Question
Write the standard form of fifty-six thousand and two hundred ten.
- 56,200
- 56,210
- 56,120
- 52,610
Hint:
Using place values you can write the standard form of fifty-six thousand and two hundred ten.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAY8AAACmCAYAAAAiTgOtAAAgAElEQVR4nO3dcUxbV57o8W8fI6NB64gnUEZyXkZxWsURq7oZYatTnImKh1lIqsTpijCjwuZtHEZLmDfAVg2ptoSnIWQ2mKox7IYwKiHvZaBqKVJj+jaAljGjbBxNxkhNHE2EoxKjifBqIqyXrfdlFyvI7w8bMIRgX4LBwO8jRQHf6+tz7jX3d+8553fPS2NjY2GEEEIIBV4Kh8PhBw8eALBz5841Lo4Qa0/+HoSI77+sdQGEEEKsPxI8hBBCKCbBQwghhGISPIQQQigmwUMIIYRiEjyEEEIoJsFDCCGEYhI8hBBCKCbBQwghhGISPIQQQij2rbUuwJp55KD6wBlcS6xiqh+k5fs3IuvlnWaw1ULWqhUwyWbrX0bnSA36tS6P2DRCYwO0tV/CMewjiBptvoXjFZUUvaxa66IJBTZv8EhTk52jQwdACP89H0FUZO3Skh3dK9kZa1g+ITag0G07peVd+AD1Dh06/HiHu6gbdjHa0U3NHgkg68XmDR5ZZk5fMUd/8WA3WOnCSKW9BcvWmPUerUXhhNiApr101XfhQ4WpvpeWQxoA/H3VFDe46KrvYv8XVnRpa1xOkRDp80hYEPeVagr3GTDsK6T6ipdQzFL/dTu1xfkYDAbyDlip6/UQnI4uvG3HYDBgaPXMru9pNWAwGKjuC0ReeOLDcc4a2b4hj8LyOrpGArPrB251UvtOIXmGyOdbzznwPYkufOSg2mDAUNHFwJVajhQYMBjysZ5z4p8pw7Qf5zkr+QYDhgIrtn/yzSs/QGCkc7YOhoIj1LYOzH2GEC/qbj8dfiCnhppo4ADQHKqhJgfwd9B/FyCAo8qAwXCCrmtds9/J/GM2nP65zYXGHNjKo38TBUeo7XATmJ5bLt/n5JLgkaibdpr6JsneoUX9JICr9Rj2W5HTb+BaNcXvduF8pEKXo2NbyMPAOSvWjz3PnKAXF8R5tpQzvaNsK7RiLd/PtvsD2Csq6LwPoVs2Dv6sDWfoNUrKrZS9vgVP7xlKzzoJxm5mxE7DpxOoNDqyMoJ4emtpGw4CITwfV1Pb6yGYqUWnmcLd3YU79r33O6moaMOJkbJyK2XfA+eVumc/Q4hlCvwxesGyR4t23hIt2j0AIXx/DMS87sZ+7tdMZGjQbVURvNtD7YXo9/F+J6U/PkPP7RDbcnToMidxtp/gYLMr8hnyfU66zdtspVRODZ2Xy9Cmge+zUo40e7lxz0ft6+BodxFCR83lbspeBp64sBVV09PRw41SPea4G/fhGQwBFsqqKjGrIfijIkYnIf3PQqh21XJzpHZu9dBrhPKq6Rn04DtrjunsLqPlyxqMaeD/4gSHzrpxfu2D/CmcHT5AT21HJyU7gLEuSn9sxxt9Z2D0Dj5Ad+g4NUd1EDqM+asJpsheuX0oBMC30p95Kf05Z6KyjwapMQB+BycOncH9L6P42MuUowMfKkpaB6nNU8G0j65jR7D39nPjZyZek+9z0knwSFSmmi3Rttgt384GvPiDU/DIxx0/gBH9y9F1M3aj2wPcHMAz1phA8NiNuUJHT7uD2vx+snbt5YdFJoqKLOi3AoTwDbZx8WMHzvGlr5vS02b+j3Q8hkJAwI8PAD27d0RXVKuJ1CIi6/v7MWe6cLaWYriixZhnIr/Awn6TFnUCu0eIhD0JEgJiu8annj5n3W/N/a8CeBICfNz9l8g9fU9VHj3z3hAk+B/yfV4NEjxSggp9eTeDBS76P3XguH6DnlYnPR1OGntbMP2hidIPHLDHSkvvj9