1psiS9j1RiX9OUfCTve2kLDTvQ00WQIJO02qq8O0Jex0KH4/spaw64doar5Ewk7NgupZchJ2emYQdRVHwk5dSmonHQk77egs1+zkmp1cs9N9W1NrCSTs1CqnxhOTsNO4xD1mID27HiUa1CdIz25Qm+/bhZewG1yGlbDTvb0k7HRvA02WQMJOk+rqMG0JOx2K34+sJez6IZqaL5GwU7OgepachJ2eGURdxZGwU5eS2klHwk47Oss1O7lmp501u/YPvIl5wMOUD93UuXZKEh9wYn8oW7fv59z9ZCp6Xf+rSX1yif3bthK65wR33pbQ7bbQ+iJeXznGrm1b2Hkkipc5dd3m8D71HqcPbmNj6F7C7yVTMwjfpzlw2LVTkfyCOzdS6V6lr6VrLU/gVvheNm/ZzsGIB2RWdm/AiowYwg/tYOu23Zy8+YaS1u7Oa6LgzTWO7NnCpp1hXHqWQ3Ov68PgO3HAsGspJe5WFO/Kut8QXZP7isjDe9iyeSfHr8ZS0tKNRi3vibt9ll1bN7H9wHkeZ1QNPiEHUOKBenZNeXHcuvj2G/2WeL/k8ygO7NrClj3HuRVXMoCS9v9SdWwqbyiM40l0NLkN/S+HLq7UomdXR1LEckysPFgcmd7lXtvIi95JgIsVVh5T8fMej62NA7N23CCzsSdZKnl+ZCFuFlaMnzQDXw8nbBx82HrhDSp9bXUy4SHe2FjYMWmqH5PdbLCZMJ/jz8s6ZdBA/qODTHewxMJ9Kr5+noyzdSEg9BaZ1YPrqQoDhV1N2gUW2TvgOvE8vWmWzfn32TLdCbNxnnhP98HV3ga3WXu4l1GrYsCSF0dY4GmNhdsU/KZOwN7GFr/150is6XxaFcmXN+JpbYnthGn4+LhiO86LRUeeU9rUU30YnL8PCHbtJdzbE4iTmREH3n1dT0veRLBkvCXWDpOY7uONk409vstP8e7Dl3Pb63K5tc0PO2t7xvvOwFu0DysXfw48zOn1YGdwKv+l1AOBXUuBqP/eTlhZHiDjKyFKeHF8CU6W1jhOno73JCdsHX1ZF/kOlWqvBQEHCrv28nj2TTfGYXIwD3rvjWjhznrOQiuwayx8zYUtM7D67f/w//7sweZbOSola8+9yTyn0bgsOsGrgmrqKvJ5fnoprsZjWXg2nT/q38qebcXDYCzB+6LJq6inujCRiHWTMB/rR9ibT9aoIu7ALMxM3dlw6R1lNfW8z3zKnpk2GHiE8Il39dm3We1sytiZR3iVW0NDTSFvIlZga2zN4nBRMQcR7/oNu6YSYi7tZIbD7/yP/zIUz1lXKe+pHjXlc3WhMyPGLeLc6yJq6ivJfnGSOU6mOCw6Q9Yn17D0KWu8jLAN2MnDrA/UVZcQf3Uzk0UnPeNA/OeGX/n6FIGWZrisuEBScb2oD1k8C5uFibELodEF36WH11/YVaY+4PCKKYz+t//GT0Y2nEjpYqzyF+zwHouV13ruppbSUPeB5Hu78B4zhin7nlOtnLWoJyVqGVaini87F09xbROVObEcDrbC1HEJV9NVByw9VYfB+nu/YNdeScKdI8z3MuSf/+knMYg7gWrvBsX3duBhYonPtrtkljdQU5rMra0+GI6dwom4KrQ5cdR/2DWQ+fAMq70t+Os//T+YTl/Di+rBZWkNw66VytTrrBxnyO/DR2Hr4Y7FOHfWXetcHVp5d0gY3iqYqKxO81ntBVxY5ozRpG0kftNdLua8vxUjvfeS1pmIZY9YPd6C8SvvoZyIKXvACgGx8auv876TfRpTT+I3yoJ514vFt3XEHZ+JkfkkzqZ1ptp7riy0Fcbdy5sP3c636aXF+wO79qYsLsz0wnjor/zuOAkPy9F4Bl7pEXZ1CcdwMzZk4cVCFS0yzy/A1taH/XEdnWVO5BzMzLwJi+s8nq3m0dZJjHJawTPl12Vc3+COodMC7pV2Sq49ncNTTbBaeoH8QTZ90psK0h/YFT/ZRIDTEP72N0umeDszytKeE8mdu85WcqJWYWnkxrYnnYfhLbzcPQEjm7U8FQ2krSaRvb4mWMyJRNESPh9ZkfgK7zroWCw/Au76Drti7i4PwHbo3/ib7RQm2Y/Cbvxxsjtr2JzDsbmWGE/Zysdm0PFr3Uu2jDfCccsjtDlp1C/YNVfy+qQ3liOHYGDkwng3U8z9VhAzyGa5NQy7RnKfHSFwwkrOv0gl+f4BfF0cWHmlM+wKOD/VmlEBJ0lXWRxqIOncUmytpnKu66znp8pU8ZgV1iZM2vtSdaqltYCoVU4YTlrLW8Gn5rhQJo62Yt2FTNW1vNq37JtggsPmxzQ15hK5zAVTn10kdfHgss5Pw3LMDCITB89Qpj+wa659yQ7XINYfe0RiynMOTh+Fq//lHmDXRmbkfMaMnUZktupgoCHxOP7mZsw7kqb0HqLnuTBiwk5iVFzFVvLvbMHBzJWwBEUn8JpQPxvGLTxHgQol2ni1xxlTi5U8Kf3+Vu/6A7uU0/7MXhrC5WdppNxYi5HVOI4mdq68H7izfjKWbquJ7jIXXftsG2NN7NifUENtxmWCjCzwOZulyuW2NPb6WeO2OJzM73CA0XUQ0nfYpXBkymxWhF7mVVoKUUuMsHE7goqKxXdY5GrJpK3RqEYq1HJnzVjhOe8kqVF7vl1/YNdWW8TNTU4Ebb1AQmoCEZs8GD15qYRdl9ZCU30Vpe87Ft7q4o7g7WivCrvGV4Q6m+EecgvVPqyRrCursTR0Y7XKqLRTDmlncBPex7KLXYIX2ou5tsWdvzvN4q4Y0JbfXIqD1RQOPu/s10F7fSZH/MZg7RNB9oc4Dvoa4RJ0XXV0K7IrvB6I/XBbdj0q6j7wpTdDdy2f0x/YtbfV86GoEqW1GpM57DcClx5h10TMTnsxbbyBpx1zYp+P5vSzzLf4B1M3PhNT0YWcmmqF/YKzXQY1LZQ82YmzgS1z7wn/ofgaKx3G4Lsh5qv1jKTjLowdOZnzqd+fn9Ef2DVWllBR2wH+8ntrMbS0U4Vdczph862wDNxFcr1qBWyOO4C5+RiWXM+k6Pl+poxxIuRx14iiLM7OHMcw7528KNdeh6zlpvI5u77DrpHK4grqlGO8cq4sNsTaVRV2TYlhBJhZsuBocke7+nS0N/N0mzmmxnO4U6q9GaP+wK69rYXa98VUK4OaPnBtkysGkyTs/rCevn9x6GvY1b9gs6spU7c+oEwlQqyd4kf7cRvpwvx7nYNIOmWRfIJxlgasuJHXZR2nmheHZjLObhbXxVRYydUl2Dr5cey1IJ9Kb1zGtWVjsHU7SUr5S/ZOHoFH8K2voqkaX+zE3dSDTXe75qOrZtlzvv2BnUqqlW8J8+0d7J5us8DCYhOv6rt0iCUPWedph9f6+wJceRzztcBrWRQ5XTreyoRwfEfaMu2G6GwLL7HUdhQBm2Pp6kyU3liBtYmw47tBNn/Ss7noD+y+JNtC4e3VX8OuKYU9c8wxn71HdZpfXNiSe4FgSwuWRKWQ93gXU8xd2B3TxTCiJdxZ6MVQjy08KpGw+0MzNhZycdHXsGt4u4fpY8xZfiINVaS1kHY6GDOLuVzJ6y40theVph+n9Ad2Ktm0FXFpo4Rdj9L/Eex8tz7sAjsBqccHcVfALrrvsIs9PAsHAbtr4tKSq2I61NmP46+7bHloLuPGclXYeQrYdR3fNsXuYbyZp4RdtxZuEiPUDti9bujSIZY+Zr2XfSfYWTJh2YWvYFeVeB6/LrALFLDrGohbdms1NqbTOCph18US34bdXgXs5gjYdZn5bcm7xBxLS5YK2OUL2HkL2O2J6Tq8qOTuogkMk7DrsW/jm7Dbq4TdipNpXWaFWkg/K9awLeZxWcKuZ33VcIaG1+xUS9gt7Bpi2eZixoRN97vArpHsK2uwGO3Gysfd7csTaaeexkVMYy6/2nUas4TrW8fzk+Ms7ghnrvzGUsaN8+boS9V0FNOYR/2MsJ5ynswPr9nvMxr34BsqQSyKOyi6EYTDcBt2PizqMjpTgwU0lIQ2PbvnO+wYa7GBl3WqsGvJCGeB5S/4bHwqwFXACR8rXBdHkqXiQLRS+nQXzqNsCY4WESpFV1luL6IzN74Qq3yqR/IJNyxGTSI8RU5jqirzDdg1p3FwnthGM2sXKV1GDk1vDmBhbsziaxkUPtuLt4kz25513VGZRXiQPUOm7BDrrNKz649n15hwEH8TC5YeT0F14qqJZ6EWmJrM5nb3G0010jNIz64WrWwq7xZ2Ynrr7BQrDGaeJlOld2sg+fwy7Cy9OZP6jYb2/iFLrY3x2f+6S4BKIRdWO2MwcRVvxNxB06utTBhtTcilLNUw39p3HJhkgn3IQxoaczi/xBmzqftI6ZJdVsR0rAz9OJcweKbPtAe7VtLPzxUBKgFcyO0SoJJ0ggBzE+aGKeLhxYL8bLE9YdJuXqosnbZScHcrTqYu7H+rOO0V23xtcBBQVI3tbOf1PrGPz2yZmFL7/jbbaWQaU6wj3Vo3Eavxa3nQObJVyFz/fDtjTa3ZE19NddpFZhpa4nteJY5QLGqnc2CaNS4LzpDedeShka5Yt4n2fc2uU3m/4dlRdIuFYv/wlNAHXZZH6rm7TgSojAvlnZ4HqMhpzH7Uy+5h10zcvskY2S3kSn7nSLJirqx2x2jCJuK/9QgPsT3hjJ8AZcAhsjoPmz48I2SCJW5Lb3dEQBXfZYmTGZM23FWZomzODCdgtDnBlxVxf7XEHvFnjJUPF1XafCU3l47DxHcnr8q1t5DcD3lVLtEe7KDmzSGcTMaw8rpqyF/OReFR205m98uOKNaMs7NENOV0jiV0Nmgtz3b6MMphMY+VY4liLq13YYzbEp6oQDGbkzPMsFh4ntyua4MDFUsPrtcM7FrJDF+BhakXO2M7D9TaiDs4RdT1lTwUMx+tVW/Z6W2C9aJrqpG3eZeZYWtJwKEYBk8ccv+NqRHYNWUSFmyB+bSdJHYeMDS8YceEMYwLEdujtLh/V3p2OvXsRGPLiGC6hTEea0Voa3E1jTWlxF/awAQzU4KPJX4OVKgrSeFF9APe5VZ9nhIoil6Og4E1i07EUFDVSH15Jjd2zMDSfDK7XnyKcf/A463emJlPYc+tdMrrm6gqiOf4QkdGuazgQVFHA6lNvsQC6zHYLDlDUlEtTXXlpN7chIupBXOOv9Zqpex/k+24UpOwq8qN52n0E1JL65XrEO0NYrorwJrh7qu4llRCXWMdRQkXWe5pjt2co6R82lZXeJsF9sbYzztKTF4FjfUfSLu3nxmWhvjseNGxJ1Ic5U8OMsXUFK8t4gk6YhNuY3Uhb88uxtLYng03cv7wIQMD1U1X12sGdsI2xfcIUWzk99vJo5wPNDZUk/PiqPC4x+AZ+pAKZUdby9tTczAWSwYh11Moq2uktjiZc0sdMLObS2Ty4JnRGIj9NAI7MZeUfzkEhzE2BIY9Eg++EH3UhxyeHAjERMQBHIz5MEg2lX9UVgao9K6KlT/dLcBhzPzIrC4X1PLuzDom24jHQ4lHfs0NnIyjlTk+ayJI6rQ8kyY2JRv907/ge+DVFw+tKZsbGwIYZ2qLx7Q5zJ7qjrW1KyuPPVcZpbYUPuXAIicszRzxDprDjEn2mDpPZ8+9Tru52qpIuCTgZmOG9cQAZgX74WJly8TVkSRVaC9iqndq/vFZA4ZdxWt2jf8zYydG0GUGjNhdbvz6335j6ZXsz0EkVQlRzJtkLfYNTSRgziwmOVlh572By4mdw32ayLiyHf9xFlh6+DFnli+utqZ4LhRPrBEexuejuZjHx5aIR7uZ4zg1mCBRHxysnJixM5qC73S/10Bhl391IT+PMGLf265ugtjCc+8AM23MsXCdxpygADzHjcUjaB8vSr/U6eb37whfMAELSwcmz5xN0GRbxtp4sfV66g/h1Snq3oBg15DPuZk/Y2Cxl6+2BddncXXHTMwtLHATfdTM6R7isWwezD/+4uNgQx0tvndpDNyzE/uiV1rwN8dgnnzj2be9K4n2z9JqgEpdrngA8NEj3ErsLuCkhbxX19i9aRXLVoUQduU5RV0W1T+k3marlx/bzr7qMv/9nvhbp9i0YgUr1+/iwrP0r8LWldLW5PD4zE7WrVjGmtBj3EpS3XfXIX8bxW+usH/LChav3EBYVOygfB7jgGHXUETMOfHQ4MjEr56NWPTqHKvFcxPD7mepBJE0FcYSFbaBpctXsjnsKgmF3W/+Lk2MJmzbWpatWMue8/fI7jbepJ6sp+FsD1nG4jXbxAOjk77rTndgsGujSrSN3QcP87K4u/Vt8VDvtEccC13PsiVr2H3mNtndPZSxsYgnFw6ydsVSVm3Zz7W3gycgSx1d54Bg1yIGytd2EyYA1l2vQmsFidHH2Lx2GctCdhH5IOuraGN13ENPaQwYdu3VJNw7zq4z1+WDoHsSe2C/iz0eWw5y9lqSTirKwMqu3asHDLs/Km5bBseX7ed6bP53+ZxK7VqqI7eBwU4XJf7+8hwQ7AaJHAOG3SC5z+6KqVXPbqA6Vbw6TWjoQR58frLwQFP8fq/XJOxK7+9mw64I3n6vryDQQbWQsNOB6F2ylLDTvQ00WYJBBbu6wkzyCou7n6LUpEqDMG1Nwq4qR2xELquQXp0a64WEnRrF7GdSEnb9FG6QXDaoYDdINNWLYmoSdnpxg99ZISTsdG9QCTvd20CTJZCw06S6Okxbwk6H4vcjawm7foim5ksk7NQsqJ4lJ2GnZwZRV3Ek7NSlpHbSkbDTjs5/lIuEne5toMkSSNhpUl0dpi1hp0Px+5G1hF0/RFPzJRJ2ahZUz5KTsNMzg6irOBJ26lJSO+lI2GlHZ+nZNZOWlkZBgeqrkXWvvuZLIGGneY11koOEnU5k73emEnb9lk5tF0rPTm1S6mVCEnZ6aZaBF0rCbuAaajMFCTttqt19XhJ2ureBJksgYadJdXWYtoSdDsXvR9YSdv0QTc2XSNipWVA9S07CTs8Moq7iSNipS0ntpCNhpx2d5ZqdXLPTystbdV+df5wSSNgNLltL2OneXtKz070NNFkC6dlpUl0dpi1hp0Px+5G1hF0/RFPzJRJ2ahZUz5KTsNMzg6irOBJ26lJSO+lI2GlHZzmNKacx5TSm7tuaWksgYadWOTWemISdxiXuMQPp2fUo0aA+QXp2g9p83y68hN3gMqyEne7tJWGnextosgQSdppUV4dpS9jpUPx+ZC1h1w/R1HyJhJ2aBdWz5CTs9Mwg6iqOhJ26lNROOhJ22tFZrtnJNTu5Zqf7tqbWEkjYqVVOjScmYadxiXvMQHp2PUo0qE+Qnt2gNp9cs/tezCdhp3tLStjp3gaaLIGEnSbV1WHa0rPTofj9yFrCrh+iqfkSCTs1C6pnyUnY6ZlB1FUcCTt1KamddCTstKOzXLOTa3ZyzU73bU2tJZCwU6ucGk9Mwk7jEveYgfTsepRoUJ8gPbtBbT65Zve9mE/CTveWlLDTvQ00WQIJO02qq8O0pWenQ/H7kbWEXT9EU/MlEnZqFlTPkpOw0zODqKs4EnbqUlI76UjYaUdnuWYn1+zkmp3u25paSyBhp1Y5NZ6YhJ3GJe4xA+nZ9SjRoD5BenaD2nxyze57MZ+Ene4tKWGnextosgQSdppUV4dpS89Oh+L3I2sJu36IpuZLJOzULKieJSdhp2cGUVdxJOzUpaR20pGw047Ocs1OrtnJNTvdtzW1lkDCTq1yajwxCTuNS9xjBtKz61GiQX2C9OwGtfnkmt33Yj4JO91bUsJO9zbQZAkk7DSprg7Tlp6dDsXvR9YSdv0QTc2XSNipWVA9S07CTs8Moq7iSNipS0ntpCNhpx2d5ZqdXLOTa3a6b2tqLYGEnVrl1HhiEnYal7jHDKRn16NEg/oE6dkNavPJNbvvxXwSdrq3pISd7m2gyRJI2GlSXR2mLT07HYrfj6wl7PohmpovkbBTs6B6lpyEnZ4ZRF3FkbBTl5LaSUfCTjs6yzU7uWYn1+x039bUWgIJO7XKqfHEJOw0LnGPGUjPrkeJBvUJvfbsWlpaSEtLQ3GBPPRfgfb2djIyMsjNzdX/wsoS8gl2CrvJQzcKfIKdbnLXTq6KQbCiHy8sLNROhnqUS3FxMbW1tUqGNTY2Kkv2p65HWVkZJSUlpKeno6gQir/lR781KC0tVcIuKytL2moQ1FeFnRT2UthNti3dtC2FDTIzM79rG3zqx7Ozs3+4eqa454aGBhTQ+ybsUlJSSE1NVcJOMSpQ/C0/+q+BtJf+2+hTO1K0K4W9ZLvSnc0U+n/vNviR+3HFvRcUFCgdgG/Crry8HPmRGsg6IOuArAOyDuhDHejv7IfCs1Vcq5jO7XYas6amBvmRGsg6IOuArAOyDuhDHaiurmYgn7a2tu5h9/z5c+RHaiDrgKwDsg7IOqDrOvDkyRPldKQCulVVVf36fBN20dHRyI/UQNYBWQdkHZB1QNd14Pbt28ooc0Vkpdph91V4pvxCKiAVkApIBaQCUgGpgFRAKiAVkApIBQaHAv8/MNwEnPXy3gUAAAAASUVORK5CYII=)
The correct answer is: 80000 + 9000 + 500 + 60 + 2
We will find the expanded form of 89,562 using the place value chart given below:
![](data:image/png;base64,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)
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)
Therefore,
89,562 = 80,000 + 9000 + 500 + 60 + 2
The correct option is (a) 80000 + 9000 + 500 + 60 + 2
Related Questions to study
The difference of 46210 to 24210
The difference of 46210 to 24210
The number 920 is between the numbers of______.
900<920<1000.
The number 920 is between the numbers of______.
900<920<1000.
The sum of 96,420 and 24,240
Arrange the numbers vertically and add:
Step 1: 0 + 0 = 0
Step 2: 2 + 4 = 6
Step 3: 4 + 2 = 6
Step 4: 6 + 4 = 10 (Take 1 as carry)
Step 5: 9 + 2 + 1 = 12
The desired result is 1,20,660.
The correct option is (c) 1,20,660
The sum of 96,420 and 24,240
Arrange the numbers vertically and add:
Step 1: 0 + 0 = 0
Step 2: 2 + 4 = 6
Step 3: 4 + 2 = 6
Step 4: 6 + 4 = 10 (Take 1 as carry)
Step 5: 9 + 2 + 1 = 12
The desired result is 1,20,660.
