Mathematics
Grade-2
Easy
Question
There are 38 blue fish in the pond. There are also 29 golden fish in the pond? How many fish are in the pond?
- 65
- 66
- 67
- 68
Hint:
The addition is one of the fundamental mathematical operations.
The correct answer is: 67
Step 1 of 1:
We have given there are 38 blue fish in the pond. There are also 29 golden fish in the pond.
We have to find total number of fish present in the pond.
So,
![](data:image/png;base64,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)
So, there are 67 fish in the pond.
For Adding two terms, we have to check they belongs to same units or not.
Related Questions to study
Mathematics
Jose has 17 more berries than Jill. Jill has 18 berries How many berries does Jose have?
Jose has 17 more berries than Jill. Jill has 18 berries How many berries does Jose have?
MathematicsGrade-2
Mathematics
Martin collected 36 leaves on Thursday. On Friday, he collected 55 leaves. How many leaves did Martin collect in all?
Martin collected 36 leaves on Thursday. On Friday, he collected 55 leaves. How many leaves did Martin collect in all?
MathematicsGrade-2
Mathematics
Find the sum of 18 and 52 using mental math.
Find the sum of 18 and 52 using mental math.
MathematicsGrade-2
Mathematics
Find the missing number.
![](data:image/png;base64,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)
Find the missing number.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGoAAACvCAYAAAAVBEuQAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACnASURBVHhe7V0HWBRHG0ZjbIm9x15jTWKLJZZo7C3W2BuW2EUUFUVFERVFFEVAEBTFFnuNvaMoiogKSBUFRKxIvfr+38zt4YEHUq5Aft7neZ+7+3Z2dnbenfm+mZ3dM0A+8gQyFkouh0wmhUyqI7JjZYXp7aeap7aZ9thpmcn0cplMqHT1UCuUp28o1u+6jMVbTmLh5uNYlCFPqFDd9uxQ0/lpk6rnnx0q8mH1vHzrMRz59zYSEhIFJT4jlVAJicmw3XsV/ea7Ycz6E5jrehVGbtcwN0NeV6G67QJ3CaTvLM+M872OOZRWyZR9VcnS0Sff/sX+uqTq+WeHrC6uYybV9ZCV+9Fh3GoYmmyEf2CIoIoCKULJqZvb5HYBXWY5wckzGGEyOYLI/ojoqwey4yqpbruS+iqfpulNPPVBDPOzXmgzegkGTzTBq+jXZFUgRai7Ps/wx5SNsDjvi0D6HSAHriVIce6TBOfj8jLFAlV/q27XFJXHUeafheMIdXzinRhuwW+x5PBlNOw2FqvW2SrEIaQItWbbQXT+ewMORsThUjJwIDIOLkHv4BL4Np864s5gqu+AaFjf8sXvk0zRd9hkvH//nuuTItR8Cwf0XmCLnUFvsPdlPFyevSHGwJXIPvOpfe4MfANnv1fYcN0HAxeuw289h+NZIOvfVISat9Ie/RfbwckvEm6hH+BKO+VTt9wZ9JbqP4qEeojBplZo230Y/Pz8uT5qhdod9lFtRvnULtMK1Y6E8vcP4PrkCqF2hbyH+4t4uFOXy7jn+SdeaHVpc0zKN6O8mZ9gPQork7rt2iQrl3NuFYoVbvvjCKy7dA/mJ65g1alr2HzHj8oQi11Uaer2yS7Zee2PSsa+yCSev+q2nRQ4Mfue8E+8sphQ+yitQjDy1SpptcVcKxS7epkD/WvRSnxfpiwKFS6Mb4n1WvyKOY574BbyIcOrP7NkeeyNSISDz3NMstqK4YtX0kVxNaXVsAuCHWvJgTPoN8MYbfsPQU/DGZhlvxs7/KMpnW58tlKo9STUoFwlFFWU09NIDDIyRdfRkzDKbA3a/TkMBgYGKFmuPLWu6xSBJqjdl9Et9CNvGV8T043OZ/H+U2jW6Q+eN+Mwk+XY/ZxaLZWBcdpmZ37MAgUKoHy1mjzNN4W+xV8kKusuNd261TFLLWq7jrs+l4AYfqWz1nXgtQTbvEPRpEMXXlETVm/iQ4UvhKDfzLb0n3Mw3nGA9g+nilTvU3aTv1t25AIq1qyDEmXK4bvSZXjeo8wsuVCsq9t6PwhV6tbj9qkbHbH9STgmW23jvyvXroutXoE6qZMsCaWPYELpvN2p9TB2GTWRV9KYFevgHh5HJ5D6amZXNxP2lz96oXKd+rC6fJ9XuGoaJVlrYkKx1sq6u8btOqoI9Yn2i4PNzcco+l0JfFeyNFadvo6LVB+rz3qgWIkSqFKnHgkVlC+UkqyQrBs0djmIcj9Ux7dFimDhnuPct6i2KCbqvogEsifgp9+7oUL1WrC+4YuD1BpZtMham2q+jEzY/a9EcHgUnkaoWN597qBBZseho7i9RbfeMHY9xP1UoW+/xQhTi5QLI22+mmauF8r9RRy/glt070N+ogKKlyiFIQvMsCMgmjt5loadBOP6Kw8wnypy/q7DqPNTC5SuVJkCBDss2H2UgoGzdKKvUgmr5G5qcXb3g9GobYdUQrG0rDVuexCM1r0H8G0FChTkn11GTsAuas0snS4ivywKFUVC6XZmgoXMJm5HeeVUa9AQludu80KrzpAor+phC81JyJIoXqo0d/YFCxakLqoksRRqN2tOob0/byWq+TOyys5IqNX/eqBu81YoXLQYqv3YmEegFWvUxmyH3TzqUye+pplFofTQoihgWHH8Cn6o2wC/DRrOB79fjnMUk5ZLD53DwDmLKFJcgkrk6Flw0GPidB45TrCw4WMydd1UekIxP2Vz6wlqNv4JRYp/R0GEHbXk1+QfrXj3W6ZSFfKBXl+URxvMtFADUoTSbYtiFevo+wKL3E/wKzsjf8BaCx+0RiXh5649eDTHKvqfNzIusLorn9lYenaMxu07caHGmlvhAPkt5uvmOrpzW7NOXfnk6JH34BXWsI1C1AXU2rn/S5Ovppl5oUy3CV2f7luUObWoX/7ojU5Dx1CreMmjQHVpGZXdIKvY8tVqYN0lr3SjPhYxsvxWnryKeRTK12jUlFd+t3FTKBq8CPuHoXSBHOe20hUrY/7OQ3Ci9MY7DnJ/ybrCVadv8NanLn9NMtNC6avrOxAtxrRNzryyin73Pexo3KLOzyjJTogJNdXaAYPnLeHhc3oz/qzLYtNTFWvW5pXOjsH4TaFC/FjTbXfwSJF1uQW/+YanYb6JbStcrDgGzJzPu8KMLhxNMWtCUYisa6FYZW649pB8z0KMWW6FHf4UuWXQ/SmpnFVQF5IrybbbeQVj6ILl6DNlNv6cbcJ9XP8Zxug7zQgrT1zjc3wsdDdcuwV/jJ3Ex3FsCmm2wx5+Iy+9i0DTzPUtit2cZBW6LzJRmDLKXITFW1YGIinJRGdisLEU82+qZC2X+SV2fOaveBn4ZxLvkjNzwWiKuV8oTqpwPgOROZG0xkyKrw1mWigWTDj76z6YYGTrM5xC4+lTi76AtQ4dtpCsMkWoGz4YsmQ9F+rLO7zm29DLeBMcH7+AG+v31WSkLTqHxOLw/fvwOGmLg96+JJYWfAJrJYyZFYvSurALVtdd39MoWF19gAELLNGu21AEBDzj+qQIZb7RFW3HmML65mNsp4CC9dspJ6dlbn8uwvWzDkhaXhmnPC7DOTRObbpsk194MTi2YBmOGi/FTv9ostHFoC4tI4mzkwKa3dcfYSfVBd9fXToN04XEYncPVp6+jvajZqFr/5GIfq1Y25ci1MUbXmg/ZC7+ttsPm9tP+A6ONJ5wpJG+dhmFbX4xuL97Ht6u/QW7vXyw7WmMmnSZJ5udUJL9dnhGV+up67harBiO0PiJ/XZ8EvXFfko6kDC73U/iUp362Gu3C/ZUiY6PI79Ip