FnjnKxoHrBH80L2lqE7Zoez8BVegaHcV3rwn2ti8/LO+mu0CNjYMSLyvquFhUuQje9+DBFRzoC+PDdBlCh/W4WEHjeJqKm+M/HAFpKGmrJnzd+Pp1tmYBKvs/JJn0eL2rrbl7TAHgYHY++9mQU722Aorm7EQC/P9reGiL4OOb1oIee9jZ+PaJm//s2uq/dpLtKB09c9P8ugO+ugxBgPPRjTDuyUKtgSkkZs7RoMxaUMRhkMrZow220dV5l8nuVNF74nOFhGxbA1+FkVMlnCfE8r+6nXAP4O2jrm+v5Dgxewn4P0JRgzklkQ1p2/wDAx+jjbIyvGyP/vhMitF2PRiXf59Ugdx4vTIelwkRHvQvb0UIcO7IJ+b34noC2vIS9akCjxQS4hhoofufXZIf8eMdjNpGRzr8PddI5/jl3vz7Cq5khxoe8gJbXdmehTTcDTlytddj8Wib6rkaTG0MEE+mRT9Oz/5iWrgsebOVHcGhUkTLGrKKe9tPVMQDX/ZTs06AKjNAPqAr1Czo3hVimNB1lDWX0l3fhajhE/hUdGvx4x4OAlrKGSvQJ3RKoMf/3SrSDbXg+KqXw/0RysybHvQT+Ww2ff1JGtnyfk07uPFZA1oEWej8qw7w1hPeelwmVnqL3O+n8afT2eKuFU+dK0GeGCNz3E9Ie53T53E07aTqsl7s5XazlwbVOOjt6uKMyU9nejnUXqAtOcbHCRFbITc8nv4GfVFKmAbjDhH/xMi2kO9qCrVhPVsiH15+OsaoGS8xydUEjX16oZG/IRVdHJ53DQV4rPk33B2ZpIxYrRrWnhu7PGinL18K4F+84aPPLaPykU1mC4C5rdDvbCN334r3nZ9ubNVz8hzK0yPd5NbwUDofDDx48AGDnzp1rXBwh1p78PQgRn9x5CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQTIKHEEIIxSR4CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQ7KWxsbHwWhdCCCHE+iJ3HkIIIRSTp+qmEDkOqUGOQ/Jt9H280esHcuchhBBiGSR4CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQTIKHEEIIxSR4CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQTIKHEEIIxSR4CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQTIKHEEIIxSR4CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQ7FtrXYBnPHJQfeAMrueuYOL0tRYsW1exTEIIIeZJveCRtZ/GIfPsr56P86mmheGf6mdfS1evRcGEEELMSL3gkaZCnama/VWdDqBGnSkRQwghUsX67fOY9uNqraZwnwHDvkKs5xz4nkSXPXJQbaim59YAtmP5GAwG8g7U0TMWWtMiCyHERpF6dx4JCeKsL+ZiZjOX+xpRM4mrtZbSs2oGz5qJ3KO4sLdoaW7q44Q6iLu9gtpTPRh7y9CucemFEMtw246hvGuJFcroHKlBv8Qa60XgVidNzb/GOR6ETC3mn9Ry6piRrLS1Ltmc9Rk87n+OffAwp26a0KgA1BSVl+E45MD1rpkiAHTU/LIG0/bIcvNfHkbT68YbKEObtYZlF0Isz6uVDA8dj/7ip//9Uobzu7EVaqKvpbMRGrf9fdUUfxikrLGTQX02PPbwWWM1B++dorfZgiZFAsi6DB6Br+/gx0V1Xs+CJSaKpmd+ziY9I2ZRZhZaYGoaPK0GrFeir+edZrDVgsQTIVLcvP7QbNJVoPp29sbqD308gL3BzeHW31KZF61rponK1mb+vaga+5AZW2Fq1HddBg+eAi9X0vmrI880QaWrgcDSb9eXDzN8NPpL2sa4WhFCRD10YT/fQM/1AGzVc7jiNDWHtKiAQF81hUMmLr41zsXmHjyPVWQV1tD+QQnamYvNhwPYfnGeq7cDhFa