Question
Identify the odd number in the given images.
Hint:
In this question, we have to find the option with odd number of object. As we know that even number is the number divisible by 2 i.e. has 0, 2, 4, 6 and 8 in its ones place where as odd numbers are the numbers that are not divisible by 2 i.e. has 1, 3, 5, 7 and 9 in its ones place. Further we will every option, for example, considering option (D) it has 4 objects and 4 is even so this option is wrong. similarly we will check every other option to find which is correct.
The correct answer is: ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALwAAAAwCAYAAACrOxAIAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADYISURBVHhe7X33l1VV/uX8JzM/zLfXt1vtFnNW1DYHwJwTZjFHVDBnRUBFRAmKiKIiUaAoKueXc6yX6lXOOcGevc/lUlVQBrRnrZklZ/WxoHjv3H0/cX/O+dzb/2Pfvn04Mo/Mv8o8YvBH5l9qHjH4I/MvNY8Y/JH5l5p/2OD/7JhuzT8z/+yYbs0/Nfev+0eHvc7evXunrvsn5p8Z0633Z+efGfYahyufwzL4yYuPj49jdHQUw8NDGBwcNHNIc2jITP1+ZEQ/BzkH+OdBjI2P8LtjhLtXkA1w/uLAmoc7J+PRn8fGxnitYQzy+ofg4Rzhv9l4NMfGhvndg/BwTL7G4U77+wbPOPGMDJvrH5DRfjxDQ/qzsEzIZ3R0mN+bjGf6axzO1NBP4ZHORoZHLCwDAwfhsXRm4Rncj2eI3xvlCuMGy38Sj6ZtQ7r2wOAABgymAQvLL+AZP8iGJq/9e+ZhR3iNsbFx9Pb2oqmpCel0GpFIBOFQCFH+jMfjSHAmzc8owuEA/AEPorEQGpuy6OltJ/gBriXQUwXwR6bW2Lt3nMLqR1t7O7K5nMEQDocR4YxFowfwJBNxYgzC63UiEHAjm02gu6t1Eh5rTHed3zPtsZeKlMK6uruQb8wjWZ9EWDIiHiOjWMzMWFRys+QTCvmRySTQ0dFMo+zjKhPy0Zjuer817SFjl+N1d3ejoSGPGK8dCgYNHsnH1pkwRcMhYvEhEg0YPG1tTTTCHq4nw58IDNNd7/dMDeEZGRlBH22ora0NqVQKQeLx+ry8dtDSVyLBn5RRJEysfmL1o74+ipaWHPr7u7jGiFCY9TSmu9Z087AMXhG0p6cHuVwDEgQUpbAiBBQIBBDw+40QpdAYZ9AfRHmZE99/X4aVK4uxek0ZNv5Ugz1FHrhcMWTSTVyrnx4rIVpjumv+2lSE6OvrQxONqr6+HjEKKkJMQTqfn5iCwYDliDSsUCCMykonNm4swYoVuzgLsWFDBQp2uVFbQ6XHcujs6GEUGTNrHzYefl6K7GeUam5uphLrkUgmEKeTRXh9IyNOg4eGFgoST4UTP20sw+rVRVi5qoR4qvDzz05UVdJZI3m0t/cRzzjXneZ6vzLtITyKlu0d7chkMwZLNBozOHw+3wE8Mno5n6PWg21byrF2bTHWfFlOPDXYvt2F8vIwZZqnsfUy2o6adae77q9NG48ieldXF52JeGTY1JsCpsdLu3C74Pf7EJcTxqJwu7zYtaMK674uoYyK8e23Fdi2tQ5lpUF+LoPGxi4GupH9NqRrTH/tyfN3GbxJhfTIrs5OGk6AhlwGl9OFZLKextaEDkZW/ZsiSG9vj7mhZLIRmzeH8eqrLjzwgBdz53rw0IOVePqpErz1ZilvwgGHI0ll9Jj1BfZwBCnBKcvI6SrKy1FbW2v+nM/LUNrRSTzC0dPTbXBlUi1UXhBvvF6N++934q67PHjg/mo89mg5Fr5YhhXLq1FeGub9KOKL6kx/3V+auof+/n6jwOraGlRWVdJIAlRKI6N2h8Gj2UMsmo35dhQWxvDOO3V4+GEX7r3Xi4ceqsOjj5Zh/vxyLF7sQeHuekbkNip10Kw/3XWnmxrG+YinoSFnImd1TbX5KcNXVLUxSUZ9fT3MdF2orkrgw0W1lIkD990XIB4v8VTj2WfL8d77bjpjkhm9lev2Ec/vDwz2Z+R8CgaK5pJPndOBekb3lpYWZmcLU1dXp4WH2dHjyeDzFV489aQL993rxrwHncRGPM9U4t136/DjjwxkoSZ09/Txfq2MePC1D56/afASnIxdYJQC9+zezai400QGCWtwcMhE/nFNoxRGXQra48ljyZIIbrghirPPzuP005pw1hlJnDszhCsud9AJyvHZZ+Vwuqx1REv27fttgxceXUeZRllmN/Fs2bIZTgqvtbXVcEApQ5/Rz72kKv00mFCwBcuWhXHTjQHiyRFPK848I42zz4rgogt9uOv2WixZVIbKcicVQFoxOmKuNR2GydPGM8B7ztKYpMhdBbtQU1eLhnyD4ckWFvJVI6dR41CNjT1Yty6J22/34/zz0zjrrGbODM45J4rzzovg2mvDeOO1WsrbgQZmVPF9raFr2gb0a1N6yfP6dXV1KCrag6rqSkMdevt6D+CR3kZ5n+LFPTSan35K4s47nDj33JjBc/ZZjTjn7ARmzgziyiv9WLDAgZ073VwnQye0jF5G9lt4NHSdltYWOBnFdxfuRkVlOeLJuHE61V3CMjGHGcz6UFScxzPPxHDJJfU44/QG4slh5jlJI5/Zs/x46ikHs5CbmT3D+7WdcO+v6u03Dd5OQfXkoQ5HDUqKC/mzGm2tzebf7SHeqiKxp4eOEY1j3fpa3P+AA6efnsHRR/fj6KPG8M9/DuLYf/XhhOObcPHFfjz9TBE2fL/HpNfu7g6tYtY6GMPkKTydnR3koXHUMGrt3r0LVVXlyDdk9yvAGrppRZRu4oknUsw2bkarWpxxWhRH/aMHxxy9l3iGOPsx47gOXPDvJJ58vJxpsxBut49RsIXX+u1ILwV1d/cgm0nzPjxUZBlq66qRJR4pefIYYhHW1dVBSphlxI3glVc9dL4Q5dNOHCMGz7HHDuBf/xqg3Npw912VjHBbeH81rJfyxuilUI3psNhTTtbU1EyqEEJFRRkpSQkzbozfHzDftYccTwbXQKxudwxvv+2mgfson2Ycc8ww/vXPYeprgPh6cNxxTbjpplp8sqyAa9YxE1pO+Gs6s4cMWlE8SppSXlGK4pI9DFZRDBLPPurJHpKlsnYj79UXiGL5igCuuTbOa7cRE3VFTMceO0j59OLEE5px1VUeZshSlJa50NQsbt9n1jhsg7e/oChgRdIkqqtraewVKC2tYWqMMDW1U7Da9dBOzTD6yaXb6MGpdBxFZZX4YOnPuP3OCnpjDiedRKOaMUqFjhHsXvPnmTNbcA/T1OIlO7Bl6w5yyOCBqPFLgPV7cXZRlz17SrB9224UF9cy8ygtdvGGhWeEihzlWgOkNm2kGDGUV1Zj1eo9ePCBUpx3bph4unH88eMUnoXn2GNHaXgduOeeIJZ+VIxt2/YgGPCRqrWZ7PZLHFp4lFFUuFfXMBoXlVH4teSXMcqnk/8mLCPG8A/gIa+vcziweWsZnn++EhdcECGeNpx44pCRy7HHjlNOwMknD+KG6914/fVNWP/tNjic+zMPjVRRdTosmrqeaIOfNVRVlZPRvYoG6iJnbiEe6UoZZtQ4hbK2FcgczJLleGlhDS67NIZTT+kknuEDeI46ah/lNMgoH8JLLxcwqhayDnPRMBu51tC0eDT1exmgjN3vDxCPsg3xVLopsybKhHiGiIc6U3CSsSsrev1e7CgowzvvVRqGcNZZHTjhBBvPXjrjXuLpp+ySpFs1rBMryCh0j2ljH5Yspsf0ixFeQ8qUgiorqvHd+h1Y/N5P+OC9Pfj66yCKi+rh96UZaVMsPlicscKv52dzOf4uUY/ishBWrQkxDcZx6y0JpqMsI0Unp8BKoUMUYJxKL8b69dtRWlzA9TzGKESP7GFj0ZBQGlmgulxu/PhDARa9Tzzv6/sx7ClklHLmEAln6KApJKhIYU+lk4zwCVOYfrs+hFdeDuP2O+KkETkafSejxqjBc9JJQ8w6GTz2WCXWrNnO9QrgU6RvaTNKs3EYNfLPxrjo6B0sCFW4b9u+hxTuJ3LLXfhyjQ8Fu9MsxIgnymJaux8qxFg0ysASySR8/jg2b4nhrbej5O8hpu04MbSaSH8MDV4Oed55Cf5bIZYs3cbP7kStw4lW8u+9LNImy8XGo2081S+KnsUlVVizugTvvVOMj5bWYsvmesqticEhQyzWhkOMETdJLKrF/P4kdu6oZ+2QInevx+WXZ3DKqe2UzQgNHsYJzyKlmMuss3jRDsp8Ewr3FBujN1LR/4jjgJz4U46ubJwgdamsJOf+oQzLPinDxx85sPHHOBx1eeori0S83rIh6km0K03DDYVJVwvjpKFJPP54PWbNSuO005oNnqOPBo0e/HsH7rwzjI8+quZ6O1C0Z4/J9HtJqw0gThuTPX8xwkvJ7e2t9H43fvi+GK+9tAM3XbsFs68ox91z6ekLA1izysXCy8UC1kNBBg2HVdGqtKvdjsamLkaXFFZ+EcCjjwRx6aX1OPmUJnpqJz22hR4axHPPVuCHDcVY99UWrrcTXk+S1MiKYhrCY/3cawqZYDBCY6rB0iVF5N07MfvKCtx5VxAvzI/i04992PKTg7zVQ0ML09hT6GQRNEbePDoyRo7fw3/L4quvwowMIVx3XQpnn9NMLN2kWe3kiVHeWxk+/3wHvvl6K2cJHLUJXldUYD8Og0XZj1SGa8djCZSVObB8OfHctY31yR7cdqsXzz4XxrJPfdi0uYYyqCHd8ZrtSRmkMqLk09XZT8PPMWL68dJLbtx8c5QcNUssHTj+uG6cemqMwUIFbBGdcCtp4i5G+jiL3qEDctGw8IwTJ/HEY4ygtfjyqzI8zgL4qlnVuP5aD+UfZTYNMRo6maXrSGE8xuBVwIomSuf9/YN0hGZs2hTHG2+EcccdrLnOzZNSdFFnvTj91BRuvrEab77OYPPheixb/gMqqwOkaQOU70RRbQ9l7GR9wkT277+vZk1Sgztud+C6a7y4/74I3n0ngG+/EXOoY4T2mh02ZSdlMQvPEO9Hmw1xvP9+iIV0Ahde2MTs04vjZgxQPi2kWRG8924tln28GZ99+iPKy9yUcbeRr7RlY7LntAZv8fZORuwkSkrc+PDDKtx2C4sZFjCnnNKKc85qxeWXJfDccz7SChpWqsEIWxxK37WH/tzR0UvBtqGgoAGLFkVwy601OO/8ahq/i95Zi6WLK7F9SzUjURE5dAk2U9htbb28YXmpNYRJ0Us7MKWlbvLIElbtlTj/vChOOZl4zmmnoeUx76EAVq90kI4k0dMriqNtNIuH6+ZHafjd3f2Msh3ktY34/Isk5j3sZzTzMsL6ceONtXj1VWWMIixdWoQFL5bj67VBJBMdRgH20HpK5blcjvKpxYoVxXj0sWpcdFGYePLMZm1csxEPPxzCFyudNK6oCR5K2cKjtbTGXjpNX98A1+mgUTRg1aoIHn24CldeWoMLLwjj6qtdeEEYvq6iE+6hgRTg63V05kg7nXiqfCTr5uZG1jUOfPllEZ5+upIZNEIjzdOR23HBhR24954EPv64jtE2yEypbeFukzXte9OGg3aE8vluOJ0tLKrrmfHqcNlldcx+EVx/nRfzGaCWLStj1tmNN98uwOo1DjhdjXRCBSmzygF5q37SVuO6dXvw4otVuP76KHXVhNNO7eDPLtx4QxxvvVHObOqiDPKmVpxcpwiX8DQxcAaDbdi6Ncd1/Jgzx41LLo7hqjkRPP2UG198XodPPirBywt3MYOUo6pS5xn9/L7tfBO2PcXg7X+QEPL5HGmAG2vX1uCRR7ws6vKG1x17LDiHqNhGpr44q/Yc01b/lEUnT11U3tbdM0QhZhmtCvHkU1vx1lvVWPtVEJXlUV4nhldfceG6a2ux+EMdfIhvTo7ye43BOJ0+Cq8KTzxRi4suThJPv8Fz3HGjOP20djpQjAYaQQMNyPqula0sA5uoC7Rv29c3hECwEWu/dtLISxnR6vDFFz5mLD+dwUecXtxzt5sUyMe/q2CcOOjQeio+A4EQNm6sxPz5lTRwct9TuxkJ9xLPGM44oxtz59ZTflEGhFZ+x0qzE3KxMNm/6+sbpKNm8d03lXjztSJe10nDCmDHTp0fRElP3FRuKeY/X4EdO1KGj1tDa1mGqlpr8+YSvPB8odlVOfXUVmIZMZhOPGmMfLgBn3ziIX1J8/MTtYCFZQKbpuoPnQV8vbacWHZTPh46XZT1TZj1UwSrV7sw/7kyPPV0FWuMJItGFbAaFh7RGRWfhXuq8OabRcymXhbizZhBPP/61z5DSS66sBGvvSoHjND5+nndCXnY09afGIcMf+tWq1B97TUXqUzEBMjy0gRtKYCnn6zG44+VY/WqIDNDJzHYQWFivUMMXmNwsN/wwI0by/DCCxXkT1JmLwW3zxjYjBkjBN+KJ59UhGuhsmzv5gqT1rPXtH6CXtdNXlbF9FbISBRFNtPByNBH7+7E+x/EMGd2DZ55po5GV8/P6rTR9vQx8sw4U20xi7hyCi/O6/dRmTaecZx5Rjsenpdi+svu/641psNj/76rq5cRKIxdBbUUepj0pAmdHZ3E00KFJulAfjzwgI+UI2WyjiKghuiMlW0c+HRZBVN/0PBJGZflgHvJd7vx6KMZ/Pxzmt/t1hXNdw/FYw1Rko72TgT8EZNVyxkIIpEWfreHVLENP/wQN7tMN99chs+Wh9HWbgcZFarDaGtto0y9+PTTQtKGasqHVIRpX8YuTCeeuBe33d5EOhegbnPMNHKYQzHZQ+u2tXWgptpFbl/FtVOkJ12khb0sDjuoixCeeLwU11xTgbff0f68Tfts7t5JuhbFN+srmf0c+Pe/s6xLGKCI55hj9uEf/9jLINFKow3TAbXNaRW/GpPxWJis38upQ6EEioudlI9OrlvQ2tJntnh37UphwQsO3H4rA9grMeLVecGhdnkIpdHQxr/b48BHH+80W1GnndZAJQ4SrKK7CqpRcrt2ppc8qqvb90cLaxy63gRg9UQEAn44HQ6z4yBurX/r7R3FqtVp3HBjJYu0UkbxEJXcaQxLQz0U2vL7bMUOPPBgNQtO4RmlMi08xx03jnNJa559Jk1h5ElnJrbffg2PFKMtQhWdjTTgwQEZkXZeBqnQFLG4cMstXkZFFpoJ0Qhrm1H0SsXVTz+VsRYoJJWJG6c79ljLAWXw557bRcqXoVOkSaO69197OjzWkIFpk6CJRaCKtuaWFsqV97FPp9v9jKpZPDffh1lXOvHKKxFESRNHx4aNo4hKJlj0bdlUSmXvZsoPmp0x7WjYMjrxxHHcNbcZ330XosE20Emm30O3h/DIDmKshcKhIA24y2RG/b6nZ4AGF8eLL5BWnl9LR6ynXkVDrX1wbTemMynsZq21iHT41tsiDADa2hw3eLTL8t//PYg5V7XQAdOUZQtlOpFBJ+OxMFm/HxGtbVDrSAwt4vr8u/5duz0uVxYfLnKZc5aH59Uz0DQx8B1qB9Ny+M7ONpSW78Yrr24g164hyCYKTdtClkJPOGGEnK6JqSrDYqNjf7q3xnTraWooEunIWAVuT08nf2NF8OHhvSzu8rj/gTpGoUry5wA9uc0IQemxq6vd7Ce//8EWCs+BM89sI459RnjaYTn++DGmx2a8/lrKcE81j9ljOixKkRpyqOZm9QMxo5AyjY3ajruXjpPF44876IQ+vPV2Al5vM/GoHhCeDni8Pqxc9TPuu387zmZtI7loCo8M/vzze7BgQY7cXIV8F79nXXM6PJrCpPW169PS0oQu1kT2lp/4uc/XhvfeT9KYFemjLJSTpIlK26qT2lFXW4dVKzfj2ad30CniOJkUxjb2f/5zH3U2SqytNISECTZWrfVLBqasam0B1yfiSLHYVvOWPbT1mUw2MZuESXVZ+9wQQ+HuPB3b2gdXbeDzkbt//TOee74Ic66O4bTTBygXyYYGf/QY/ut/d5HTN5EitVD2Ogybvsg8MPmv6k9SYNKZR1+fsqYlUzlvKpUnfQzg5ptiDFIZ1mGNjPzK9FPvcYrB6yYliNbWRlb6hXjn3Q2kM2U0qAazHSRlKh2dcEIPZl8ZxJLFPkTCqvKnbiPa8+Axxkgdj4VZgPjNdpW1fSSDH0dpWQsWLAzi9jt85NRRpqQWGoo6LgfNwYgOlz5bUYj77/ex4Ok8wAOPPnof8fXh8iuiWPSBHKXFKMQeU/HYmKyfitjNzXlj8O1tbWab0R4ORzN5ohe33ebFyy9FUV3VZFKkTiVNcUgDW73mZ9YjBbjwwpTZtrO3y2bMGMYFFzTj5ZeVWuupHBn8VMFPxaOhwnyQNKIZ+cac6X9RLWV/Jp3pYwGcx81U5n33h5iB/Pyc5YQ6JKusrCIN20isO3D9tQlj8MKkaHrMMUPUWTtrsTQzTooG2WEMU2v/Gh6zy0Jqq6nmPPv3CkK9zKLbtjXj6qtiuIJFv4r7TKbV4NHulcftYKbehoWvFOLaG6I49bQ+E6Skt6OPGsB//62B1KveUGK1QNi2oDE9HulrmBmwgfqiszMgWO0E+j3pIO3p5x06uY4wKMSwYkUO9fXaMZxaO00xeAlBF29pySMW9+O7DaUsvEpJaRTBhghWaXsIZ52Zxp23FWLNymKmlwZzk7a3cRmz1sFgNYaH+0gfAuRsXqPQcVPIyUPHWUC2kTrEce99MRaBahnIM3L1Y6C/h4KsZ0SJMOpGGcUTuOSSVipxGEeZ09shRo8srr+xDJ98WopQOLW/0p98/enwjFGJPeTiWdKaDAXYtT/qWSOR6KDQInjwQQ+LQD/2FOYY2a32VJ0yq7Vi1y6l7DpcfbXOGEbx97/rjGHEFItz5nhZXFWhri5I4+ggHks+1pgOjxrhupChMqVQbe+KrtijqaUfG75XFkyR1vnw7bceRrUmylR8uZ0ZyEsDLMTnK8pw7z1pnHzyCI4yp8nDDAhtmDnTT7nWmFqlp0f0bGqEPxSPRW3VpRgKB0y0t4dtK1VV3aR9MVx1VTU++8zJz6qVQgdIPaRYURQVVePLr5zG0c4+u9fIRvo6bkYzzjzNh6ceV2NaPTqZMUcOZNdfxiODzzdmUJ+MmXseH7f0ZRW1Q6zHmvHIwz7MnlXHYBxj8JNjT73PQwxeJ6stLY2M8nnU1kbNbspVc1yYeXaKhUcLC8YWPPFEDMs+qsCegmpyvAS9jimYXj3Z8PVTaUpRSluT6VQnuXsGO3ZoX9qFllZFeOuzUmxzcw+2b8ti4YIwqYCHyiNPa+lGL9N2lgavttl0qoORJIO77koyymcpxDxmz87joXkxvPt+DTZvq6bjhIhH6bXb4LHoi25Y/FNNcNpy7acDtTCKJylwOWCSApxqYO3tAyyec3j3HRrumw4U7FSrrE6CR1nYthNTxmx/bt2awKOPJ3D6mSk6XiOuuKKFWShNuudhcV5DyudjhrIcypza8p4ZI3kFC4/qCO0YqXAXnl07nMwKIUbJXn5mQund3UPE2oz3WNy/tLAW69fVUPY63h8x96o9dYfDSa4fxEsvqWcpQ8fL49JLGll8p/H8817yZQcpX4AOlaC8m02NYN2zbWAynFH097GWaOxiHZfGT5sqsXtPHeUvCmEZjT6rn+FwH