1H6RvA6t7npgznb96JGq54wWrwSMrmc65MilEQixQrrXWg1cCYm2bhg9b83sMXDF3Z3nmBrKj7OPG+r+a2k8NvWMwAON+4ixKY7ntn/hW23fWB7x19tWrX5qFK5XTUdlXnzvWc4MHYyrlaoiB17DsPWOxhbPYTtarjFi8p09gbON2mGs01/ge1FT2y5m6ZMGuY2ahxbbz2EqdsRNO83Fr+Sf3rsp+j2GFKEYoh5F4vlNrvRYdhc9Ji6GMMXr6VxjTXGLEvN0Rrk0GW2WGxuhthl1eG0aCiGmNkqtpl9mTZdsrTq0pNt5HIbzFqyDqfLlINt/SYYYb5J2LZBoCLdmGUbOJX24ZZ2MOk9FP/S4NhmpCFGWGzh9jGqpHw46fvn/NKk+QpT9qF8BhutwE89R6FT/4m4eO22oIoCqYRiSBJJcZnUXW6zF+MXbMToueswZp5VKo42Un5fnw5Tp0+f6zHUyAbWRuOQsLQSLBbOwxAjqkjKX8F1KlTaBNL+X9i+4HqMWGQLyxad8G+RYlhsuBDDF9ioSUdlEaj8PWreBkwwscGBxi1xsFgJTDBcjFG0rzKdpphyPKpnwwXrsdX1MELCIwU1PuMLoZSQyIDYeBE+fErEh7ik1PyUhI/0qQl+iEtG3LHFENl2QGx0OP/N8leQjp1CpU0g2zetTQ1jnkfAs9lP8B04EO+V56ImXVp+JL5PECH60lXcKlECT81W4AP9VpeWkaXPLNXtzxifKBZq/0ukK5TuIIHcdQDE+w2F35rFO/c98CheHB8ushvs2cOzKVPgVbMGJIGffYauoXeh5LFREK1rAullK8GiOUg+fIB327bw7d0bMpFIsGYdiUFB8ChXDkGzZgFfeTJQW9C7ULLgaxBb1ofs6UnBojm8OXoU1wsVwptjxwRL9hFmbo4b1DI/0cBcH9C7UNKLlhBvagP5hwjBohnIqQU96tED3u3bQyI8upITJEdEwKtJE/j260eFlgpW3UHPQskh2dEf4l1Dhd+aw/vz53GjaFFEOTsLlpwj0t4eN2jQ/Pak5lv/16BXobh/smkN6QULwaI5PBk0CPebN9dIa1JC+ukT93kPO3SA5ONHwaob6FUoWeAlJFMgIXt6WrBoBrGenvAoXx7ha9YIFs3h7alTvKVGbt8uWHQDvQolvWGL5LWNIH8XKlhyDva+hgBDQ9ypVg1iYUJTk2DR4+P+/XGvaVOIXr0SrNqHXoWSHJoOsV1n+pL90Dkt4n19cbtSJYQtXy5YNA/WYm/QIPj5qlWCRfvQm1DyT68h2toZktOmgkUzCDM1hUeZMkjwV9xw0wZYqw2cPZuPrZJojKUL6E+okBsQrawOqf9ZwZJzJIWG8tYUYmxMB1DcHtAW4p88wZ2qVRE4dapg0S70JpT0tjNEFnUgf6N46lsTCF+7FrfoKo/T0aCUdX23SpdG7M2bgkV70I9QchnER+dC5NAd8sQPgjFnYGG4Z9268Bs5EnKJRLBqFyIKVu41aICngwfzAbY2oRehmDgsiBCfmK+xLipi0ybcpKv7w9WrgkU3eOXiwsN1TUxTZQT9CBUTiOQVVSG9t0uw5AyS2Fjcb92aT77qGtK4OD4AZlNVbECsLehFKOnDfyCyrA95+D3BkjNE792ruKqPHxcsusU7GgRfL1JEo9NVaaEXoSSHpkHk2BvypJxfgVJqTT5du8K7XTut+4n0IBeL4TdqFDxr1YIoKkqwaha6F0qcCPGWDhAfni0YcoZ3Z87gWqFCeH3ggGDRDz56eMCjbFl+O0Qb0LlQ8jdBfH5PetNOsGQfcqkUTyjiuv/zzzwC0zeCZs7E7SpVEP/4sWDRHHQulOzRMYjWNoUs+LpgyT4+0vjl+rffItIu56JrAkkhIbhduTICZ8wQLJqDzoViU0Yi6xaQJ+T89gPzC15scjQ6WrDoH+GrV+NmiRKIvXVLsGgGuhWKxkwip34Q7xwmGLIPNoXjUbEiQpcuFSy5A+KYGHg1awbfvn0hS04WrDmHToWSvQ7grUmiAf8UOH06n2tLev5csOQesEEw65I1eSdYt0I9OoLk1fUgC0u9CjSrSAwIwJ3q1RFsZCRYchfY3d9H3brhQcuWGhsE61QoycU1fGkYPuZsrBFuaYmb333H7z3lVrw7exY3v/8eEVu3CpacQXdCyaUQuY+HZMcAUiz7fXfyy5e4W6cOgubMESy5F/6jR/Ohg/jtW8GSfehMKLYcTGzTilqVJf8tS0pCYmAgEqgbyxSfPeOf4RYWuF64MF7v3csXRn6RLiP6+UHy7h0/flbAZuMTg4P5zUi1+aohKxsbhPv8/jvenjihNk2GpLKqRrO6EyroKpKXloc8+Ar//crZGXcbNeLTLndr1/46qRWxzxvkpK8bGMCzZk3crVv3y3QZ8A4di90GyWo4H3P4MF8jkemyMlJ579WvT2yAu/XqqU+TAVlZnwwciKTwcF4GnQklubaJ/FNj4NNL/vuZoSGuFi2K+/37wXvoEDwYPChT9B7+Fx6OGoEHQwbT74FfbE+P3iP+wm3qhm6R34jz8eFlyCxY0MLL2rdPlsr6YAhxKCtnGvtX6D1sKO40/wW3ypTBR2E8phuhpCKI94yGeNdwalqKidPAKVNwq3YtPNtqi6BdLgjcsV2rDNq7Bz4TJ/D5uKwGISEklEetmgjYZKODsjohyG0nfCYZ4naVHxB7WxEh60aouBiIN9D46d/PE5ZsrcEtfvIbEei8Hc8ctmmVgbtc8XD8OL4gJctCzZsHj5o14L9hvfbL6mjPxXpIF5XOhZK9fIBk8xqQee9XGOTyz0LZWCPQyRHP7O20ysCdLng4bmzOhFpvpf2ykljsYng4YbzuhZJ67iD/1BSySME35AuVPvUplGTvOIid+tAX4cZevlDpU29CJcfzBwEkx+cLBkI2hQqikwjd7oDndCJhtE8Q9efq0qmjLoRi5Quh8rHPtNsCicFUXlb2586O/HvaNJz6Ekr2wgvJVs0gvb9HsBCyIRSrgEA6iYsrV8DNaA5OLF2MpxQxMru69GmpTaFYudiFE2C/FbfWroE3BUiqYrHtobTda+MG7F8wH/+YLIDPZhtuU82HU19CST1dkcz8UwT77zQBWRSKieG5wQojOv6GZrVqoOtPTdG4ejV0oc8zy83Un3AaaksopUgXVppjeIffUL18eViMGolIOp4yDdu+7e+paE6D4MY1quPHqlXRgr67z5uLcBJFNT+9CSU+ZgQRe6JQFC9YCFkQinUZEa47MKN3L1SmAaD7PCP4223BMdNFqFmxAob91p53Jyyduv2V1IZQTCTWhTnNnI62PzZApyZNULhQIRjRID6ahgMszQsaG51YYsoFnPhHV9ynVnXJYiXaNGiAZpTnXboAU/UKehFKnAgRBRHifRMEg4AsCMW6ECbE702boEuzZnTiTnjp4szF69e6FTpT5TBfpc4vqFIbQrFjPqWLZqPhRNhNpQH8WkvUqlgR8wb0xys2MKY0Ea7OmNmnN2pWqADP9esQQWWPpLIfXmSCUt99h/U0tmPnklJWfQgli3jIn3+S3N0pWARksUW9pBOZ3rsnKpYuhSOLFyKKKv0C+aqG1arC+M8BvPvQR4tiDNi2lQIcR96CmFDVKH+lUIqAYRt6t2hBra0xngg+lQVED+i8q1Erm9KjO0+bkqdehHqwF8krqkEe9USwCMiGj7pnvR5D27fj4kzu3g0t6tbFjD694L9tC4K/0poYtR1MsMq/sWZ1KqGYb7pL+zSvUxvjuvye0lWy8/GhgIOdy6hOHXmLYtt4fvoQSnzGjELzXyGPfyNYBGRRKHYSL5ydsH36NNSvUgW1K1VCiWLFuNNm3V66oa4KtSkUozqhWJd9nWz1qlTmNj6koHNhQj0UhBrRsQNeuDjpTygWPIhcBkJ8YBI1rTRPV2Sx62MnzPryupUrYe24MbhmaYGlw4ai3PclMLtvX36SKSeaDvUhFG9RFCy0qFuHC/KMuslULYqiv9GdO1FXrkcfJX8bimTL+pDcUHMrOgtCMZGuWKxC7YqVSJQ+3BFzh0wnxyqkYslSOElRVThFV+r2V1IfQila+lb0admCR4WPt2xW+CgnRVdeg3yUMm1KXroWShZ4GclmFSELUvMYTBaEYhHeIRYhFS+OjRMn4J37bt6ns88tUyajbIkSOGgyn6dTt7+S2hSKXUxvdu/iAQKr/MVDBiHh4D66eBQR6rSePVGhVCl4rFvD0zE6TP+bbCWx24jGUpQuJT9dCyU5txLJNm0h//jlK82yIhSPkDZao0PjRryrsJs6GUcWLeT+qhH18X/83IxfqV/zU9oQShlpnllmBodpf2PNmNH4vmhR3oJ2zpmF02ZLuAhHacxXhcaAfVq2xD7jedhCoXydypV5cMS67FRDC50KJUmG2KEnjZ8MSRQ1L3nKYjDBwu9/l5vxkf+vDeqja7Om6NCoIcZTJHVuxTKE0XZ1+6lSG0KxCmbBjLXhBLRv2JCP89hnh8aNaXzXFFbjx3Ih2Nzejlkz0JEuNtYFtqFzmNK9Ox9Xsa