Mathematics
Grade-2
Easy
Question
Find 34 + 49.
- 83
- 73
- 63
- 53
Hint:
Use partial sum method by obtaining the one's and ten's of the given augend and the addend.
The correct answer is: 83
Given That:
Find 34 + 49.
>>> By using partial sums:
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/generalfeedback/1624958/1/1239479/Picture5.png)
>>> So, 34 + 49 = 83
*** So, 34 + 49 = 83
Related Questions to study
Mathematics
Find the missing ones or tens digits.
17 + 45 = 6⎕
>>> 17 + 45 = 62.
Find the missing ones or tens digits.
17 + 45 = 6⎕
MathematicsGrade-2
>>> 17 + 45 = 62.
Mathematics
Find the missing number.
![](data:image/png;base64,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)
Since, the partial division of a number gives ones same as the digit in the one's place.
>>> 82 -> 80 + 2.
Find the missing number.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAO0AAADCCAYAAAClt0VsAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADahSURBVHhe7V0HfFTF1w29WLCLBayIveCnYPtL7yEIUgRFOoiACAoiICCgSC8qIEVAekIqIYX0npAeCCmk0AIhEEggpOd+c+bNLrvJQtru5u3mHT2/JW/mvX07M2funW5BChQoMCkoolWgwMSgiFaBAhODIloFCkwMZivaq9duUEBkCtm6R9Ehl3CydolQaBAibQ2Vvqpnl6euuBE8n23dIskvLJGuZOeIkmB+MDvRJqdn0tx1LtRl7A7qPG4X9Z16gKxmHBQ8pOaA7w6S5R2IsNv31A0H1JBVfU75eMbmnd7lbte0r9/ORxXxd58pe+mjkRvp42HLadbSXXQq+YwoGeYDsxLtYbco6vTlFho85whtd08nn8Q8CkktppCUEsFSDbK/T9+B6vgK5UuNfBQMZX/7JxSRXcAl+n17EHX5chW91m0a/WftKkqIecBsRGvjGk5vfLaeVh6Ip9PXibLKmIvMeKGAKPUmUVqewloRaaiirnCwKnEMyHTGxKtEwUlF5H48k6zdT9LEn7fRE28NoV377ERJMX2YhWhPJZ+jN61+p6X/RnHBZhQRsf85mG6pkBF/KzRvFjPmsgw/kVlG7hHZtN8tnnbZBtHnE5fSoy91paiYOBbD9GH6oi0roykLdlLfb7aT38lbFHuJ6AaUKoCMvMWYr9DsyZwqYnU2JWUT+cUXkK1POu2wC6Pf/rShF94dSF+MnsqKSymLYdowedFmXLxCHSzn0cpdAeQTm0vRF8oI/YbIxGslzDW+wVwmlolJ1+oxNX8//q2iZhwz4akrRJFniXxZBe4QcJ52OUbRhp2uNOrbX+nJdp0oOTmZlxtThsmLNvD4SXp/4HzaahNGLmGZFJ5eRim5xBl+tpR84/PJ9wTjSfGp+W98alIVritMBvQR1BUGqsI146j+Xf665rXy102dsLKeMbnk4H+OdjtF03om2kk/rKAHnn6H9h+wFiXHdGHyonX2CKXOQ+fT9sOh5BhwjgnuFoWllVHo6VLyjstjvKmwntHnRB5v09r5ptNOhwhatdWJpv+8mlvalWs2ipJjujB50Tq5BVHXYfNom00w2fudIY/I6xSQUET+pwp55imsn3QLv0KHvVNYm/Y4rdhsT9PnrqQ2L3Wi31esFSXHdGH6onUP1hZtVA4FMtEGJCiirc/UJdqn23Wk5SvXiZJjujAL0XZRRKuwHHWK9iVFtLKAIlqFulhBtD+tYqLtpIhWDlBEq1AXdYq2vSJaWUCzTWuniFahoCJaGaOuRIvBe794jAnmS2PB7G9d8XQRcaXxxOrfKw/ifWvzzrW9v3JWFK3SppUNjC3agMQiCksjCk0lCkwqpsDEYgpKKuF/H08n8sf3irHCCveyMNwLBiWXat2La36nCnTeJxeiolG9v4qodHTFrcC4PP57kUaqe4NPlxHG0nXGryUV0coYmm1aQ4s2jIkLg/ZLNxykUZN/olfefI/av9aB3n7vfzR22i+0eO1ePhMnJIW0hAtLikLqEZ1Da7Y70zc//k7/627F733n/U9p0syltHb7UfJnooWYVRME5EQIDL8LAvh+/jr6fsE6mr1kE7kev1xpZQOxR5xleRV0nuYs3Uwz2P3gun9dmZCLdN5TW2qL1kGjI2q9KDmmCzMTbbrBRAvRbfzPg15+/V2ysLC4Izt+0pMOeSSyQs6Ey+6DYGF9f2WCfuOdD3TeAzZo0IC69x1KziEXmXBLKnx/XRGCjDhHZM/SdsioaRXee59rHBe0rnvB4OQynnartzmxSuodrXs/6NyXItmzdd1XW+q2tIpoZQEt99jXMKINTS2jfw4F0oMPP6ZV6O69rxXd3+ohLjjN67Ce7hFXuSuNezcf8KVGjRtrxbkTu/QezCwua+/WwlVGRcHby7VoK8PaY2YZmgC/rttHbZ55scK7NmzUiPa7nbyjaOH2OwSco6FfT6+QRmDnXoO4BdZ1b22puMcyhqFFi8nnEB8KmKqwNWnalKb8uJxsfVO5BcKE9KfLFeplGw/x9lv0BaJpc1eprz/W+mnqwp7VZ+BX9EL7N7TuAVG41zK3MZRZJ13vczdCaBA73Fi0lQMZaypcPMcrNpcGjZhc4R1VREV0J9HCW8CyuGeeb6/zXlARbc2giLYSovDbeJ3mVlVV2CC48DNEoUwcEEZcJtEfm+y0CuS3s/+QOlyYtVm/y43aPNuOJsxYzIWOe0J4+/gKDRw+Ues+cNLMJfze6vawon2IRRPDx35PfQd9TZNnLSNP1o6uidXG71u7w0X9Tg889CgNGz2d/Y6X1NfuJlq4vZ90s1THffPdj8iK/VZNi6uItmZQRFsJ0TG092gss67N1IVt/PRFvJ2nEhXcQKwmUYWD385ezoWHThj3yGxy8D/L4wWz58F6o9cVBXsXu69Fy3u17v1q0mwet7pWEpb9n4MB6ue0fa49X64YkFisM/7diGdt2HWMHn60NVkOGcfFCevf7pW31M+/m2gh+t5WX9JTbV+gHxf/RcEphbRup5v6XlARbc2giLYSwtLa+qSytuuD6sL2Yvs3yY21WVWijLlINPe3rVoFcvW2I8JawsXO588pL0JUCHa+afT4k2217v12jmSlNeNWhbgH6aB6Dnqn0btbE9Hidx1jlc0B91O8Iw0i9GTu8gsvva5+/t1Ei9+MjkF7/zO8AohizYTf/rJR3wsqoq0ZFNFWQhS+4NMl1H/IWK0C19PyC3IIOEuxTLAbdnvQw489oQ5DLzAKemVuKUT253+eWs8FF6/eQ8eZSHTdczfqU7Qg/+3JZfwTSx09Y3KqLFoMeWFcFk0B/A3hKqLVDxTRVoHoVEEBaPfybdcQfPbFV2nIqG/pvvsfUF97s8OHZOOZrLsglyPc48mzlmo988k2z/N2KXptdd2jSVhuCJKLgzHqPHPT7cPVz8LwlEf0de5qq+Igfk06p6ot2nJURKs/KKKtAr0ZUfDhJnftM4SaarRvNdlv8Gg+QQIWr7IJEhgKOshcz/Ku8TRWuOCK6rpHm7f4d2Bc90jwBcYMJqrrvB2qehYqmcNeyeQansXDEQ/xMTupup1cimjlAzMU7XW9ixauHsQYnUG0eusReuTxp7QKn4ropMHMJgj8bq4x3g1xelmN0Lq/4ye9mBBzq/TuISlltG6nK7V97iXeMw22fb69ViXQtFlzevqZF7TjsH/DJcf9up57JyqilQ8U0VaBaJ+iYI6b/gs1adJUXegg0ueYi6xZEJs2bc6HexAfbcEKz2KFH5Z03LRftO6D2DCTCkNEd5q7rEmIYO7v/2g9o6r8efk2fr+u596JimjlA0W0lRBDMximKS8yjIO6HM8kT9ZmnPj9Yj4zSjN8yfr9FXqAIWIIdvrc1VpxW7S8h1ZscaiiWywRlvLvfd58sgba1JytHqSW99ynfm6jRo34+LI6nBHxNx3wUyytCUMRbSUMYW3Pv/Z6k4XGpIA+n33FCn0pK6xSBw82SF+8Zo9WgYQV9o67wd1qPEc1Ljtr4UateI2bNOHzkiPPV3dcFsv7bvE2qlPgeU6PqKu0XmMs9MWX3yRrzyQ6GpapjoP40vcobVpThSLau5EVbli/zzSm8rVseS//Lk2riGmOcKHf/aCrOt4jjz3J3V2MxUIkGMJZ+Y8jtWhxjzoOBDt32RYeVuUlbhrEc3mvcJI0ZRFjoTsdtHuP4QlgUoQqDuJXr3KQqIhWPlBEexeicMPF7d5/uLqgYdEApjWiI0kVDzOcUCh7WH6hjvfwo0/QwWOnuGsdzsJgAe9/4LYL3ax5C5q3fDufmwwxQRQQPif7d02Epe9xWhAuPX4fxA7Pobxo8Rt5xxtmeZV7Z/wt3S8tzfv9b1v1vSAWR2CYShWnutb/biwvWvTKP/XS+4po5QBN0doayNJaDZugLmgNGjSkqXNWUNxlnGAgLeaGe7zP5QSzrrcnWDzf7jU6FnWNwtLLaI9zDLV+6ll1WMOGjeiHRX9Kbd64PGbBcrXoFXujRvOFuWitg9TfU1vRQnTckjNiEQLe6UWNRQ4QrY1XMk8HxMGqIM37EV9l4WMyiLfbVfeCXft8TnEs7VRxJOFqv0NNqVu0iqWVBW6LNuS2pWXuqr7atOjNxQ71moUN47RY/bJ8kx2t+9eNz63VnJMLjpu2kFtfuL5fjJupFdaoUWN678PunB06dqYOnbqo+Q77+/8+7EYbdx9j312q853uxPKW9uln2tV47jEsvuvxLBo+ZgYXV/d+w/jnvfffnkiCyf8fdu7LPIzhLGwwzfxlA78PUyCDk0voz/88+Lh2t75DqNeAEfTW/32svhd8/Ik21NtqJI+D5//LBIbpnrrep7pURCtjaLvHaXoXLdw+FETLoeO0CpyKsJrlr33UpT+5R17h1gMWympYxZU8lRHWHK6jrne6E/Gb0ek0bPR39HFXS97jjfnC+A264t+NaItjMglW9+h6P1384NO+PK1gYVFhzZi/Vme8O/HX9fv5fbrep7pURCtjGFq0ICyVF3NbJ3y3mJ5s85zOAgc+8fSz3DJh6mDwaVjJW7y9V364qCpcsv5AtTtpMEMKvdX4TriqqDBq0jYGMY0S28O0fuoZne+ni5iPHZRczN1cWP25y6o3jrx6u3ON1hHroiJaGcPJPYS6DC0nWn21adHGApkYIAJYATu/NL5HFNqksxZu4IR7jGu2Pim8sELkqg3LYHUwzLJ2x1Fas825SoRrjPZwTXqUQakDqGLHUHXI72W/e8tBf53vqIs4xNk/QbLq+N0YYtIVTxexX5RbxBW9tWsV0coYsLQGES0rdBLZc9DBImYpwW1EOxXi1CQErRre0XwOt37sXdChVVXiWbzwiu+sS8Jq63pHXcTvV825ru7vRppyN15Pv7m8aJUhHxnBUbjH2w+jIwqi1cOCAdzLhOgzbib5jPxG+rsGnTlmR1RIvFKquQVX0Q9Nh3hWAcZXb2ZWVVletN/NXUVt2iun5skCLl5h9MmgH+nvfT5k7ZFMR0Mvs1r+Bj+nVldmVkpYVnSGfP8r+bB2Fufg0eQTeVUSr657qkm8myZ1xZEl4XFgIgXSB5VaDd3vgJOFFMi4OSKOfg3xIb+T+XpPB5ewy3TII4m2WgfRb3/a0KSZy+jxZzvQmvWbRMkxXZi8aMNjEqlDryn063pr2u0URTasdj0SfJHVtFf5PsNw06pMVni8UCBZrawWLNisOXnbhpJ3conu+6rJgLgCCjlRwhl0okhnHFmRicAbnsaq3eQzfCL5LFhHPnu8yDv2hhRWPv5diN+7hYm107GF1Nx+IDV3HEYHotL1mg7Ym9re9wztORJDG3cdowUrdtKgL6fTPY+9QrYOzqLkmC5MXrRZ2dfpf4Nm0cQf19GmvV58r6aDxxKZq5xOTkEZ5MwEDBHjszxxXSKLF5pJR5jlcP9pBfk0bMjF6svo3aIluazZQ0dYW/kIX7taO3qGZNM8Hxfq7b6CRnlup1983ck1OLPc++D98O4SNa/XCZE2TAgePT/jaQJ6vt1RCmMWrUL8uxC/f7mvH1nY9RHsSVO8DpJPCEtfHfGrTZbn2CHzkPsp2sGaTMv/Pkwz5q2mT3sPo2de+YjOnr8gSo7pwuRFC/y28RB16jed16jr/nXhexT/x2rZQ0y8tt6nGVPIzqci0dtrh3DfVDp8nBW+n1eTd+MmasH6Nm9Ozov/JFvmGiMOf5a4r2rUjo/vdPO5QF2dl5HF4Y8Zu9DrR34gZ58zZK8Zn30P3ktFre9lv0UirqkowgxE9Jjj0+P1d9WidRs0imxDMqR0KRcf1JXWoIN3KvutqfTakVlq4b7iNJP9ThbGruNTixrPUPNu4Ty9kmi/Swz99d8x+nnZFr47ZaunO9CUmYtEiTFtmIVoL2RepQHjfqMh4xfR4pU7aOmGA3wIYZt1IO1zjqQDrjG6yTL2gFss7fVj4liwhnyaNlUXSj/2b4cfltD+wHQe54BLdMV7VdS8fhceco0la5dYet/xZ1ZYe/EC29lpMdm5xtNBFqbrngrU/F7N7y5/XZ88doIO2gWT56OtpbRhdJo8m6VNGgtn6aLrngpEPIlOrok01nkbWdgz0dpbUmP7QbTE+Qg5uJwScbTjV4cHWVocdImibQe9aCErC5NmLKBXO/aj597qTSlpZ0WJMW2YhWiBkKjTNHjyGhr5zVKaOW8VzWEWcuGKHbT8zwO0arMNrdxkXZHs+rKdzrRt2nzybt5CXSD9GzSgHcPH0R+7XWnllsMa9+A5mtR4VhW4mt2zfPNBeuHQJLJw6MfYn7rtmU8b/rKjVTriV4t/V4PVvHf5NgfauGAteTZrwdMH3DbxB1q+8+gdn7FCg9K1Q5wrGNf+ZUs/b9lJ99gOY2lgSRaOfanznp9pI0uH2/dK8e9Gze/g3HSIp+PyjXvpp8Xraey3P9H/dR5Cbd7sR0ePBYqSYvowG9ECESfP03fLrGnwpBU0cvIiGvPtLzRu6gIaP00Hpy+gr2cvpwVDxpI7s6r+ojDCNV7xUTcaM2c5jftuoe57a8iJU3+hUd/Po4f2DicLpwGcnVZMpm+m6Pd79M2vZy2lhVYjyIdVZkgnj8aNac