957L4GHH67E8uXV5vN9LCxVU6iPJxSK0sHUkJahU1BfZ2VJPTO47dYk5j/rw5erPaitCZu9etUuwjOhLwuP5K1iVcV7NNrIQOhHcVGAMrUOBCc+u4+/68HSJT7Me0gHXF4GAQUE2aT+nf8l5ikGr5uXJ7e2thijD0dS+PFHD156sQzz7q/EC/ND+OLzLD23EZGQuG+OkTDJGw+b00Sdgir1GaPq7jfVvNvdSCNPY8VncUZnH15+pRzffOOmwdmABUR9L6MsfJqxcqXDbF3u3OmiUjoYLbqRI2drZ6pX+0BJSYaR083IW4Mnn/DwBhPkpQ3k1I2IJ1jQJHTqqzScMDsp4pOKOipkGxu7adytKCjI4Ysv1KmoLa46/PBDyOCxCjlrKOto/33LpgDWfVmF0qIgI3u3MQhx5lw2S6PPc70mfLLcg7n3luDBeR68/76K2RwjeyNl0sB1k/wZoZyswNDNgDLAorh/YMgchIXDzaRzjVj3TQrvvuszx/tffuln5rQOhKQXG08m042C3QmsXlmGDd+UIBxMU25Wn7sMPhIOMTPn8eWaCObeVY577qnDm29EmQ2yqCQli0abmObTpm1aR/1Z3oO1960HQNQg2M/PtKKyPIvvNySwaBGj8FPlWLykjt+x6JPtIMLV2DhA3Wbw0UdV1FsJ6hxx9NJZZPDq0kzSNiSDjRt1ZuPEvAdrWVT7zf5+WRkdIthAXaXoGCEEWRhn0hkGnk5i0cMyCpSsIaiXmpocZaozhKDZxZOcamubTaCYcFgFhUHTgfrZ8kqs/6YOfl/OyOdXDV43r2it3YtoNM6oEcbWzdXY8G0lPSvGIqaTRjhkeLt2M9ShKKUqpXrcMmRW3ek2VFU34Nv1URqUn0VWENeSV158UQKzZvvIjQOoqmykMdrUwwLU1NSGHTvLWXBsYzRzmG0xCU+FSjMjgP4ejfLmN1ZSwIX4ebufjqeip88oTMWq+kOEXbtB6hEJR6J0zGZGn0YKPs6IFMLjjyVw440ZXHllAtdcHcArLwfpSBPnCRqCpajvdoSYyargJjXpZJSzikRdI0eHbKHS27BrtwMrVu7Epi1+eH2t/F0PcetJJxljl/mses+dTicNRxGtydQaO3fW01gCePa5GGuXNOulemaIKP8eoVNmjEPYvd76qd2aRCLLbFOObZt2IxpOsJAbNg+aqDFLD060t3eRakQZYApp6HU0FjpmVi3AenrIaqlWIJCReb06xJJ8FNxaGT0zLERDePH5AO6ZG2VmT7IoTdBxItiwIbafo1sUQZFYJ9DhcNb04Xz3/S6zxauDNAVN9bun6ut5Dx3UQ5xBrgw/fE881SkTCHt7BzGkQNTdQ92q5SFsOjt9dMR0ho4QZyAoSWPVqhDrEp3MBqmrGM45O4abb44xKKRpa9owmaAscpIIKe3uXVXYTZ3FohljF8bEOA4xeN2EHeVlxOpbVmSyHhIIG9508JNB8npFiXRaOyQeepgTX6/z45VXI6QeMVx2WQJnnpljdc5C8589OPHEZhaCSQKuNyeedrGiaC8uXVJaRGXvokLENXsNDdBxvASYzeaM8UgwlRWVNKwG7DU8bv8dcWgdOUmONMLtdplmpQ0bnHjPHE0LTz1rkBbi0D5+L4u7Jlx/XRxLl8ZplK3m9FNDVEMRWU5cW1WDeDRGJVknyZ00eEUw7XbI+BWdamprTOOTvjeZr0umVl+6OhJddCz1fXiwZEkIjz4i/pvEzHPz5NxqaOvFSSd1Ys7sFN56M8j7zO83MPvUWn0pCdKESpSXlhuZ2PLXQxR6oEJNfGpmq6qqNn/XU0X2DoiGdCaZKouHQgEaYB2ppBsfLQ3jsUdjuPaaOM4/T3SoFScQz4wZg6SyeTzzrNecj3SbE1WrcFUdppYJtfuWlJbSZnQgNnTAfmQ7vdShcOp5BWWhXmZcu9jUkKx0bwqc6pqtrKrCzl0OfP55gLQngptviuDCC0gZT2vE8cd1sW7rJZVtJq1OkE6mTXCxaBC4dg+Cfj9Ki5ltaCP5fBPX1lap+Wdz71MMXlNDT+1ESVEUAepTCcOhW5rz/PLEdp81rO9YXH2Akb0R326oxbyHy3DRRTEaUyeNapBC0565CjpNCbCRqSnOoi9ruJlSmJxJqbakpAjV1VWGAyrbaH0ZjJSnNKwniaSoSCTI34vnTh0WHnFjtaQ2U5l6YKCAkVMnjx00Kp08aj9YW6w6lBnCmWc04e6743QMPdDSQaUNGGUq6ujBCUVmZQ21P6uxTQ9wNDQ0GKNva2ulQuW8NC6zVTZ12HI1eFjs6lDpjdfLMGeWk/JpNFu8xx2vLcS9mEE8xx83glNObsJ11wYY3eLIZJXl+k2qF12rc9RRPtUsJEMGo/r2RWn0JJNmd1e32auOsNBsa206JCDYQztU2t1xObz4eGkFrp7t4rVzNPJ+ymiMerNkpCknvHJWhEEhRpm0mSzR39druPeeokIafIHJMMKhgCMuLmNX9pAzKjtHwmpn0IGXtjcn47H+LJ2106HdHi9WfF6C229z4czTszjpxG5iGTZ4pC/t8pxwwgAuvzxHphAjNcoxILJeo/3pvisrK0wTmTKY8Ej2GrYephi8PfQAhwSq/vd4IkhlJ0kbmg945nTfEXCd/n27IYTbbneYw6qjjh4x23TaC7b3YAVazT9XXJFhqvKTlvgoRKbVVNx4uJQpOqJoJs/XUBTzB4Ior6gyN6KdnvpUDMOT9oanYrJw6YBo544AHnigjFkmYbbntFU3BQ8Vetxx/bjwwhx5pt/0zft8YRpPmHWBl2nabZqa1GSlyKj+bRm+sk04HDGRTM9+Njdn9yvTGlPxWEM7EU5nijzWaR6E+dvfug6Rj/bwFRTOPLMJjzwSpBO6qIegybZqKy6vKIebgaiZzjNEuehB8YH+AQYlUtCIujGzzMaiNyp823jViWwzFY9aSAZM2v/4Iz/OPSeG//U/OxhBrZPZGfvxHH+88I3ilFM6MHduGKtXiZZ4ea0wXC4WyUV74HA6qC/tmlit3aK65jlVZulMNk9qo47aMGWow8ZDt4ztofuJxZL4bIUDs2fX46h/9OHoo8cpD231TshINnTyyT24/voUPlzsR1m5ap4Q7cZnHrxxOl0myylQ2MO+1rQGrw+GQupKrMbWbQ4UFjgRCsTo1ZMXmFjE/m5X1zCr+qzZWjz3XB21K3LJoLRXrmkBV5o855wcHnzAhbVfKYL6WJyo6LKej5WwlBatgkTRaJQcM0bOW0W+WEdKUI7yMglZh1fWtSdjsSnF+Ng4iotTTH8+k1V09C8sliItTFYUUz98O7mql0V5GaOEyxh8WA8Q0/GVkqfiGaPB51lneJhW61hTVLMmCRj+bO2+aE7GY2PcS7m2sY5I4uKLc1Sm1a4hudh4LIOXQvuYzv2kPsXYs0c99n44aWB6ckkPhPcPqPfEulfRqPb2Tvi8aq3ws3aqwK6dtQwieTqZCl9LHpOxSG46CMxk2plJcrjk4mb87b96aUxjB7DYUwdXM2YMkWqF8c7bpJy7KhFkUNLzp6qTtGFhG5fWN60OzHz+QJI2FMSP31ehYIc4tSjPRIQ/GI+6ZOvrc1i7No4bblCHpqWfCfvRtA/3hnHJJTm8uMCFbdtr6Vwe80il26cH4rVT12QYgj3sa01LaQQqkUjjO0aXBQuqsOC5PVi/tppFUiOjmBV1NSa+Y32vq2sEP25swN33kJfO7CI4NVJNALa8cx8jfDfmsCB6992g2bYS19J+uHq01Zvd2qpTVrvL0eLBTc06JQzgzTcr8PjD27F0URFczgwGKCS7sLPx2N+TgZaWZvH00wFccEETrz/V4PVnUYnjjx+kAbZg4YIICnfTwNMNhg7pwXAZvejLVDzjaG7pwK6CIN5+qwwP3b8Db71WhurKFHlkn5UJpjEy/QwEOnkPWRaDjYymfdMYvCLaAM44o9kU+5t+8lEuGSqw0dA6PXghuqBrWMPi0yoW62obsPhDJx56cBcWLiyivLRz1rNfZxMysoZVf2l36rPPcrj4ohZmHB0OTTV4yUh7+Sef3Ib77o3i++/0BoF6Q4eszYGAwWXaIMyyFsUV/Q2GmrBsWR2eeGQrXlv4MzaxdlHBenDrrjWsxxJVlK9ZE2P07jJ6siL7ZDyyoXFmnB4Wr/X4dLneQlFPytfKGioHp9tpnt1V3WcHKA37WocYvKaohKLVls1RPHh/OeZcWYTHH6nBurXaXrOphvXZyUMRfsOGHO64I8GIKcDq5ZBRWanIiu5jOP/8VkbdOKNjiorUc7Fqkc2aNw2IKvQzRU8Gq2spguiUcMGLNbhqVhnm3lGHz5ZHECSnVGefHVknD6X74pIMnnoqwGs28tri75PxSIAjNK423H57El+vrSc1aDOFn3o1rIdatEevvp7JwttrtjkrK9MsLmtw5RWlmHNFNd5724m66hSLWjsbTJWPHNfj6ST3zJHSNOHvf7dOH2XwlvMJz5h5EGTOnCiWL4/TmFpN8d7eYb3OQtFUe+hT5aO2hFEqvhmLF7tw7bWlmDWrmsHKh927tZukp4AOxmMZmBrUPv44S0pHg/+vfjqb+PuEsUuHJ57YQ85cj0Uf6EGRVuq5l/y402Q+Fcva3rQitz2s66RTXfh8hQd33l6MG68rYRGqtyAk9+OZqisN7bdHmQW+WBnGtdd1GD0ZerXf6DX1dzWhiYIuXJhAaZke2u8x9VMmm6YN+U1hrzpD1zjYtqc1eKuld5QpsgnvveOkAGtxxeUBzHsowvRUj3yuxbQJHCxAHdZ8tZbeeaMfp5/eboRlGbk15Zknn9yOW29NYuXKFIXVRqAqyNpNdBdP1eNgurZwTAwdio1S2W1Y+UWEDuVjRA7xZ5TpOE2jaDO8+mCD17tYdu6ImP3fmTOzxDBh8Nbcy0jRjWuurse770RIrdQ+MEAD66Kh1xsubD2QoIg9FY+ilLo9f9qop5LCOPvMAK6ZU4fFi/xwu609YiuqTgzdQ21tE158Mc6A0ECDV4OXFDkhH7U8X3ppGi+8EKBD6VxjmDVVr2koi8VjJlXLuKYajOQzzmjeSdoXx2OP+UgpfaZF+PXXVdg10UAVgad+R0HESxr0/vthBoQ8I7yepx03eAwm4pkxY4DZsRHPPhs1p99tbQPo6+2jkWdIHcKGK+us41CdKQD2k/axVns5RDrkpxN6TT97QUGatjJxcmsPyd4fjODjT1246urW/TKxZGPJyDo5PvvsVsybl8DGjRlm3z7zrLAYgl71oeynbVrp3rbnyXNag7eHnmQp2mMJ/7LLwrj0khReeC6C3T9H0JDV6yOGubD1zKZ2IfL5dqz80o0bb6nGzHMbceqpIzTwUUasUXrlGP/cTWUG8eqrHqNMKUFNUnoETFxZW47yTHHkQ/Goq3KYRa2a1ry4/AoXjTiBe+5NYP36CJ1Bbcraa7aeIx3fO0L8zFI/OTDvgWJcdGGSeAb24xljpT9GY+8nd+X9PU8qU5hl0a1I0WN2X7SnLSojPIqmU/FYP4eYWcLhTnz4YYoBIUijDzFThOiECcPV1eMuPiv56A1e2i4tL09Q6R5cdFGKSuwhlhEjnxNPlKz6cN55enAkZg5r8vkOQxXU4KZIapTJe5oucul3ulY228VgEmOQctHog6QGEXzwQZRO2MLidgKP9KV+ppoan2mBuPTSJA2qlzhEXyydCY9Oa+fOJZX5QcV5uzkBVvbT+4eEyaYO02GSgzc1dZvdr3vvC1LWceOECxY4qf8G3tvIfn1ZmLq6ulmQe/HRpxW44aYcTjuNGIjDwiL7GSK+VlKZNL76KmsCnXp6FBD07h9tfcqG9KCPrm+s5iBMv2rwipg6Tt++LY3HH2Xhd24A/z4vRHoTxvp1Mbhd6nFJI5tLUxgp8rkItv3sxjvvuXmDScyanceFF+Vx3vkNOOusGNOii2lIx99JIwhFBrWRajtSj+OpMFSkOFR4+wHR0JRFiovr6YRuFqJuCsWHu+8O4PMvoqitS5hnWXMNafK5jImIhQV1WLq4Go88HGLUyDEVNuP8f7eah8tnXRnGM095sXVLksbVZZ6SUloM0/lEH7StNT0ey+gVMXt7R1BV1YTXXg1RoQFmtiBuuy2Mj5ZGUVYag952lm9IURFps41XWenH55+7GYXDuGpOhngkn0ZG2DSNIYSHHvDgm3VxylMHfNr+zNGZrbeDKfuJd2v8EibhDfjyWLLYg+uvc1PuXrPF+f77TP8lKSTj9chldfiTogPFWQh7GTAcrHN8uOqqOB0xY/bdL7igAVfOSuDOuzxY/pkOy9qJp4vfzVgv29pPrWw8B2MRPsnHyswtWL0qgvvv8eMc4rn4Ip9prCsoSLL4jTFL6H6FJ8EI78PmrW4seCmKG27M4fLLmkwjnmowPWd7Ewv5RYuC8PksqqdaS98LkB3oEcoe84jpZBueimtag7enhoDncu3Y+H2ERu/GeYwaM2fGMJeCkCFt31YHh9NrLhgMhnhzKVbuDRRiGu+8m8SChUk8Nz+BRx6popHuwratXkahZiMs3aQEp7Qo4zo4kh48pVClbqXDwkJmmxccNJg60xh1620uOlo5Nv5UhjqHi8VmyGSNSER712n8+GMSiz4UngyefyGH554N0Ugr8e36OtMTo1PTLI1d35Gj6B0qUuZ0hjUxrWd3FZnKSrXNGsAVV3jx7/P9uO4aOveL5fj2mxLUVDvM4VQorNfb6fQ6hU2bkjTKBANAPeY/zznfTyOowMoVxF8TMq8NVFemfaAkY9eug43nF3GRqw8O9MDrTmPJhz7ceIPLvHfn6qt9mP+cA2vXVBKrgwYT2P/crxw8i23btM8uDFE8/3wSL7wYw2uvu2ns/HxZAK2tVtuygoEw2cYuHPacjEN/t4ICi+MhcvNwA75a7cU9d3lxwfl610yAmawCyz7Re47KmYG8XDfMwJNjEG3Ezl1JfLIsijfeYN22IMOZJj2L4MPFZdiytYqfUW3CTMPIru3jdFqnqpZ8DsYyef6mwQuwjshz2U7sKWzAK69EMXu2DxdeoLeJ6YkfHYRECFQN9x0mSosKpdM9LHC6GEG6UV3TgR07wti8pZLK9huQOtTS9pHV76JX3P1yGrKnsNhGpte+VVTkTJPW1VdX4eJL6nDLLRV4860SFqp+rttIx2ijI/Wgo1OcsxuBUBdc7h5i6CW1yPN+fCivcMLl0mNvPiNwFWK6j0Eq6bccUFPFoDoo29t7SQ9UAIaZcRy48nIP5syqwVNPFpuzBslHeERJ1EyXy3Xz/omH8nE4u3kvDdi1y0PlVzALVMG3H492irRrNdnYf33qMyNmt8jPKLhqVRQPPeikI3pIu+pYz5Rjw3d+Goz1hra+vl7Kv5/4OmnMrTS8TtYyXdRpC0pKogwsNcxgtUZXsbh20RLmVNSuI6bHMDGtMW62tGPRFqz/JorHHvWQIrsZtStx150FLGyrzE6Lzjp0ljHQP2QYQCTSwd93U0Y9nJRvbSO276zA9l0FcHn04oCwcUC9T1T1yL79r+b4wwavaXnMPtPKq+ac6upG80axefPCuO8+N95+u5qFkqJ2g9ndGBWnH9G7T/SuERZcfQNoNT0wMVIOdeu5KFQ3PASsyG5zZI3prj/dFB4ZmvpVlE2WLVOTk880Sz0/vwybNrqRSefNsbqKF2FRQ5vw6BS5k0aXyWatg67aGhpqLbw0MBm7fVo43XWnnxKuFVW0W6RmsG+o1IULoyyq1QNSiS/XuBCP7W/UoqFYvFV49L4avbyqjxQsT+X6UFpWRoctMXLSoZac77czzcS0Pmd9Vjs34rl6PPDVV/UWAg8NrBKffFQHrydhDF6OZNc95v0wg0OmHcB6kVME1VXVdMYKeNwe8yCIviM8B1/316clnyHi0av61An75ptqcPPizjvK8c5bFSgvi6CttYO2IzyWzoRLO0lq6VAWzebyKK+hve0pQK3DYTY68o15fkYvw+V1jF38iQh/8FTHnjh0MNjOiK2n7EMskGqZYqqpLL/hm+1trdC7JjV1+KBW3fpUPSmPn9HVaYxMilSKnszZD8fgNcUP9b2eniHeeAfrggwNK4gVyx3Y9CMV6g6ZV9TpnYVSkpkGjx6hqzf0Qnh0mCPBicIoSkjQvyawX54Wnv7+EfL/bpNBvvwqhqVLvPj6K0bJCjejdQqt5Jx62ETyEZ4WFqQ58XTSKI/XjZo6vejKaxxAwUB4fqko/KWpTKip7yko5HI9ZndoHWuDJUvcWPVFGUqKdBCkFmzi2a8vvXhK+PRuFz1DrNrKTfnoRbnqDlUm/iN47KnvyclbWvoY9NpJM9Ws5mOErzQHZbEoqRtpXCttw5JRm8GnNhNDfykjl89jDpdkU1ZnpdUxOd31ppuHZfCaulFFjrY2pqg4U6Anzalme73YR6+Bjh54g7Bp02UK1JaailMVhLoBW5Fa648ITtNWqqbaejtJW5KJVvg8WXiccYRZDOk5T/FfUShN4VGhJkz1qaTBpQihF4nalOrPTAuPth+VDQdo4B3MZI1w1KltQtdX67Je2W29Nltv7NUrofVyJjXf6UWnuQbLSX8/hfntab+lIZPRC0rzcNbFSHeCiIQtDMJi45GMFMmFRQ1vejOznMHunZ9u/cOZkpGCw/Cw3kLQi0CgCU5HAj6vdn2stxjrxN3IiH9WwS596a1iCqh68ZN6iOxgOd01fm0elsHbCrWGaM6Y4brdTIFq3dWbchUJRFUynPqzCgtRCL3EUy+9t+mCPQ6+xuHOiSHn0f8hglpOiYdFlq6tKC9haQqPMIordvd0GyXaL021x3TXOJw5ISMFhzE6o/ViUB39t7a0mq1OYZGM9BCJahhxYlEp9cmrFeD/Dh6tJUMjjWImk5MryzZQJtKV0RnxNJAPtwkPo7nkMzkDa0x3jcOZk/FIZ5KPnqHQ/Rs8NGrhECb9tNqwmw0dtDOw+pmstaxx8DV+bR52hNe0QE9MCVJRZIwRQAY9edrpb3K00pi83p+dv4RH1z4Yz2RME9+3vjp5zT8zJ2PR1O90vcPCw2H//c/O/zfxaExg0pNgv4XHxmSPg9f9PfMPGbw9/+iYbq3/xPyjY7q1/hPzj47p1vpPTBnWHxnTrfWfmn9kTLfO751/yuCPzCPz/7d5xOCPzL/UPGLwR+Zfah4x+CPzLzWPGPyR+ZeaRwz+yPxLzSMGf2T+heY+/B+Hz7kOeqv6EQAAAABJRU5ErkJggg==)
Option (A) contains 5 footballs and 5 is an odd number. Rest of the options have an even number of objects.
Related Questions to study
Choose the even number.
Choose the even number.
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All even numbers end in _______, ______, _____, _______ or ______.
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6 + 7 = _____
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6 + 7 = _____
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Choose the even number.
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Identify the image which is even.
3 Choose the odd number.
3 Choose the odd number.
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