5QtZw6FUr+MQLJaxpDcslKsKRBFoUKIPKxkoMdrlMgcd58Of9klfDFFEw61FbXx1oVm7e7SWMo1rV5UprbVmv5bxbZ8TRcLKp8+s3Gf8yXMZFZsKGaF6cuhZIFXqVAoiFkT9JZKaoUit2Kt92EIDaOoEKnTwf+GULdyHNKG06Vzj6D2a1rle0ZMWiPGz/5bAvFLirqglOXlVoDUVmutGR2ZRqWPoz8VUrZ2QXG7WnKTvYgdlHp4la89PIGiKxbQkaRn1qQUOxlhTd/qAK/Vebw37gB/nQVfp3r4LfWCn5r1qnZljEDyI89GDYEHmWyvmaCLW65RWV9unxZFsq6FoHr1yLUyhIB9N0vzbZ0Sd0huyAe/DWMPxmiVaHEO4dC5NiLBEn/JYTsJYWXDQxwq+oPuFWjOm5Vr5YhPWrUhEftuvDuWAe+Peh7DfXp0iPruq5R5HW7UmUkPH0qlCJzCDMzw5UCBbhYmSkr4z063un6jbGqUWdcqFEbd9SkSY8edAxeVhrcx95TPD6rcaHkcW8g2tgKkjMZP2XxydMToaamvFthL/DIiKEmi+jTBE97N0ToUANEmbVB2GLab978L9Kmy3nGCKZjRe/aBVliolCKzCGehGVPjWSmrIxhC+YjeO5c9KnZE9UbTsD52aaImJ+5fZVkZY10dIQkLo6XQeNCyQIuUiDREFI/zb2RhS2Hjrtkg0jjsnjvNg5SClZyOxz2X0ehRtOwefcVaOLlphoXSnptM5Isf0zfP2UR8uRYfDgwG5FzS+Lj0UUaeUBb2/DwDkGZX2Zh4kIXSKWaeQetxoUS/TMdIrvf+b2onELyJgRv7Pohyrgc4q7Z8yAktyMi+j2a9TJDq34r8Pa9otvSBDQrVMI7iLZ146/PySlEIXcQbfELokxrI9FXsy9e1BYkEhlGzXFA+eazccc7WLBqBhoVShbuheSVNSH1OSxYsofEB0cQtagaYta1h+i5ft6KnB1s3HEO39SdCJcDOX+QPC00KpT0riv/ayH562y+yJ3C+bhLmxBpVAZvHQdDquE3N2sTV277oXijqZhm5pbyDzWahOaEYm8MOzQTIvtuQFKsYMw85MnxPGiImFUcH/4xot+5P2hQIvTFGzTpvgRtBq7Cuw8qi3g0CM0JlfAeyVs7QaS60DKTkL4Lx1v7gbwlxV2xyxNBgxLs75yGzbBDhRaz4f1Eew9+a0woebQ/klbVgtTTRbBkDqKwu4he0xpRC6sh8ZHu3yeeU6yzP41v6hhizzHFVI+2oDGhpL7HkbSyFuShmX8bZKLPcYrqauC1ZWuIw70Fa97B2Wu+KN5wKowt9lEnoN1eQGNCiU+YUNfXGfK4GMGSAeikWNAQQYPYtw6DqOt7IWzIOwgIeYV6vy9C5xFrERuX8zHj16AZoaQiJNtSKH1wmmBIH7KkT/hwcB4iZn/PP2XZCDz0jWSRBP0nbUbl1nPxJFA3kalGhJLFBPJpo6+9kUXyJgxvHIYgck5JChpsyZJ3ggZVLLc5hm/rTcKhM5p5MWRmoBGh2AA3aU2TDN8YJgq7h2jyRVGLqiKJfFNexcmLD1Gk/mQstjqkdb+kCo0IxRZaJlu3Stc/JfmcoKChFgnVCqLQO4I178E/OArV2xujx9gNiE/Q3AupMoOcC0VXVbLLYIid+wsGFUgliLu6DRHU1b3ZNgCSGN28dV8b+BSXhF7jN6JaO2MKJLTzOtKMkGOhZDRYTbJuDcmF1YJFARY0fDxkgohZ3+HDvtmQJWjm/eb6AOvhTKmrK0xd3vHz+hlG5Fgoqe8xJJnXhDTEQ7CQ7X0En6uLMCqDTxc28JaVl3H4rBeK0KB2uc1RwaJ75FgoyXkLJK3+EfJ4xYuZxOEP8HrNrxQ0VEfC/YPclpfxyP8FKreag0FTbZGYpJ+3QDPkSCi5TALRnjEQuyr++i7p6QVELanN7yOJQj25LS+DTbB2HWWFep0XIjBMv69DzVmL+hSNZJs2EFOrir+5A5EmVWicNAiSD2qWMedBzLPYh6I/TsG5a1lbXqYNpAgli/SF5OEhiL0PEv/5On2PQ3TRCgmmFfDOqi1FdiXwZkUDiDycIHlyWv0+qXgQEhp/afLf2DQJNslapM5EWNrljrvLXCi5JBmi3SMRv7AkElbVzTTjV9ZG3PLqeLO4Ct4uqogEi3pItGykNu1n1lF8rqyD+MVlIToymwqg+79LzQgPHj9H+eazMGKWPZKS0/9bcF1CIZQ4EclOfZFo9ROk55dBeoF43uzrZOkumhNXQHZJ8ak2XSouVexHTFjTGMluo6g55x6h2IKU9oNXo+EfpggJz8QEs47wWSjnAUhi/zf4cBfgQ3y4U3tk+RMTN7UloUbnqhY1w2w3ijWcisseWVtNq22kFmprR+C+M7V94n0n7fHBDn6MRJtfc5VQzgeu45u6htjofE6w5B7kCyXAky2a/HkmRhs5QiTOfQN0FR9FQm35/xQq5m0sWvRbgZ96meHlK839E7YmkQuEomBCz0JNXLADJZpOwy2vbC5z0wHSCNWBKjKNUF7bAV8KAALdFXymwsC9wGPa5iWk9SYB/Hd/TveUgoYHwjZV5iKhtuy8hEJ1J8HO7ZJgyZ34ulAPXRB6eh3+dTDGOcf5OL+dqPwksm08vY8LCeWM226m2L5sLNwsJuHZCUvgkatiu1LMXCTUzXuBKN1sOsZTi9LUYn5t4UuhvJhIQsUy+u+BveloVC5XEtUqlEGNymVRk8g+CxQogKWT+wIB7ki+54SlU/qjasXSaNmoJupULY/6NSvh9JY5XOxUed4noeh34kb9CfUq5iOa9FiKlv1XIOZd7l/s+XWh6OqPvmANr73LcH+fgt6HV8Fx+XgU/rYQHEhEhBzAMZuZKFr4W6ybMwQxt+0ReHINOrdsiPo1KuL1JRtFy8olQoklEorutqP0zzNwxztv3MxUIxSrSFah5JsY7xFZt+bnRj6H6Ec+KGQf5ozqhoa1quDluQ2Q+7qiV/um6Ni8PsRsX5Yu7AD2r50KAwMDnLOfp/Bzyjx5F6g/oayd/+V+acdBzS/m1xa+LlRaPnKBH7WoStQVmozvxQOKj9dsedc4c3gXIHifQlwS1tNtCSqWKYn1RsMUYivz1aNQF289xfeN/8Z0MzedLk7JKbIulL8bFk7oxYUKOGrBI7vwM1YoX/p7mE7u91mox67wP2KB+tUrYv6Y7uSnWACRWqgEHQsVHvEWDbouRttBFvjwKUGw5g1kTSjq4qIubkTjelUxrHsrRThOvifk1DqUL1MCZlP7A0EUsjOhKG3gMUv8SAGF0ag/9C4Uuzs7dIYdnxW/75s7b61khBShkkioxIyEuk+kMZK96RgULFgAl53mK8ZQ1KVFnrdG2VLfYf74ntx/KVrUTvgeXI6aVcph5bQBCqGU+aoIlaQjodZsO4WCdSbC/bh2F/NrC5kXilrOh2ub8WuzOvijTSMk3bFX+B0SIMHDjofro3u3pYHuHsX+NOi96DAPxYsVwaEN03gL05dQZ648QrFGU2G0SvuL+bWFzAnFfj/ehZO2s3kU52ZhqIjs2DbWndFAd+Kfv3Gxnh1dnTIrMX9cT5Qj3xVyaq3aqE8XQgU9f426nUzQebhuFvNrC5kTioSIp7FRx+YNKCSvjJfU1aWqeGptXnvNeIDRsnFNWBkPw99DOqFUieJYPWsQZMyXKf0To46Eik8U4c/Jm1Gx5Rw88lf8b1VeRSaFYoPejRjdpy32Wk4BnuxKvZ2JQN3gpe3GGN6jFbq0bojevzWFw5KxEHk6KPyTanoSiR0jYWNrrQrFF/PXNcShM16CJe9CIZSIhNpOQtlmFEyQjQUPzNek3ca3E1krozSSe44kDvkvJiif50ubVkWoXSSUFm7FHz13ny/mZytcZbK86ZdUkVqorZ2oghW3ydXeQv+CJNpDqnQmitLmQ3z0lTx8yL/R9gSbNloRij1kVqP9fHQfo/vF/NrCZ6HseyHesiEkpxdAcoZ4en6GlJ42RvypxXhxci0k55ZQaKU+nVry/BcgblU9JLn+pVGhmDDsaYvqbDF/6CvBmvehEEoqhmj/ZMQtLItPS3/IFMXLKuKBSXMMHmMEh6ndkWReA0nLq+KTGVFN+i+45AfEmVbij+xk9Lq4rICF3ovW/YPCDSbj2IW890xwRuBCccQEQfbsMqSBVzJFBF3Gez8PWO26hHajLbHVah1E/hdpwHtNbXp1ZG9ylsdq7hGWf87c44tTzDcfz6PPMqaPz0JlE2KJDDuO30HbyfZY4+4BfY1UHj+L4M/U9jXclGsWTWoSORZKicMXvdFxojUWbj6K9590K9cnGsiyAW3dzgv5APe/CI0JxXDxjj+6TN6E6Zb7EfFaNw+uiSVSPjXE3vdw+rLKn4n9x6BRoRi8nj5Hn5l2GG3qCv8w7UddbJK1QK0JWGufN14Vl11oXCiGJ8GRGGbijIHzHHGfhNMWvHzDUO6XWRg2YxtvWf9laEUohueR72C4Yg96TrfDNa9Awao5sIfM2A1Atpg/7GWavz36D0JrQjG8ehMLow2HKMjYiFM3HgvWnIO9afLvJbvwfZNpuHAzzZ+I/UehVaEYYuMTsdLxDNqN24C9Gpocdf3nBvml8fyNk/8v0LpQDGzRvY37ZbQbuwF2B65BkoPFjh73g1D6p+kYM2875fvf9kuq0IlQSuw8cYe3rLUu5xGXjcnSmLef0Kr/SjTtaYYXUe8E6/8HdCoUw7HLPugwwRqLaGD8Jguvm2atcPx8Z5RqNgO3tBCc5HboXCiGS57+6DFtC6ZZ7ENEdOYGxmwRf4FaE3P9Yn5tQS9CMdx5FIr+c+wxcpErAr4y7XPljh9KNp0GQxOX/8RNwOxAb0IxPA2OwvCFLvjTyBE+AerXNES9/oDmvc3Qou8KvrD//xV6FYoh/NV7TFnljj+m2uLGg9QL9iVSKYbPskf5X2bgnk+IYP3/hN6FYohLSILpluPoMX0Lztz8PDC2dvqXT7buPJz5Fwr/V6FVoWQyGd5+jEf021i8fvcpXb6PTUBoxFtMX70P/Wbbwz8sGqcuPUQZGi/9RS0qhqJDRnX7piU7VmJS/v2oLMHDJxgTV+zG+GVu9LknQ0612IvRS3ai10w7TF61F80HrULJ5jMxbIEz36ZuH3VkeWyiwXWCHt8Epg1oVSjX47dRmwKB8u2MUbb1XJT9NWNWaDsPldobo1wbI0o/BxXos0K7eWrTqmOZVnPww+8mGGXqitfv885fRmQGWhVqz5m7qNdnGV/HYFBtHAxqjM88a06AQS2ium3psepYEmwOJq10x5sPmvvvptwAnQhVqP4kGFSnimSVr03SxVCuzdx8obKKVEKxK561EG2yer5Q2UK+UJpDvlB5BPoVqibZKo+CQbnhMCj7FwwqjCA/M/bLNBVHKraXI1YZnXq7KvOFyh4yFIr9JlHYy6LYbfU55u4YMt0OJZtOp+htDAxqUxomWo1x/AW8s1e483TsXpRBZRKLCaiaH2O+UNlDukJRJRcgMSYvduVPqrOnL3z8XuAdVe7JS96o3HIODH4YjW9qT8Q6hzP8zSqBodH8r1PDI99irNF2RUtMK1a+UNlDukJRV/YzDYSjYj7i7FVf1Gw/H2Ub/o1Zy92RLJZgDlW0wfeDMXKOI0QiCTY4nUX5n2aiaY8lePDkOcJexuDHLosUYuULlXOkKxT5m/6TN/M0s6hLMyhDvqfUUNTpZMJvt1vaneJ+6+qdAASFvUZhNmDmfmoYdY9b+X6Dpm1R7JcvVM6RrlDkY2p3WMD/JOvh0+eo29EEBWk7u3sbTa2MrYso/ctM/u8ye4/fUQQQrJsrP4L7NHbrkP0tELer5psvVPaQYTBBldxx2Bq+ePJF5Du+6vVl1HsMmWYHg9LD+IJ/5pfY+115cMGEoqjwlz7LIabu0cH9Cn9vBBMnX6gcIkOhyL8w33Tp1lO8pUpl/oq9ypr5JYPywxVChakXKlkkhtP+ayjI5xBVwvl8obKHdIWi1lSHurv71Io8H4ZQV2eORiQMe0CardUbPtuB/09TYNgr2O+5QhHgZ6F+7r2MvwRxrf0ZRWvKb1E5h1qhWIVXGYWl1kcglcnRcoA5DEoO5YPZog0m81D98m0/lGs+i/so1uIMKlF0V51aDgUYHai7ZGDvgWU+i0/G5guVM6gVigawrCuzpi6NtYzG3ZdQxDeEd3cG1cbwVnbj3jMUpFZ38pIPPsYmoGHXxeS3SEwaW7HHa+ITktCKCcxmMpQi5QuVfaTboiqNRK/xNvwJdtZ6pi/djYkmLvwF8ewvvedbHqDQexi6jVnP3wp21ycEU2hwvGH7Wb7PVooOi9SjPFkryxcq50jXR7Hv1GUNnW6H05d9EPoihkd/N70C+VRS8QZTFEECcST5K7YyNiL6HXz9X/AxVpmm0xR+S1Ukxnyhsod0hWJkv2kQy1YZ1e+yiD/nVPbnmZ8nZtlcH+smKU35FrPQsJspfvjViIvBRWLbVfNjzBcqe1AK9U09CqNZBbNuT5VMLFbpbNaBCcQHsGnSsTRsEpZtZ0EFE1F1uyppW/6t+Gxg92mFUIV/nIyCdMUXrGOoVRYgscq3NYKh+Z58obICt1Oe+PFPc9TvbYZ6vZYS2af2WJeOUb/vMowz25WlJ0XyArQqVDAFCXb7r/KH2Gz3XdUJN7hdxL+3nvDo8b8D4H8qj0rEhbttIQAAAABJRU5ErkJggg==)
MathematicsGrade-2
Mathematics
Find the second addend of 59 to make a 10.