The correct option is (c) 1,20,660
The missing number in the pattern of 56,450, 56,500, ____, 56,600, 56,650 is _______
The difference is called the common difference.
The missing number in the pattern of 56,450, 56,500, ____, 56,600, 56,650 is _______
The difference is called the common difference.
The greatest number among the following numbers 95, 656; 94, 657; 89, 900; 99, 200 is___________
The greatest number among the following numbers 95, 656; 94, 657; 89, 900; 99, 200 is___________
The greatest five-digit number that you can make with the digits 9, 6, 8, 7, 2 is
The greatest five-digit number that you can make with the digits 9, 6, 8, 7, 2 is
The value of 5000 × 6 is_________.
The value of 5000 × 6 is_________.
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)
In 76,424 the digit 7 stands for ____ and 4 stands for ____
![](data:image/png;base64,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)
In 76,424 the digit 7 stands for ____ and 4 stands for ____
In 86,497 , ___ is in ten thousands
In 86,497 , ___ is in ten thousands
Put the missing commas in 94656.
Put the missing commas in 94656.
The expanded form of 21,240 is ______.
The expanded form of 21,240 is ______.
Write the standard form of fifty-six thousand and two hundred ten.
Write the standard form of fifty-six thousand and two hundred ten.
The value of 51000 + 21000 is________.
The value of 51000 + 21000 is________.
The smaller number among the following numbers 76,400 (or) 56,740 is________.
The smaller number among the following numbers 76,400 (or) 56,740 is________.
![](data:image/png;base64,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)
The missing numbers are________.
We can find the next terms of the sequence by adding the difference to the previous term.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAARkAAABICAYAAADCtYHxAAAIUUlEQVR4Ae2cwU0sPRCEIQNyIBjS4MqNDDhzIgVuBEIcQAhkwD7V/6tQbcu7s+OdZto7ZWnl6bHdLn/d7gX09K52biZgAiaQSOAq0bddm4AJmMDORcZJYAImkErARSYVr52bgAm4yDgHTMAEUgm4yKTitXMTMAEXGeeACZhAKgEXmVS8dm4CJuAi4xwwARNIJeAik4rXzk3ABFxknAMmYAKpBFxkUvHauQmYgIuMc8AETCCVgItMKl47NwETcJFxDpiACaQScJFJxWvnJmACLjLOARMwgVQCLjKpeO3cBEygZJF5enpaNTJr76+Hr6SFuipqGkEbNca+Ms+otccuWWSurtaVtfb+GshKWqiroqYRtFFj7CvzjFp77HVv8wHFa0Nfe3/FUkkLdVXUNII2aox9ZZ5Ra4/tItOgVinolbQQVUVNI2ijxthX5hm19tguMg1qlYJeSQtRVdQ0gjZqjH1lnlFrj+0i06BWKeiVtBBVRU0jaKPG2FfmGbX22C4yDWqVgl5JC1FV1DSCNmqMfWWeUWuP7SLToFYp6JW0EFVFTSNoo8bYV+YZtfbYqUXm+/t7h38D8Pj4OEvb2tDX3l9hVdJCXRU1jaCNGmNfiSfu6tz7Gs8T7ZQiw+Jyc3OzA8D7+/u471F7behr769wKmmhroqaRtBGjbGvxBMFBnrwWarYLF5kUGBYXCjW/f9BMwdzGC0HcJc/Pz9jXZxlL15kuPvLy8tvRfRPMqQyv0dSVmsVNZFRZW3UGPtKmvmTDIoL/tTx9fUV5c620zMYxcZFZnZcfhdUSkCKqqhpBG3UGPtKPFFYliouPGd6keFGc/q1oa+9v7KqpIW6KmoaQRs1xr4yz6i1x3aRaVCrFPRKWoiqoqYRtFFj7CvzjFp7bBeZBrVKQa+khagqahpBGzXGvjLPqLXHdpFpUKsU9EpaiKqiphG0UWPsK/OMWntsF5kGtUpBr6SFqCpqGkEbNca+Ms+otcd2kWlQqxT0SlqIqqKmEbRRY+wr84xae2wXmQa1SkGvpIWoKmoaQRs1xr4yz6i1x3aRaVCrFPRKWoiqoqYRtFFj7CvzjFp77JJF5vX1tecsi61Ze389SCUt1FVR0wjaqDH2lXlGrT12ySLTcxCvMQETqEnARaZmXKzKBC6GgIvMxYTSB6lCAH9jyfz8/PxUOepJOlxkTsLkSSZwOoHMP+ReX1/vXGROj4VnmsBFEnCR2Q+rf5LZ52HLBM4m4CKzj3AzRSbzd+TMpNoPl60RCGTmg39dKpwBmYE/xTfm6EdRfXx87I09PDzo8O75+Xlv/P39fW/87u5ub3xv8IgBP6op7hvHoUPb0rpub2//0wMesXEMevGsbYrf29vb3jlhZzZozGouMllkF/CbGfgp37gUekFxmVEY2LBex9XmBeHFizZ86aWLNveIPS+mXjjsSzuORzvqiHbUEW3Vw7Usajwr54CV8oq28sIatekTPVq0uceSPfbPapstMvEbTS8MEwjg8YGtDcnHMfQxwY59g6mfqWf4zmpTvnEGPTf48NLgvRYJaMQ432Ge8sQ4xvgOe/MCYYzFQN+1zn1oX+pSjVyPWHE8Qxe1aw603rFQYOzQOcgPmvHRBu3xnY6f+zyVD+f432SR0QsR4TEZmPDRxloNSLSRDExq+I523O+Yrfscm9czNuUbFwFzcH4+8yK1LjPnQAsuC2xtvCStC4h52Cuu0fV4jrHAO6w5djk11hm6WuehTtXPeRib4gdWmKNNi6W+X+p5Kh/O2WeTRQZAeWEivKlvkVai8oIwkdQ3E07fxT0P2ZmBP8U3tfN81Nm6JJyLOS1G5NpidGgN99Mee0OPfo4VGS1CGbpa51EWqh2aMTbFr1VkWmvU97nP0JbVNldkmABIOE1UAm4FWL9FmCicjx6+kAT0rWNMQozNbZmBn/INDviw4Yy0WwmPy0yfrcuMteBIHui1Ye3UTzI6n8+qhYWMY+gxDj1oGbpa55nKA9VMrcoPrDBHm+agvl/qmbFbyp/62WyR0SRHUHmBWgHWpEAwYsHgmlZyAXZrjQbh0HNm4I/5bp1DL5P+dEDtyog8OIZeL3jkob51zSnP8MsLqRq4VgtPhq6W9tY7ZTrFTzXzHC3tHFuiP5YP5/rfbJFRcBr0VjD1WyReEPhhomsi0T8TDmNzW2bgj/mmZnBhwwXmmtY4xjhf52I93nMtbDDGh0358t0pPdapX/Ina+qknaGLe6DXhpyAPjaclzbXkBfmKD/yok+eizZ9LtkrxyX9wtfmigwDrAFDUJEUaEgEJgNha+HBPE0OzEGAkAgt30wQ+prTZwZ+yjcTHfP4UWY8F8dwgbWBIcfQ61rMA0eOk72ubz2TL9ehjy3qjrFaSlfch5r0nHyHXosqNE/xY0GkD8zPbNgnq22uyAAkkloLCWxeEiYPk4XJQBvr9FJgndrRt36DzQ1iZuAzfc89p+evTyAzHzZZZOI3ohYchHvqWwSFA0HhJ6YI36OP32Bx7jEb67Napu8szfabRyAzHzZZZPJCtaznzMBn+l6Wgr39BYHMfHCR+YsIdu6RGfhM353H9bIVCWTmg4vMioGd2joz8Jm+p87l8XoEMvPBRaZevH8VZQY+0/fvAfwwDIHMfHCRKZwGmYHP9F0YqaUdIJCZDy4yB6BXeJ0Z+EzfFdhZwzwCyIfMj/+P33nx+LPZmYUg0/efAfJGJpBEIO8fjyQJ7nWbWQgyffee1+tMoAoBF5kFIuEiswBEu7hYApsqMigGWZ+LzRAfzATOJLCZInMmJy83ARPoJOAi0wnOy0zABE4j4CJzGifPMgET6CTgItMJzstMwAROI/APiGfAKM/QvLkAAAAASUVORK5CYII=)
The missing numbers are________.
We can find the next terms of the sequence by adding the difference to the previous term.