6w8TR65hKd8XVxnCD+PYFxytRF9Pymr1ka9GeiHUD37xtKY2ayNGJ5Vv7eKpPl6bip8+iLsTOpx2cTqX2nIfSx5VTy8IsQJcQ8YFaiBa7fKCRbz0T6aY0zjZ7zL30+ZT1ZTVhFAyeuvs1Ja8hq5laaOvg7cmnanAKFWL0Yl3UcQP2nbyKryWtZ3HL31ZKDx6+lPtOWU/NDQ3lBtThiSf+38CcaOm6DOo7VXaj5LP0Rv/Hu7P3dZlr4yWAKYumDtHJq2YpGfL2EBrC0/WzS6ko5EBTfx69NXk3Dxq2nTvPnM/eYpYOjFbO4A+jDRfPY9Y2379N6z6rRasJK6vP1Mhr67RrauMuFLl/NFSXDfGB2olWhqITo7KWbFHc6i6ISLlG0iomZFHP2BvnvcyG3hx7nlsObEYKNnzOXIll4VHIWi4e4+mVswmU6euIkNbEfwtqzzMLY9qF/In0oLqEG36f5m6rKGt4bmZJNQeO/5ekEBrz6OnvORYpOunz7mdVkbOJlCks8Ry+6TSGLw6xta9uLengso/jEqyw8UwfZfTreTZPI5xgWN+XcNSoqLhMlwfxgtqK9K9JOU8xrL/M2LAqhB+PpWbNEoGERcyuVWZeBrKD2o0YOgyguL12EyBvJI0fwdPJkPDV0iLhae8yL30sW1j2YaPvRo25fUWZZtghRcCfUO9Hmp6ZSaPv2vADCJT7GmPTNNyLU8HC6eJxZWeYSHu5LDx8dRYk35T9uWFZQQBHvvccFC6bOnStCao+o62nUzHGw5HlY96Q1px1FiII7oV6JtiA9nY6//baWYBPGjKGyEuZLGwnb0z24VbGw6U3Pu0+mi/nytyxFV65Q4KOP8iYE0i5j2zYRUnuUUhl1DfyFCxb8yH8uFZeVilAFulBvRFt48SJFdOqkFiw+Tw4dSqXMihgTvycd5oK1sOlFHXxmUl6Jcb+/JrgZE0O+TZpw0YLZHh4iRD/YlOYqpYmtJWvvD6SQ7EQRokAX6oVoYSmi/vc/LcHGWVpSaV6eiGE8zIzbIaxKD+oSsEBclTeyDh9Wd9YFtGpFN+PiRIh+AG/jcZfRvMmAdJl5YocIUaALZi/a4uxsiunZU0uwMb168et1gRHha8jiUDfG7jQ47A9xVd44u3Kluj0b2q4dFV29KkL0hzGRG5lgu3OL+8KxyZRTbPwK1VRg1qItuXmTTgwcqCXYyI8/pqLLl0UM46NP8K9S4WTWdlK0aSwTS/r2W97+R/pFffKJuKpfHL0UQRZ2ltxFhnAPng8QIQrKw2xFW1ZUxNusmoINf+893ratKxSUFlEnv9msUDL3mBXMRQkHRIiMUVZGcf368fSDpY3/8ksRoF/cKimk1zynS2O2rEL7LHS5CFFQHuYp2tJS3iuMgqYahz3+1luUn163Y6JZhbn0sudUqdOFtd/+TD0qQuSLktxcnnYq9zh98WIRon8sTNgveSG2/eh+5xF0+mbdVbByhlmKNnnqVC3Bhr78MuUnJ4vQukPKzUv0qMvXUoeLbX86nBEsQuSL/DNnKODBB3knFESbuX+/CNE/onPSqIXjEGlIzLoHrTptL0IUaMLsRJvy449cqHCJUciC27ShvPh4EVq3iM1JpyYOn3PBov0WcPWUCJEvcoKDeeWnIv42JHoGLWaeSC9ONCVKlDHbCjAr0aYtXMiFisKFz6Ann6Tc48dFaN3D78pJycra9adGDp9RfO45ESJfZO7dqx6fDXzoIcpPSREhhsG/Z70k0dpaUiP7gRRoAhWbsWE2oj27YoWWYAMefZSu+/uLUHnAJiNI6mhhwsW45LlbV0SIfJG+aBFPTzCctW2Lc3JEiGGQkZ9NT7iOkdKJtW+nxW4VIQpUMAvRnlu3jlsClWD9WrWia3qetaMP/J3mwgojOqH6UHuPb+lqofyXjZ0aOZI3N8DY3r15b7KhMRZjtjY9eOXW1n0CXTGBdDImTF60GVu2kHejRmoXzve+++jKkSMiVF6YH79PtNd60kd+c/kQkKzBBBr16adq0SZNmiQCDItjl6PV7X5UcPvO+4kQBYBJizbzv//Iu2FDtWB9WrSgywcPilD54ZvozZJorXuQZcgycVW+KMrKorCXXlK7x5gZZQxgPvbb3jPVaTUg5DcRogAwWdFCnNiITSVY78aN6dLu3SJUnkDh4xMrDnWj0ZEbxFX5Iu/kSQpgngtPX0bMQTYWliQeYoJlaWXbj1odGU5JNzNEiAKTFO1V5v76tmypFqxXgwaUsXmzCJUv4BLzgshE+8OJneKqfHHN21stWF/WBNH3QoG7IeHGeWruOJT3IsPa/pFkK0IUmJxor3l6kn+rVtxdQ2FCoTq/Vv7ns+SXFNGbXjNEm7YX/ZEs/0KYsXUrT2ekcdDjjxt1znYZ+69f8FIuWMwge8d7lvz7AIwEkxLtdT8/PpSjEiw+zyyTf9sQuJCfTc+6T+QFEC7fv2c8RYh8kTpnDk9jMKJjRyrNzxchxgHSiPe22/anxvZW5JkVK0LqN0xGtDfCwymoTRstwabNmydC5Y9TzN17+OhXUiG0G0hOl+Qz6eNOODl4ME9n9ByfHDZMXDUesgpyqLXrWF7JYcz2mxj5N4GMAZMQLdpSwc89xwuQanri6RkzRKhpICg7gZpgL6TDfdnn53T8Wt3Phb4bykpLKbxDB57WWJaX8sMPIsS4mBKzhQsW6faU2zhlzJZB9qLNS0yk0Fde4bU9LCw+EydPNsogvz7hkhnJCx6sRkunYZSWlylC5InCS5co5JlnuGjBC3//LUKMCy/mEjeys+IuMsZsd5/1FiH1F7IWLZbSaW7Ehk8suSstLBQxTAd7zvkKi9GPnnAZQ9eKbooQeSKXNUf8RQ89ThG86uIiQoyLorIS6uAzS+oLUMZsOWQrWixWD3/3XS3B8o3YTFCwALYG5T2hzFq84fWd7Dd0u2JvLw2nMUK8eafqbuI+hnt4hWfXn+45MpxO3ZD/QgtDQpaixUycqI8/5m0pCBafcVZWVHrrlohheph9YhezFtKOFV0C5st+ydn5jRt5RQnRBj/9NN+6p64Qz0R6HxOrap3tr4nynfVmDMhOtCU5ORU3YuvTh4qvXxcxTBN84zI+La8nDTu+SlyVL5KnT+dpj/YsdrJEx1Rdon/IMlHp9aK3fWby7WnqK2QlWowDxvbrp2Vh+UZsBtj9z9joG7xEiLY7n4Msd8T17csFC+Ge+vprcbXugI3eLGz6SIsIGD2zYkRI/YNsRIu2KsYCUUjQSwzBRrz/fp1uxKZPvO39PSt0vcniUFf6NUHe7l1ZcTGFvfwyd42RD+lLloiQukNWYY40OYWvs+1B46P/EiH1D7IQLXZOTBg9WsslPv7GG5SfliZimDYw/Q57+ap6QP9MdRYh8kTB2bMU+PDDXLSwtnJZiDE1ditPPwj3abdxdKngmgipX6h70ZaVUeKkSWrBopBgQ+y67K3UN87eyqLWfAd9ZiVs+9GB8/LaUaM8MF1UdQyIb+PGfOGAHOB/JZ4a4sRBuMisqWEKU0ENgToX7envv1e7xPgMfuYZuhlrXnNMsaFbK+cRXLQ43tLjsrzbY5f27FFbWRy8dSs1VYTULQpLi+l939nM2kqLLnoELuILC+ob6lS0afPn84Khmksc9NRTlBsSIkLNB15ZcdTYAVMY+9C9R4ZT5HXDbo5WW6ANi7Ys8gSL4OU0Ni6N2UrrbO9xGsorxPqGOhMtCoamYP1ZGwpumTnC+kKQNMbIRPuoyyg6w9xlOSNh/Hju9SBfYnr0EFflgdS8S3TfkS+kaY2Husu+U88QqBPRYv0r3C8IFp98IzZP822fbEl3Y9YBUxj7UFu3CbIeY8R4bEy3blywIM7xkRs+D1shdUjZ9KHXvabXu3W2Rhct34hNiJULFhuxOTmJUPME3zoFJ+Ux0WLoR87A5JaQZ5/leQNre271ahEiHxy8EMDTEta2AaPLpUgRUj9gVNFi6AB7OalEiz2esqytRaj5YlrsNsnS2vSmXkGLxFV5AsNsfi1a8DyCaK84OIgQ+QCLLZ51nyQJl++3tVGE1A8YTbRZNjbk07y52sJ6N2hAmXv2iFDzxvDjq5lgMQWvJ42KWCeuyhM45d2H5Q33gpo1k9UJDZqYEbddqght+/HzkS7m158xW6OIFvsQl9+Ira7WZxobpWVl1C1wIbeyaIfNjPtXhMgTaL6o8gkLBTDRQo4Izk6gZg6fSR1SLG23pLuLEPOHwUWb7e5OfuLUNZVbfG7NGhFq/kAnCd/QDa4cswwrku1EiDyR+tNPfLgHrnHEu+9SaZE8O3mKS0voQ3/sbintjdyDNTvqy2FdBhUt34jtsce0hnbO/Fa/FjHnFN8SZ9P05UMUu2S+80L8sGFq0Z4YMEBclSfWpTgxwWLM1pKaOg6m2BzzmPZaGQwm2tywMAps3VpLsKkmtBGbvpCelymNK0K0jA4Xw0SI/FBaUECRH37I8wrEbDU5I5Wl7UPOI3m7FuKdF18/+kgMItob0dF8OiIyXrUAQO4FwFAIu5ZEzRw/5+4xNnST85m0qn2h0IRB3l3YtEmEyBefH1/Jmx1o1+KU/Zwi090ooarQu2hvJSRQqDj/RTVskDRlCqvG6+fhwEczI6gBJrkz0T7g/CXFyXja3c0TJ/gCAVXfw7Vjx0SIfGGTEcwsLc78xWFdfcn5UrgIMV/oVbToaQx79VUuVJVgT40axZfe1VfwDbfhvjFL8Iz7BH7+qlyB41ZUHYZ+zZvL5gT9uyG3+Ba185jCK0W4yF/KfEhNH9CbaAsvXKDw999XCxadGScGD67XggVWn3ZggpVWpbzqOY1ulcp3CuN5cc4vvCQsjzTmMSC1weyTu3gnHyztYy5f0zmZz+2uLfQiWmzEFvnJJ1oWNs7Skkrz8kSM+gu+oRumMNr0pA/85oir8gSaMRAs8o/vC1VcLELkjbBrydQEq6j4mG1PPtfbnFFr0fKN2Hr04JZVtYgdf5fkKjvBA+Oj/hKi7UVWofIe7ort04cLFnkZP2KEuCp