Find the second addend of 59 to make a 10.
MathematicsGrade-2
Mathematics
One number makes both the equations true. Find the missing number.
14 + ⎕ = 26
⎕ + 26 = 38
One number makes both the equations true. Find the missing number.
14 + ⎕ = 26
⎕ + 26 = 38
MathematicsGrade-2
Mathematics
Find the numbers in place of A, B and C.
![](data:image/png;base64,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)
Find the numbers in place of A, B and C.
![](data:image/png;base64,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)
MathematicsGrade-2
Mathematics
Billy puts 32 skateboard wheels in a pile. He puts 28 more wheels in another pile. How many wheels does Billy have in all?
Billy puts 32 skateboard wheels in a pile. He puts 28 more wheels in another pile. How many wheels does Billy have in all?
MathematicsGrade-2
Mathematics
Carmen planted 21 trees. Patrick plants 19 trees. How many trees did they plant in all?
Carmen planted 21 trees. Patrick plants 19 trees. How many trees did they plant in all?
MathematicsGrade-2
Mathematics
Team A has 6 points more than Team B. Team B has 28 points. How many points does team A have?
Team A has 6 points more than Team B. Team B has 28 points. How many points does team A have?
MathematicsGrade-2
Mathematics
Mika has 43 buttons. Sara has 29 buttons. How many buttons do they have in all?
Mika has 43 buttons. Sara has 29 buttons. How many buttons do they have in all?
MathematicsGrade-2
Mathematics
Jamie has 24 cans to recycle. Lisa has 27 cans. How many cans do they have in all?
We can add two things only if they belongs to same unit.
Jamie has 24 cans to recycle. Lisa has 27 cans. How many cans do they have in all?
MathematicsGrade-2
We can add two things only if they belongs to same unit.
Mathematics
Find the missing number.
![](data:image/png;base64,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)
Find the missing number.
![](data:image/png;base64,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)
MathematicsGrade-2
Mathematics
Find the sum of 41 and 23 using mental math.
Find the sum of 41 and 23 using mental math.
MathematicsGrade-2
Mathematics
Identify the first step for finding the sum of 14 and 28 mentally.
Identify the first step for finding the sum of 14 and 28 mentally.
MathematicsGrade-2