Mathematics
Grade-2
Easy
Question
Find the picture that shows 4 doubled.
Hint:
To find the picture that shows 4 doubled, we need to find the pic with 4 two dotted symbol.
The correct answer is: ![](data:image/png;base64,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)
is the picture with 4 two dotted symbol.
So,
shows 4 doubled.
Related Questions to study
Mathematics
Identify the equation that is represented by the picture.
![](data:image/png;base64,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)
Identify the equation that is represented by the picture.
![](data:image/png;base64,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)
MathematicsGrade-2
Mathematics
I got 3 scoops of chocolate and 4 scoops of strawberry ice cream. How many total scoops of ice cream did I get?
I got 3 scoops of chocolate and 4 scoops of strawberry ice cream. How many total scoops of ice cream did I get?
MathematicsGrade-2
Mathematics
15 + 14 can be solved using _____________
* Addition means summing up two or more numbers or values to get another number.
* The property of addition is to increase the value by adding another value to it.
15 + 14 can be solved using _____________
MathematicsGrade-2
* Addition means summing up two or more numbers or values to get another number.
* The property of addition is to increase the value by adding another value to it.
Mathematics
When you add the same number 2 times, we call that a ____
When you add the same number 2 times, we call that a ____
MathematicsGrade-2
Mathematics
Count on to find the sum.
![](data:image/png;base64,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)
Count on to find the sum.
![](data:image/png;base64,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)
MathematicsGrade-2
Mathematics
Write the equation by considering two boxes.
![](data:image/png;base64,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)
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)
Write the equation by considering two boxes.
![](data:image/png;base64,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)
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)
MathematicsGrade-2
Mathematics
Find the missing numbers.
3 + _____ = 9 + 3
Find the missing numbers.
3 + _____ = 9 + 3