5ySg4cgOnppzuPNX8BRkmiopVWK+7CRaaUT9yUH3AienCfsbbm+i5G0S1tYiaf6in5OXoe6eDeL5owt4+gOexGm3+X1H7vhXjzJVy0ENXwxkuDfsIZmShP1DJ6SrL3H6IY112mGdpdajG7uALRUZhzf5Tq1ElcoAzYt+jir++EGJ9eOykrtRO6PBlBoeGGfyHEqaulNIwFJxb56Yd+x9MNPYOM/xFIz+8a6O21xdZFnJjK21g4ketfDk0zPDlGrIHTnDyC/+qFN/3tRN2ZJG9yLJtO4zwcJLJ2Vdc2FtGMTX0MTzUR+M+D7ZTPURrgveKlYqbek59MszwUC+nc25Q/TedeKcB/PRUWXFsraF7aJjh3laKHjVResFNosOK1mXwIOcwp/a5afq7NtwPgwQfB/Fft1Na3ol3kw2o8rQaMBiW+NfqATzYDQbst9e6tCvP0zpTxxRw247BUI3j0bOLAn3VGAx2klrS6CjDxT5/+dbXd8f7hZ2BAzXU7NNELg5fLuJ46WsMXHPNNUjk1ND4rglNphr1djOWtzX4bnsjy4MBJp5oMRp0ZGWqUW83caLpIidy0hM+qb6QUJxPuednLgzO9OuqUWdqIv264268ASDo5NcXVNRUlaDbqkadmYX+6AlKxjv4zT2ASSbHQP+6MbIftuo4/F47LfnZTCVY1PXZbJWmwdLYTXqHnbrSfAJPVGTtK6G+wYpuk91IzGuCe9RP7TvD5H9iY/9MBr5KDck9ZQmRIgL47vrhejV5vQsW5RXN/ZyZzpaYRdlZWngaPWVmmTle/msqfpyPI38/lh/kY9pnxJiZ7LJHqeKcwHI0Mc3sz+/XZXwUJ14Gig3YFmyibBpAz+H3zZS++yY39pjZX7SX/XlmjIbET6ApHzz0VSOMLLYgQ0tRVQtFVYss22qhZcQS/7WNIEONeuYLFEpHhYr0TDXq1fqyC5FCpp6C9meddL69oDc02rcZpzsUUKGv6ObmUT/eETe/GbqItcGGubmd0/nJH1ajfcUM1wJMTvNMH8vEuBu2WxZt0nrGdIgQRTT2ncK0oA9j5gkdmgM2hgsC+O65cQ/0U9XawLbyy7Qf1ZFICFmfzVZief6vh653C8kzGMg7YMV+c/6fUvBuD3WzSZVWbH2+uVv1xZpEbtvnN8UEPXSdPEK+YZHETYBHbjpnlhvyFyyPNo8Mz5XRULCwjCF8fTasBXPv9zxeUMeHA9jKZ95/hNoON4FpUs6zzW0BHFUGqvsi9Q30VWOo6sE9OFPfPAo/6Jm/PwNuOmePZzWdrol5TSueVgOGjxw4z5aSN3PspoN4eutm9+GRk524Y3fxEx+Oc9bIMSqwYuvzxDSTRPgHbVgP5GEwGMgvrqVzJP4peXVkoc1R4fvKR2hBX2iifZvBuw7arrgIZGjQ7bNQ2dBJ57sqHF/cSCDwvDi1YS9mfweOWwuar564GOgNYd5nTGyAz/bdmPAw+ih98X7hhy462wfwkoV2TxEl77fwZeN+PK39jCZYVgkem0jXBQfq8k8YHBrkcpmarvcv4Y5+R0N327Ae+5wtx7oZHhrmyw+LmPiwlJN9iXYUxumAC7mxFVdzx9BI7/Wb3BxsX7SDrutsF6poGbutarreb8MZPXuFbtopbXCzuz7aQZg/gXMo5s1r3Nm54pbq2J320fPeCTo4zuVrwwz+r0qy7g7jXriNT+wMbK+k5cJxjJnxOlFDuFpLOTOym8YvhhnubSTf76Q/ZnOhWzaKz05Q9OGXDA8N012VTX/FSXoersoeiUt/6BSm202cbHfjfxwk+NiPq6UU62VvQn0W6u+k4+1o4vwXXgKPgwQfeXGP+FBt16zOqMzMImrqjVx9v4K26z4Cj4MExl20VZ3kquE0NQUJliLLzPGj6XQ1NuG4FyD4OEjgXg+1B+twBoDvqPnPoTqaYvaT+5YHXtUkdmfDOmi2Eiun5N1TWHIiV2C6AjOmjy5xd7wW464gNz7tZKqim9p90YSrzBKaG73k1fXgeSuRrN1oB9wxI5pMFRDpgNP61UwBqrTXONE3SPrMlU+Gjh++acQ2FOkAnGkQKGlopGSmjActFH1Ux+j4acyvBnD29pAdU0b165XUFHdinSnCvM5OIDPS2Tk6FensXJ3uMBdnDhg4s+gyhc82mOnYBciMdOz23PYSOKol614/9rtm6odK0GUC6LBUlOHsc87fRnEjjUdNkboHndRdUFHTW4Iu2iemP3qCkgvV/OaeFZ3GSU9vNpVXameTa40VNZR0zO5hgoEJQjuMGHVZqNNAve8EtgujhNJXbw8vSWOh+XI6bRfqKC4IEMrIwlRcT2OCTTFsLaL58hT2v6/i4NmZ9zfT+zPjqtVOc6iFL7/TSVOzlcLZDPMWvlQ0XFiF/mftXMw8z8WqQs48BvWrRZxoOoU5C0BP5a8u0nnORmmBjyBq9AdO0NlagibepqMkeGwiqoyFX38/3zwB8OEZBHO7bv76u/WYnjjxBUggeMTpgEtTkR5w0nb2Eo5h31xTSJ553lbmlVGdTTYhQtMAE4xeh73FS5yA17qzEwAjtbEDFqL8g7WUNivc1BIduwGfl1COKRo4lpChnjvpxetEfTiKi72UvPL8zWW9eRxrVwVHCh2YCyyY8k2YDUbUq571nIWldYTFejFVLxdR81ERNYu961ALI4eWfk31soXaDgu1K1lchbJet2LrtT5/hUT6ddOyMB5txHi08TkfYsTa/DlLfMqSJHiIFbNkB9xjJw3H2uBvm+k7p0OdNpOwpewzVEuORlnbzs6ZMiw2YCH720m4bs1IJ13J+vE6Ue8CqJbOlcrQU/nJTcofenF/9Rv6262cCZqxtZ3GLHPsbCrS5yEALfpCcN72zns1NOrBlaGNeRZYKJLdv5h4HXDjHgaemCl5Wzd7lTo1rWTk/OJljLXWnZ2KPU10RP2zsna/hmbE9eyAgaXE60R9WU8RTu4+dxcH8XzRRtfNAKrtOkyHKmns6KQmw4Hjdym5h0USLTN4REaGLJWcVt0XiI4YcaTmH+6LSEoy1lpSs/cnVtLb67Bd90c71xw0tfZjeq8EfRqwdTevadx0dbsiHWwP3bT9Y8yzxeJ1wGVp0NPDpc8iHZH+W23UnXfDeCAmYzZOGd8qYTKmjP5bbdhjxvOveWenAtqcIrjaRc+9AMHHAbx9bXTdVLCBl/Mpe9VJQ0MP3keRujrau5aYgZP4najqvewvnqSt3obrYfQYttuZO8pqtqV7aTt3fu79XjfucRXbvpNqe1gk2zKbrbLYf3YY88wQSM9F8t+FlqETc23jGWpCAytQQrEqVK9W0nk5m6aPSsm/G0S1Vc/him6aD810n+koO1fDnfdOcuizEOodZo7/tBLT7eipXxWnA257Cc3t/05D/TEKmyFrXzmNH5Rx4oNJJkMklNypyqul96yNuoZD5D9Woy+uoeQdHZ6ZG5gU6OxMlDq/EttIHWeOFmLLyEJ/4BRl7zhwxn9rRJqWktZOQv/zJMcO2GCrifL3j2DpWyp8xOtEVWE62Utjcx11b+cTzNRTUlVCWY5ndqRS1oFmup/aOfPeQc48CqHaaqKksZea11NtD4tkeykcDocfPHgAwM6dO5e3ldt2DOU88yz9SJu2eeM9tTb6UDLzCs+l/sLHQawIOQ7Jt9H38UavH6xKn8cUDwbnEruO1C9IdIqdEXCRpKXFmr6eSbCKkxgWuNVJbXEk+S2S+DSX/LYSyVhMB/FcqeXIzPvLbThk1kIhxAaW/OBx085FX3400ek0xts2zlybSdoKMHCymJPjJlp7hxke6qZmaz8n/saO58mSW50TJzEsdMvGwZN3MDT0cvPmTQZbI8lv9tgMzhdMxvJ/UY21L5uay8MMD31J648maDpmn03AE0KIjSb5wSOnhtMVxtknWBYVgOer0cg4//sO2q7vpb5+5smPGkzv2qjJ6OLSUILd7HGegqn63gkG/6mZkpwsVCoVWTk/xLwnxMSfYh66sNRTNmeSsWbKuDWSjGWKKcLk5CjoTRi3R55eqXv7FO3N+WQvfzCNEEKktOTneSxIdAIgGCQEBEbv4DeY0ceOiU/TojeAfXwCEukpiZcYpkpncriNMx87IvMBR5kKnl9GpclY+kP1mI9W8+YBPeaCIvYW7cVsMCY2t4gQQqxDGyDPI5oYdr2bxoM6vhm5iLXgCGeGI3cuwaEGSi9MYmroY2RkhJGRQU7nKfyIeMlYmiJsgzf5sq2Gvd8dp/+9Yt78m65NN7eIEGLzWNPgsWii07QPzwiYdmybey3EcycoiZcY5rs3QKigBEvOzDj0KZTM6hI/GcuPq6ONgTHI2qGnqLiWlt5m9t+2038v8c9JedNBPJfP0DO+EhsL4mw9g3OdPq9wzUz7GWhow6XkouR+F3VXEnsooBBKrO2dxy4LlftuzCU6Pfbj/vgMbU/KOF4QabKKnLy76FpmYli2Rg+9l6LJWH7c7XU0jYAvkFhqWvxkrGzUT4ep+/uYWQ1HXHjQo9kw45NDeD62ciZo4XCGg+qlZi6MJk8unSCqxlysx/GegoERm16AgZOl9O85jElF4rMW7iqh5HGDgqcjC5GYNX62VRZFzb2oLzRRVWwj8CQySXvLr6zoZ569s6uM5qo7VNUdoueJGm3+cY5XmPDMnPvjJIZp3m7m4uMG6ioKsZGF6Wgj9e+coO5Pk4TQPadcMeImY6nQ/7Sdi99qwnYsH99M4tXlFkq2r/weWxP3uzhzbT+NX+hRsZvGobmHGXo+zqeaFoZ/Opfhk67mmTkgnqGxUGOxUtrq4rfvm1IuiS/VBIfO06A6xeChRJ95OkOFvrySbUV19Og7KdmRlOKJzSgcDofHxsbCY2NjYbG2UvM4fBPuP5UbPvb5xKJL77TkhnNb7jzz+qSjKpz786vhyaU2PXUj3JR7LPzZH1empCsl5Y7D09HwpYNvhJt+NzX32lfnw7m5VeGrf3p29UlHVTg393w49qg8+PSd8Bu234ennl19TaTcPl5hG71+4XA4vAE6zEVSBd3cGDJiyVN6xQtxE0RVRkzFHhw3fStV2o1pzMVVfwn5CuaXXkj7ugXtZ8OSeyRWjAQPsTSvhwF0aJcTO5ZMEAVQodUZ8d7ybryHZ64g/x/c+PO07HyRod/btRi5yp3nP5R4wwje7eRMbyIXJOts4IbiQSvJrZ/M5yGWFPD7IM/MtvirPmsmQRQgM5Ig2vPVKMHiuafcZn9HCyMPSDCrZ1OafOiGV04ssn8UzFqYlo0mJ4TrYQBe3bh7OnS3DesvQpy+sgVHlYEzSzyp2FQ/SEuxnur37GR31Mz1s6ak6KCV0Gm6Y/qtArc6aWr+dSSHLVOL+Se1nJqdcTAyMCVZ9ZPgIZJniQTRGaoMFTyRtpTlUTJr4RbSM3n+fCwbwbSXrl8MsL+hD30G7E7gyd+o1snAjXmDViL8fdUUfxikrLGTQX02PPbwWWM1B++dorfZgiaNpA5MkWYrsbaeAs9MjysSMzNr4fx/i89aGM1v2sCXi8GhS7SpyyjKifyuUsfsly0qQDV/X0V3k/bt4xzuvcTVh2tW9DiCDHS2oT5ahG6m6fLxAPYGN4fPtVO5T0tWppqsHSYqW5s5PHIG+9DceMdk1S+1gseKJqIlxvtJHV335Mr3ebI0WrjpYyJJ2/c/9IJh5/KaxTaJ7O1G+Nr3Yv1C0xP4RlTotm/UJqsg7utOjIf2orh7LtUHbiwyaCU4cgOnphxL3oILhQwTRcUqnNfdc8Plk1S/FLoOiW3TC+CoKozTXvkp5qGfxG/T/P6NJefe0B0uob/8JI4PW7Asp1N4o9PpKeJzfH7Qr/j+CeHzutG9Xiv9HUvQ/LkRzVkfD6aJtmUvw0Mfbg5TmUBq07o0PYpnEHRHlvMljQ7c+BcvgR9rU++7GB20UhJTNd/XTthhjMzSucC2HUYYmWQSon2Lyalf6gSPBW16icxUmJ6fQJtmvDmeM/RU/o9tvPlBD/qOErTyMMP51Eb2FtTSPxLAcmiF/6xCd3Bd02Pp1sZfdzN72cRhzTFcd2sw7lneJvwjA/h+fALjRm0hDPjxYcK8zAucVB64seiglVCc1pJ7/nmJusmoX4oEj5k2vb7ZNj2VWj3XubMl8pM6Uz1/LmpVAuskQJV3hJr2Uj4fOUytTKe5gJoiayWX3nPgfcs61+Yapa8aYWSRd2UdamHk0NLrBga6uHrgOL/dKJn4yZKm40iVmcJPBzi+pyjy/d5Tw8hiO55F9n3IQ88VqGlNvel4U8W6G7ihinMkczTzzoPJqF9q9Hm8UCJaYqZ8A9iORWYTzC+uo2feTH9ajG9p6Rl2ywPkFrPLSuPb/dRd8Kzc/vE7aPhUS3tVCo9wSSHqglM0pjVRp/gZVSE87U34yhvl0SRLWWcDN7SvmGE8wOT0s8smxt2wPXt+k1YS6pcaweNFEtES4sL+8QPyG/oYHurjtMGDrfEqsX+G2peNcO0Oo8kqwjqnO9ZNo9pB/4qM2Aji7PVg+TDVx9anEjXmhm4stweUZYnf76Ens55mxc/EWmeyNGhx4VtmQlwqD9xYbNCK2rAXs78Dx60FX4YnLgZ6Q5j3GefdeSSjfikRPCJtetokHjgdNXWV0Zn+NJiLzHDXw+i8RkENuide/JLq/BwqdMdOY1mRJiY15qrTy26f3rTSNJjrrcr6LXaV0XhUt/Hv7tJ2oy8E77Kix8zADV3K9XcA0UEr3vmBMbOImnojV9+voO26j8DjIIFxF21VJ7lqOE1NQWzoSE79UiJ4JF826c9c4QYJ/kfMrxnpZANTi9wGCiFSnRrjPjPuYbfyIc0zAzfyUnTghtrI3gI3zpH5NdMcauHL5r2Mt1opLMinsNzO+Pdb+HImQXBGkuqXIh3mKeBpJIcqXUZbCbEuqQuOU/nxSRz3LFhzFixcYoBB6g/ceP6glazXrdh6rUu+O1n1S4k7j2QnoiXE78OdodtAEzgJscmk6bD+8jD99QomGVsvAzeWO2glifVLieCxaJveKvONueHAa+xeuyIIIV7ULivdDVtwDCZyMllfAzeUD1pJbv1So9kqmYloCfHjHvBRUiHj4IVY71Q5Vk4vbLZaVGTgxvoRGbSS+EMCklu/l8LhcPjBgwcA7Ny5M2kfFNf9To68B41fPJuIlmyh23aKWzS0rHGGeUocByHHYRVs9H280esHqdJsBclJRKwdFxYAAArySURBVEvEEw9tNh/Hz8qjSYQQIlGpEzxY6US0xHiv9pBd1ywPRRRCCAVSo89jltI2vRene6dxVT9PCCE2gpS68xBCCLE+SPAQQgihmAQPIYQQiknwEBHTfgYa2nClyDPpN+30wA8HONPuWp0Rh0En9rNO/PI8N7EMEjwEEGDgZCn9ew5jimZJhh56cfV1YTt5hPxWz7NveeLDcc5K4T4DBkM+1voevAseCREY6aS2ODKHSt6BauzX52f9hsYc2MoLyTMYMBRYqev1zp40dYdLmGw8iWMNnzqw6h4NUH2sH/2huUdJxDsOS+1DAKYDuDtqOVJgwGDIo/BdO66Zfao2U/Kqg5OrPTxebAgSPATBofM0qE7RGJ3zIdBXTd6xOhz3VKjSfPOms4wI4b5QStOjIlp7hxke6qRkuotjZ51z6z7s4WRFP9lV3QwPDfPlL1/D8241nfdnNuHGfqyJiR+18uXQMMO/KoErx2gYim4hOj1w0wc9+DbFlXEQZ0sD6ScbZ4eNxz0O8fYh4P/iJCcGsqm5PMzw0Jc053iorurEG92nmrdqsHxVgf2mhA+hUDgcDo+NjYXHxsbCYm2tyXF4Ohq+dPCNcNPvpuZem5r7+U5Lbji35c7893zzm/AHuQfDl/4Q89qfroarcqvCV/8U+XW082A491R/+JuYVe60vBF+I7qtb/75g3DuwUvh0adzyycdVeHcn18NT86+8iD82V8tKNsqWJPj8IdL4YM/aAr/PraqcY5D/H04Gr50MDd8ciDmKDy9Ez7/gzfC57+K+RhXUzj3rz8LT6xkfeLY6OecjV6/cDgcljuPzW7MxVV/CfmGmKd6xZsf+V/H8bAX3Ssxr23VxszkFmTiaz+67+nmzWa2bYeR0Nc+AoD/oQfydPOy+rO+u/DpyptnemDvrav4D+fPn+gpznGIuw+DEzzw6zDoYo5C2ja0e0L4/jg3N4TKYKLkroMb4ytSFbFJSPDY5Px/cOPP07JTyaNZnnyDHxXq