MathematicsGrade-2
Mathematics
Find the missing numbers.
7 + _____ = 4 + 7
Find the missing numbers.
7 + _____ = 4 + 7
MathematicsGrade-2
Mathematics
Jenna has 15 bean plants and 5 lettuce plants in her garden. Find the total number of plants she has in her garden with the story of addends.
Jenna has 15 bean plants and 5 lettuce plants in her garden. Find the total number of plants she has in her garden with the story of addends.
MathematicsGrade-2
Mathematics
Which shows how to count on to find 4 + 10?
Which shows how to count on to find 4 + 10?
MathematicsGrade-2
Mathematics
Count on to find the sum by considering two blocks.
![](data:image/png;base64,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)
Count on to find the sum by considering two blocks.
![](data:image/png;base64,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)
MathematicsGrade-2
Mathematics
Count on to find the sum.
![](data:image/png;base64,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)
Count on to find the sum.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWAAAAAuCAYAAAAWRMPkAAATpUlEQVR4nO2dWWwcx5mAv+qei8MhR+QMD5EUJVIUD9MUI0qWrEixHTs6fMCW14YMZeP4YWHAQJCXIEDeEr0skLeNAgQL2A/OwntENpB4JdvawIwdeXVYpmLJ1lKHSdok5SEliuI9B+fo2oeZaZLibZPdzEz/gkCiOd1ff42umr+rqquElFJihRVWWGGF4WGba2MkEll0R1VVAYhGo4RCIcbHx5mYmCAWi6EoCh6PB6/XS25uLna7HQApJd+mvjeaaTlmhuNKM1WbWJQnhIoA4okokViISCxMKBokocUQKOQ4csl15uFyuLEpyWKoSQl8c0ejmdnguBpMu82p/z5nBbzwyQgURWF0dJT29nYuXbpEZ2cngUCAQCBANBrF4XBQXFxMZWUlNTU1NDc309jYSGFhIUIINE1b00zLMTMczbquAsHE5Bg373TQNXCVvqEe7o7dYnD8NnEZw6468LoLKc4vo6xgI1UlDVT6t5Cfsw4Jy/6iMZqZDY5GMcVcTRDhcBghZn/LK4pCNBrlwoULnDx5kitXruB0OmloaGDz5s14PB5UVUXTNMbHx+nu7qa9vZ1IJMKWLVt4+umn2bt3Ly6Xa9ZNLaU0lGk0z3LMHKZiA8FsnhCCeCLOjb7PuNDRSvfADeyqgw1FNawvqMRld6MIFSkloegEd0YDdA9+QTQeoaygit21P6BxwwM4VAeavMcRaSjTaF42MadnwHNWwKFQCEVRZp3Q6Ogox48f509/+hN+v5+DBw+ya9cuysrK8Hg82Gw2vSDE43GCwSD9/f20tbVx6tQpurq6eP755zly5AjFxcX6TZ3+aTTTcswMR6OZQpUoYiYPBOHoBKevvsO5G38mP6eQHZsfpq68GZ+nBJfdjaqokOJpMkE4GmRo4g4d/Z9zsesjbg33sKf+II/c9zTeXB8yVXDTBdhoZjY4msF02nOmSEvJgIUQDA0N8etf/5pz587x3HPP8fzzz1NeXo6qqiQSCT3Vnl4Qpv8eCAQ4ceIEf/jDH2hpaeHnP/85FRUVJBIJ4vE4qqoayrw3a7Ic/z4dzWDOyoCFYCIyypvn/pXrgUt8t+4Ae+ofx59XiioUEnIab1phn/774PhtPu5o5aOr77C5tJF/2PVPFOWtR5MaCS2OoqiGMmdlhhnoaBbT5cjVP6sePXr0KPdEIpGYOrCiEA6HefXVVzl16hQ//elP+dGPfkRRURFSSuLxOJqm6YV9ekGY3onh9Xppbm6moKCAP/7xj4yMjNDc3IzD4dDb6YxmWo6Z4Wg0U1WneEIoTMYjnPr0v/hb12me3vES3296lnXuQpCSuBZPZT9z8FL/AHKdHqpLGvC4vJy98WdCkXGqSxuwKXYQYkYBN4I58wstMx3NYtpUu77fnBVwPB5PnVAScPLkSV577TVeeeUVjhw5gtPp1G/i6TfyvSc1PaSU2Gw2tmzZgtvt5vjx4xQUFFBfX4/NNtUXaBQzXWgtx79vR3OYyREV6czpQkcrf778Jk+0/CMPNz6FXXUgU1nk9KeQBXlIFMVGWeEmnLYcPrr2Lp4cLxW+alRlmqNBzHTFlMmOZjFVRdU/u2AFbLPZ+OKLLzh27Bj3338/L7/8Mrm5uXqWcG+Gde+2WScmJaqqsmHDBu7cucP58+dpbm7G7/frxzSK6fP5LMcMcDSFWZS8rqqiEhj6irfbfs/GoloONr9AjsM9xUsXawmKYiOdOc0fElVRKfauZzQ0xLWvL1FdXI83t5D0kCajmPnugox3NIupTKuA72191kMIQTwe5/Tp0wSDQQ4fPozP55s1rEJRFFQ12Rt4b0fIXJFIJPB6vRw6dIixsTFOnz5NNBo1nGk5ZoajadcVgSYTfN77CZPRMN9reJJ8d8EsnhBKssDJuTruZocmNdzOPHbX7iMUHefKzQvEtZjhzGxwNJOZjnmPoigKg4ODXL58mebmZurr6xeELeVmTkokvzXq6upobGykra2NoaEhw5lG8yzHzGGmt4+GhvnyVjtVJfVU+jYv6ThLCSklFb5qNhXV0tF3hfHwiOFMo3lmOJrJTMeCd2FPTw+3bt2iubmZdevWzfpG+Dbhcrl48MEHCQQC9PX1Gc40mmc5Zg4TACEYGA0wEhykuqQBtzMPVpBntzmpK9/G4PgthsYHDGcazTPD0VRmKuasgIUQSCm5efMmwWCQ8vJybDbbit3Q6ce/6upqxsbG6OnpMZxpOa48zwxHU64rSd7AWB/hWAhfXgmqouq94CsRilBYX7CBUCzIwGjAcGY2OJrFnPG3+XaSUhIOh8nNzaWwsHDFTiYdmqZRUFCAx+MhFAoZzjSaZzlmDjPNi8YncTnceFzeledJDY/TS47NzWQ8YjjTaJ4ZjmYy07FgBSylxOl06p0WKxnpHmaHw0EsFjOcaTTPcswcZmoLEg274kBdQofMNyCiKAo2m514IqZvM4ppNM8MR3OZyViwE87hcDAxMTHv3BDfJhRFIRgMMj4+rmcVRjKN5lmOmcOEZI+4XbUTjgWZjE/OMZvAtwuBQiQWJhwNkZN6c8pIptE8MxzNZKZjzgo4PeC4oKAATdO4e/fuCp9Ssp35zp07+jAfo5mW48rzzHA05boiEUCuc11yIp/w8Aq2GKZ5MBocQtPi5DrzDGdmg6NZzOmxYL5dXl6O1+uls7OTSCSypKwi/Si48Aklx2xev36dkpISKioqDGcazbMcM4eZ2oo/rxSPK5++4V5i8ck5Z9X6RjwEcS3BzbtdFOT68eUbz8wGR3OZyZi3AtY0jY0bN7Jp0yYuXrzI7du3F72h0ye0lBt6eHiYM2fOUFNTQ1lZmeFMyzEzHM26rhKNYm85xd5yOvuvMBIaXBIv9duCn0NAMDLC1a8vsr5wI4WeEsOZ2eBoJjMdC3bC5eXl8dBDD9Hb28uZM2eIxWLznlg0GtVnp1rwfERygusPPviAnp4e9uzZQ15enuFMyzEzHM28rm6Hm6bKnQyM9tF+82+pt5zm5sUTMTSZmPUm1CxealjUZ90fc3s0wH0VO3Cn2g2NZGaDo5nMdCzYBKFpGrt27WLr1q28+eabBAKBWdlCOoNITwnocDgWfMtIURR6eno4efIkTU1N7Ny5c8YxjWJajpnhaOp1lZK6su+wqbiO/732HnfHbzM7I0ryFEUBIbCrDsQCPe1CEQyMBfi44y9UFdVTV9Y845jGMbPB0VwmLKECLigo4PDhw4yMjHDy5MlZGYOUcmqi6kXSdiEEk5OTfPDBBwwODnLo0CF8Pt+M1QaMYlqOmeFo5nWVUsOTk8/D9z3JeGSUCx1/Ia7N5qUH9SuLtCsKBLF4jM+6zzMWGubB2h+Q5/Les8qJMcxscDSbmTzOIqFpGtu2bePxxx/n7bffpqurS88qprehCSEWzCQgeUN3dXXx7rvvsmvXLnbs2KFvN5ppOWaGo9nXVUpJdWkjD2x+mHM33ufWcC/pLEdKiSYlUmoIoSyYLaWjf7iHTzr/Sn15M1vW34+EWfsZwcwGx7XAXPQoUkocDgeHDh1CSsnx48eZnJwEpiZuv3dFgrlCCEEwGOS9994jGAzy1FNPkZ+frxcGo5mWY2Y4roXralNs7K7dj0Ty0bV3iCaSM7RpUktW9EKdCzGTh2AyHqGt669MxoLsrHkUtyMvdS4zP2sEMxsc1wJzSa99aJpGVVUVL7zwAqdOneLatWsoiqJnEULMPznx9Pjyyy9pbW3l0UcfpampCU3T5t13tZmWY2Y4roXrKqWkZN0GHm54ioudp7k52AUixUv9XHRYk0hmTJe/OsfWjbvZVFyHREMRgrk6g1afmQ2O5jOX/N6dEIInn3wSn8/HiRMniMfj+s28lIhGo5w9e5ZEIsEzzzyjr1Kw0P5GMy3HzHA0gykE7NjyffJy1nHhi7+gafElsyDZs97+9ackZJwHa/elVmKQzNcTbwYzGxyNZi6rAi4pKeGJJ57gwoULdHR0YLfbF98xte/g4CCnT59m586dVFVVzWqMXgtMyzEzHM1gCgQFbh87ar7P9b5LBIa7k2uALYWHYCQ0zJWej6kr+w6l6yrQlvA+ltHMbHA0mrmsmSdsNhv79u0jGo1y/vz5Odvg5ovr16/T0dHB/v37cTqds9rS1grTclx5XrYwbaqNlqq9xBNxbnx9OdVjvjhPCkngbhf9I720VO3FbnPCUh0NZmaDo5HMZU/9U1JSQlNTE21tbfrEJItFIpHg7NmzrF+/noaGhiUXILOYluPK87KCKWGdx8em4lpu9F0mPBmc1ekyV2iapP3mRXyeYjb4a5ZcSZjCzAZHA5nLroBzcnK477776OnpYWBgYEanxnz/JyYm+PTTT6mtrdWXB1/LTMsxMxyNZkokTlsOlf4tDIz2JV9pRUHM8Q/9J4RjQTpvt1NWuAlv7uy1yNYSMxscjWTaFvzrvSeVGuJTW1uLqqpcvXqV9evX68N70pG+kdOPfJ2dndy9e5cf//jHy2rMNoNpOWaGo1lMu2qnvLAKVVHoHeyk0FOMJme3HwsEkuTijv1DvYyHRmloakGgIEnMceS1w8wGR6OYy6qAhRDEYjH6+/vp7e3ll7/8Jb/5zW/0DorpbWxCJIf8JBIJJiYmuHXrFsPDw4RCIZxO55plWo6Z4WgWM56IcXdigIGxfv79o2O8/cnrMwqtniuJ5KD8hJYgEg0yPDHIRHiUyVgYh+pY1pSIRjOzwdEo5rwV8HyD3Nvb23n99ddpaWmhrKxMH94DyfGXiqIgZfJ96eljNYeGhnjjjTeoqKhg//79c6bmRjMtx8xwNIc5u1NGAD2DnbR+9hY1pY0U5pWkhjApqfPRUISSOldFH9wvEIxHRvjw/97Gn1/K9uqH5mk7NJqZDY5mMZMxZwWcSCT0G/He6O7uJhKJ8OKLL7J161ai0Sh2u11/515VVf3Gjsfj+uKIvb29/OpXv6Kzs5N9+/bpj3xJGbngwPrVYFqOmeFoBlOTWjL7uQcnJdweuUksEeXRpkNUFdcTT8RRhUpCJh9FFUXVvyw0LYEiVKSQ3Bnt4z8++hf6hntpkVOPtakjo0lpKDMbHM1iTo85K+D52r2EENTV1VFYWMhvf/tbKisrcbvdeDwepJSMj48TiUwtdJc+jpSSoaEhYrEY27Zt07dNyc4/PGi1mJZjZjiacl2Zn1fhqybXlc+Jtn+jyFuG05ZDjt2NBMLRCaLxyfTsAvpxpITxyAgxLcHmksYZxVU/N4OZ2eBoFnN6zFkBLzRJSUVFBTU1NbS2ttLY2EhRUREulwspJTk5OYRCIR2SzhoSiQSff/45fr+f+vr6mdmEpiFlcnpAI5mWY2Y4msFUbfPz/HmllBds4tJXZ6n0b8Hr9uOwOZBIHHYnk7FwskCmKnwpk5MDdQ9cIz/XxwZfNclFcqYyUYlccLHI1WAqBvPMcDSLOT2W1QkH6B0YLS0tvPzyy3i9Xr1dTdM0vVBMzyYAIpEIHR0dAKmUfeqzi81KZTTTcswMx9ViwvwVsIYEIahZfz8Htx0h1+lBkwn9GFImhzili2Uyc9KYjIXpG+6BVFOKJjWkliywi828tRpMFmBmiuNaYC67Ana5XDQ2NnLs2DF+9rOfUVpait/vJxgMMjg4mMwQUu1qkLyhI5EIXV1dPPfcc/rjX/pvCz1CribTcswMx7V0XSUSp+qk0r+F//7k97zW+s8UeorIdxUQiYUYDQ/pPCnTPIjFJ+kb7mFv/UFy7G6900amjqku4LhazGxwXAvMZY8Ddrlc7N69m7feeouxsTEeeOABHA4Hubm5+P1+/XPTC8a5c+cAePbZZ1FVdcaKvYtNDbhaTMsxMxzX0nUFsNucNFRs48z19whPTlBUthWbasPpyJljYH6SeS1wCYDddQdQlXQnT/JzqmLTP2csMxsczWcuOwOWUhKNRnG73ezdu5cf/vCHwFSbY/pRLV04FEWhqKiIV199dcaj33y91muBaTlmhqM5TEk8EcNpc9FY9QCPND4DSH2YElKiIVFT88oqQsGb6+N/Pv1PEqlZt4QUgEBRluZoPDMbHI1hLrsCFkJQWlpKTU0Np06dor29HUVR9MHq0x/n0j3M3d3d1NfXU1ZWtqTHRrOZlmNmOJrFLMgtYn3hJi52/ZWewQ4EAoctOaGPqqj6YP5YYhKk4PbY11T4ayjMK/5GPDOY2eBoBFM9evTo0Xs3LrRSrJQSt9tNdXU1OTk5dHZ28v777+ttbUVFRbjdbq5fv86HH35ISUkJBw4c4KWXXqK8vByYf3jUWmFajpnhuFrMxTIop81FaUElDruLvqEeLn91BrvNycbiLeTnFOK05xC428Vn3efx5vrYXv0QjzU9iz+vNPWAuvyKwmhmNjiuFnN6E8+yK2BI3pA+n49t27axfft2JiYmCAQC7Nmzh0ceeYRwOExbWxt79+7lF7/4BQcOHKCoqEjf95uE0UzLMTMcV4O5WAUshCA/p4CakkZqSu8nHA1xd+I2DRXb2bpxJ9HYJF/0fUbjhh0c3v0K26u/xzp3erHPb+5oJDMbHFeLOb0CFnKObt30o9hikZ5Zqr+/n9/97ne0trYSiURQVZXHHnuMn/zkJ1RWVi6pV36pYTTTcswMx5Vkqra5C1ZyKNJUiNQSNkMTA7xz8Q0ufXWWWGISRVFp3vhdnt7xIv78MuCbOxrNzAbH1WbabVNzi8xZAVthhRVWWLH6sez5gK2wwgorrFiZ+H8m89Zx6ErYngAAAABJRU5ErkJggg==)
MathematicsGrade-2
Mathematics
Count on to find the sum.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOEAAAApCAYAAADDCE6jAAABAElEQVR4nO3dsVHDQBBA0TNDC+SU4IRGoBFTCTRiGiFxCeQUISJmSOxI3PdY76UK9hT80Vyy2i3Lsgwgc1cfALZOhBATIcRECLH7cw/2L+8zzzHGGON0PEyfCbWzEY4xxunjddY5xv75LQl/ttPxsIn3vHVrfjAuRliYHf7seb9u/T0fHp+mzfv++pw+b03uhBATIcRECDERQkyEEBMhxEQIMRFCTIQQEyHERAgxEUJMhBATIcRECDERQkyEEBMhxEQIMRFCTIQQEyHERAixi3tH/+7JBP7H7pr+T7iFzdQ2cN+GNTdwX1WEsEXuhBATIcRECDERQkyEEBMhxEQIsR90ijFdM2cUUQAAAABJRU5ErkJggg==)
Count on to find the sum.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOEAAAApCAYAAADDCE6jAAABAElEQVR4nO3dsVHDQBBA0TNDC+SU4IRGoBFTCTRiGiFxCeQUISJmSOxI3PdY76UK9hT80Vyy2i3Lsgwgc1cfALZOhBATIcRECLH7cw/2L+8zzzHGGON0PEyfCbWzEY4xxunjddY5xv75LQl/ttPxsIn3vHVrfjAuRliYHf7seb9u/T0fHp+mzfv++pw+b03uhBATIcRECDERQkyEEBMhxEQIMRFCTIQQEyHERAgxEUJMhBATIcRECDERQkyEEBMhxEQIMRFCTIQQEyHERAixi3tH/+7JBP7H7pr+T7iFzdQ2cN+GNTdwX1WEsEXuhBATIcRECDERQkyEEBMhxEQIsR90ijFdM2cUUQAAAABJRU5ErkJggg==)
MathematicsGrade-2
Mathematics
Count on to find the sum.
7 + 19
Count on to find the sum.
7 + 19
MathematicsGrade-2
Mathematics
Find the missing number.
8 + 2 = _____ + 8.
Find the missing number.
8 + 2 = _____ + 8.
MathematicsGrade-2