557bQgSDkP3tLc/dxFTQDxnquA+i3BzTA/sZveXH9Iqy5yDF3Yf/ESS46ERoC6i06AxeXPfW5zSawbudnOn1rcSWcLaewbke+tkSHuCSvDpJ8NjkJh+64RVtak6/CZtkeuBJfCOg/e5aHYVssneA+49rOqPOsoTutmH9xTdYDkRnyQsF8N0eoOejOqwHqnE8evY9zx/IocZcrMfxnoL5QNaEkgEuyauTBA+R2mR64FWgQp0BofXWNjjtpesXA+xvmJmvwoM97yAV/3iDyf+6halFAkfcgRwaCzUWDxWtqzRcehkUD3BJUp0keAjlMragYZLJZ4dhRalQq8EXmHzuJtLVGvjT5CIjuRaQ6YGfK+4+/LYaNT4Cj+Nva+pp/K6uVBMcukSbuoyi2bk79FTevMlgRyOVb+nIXuQ93qEuPAXHObFPgzpTTdYeKzVHJ+gYmLta1759nMO9l7i6ig9oTdi0l89bnRx+2zzbn5hV1MzI0OfY3i/B/JwHvCajTqsXPFIsCU2R+13UXfGm7JXIi8jeboRoJ3bCdujYi4fx2C/iw1E8mNBqANRo9Tr83tiroBAPvG5U0SYyrW4v3B2fl6Dm/9oDeVq2xX7WppgeOButgXmd2ImIuw/VWvQ5fkZ9MeEl9ADvbdWCJjI//vtg/O68PZ/igrivOzEe2kvs+XLpABh/IEdkI0ZMxR4cN1eiH2WFLWeACySlTqsUPJKThDZrqUSoqBdKptpVQsnjBk72rYeeNGU0f25Ec9PHAyXNQiojRUeho6MH76MgwUdees7bGS20YN4aWUWbX4Jp6BIXr/sJPg7iv27H9tk2yov0kU0Yiiijg7ZeL4HHQQL3emhqHaXokHle/8vmmB5Yw+7XNbi+fqDoXfH3oZYfFptwfnwR18Mgwcd+XC02eraWs//VmA2FfHhHdJhy1lGEnh7FMwg6rZK5FOIP5IhQodUZ8d7yKruoWgXLGuACJKNOqxI8kpKEFiNeItSLJ1Op0JdXsu3DOno22nDGl00c1vTguqvkTSr0P2unfusAVcX55B+oYODParj8wdytNFstNF62MNlaSn5BPsXnJjB91IJ118wm9NRcqGfbP1dxsCCfwqoB1FWXqS+IvSaMTg+cv/GnB9a9fhjNVRceRUE8/j7MequRzkOT2I/lk19QTMO/mmhpnT9bZ+grF1dftbB3x8rVJ+kCfnyzd7orL/s7Whh5QKoNIXiRAS4rXqdwOMkJLUlKQpsTPxFqpZKpHnz6TvgN2+/DyUpZW6vEom/++YPwGwsS+lLB1Ffnwwf/+rPwg6fx111Ja3Mcvgn/5u/emP8dXBWT4as/fyPc5FpniZjPPR8stXwyfPXnueEqx+S8VZ9NTg2Hw1+dD+fmng8vODMlLFnfoUXPl4kuf8E6LZT8O4+kJKHFSCARaqWSqbSvW9B+Nox7g3V+qAtO0ZjWRF0qNcttuumB1ZhPNqJqrlvV53n5+xroeaWdmryNfm8HiQzkmPUUyNhg+2SF65T04JGcJLQYCSRCrVgy1XYtRq5yx5tAudYVNeaGbiy3B1ImMG7K6YEzzTReseC5tkoZ9UEnPXctNP9Mv/6aBbM0i19MLin+QI4Z/odeMOwk1YYQLGuAS9RK1ynpwSPlk9CUSMtGkxPC+zDVutFWQJoGc711/uMx1pDunUbKclKkMKtJY+Z0+Sr18ajN1HxgRrMe7+zSdqMvBK+y6BF3IEdECJ/Xje51Xcqdt5Y1wAVIRp0kz0ORLaRnErn9E0KsITXGfWbcw25lV+HxBnIAhO7guqbHkqdd4TKvgGUNcCEpdfrWim1pJWVsQcODSBKaOs66sYlQWxdfJV2tga8jyVSLbi6BbURMRTLWUnOvCbGpqAuOU/nxSRz3LFhzFizcaqFlxLL4+14tw9Zb9tztBga6uHrgOL/dvoKFXSlpOo5UmSn8dIDje4qeOZ/pq0YYWeRtyahT0u88kpOEFiOBRKgVS6aansA3okK3PdVuZoXYhNJ0WH95mP76FXxuk99Bw6da2qtMKdsPpHiAS5LqlPTgkZwkND/O9jacDyGRRKgVS6Z66MPNYV7TrciuEUK8qF1Wuhu24BhciSFqQZy9HiwfzjwrK1UpGeCSxDqFw6uT5xGbLxHrueOSn06E+//+WPgvfpAbzs19M3zs9Gfh0f83s+z34fO574Q/8838/k34zv8+GS7+YW44N/eN8F/87fnwjYUz2/yxP9x0/C/Cb+TmhnN/eCz8weej8/M1EtjGxOfHNmSeh5hPjkPybfR9vNHrFw6Hwy+Fw+HwgweRxyLs3KlsPoFEBYfqKBzay+C5Z9volmW8h9Kj49QM1a7e6KCQB3uxHU1rJyVJysRN9nEQiZHjkHwbfR9v9PrBKo22WtkktBDe6wNse69sFYeVhvC0N+Erb0xa4BBCiPVklYbqrmQSmgrd0U5sh1Yxe+x+Dz2Z9TSv5mcKIUQKW71Bp9EktHVpVxmNu+KvJoQQm4UkCQohhFBMgocQQgjFJHgIIYRQTIKHEEIIxSR4CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQTIKHEEIIxSR4CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQTIKHEEIIxSR4CCGEUEyChxBCCMUkeAghhFBMgocQQgjFJHgIIYRQTIKHEEIIxV4aGxsLr3UhhBBCrC9y5yGEEEKxl/7t3/5N7jyEEEIo8v8BvoGKmExTbAgAAAAASUVORK5CYII=)
The correct answer is: 56,210
![](data:image/png;base64,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)
Using the table above we can write the standard form of fifty-six thousand and two hundred ten.
![](data:image/png;base64,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)
56,000+200+10 = 56,210
So, the correct option is (b) 56,210
Related Questions to study
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.
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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.
The digit multiplied by its place value and added together gives the number.
The digit multiplied by its place value and added together gives the number.
Place value of 5 in 69,542 is _____.
The given number is 69,542.
69,542 = 60,000 + 9000 + 500 + 40 + 2
So, place value of 5 in 69,542 is 500.
The correct option is (a) 500
Place value of 5 in 69,542 is _____.
The given number is 69,542.
69,542 = 60,000 + 9000 + 500 + 40 + 2
So, place value of 5 in 69,542 is 500.
The correct option is (a) 500
The number form of twenty thousand nine hundred is_______.
The number form of twenty thousand nine hundred is_______.
88.888 is the _____ digit number.
Decimal is another way of representing fractions.
88.888 is the _____ digit number.
Decimal is another way of representing fractions.