/YE3tx/4/qz2aLgELzHqVba1ECwsbN2AAz2gIFjOdojp3NvmdE/WJgaG/88F/FKaJ0fKdBYbhnvB33uF5CaYtXChCTAMbU51ZGrN0ZtYWVhfW11xhcWHzZoodOJC3P6vMzz/nm7Adf+stblkhWM5GjSi6WzeK//JL3fcZiHGDBvFJAXKbcoedFj7CrB1hAeaf2idC5If8lBR+nCXatODFnfI/P1cTWKP86NFRUk+ydXeac1LeB4zXBhbo3XVjmQTxVYeojZG5asEKqjoyjEm8C9rSN2S2Tc314jx6zXOa1LNp05tbA2MgceJECn75Zb6jYlWJ5XhYKKDKx+A2bXTGMxZDGcPfeIMPQ1UV6DnmCzNYeqNH+UaxcY/mNBYskMEo+MgoFPzygpA7Ve/t17RptTLYGMDwDlagqIZ8Dl8IEiGGRXSXLtWuiMtXwHVR+WpSVRHnhFV9BhmOD22AtMbp8exTzrPPagO1aJFAqG0Txo7lh1xhS9O7ksWL/+ILft4OOi34fbriGYrjxtEJ5tbLWbTJNzKkvaHQq8lqf++sOBFiWKg6lFTiQ8eSqVD13qo8xUFgVUUus6yYFYUKEv0II8PXihDzglq0INqF1UVdjsPmJSTwzEXBlKNog64mkIW9FRNsP2rq+DlFXzfOroYq0SJdIjt2pDNLl5oMEydMIN+GDdV5Wh3RAmjLSh1S/ehh1sY9m29+Y7ZaosWpdKYEiFTOorXLCFFPr8OGbqdvGue0BJVokaenZ80SV00DOEDct1GjGos24noKNXUYJHk3Nr1ofcoREWI+0BbtkCHismkA+yPLWbR8QzfRnm3n8Q1lFhpnKExTtHzetwnhur9/rURbXFbCx2n5kj3rXvSR31x+zZygiNaAWJJoLbWvbHrS+74/8iEgY6A+ixbYjMryMEt3Zm0b2w+kkOxEEWIeUERrQEyN/UeaWMHYLfAXcdXwqO+izSjQ6LVnaf/DCdMac64MimgNiKFY64kpjIe6883djIX6LlpgdOQGJlhpr+kXWdMEO4iYCxTRGhC9ghYLS9uTpsVuFVcND0W0REcuhfM9kXmHlG1fOpwRLEJMH4poDYSbJQX0rs8PvAcT7dqliYdEiOGhiJb4KQ58zJavs+3BTyUwFyiiNRAyC65Li7PREXW4L/1jxC0+FdFKWJiwX3KRWdu2lfNIvqeUOaBuRVtWuwVUchZt8s0MPrgPwcJFs88w3mmAimglxOSkU0unIaJDqiffkMAcUGvRYjOwM8uXU/xXX/HCgqmFidOmUU5goIihDVX8E+y7Ynr1opOjRtHFf/+lspLqj6XJWbQ4zrKhvdhM224AhWYniRDDQxHtbXTnG8VLq6w+9PvJLMZsayXaW8nJFPrii+TO7sUEdcwdxb9dGXES3lUXFxFTQn5qKoV36KAVH58oYFhiV92dLuQsWswz5u0pJlrswpjELK+xoC/Rlt66RRn//EPJP/9Ml21sxNWKKMrMpAt//cVP2MMc9NSFCyknuGYdP/oW7Y4zHpJobS2pkf1ACjaDMdtaiRb3QnQBjzxCl62t+bkvWQ4OFPr881yY2GcIGc/BXGEUJh7/gQf4sSDZbm4Uy6wtChgEfP7PP6W4VYScRbvvvJ8kWuYet3YdTRfyr4oQw0Mfos0JCaHwjh35c1wY45gHpQt5LM2xrlpVWSN/QZ+WLensypUiVtWhb9FipdUTLtgsXuqQmh67TYSYLmos2pIbN/jR/sgs1K6aSF+6lF8PuP9+7g4DyAxvlgkQZ+r8+fwagN0vQoTIY1hhqw7kLNoNKUekTijGV72mUXbRDRFieNRGtNgXKm3BAvJq0oTniS/7xLPiR44UMW4Du11EMM8JIsUC+rMrVnCLG9y2Lc9n5M31OzST7gR9ixYYgzFbLCJgwsVpe8bMC0OgxqKFBVW5xjiEWBMqCxz+9ttUmi8tRD6/cSOPi2MUb0Rqnyd64rPPeFjICy9QYTV2AJSzaOfG/ye5ZdY96X/+86jISFMYgdqItuD8eX5f6Cuv0MVt2yjivfd4XuoSbeb+/fx7wIzNm8VV4geE+957L8/TlNmzxdWqwRCi9bwcy91j1eKNA+cDRIhpolbu8Zk//uA1KhIYz7mVkkIZLKO9We3s1bgxd5lVwJEgiBv48MNUcOaMuCrh1JdfqmvmG1FR4mrlkLNox0ZtFKLtQVYhxt3QrTaiLbpyhedhcU4O/zvigw/uKNrkadO4S4zT9QozbrfZYa2Pv/66VKGz5k91Nqo3hGgxZovDvKUOqR583y5TRq1EixPVUufO5cdYopAEPPQQF5EfE+YVR0cRSwIyGMIMat2au8SagHutEu01Pz9xtXLIWbT9gpeyAtKTLA51pXGR1Wur1xb6aNMCpYWFFMHatXcSLdZfI+z4m2+qPSoVIt5/X6qkH3mkWhv9GUK0wKKEA7wCxfDPA84jjNoxqG/USrRAwYULvE2KDELNyjOKtW8uHzggYkiI7tr1tmhZba4J7JShFq131U+Vk7NoO/nNEaLtxjfTNiaMJVrsbY0wCLT8mHvkRx/xPPW/7z4qOHdOXK0chhLtydyz1MxxiOQis3xZZcJjtrUSbW5EBIW89BLPHGQg2q1RLLNQYMC0X26vbEn+7jtJtEzQ5XeuV1laZFROaKi4WjnkKtqbJfn8NAHJHetNq5LtRYhxYAzRoiMSfRrINy7acsDpe1y0rG17K7XqO3YYSrTYG7lP8BLJ2rI8ed93NhWZ6JhtjUWLsTkctIUM5acJFBTw69i8HBMskGE+DRuqj/9XHVYcyFzo/DTtc0TRpoWVxlAQ2sVVhVxFe/ZWFrVxG88LB2r2Ped8RIhxYAzRlrF2akzPnjzfdIpWZWmZaAsvVn3HDkOJFth51ksa+rHFOlsr8smSj2dWHdRYtDhRDYJB4bjioO1qXHV25teRoemLFvFr59au5Zno16wZ5QRp70oY168fLxjI6OrsOSVX0Z7IPUMPOn/JCwhOzHO+FCFCjANjuccnBg3ieYxx2gptWnYf8htNp+pMmjGkaK8W5tKTbuOYaKW9kbHe2RRRY9Fmu7qqRXtxxw5xVcKl3bv5dRCTKIBsd3fyYpmBjISrrELeyZMUIMZ7k6ZOFVerBrmK1v9qPDXCPkWH+/J2FKY0GhPGEm3i+PE8LKRtW/V4PFAqeo/5fdU8XsSQogW+idnMBYu8aeM+gbKLbooQ00GNRYsd6QMefJCLEF3+GFi/wiwsBtexFStEyIcChGsEC4pDnZCRGKuFcM/8/jvveURcdFhUV3RyFS0sq+SG9aN7jwyn8/naHW+Ghr5EC8D7QZ6dGjNGXLkN5Dny35M1gzL37hVXmfD8/PiIAvL17KpV4mrVYGjRemTFUEO7AdxFRh79d85XhJgOatURhXHYwCee4JmjmsKGT/wd0q4dZXt4iJgScN7p8bff1ooPBrZuXcHFrgrkKlp+Jq2ozZ90HUs5xcY9PbA2okXlijH1OFYWMB8cw3hIX8xyQvmIZVT18Oenp/Nxd+Rn6HPP8Y7IC1u28BMCkK9BrGxUp+cYMLRosU/X2z4zpf4GjKGb4JhtrUQLYBHAuTVrKHnWLF5ATs+ZQxlbt97xbFOM0Z7H5PIZMyhp+nRubbHwoCaQq2j/SLZlBQLHU/Smd7y/p/xS4+4NXRvRFmZm8vucGY8yQpCwphAh/nZkTFu8WMSWZkVhcQjCERfEvwOefJKya3CSvKFFC/yWZMMFi1lS9xwZRgk3zosQ00CtRVuXkKtofzjxryRaVptjaVhpLdcNVxe1srQlJXR+wwZKYs0XNGHKM5Gx/FEdGCFImjaNH4QGC53CKu5biTVbTWMM0Z7KPUf3Og3nzReId4kRdxXRBxTRGgAjwtcwwUrzjkeyfxsb+mzTGhvGEC0wIPQ3UbH2og4+syi/RL4n9JeHIloDoGfQIkm0h7rTd3HGXwqmiLZy7D/vL7Vr7SypAaOPkc5Z0gcU0RoAb3rN4O1ZzDtemnh70YSxoIi2clwpzKG27hOkXn5mcSdFbxIh8oe2aE3sLB8swJabaPNKCuhZ94nqwrApzVWEGA+KaKuGb2K28DYt8qqt23i6zIRsCjBtSxsXJzvRpuddpsewuz0sLXO7bIx0Jq0mNEWbPH26uGoayA0LM5pofa6cYHlkJRYR9KLdRp5uWlOoRYszQf3vv5/CXn3VZBj6wguyO5824tppPqECtXcjx8HklWX80+k1RYt53flnzvChOdmTveflQ4dqddRldYAx246+s6X+B0ZsLm8K0BItCj/+bSpExspNtMcuR1NDh8+4aO878gXF5GgvjjAGVKLlFfE99/CZaUFPPil74j2x/lYzTw0pWmBlsp3kImP2mtMwPm9c7rDAae6YnYQBdFMlBvQh4hvR0eJn1R0OoFfycD8u2tYuY+hiwTURYjxgszykCwq+KVbEeGd8wk1WrRIzFHBmMCpXacy2u1FPgqgpLLAiJ63cadymRmwkd/b33+84C8uY+Cv1KB/qgWjRIVVg5NlQAJbMaYrWFMlF26CBwUULDAr9Q7K2Nr3pTe8ZRjuStKawEJ8K9ISFp/bz3SrQEYUzaesC13x8+EqrzH37TJaX9u6lywcPUnF2tvhVhgM2elOdZ4vFBGjiyBmKaPWMqTE4k5ZZWlZrY6cEBfLH1cIbfGtVeEfwksZH/SVC5AlFtHrG4LDlTLCYHteTxkZuFFcVyB3fx+1Qd0g95jK6TvoiqgpFtHpESVkpdQ6Yz60sCsDck7tFiAK5I+hqAjW1H8hdZLjK/6RXf4WSsaCIVo/A/rqv8jNRpe1MzOWUtvoAdD594PcTyzfmJbEKt2fQYipllbAcoYhWj7hWdJMewfGWYsnXXhPcFaE+Y81pR6lpw6xtC8fPKS5HnmO2imj1iJS8S3Sv0xeSpWUZf9TIG7opqB1Sbl6iVs4jRKXbkxYmaO/dLRcootUjAq+eosYOg3kvZFPHIWZxrGJ9w9DjK7mXhH6J172+o9xiceqjjKCIVo9wvBhGFnYDeUcG3ORTJraNiQKiwxkhkqW1608N2KccvSVFtHrENhxgjAxntfRz7hPpUr58hw0U6EYOs6wvHPuGe0uwuKMi1osQ+UARrR7xe9JhqSPDphe9wVwruU+HU6Abs7DHF5+K2peP2Rp7C9zKoIhWj5gZh8zuyoX7if/P4qoCUwP6Ippis3mM2Vr3pH/S3UWIPKCIVo8YjRPHMe+YiXZo2EpxVYEpQj1JhnlN3QIXiqvygCJaHcDMppslBXzrmOqwT9CvvGZGRk+I+ktnHGPyBqPioksoLiupcp7mlxbS2hSM2fbi1rap4+d8ZACTZ3TFNzYV0erA0cxIetXjW3rdcxpvm1aFr3tNp3uchontS6zocdYWwgZvuuIaiy8fm0TL6mBjOTnC4WJolfMU+faSxxRqYP+ZyE9Lnp9v1XF+qqiIVgf2nPNlFhMrdVhNi17EqhJnxGD+Koh9h3TFMSYPdpb9ihVjYVu6R/XyFKMAqrzkc5LZ37ri1QXFb1KgAb4nLh+rgwhZTYuMxoC7qRAVBqwEe+8pMVvEr6rf2HnG63aewnpWNU8xGqDrurHJyyLLU1Qg4jcp0IBatIzYimRe/F4++X9Fsp2suTLZnu959DJzA/lUSkW0aqhFy4izg00nT+1oDXtPvi0v3l8RrW6oRctckSdcxvCFAKYEy+BlrHaWXEFFtBLUoj3cm551m2hyeYohRG71FdHqhqZoW2Nw/dZVEWIakHqxmUuliFYNTdG2dZtgcnn6IZYNKqK9M8qL9twtec2IqQyKaCuivGhNLU8V0VYCRbTmB0W0Zg5FtOYHRbRmDkW05gdFtGYORbTmB0W0Zg5FtOYHRbRmDkOKFs9yz4yio5fCKeDqKSo2wI5/imgrQhGtmcNQosWMpVbYQ2rfR2Sxn9GmN3X2n0chet5LShFtRSiiNXMYSrQjwldTv8Bf+BS6GXHb6Vn3CUzAH1I7jymUWXBdxKo9FNFWhKFFm1WYS78mHKDhwUvotyQbcVV/UERbCQwlWuw/pAnPyzF0HyaBH+pKm9NcxdXaQxFtRRhStO6Xo6k9zgI62JUs9n5AHQ1w8Joi2kpgrI6osrIyestnJsvoTtzy6guKaCvCEKItpTKeb3yLIeuedN+RETzduzFvSt9QRFsJjCXai/nZ1NZ1DFkc+ESvR4gooq0IQ4j2Zkk+NXcaQp18ZpFbZhRZBi8li/0fK6KtCxhatBfzr1HAlZPUJWABt7L8xHg9breqiLYiDCFaHBjumRWr3tLHKvQ33sGoiLYOYEjRljKXuD+rkRswQeH53VhmYOhHn1BEWxGG7ogCLEOWKaKtKxhatNzCHvyUtqa5Ugn7W99QRFsRimjNHIZ2jy1DWNtnT0dyMdCRE4poK0IRrZnD0KKNzUknl4xQg+2eoIi2IhTRmjkMLVqcOr462Z4u5Btm9wRFtBWhiNbMYUjRZhXm8Gda7HmPvopYJ67qF4poK8IYoh0gRNtdEa3xYUjRXi/Oo1c8pvLpi1Nj/hFX9QtFtBVhDNGqhny6G+AYEUW0lcDQ7nHyzQzyyoymm8UF4op+oYi2Igwh2tKyUpocvYk6eE6lDt4zxSny/fm2u/i7w7HJtCXNTcSuHRTRVgJDi9bQUERbEYYQLSZVPOA8kix2d2Ce0wd8GI8fwHaws/T3ztdoUvTfInbtoIi2EiiiNT8Yyj3Goo+/U5zo7zSXijztSFHXU0XM2kERbSVQRGt+MEab1pBQRFsJFNGaHxTRmjkU0ZofFNGaORTRmh8U0Zo5yos2Iz9bhJgG+gYtUURbDuVFa2p5+pHfXEW0d0N50abnXaaSslKTYe+gxYpoy6G8aE0tTz/wm6OI9m5Qi9bOkho5DKJnWCY/f2yyybCl0zD1wcmKaCWoRcvytLHDYJPL0+aOQ6Q8VUSrG7dFK06CxwHNzOqaDPl7s8xVRKvGbdGaeJ4qotWNnWdZBu//mCwOdJY27TJV7u1EoyLWi19Vv7E5zc088hQUv0mBBtLyMuk/Jtz/znrTf+d8TJdnPCk0O0n8qvqNlJuXzCNPz/nQ/wNGsIeJB1mQNwAAAABJRU5ErkJggg==)
MathematicsGrade-2
Since, the partial division of a number gives ones same as the digit in the one's place.
>>> 82 -> 80 + 2.
Mathematics
Find the partial sums:
![](data:image/png;base64,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)
Tens = 30 + 20 = 50
Ones = 5 + 4 = 9
Find the partial sums:
![](data:image/png;base64,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)
MathematicsGrade-2
Tens = 30 + 20 = 50
Ones = 5 + 4 = 9
Mathematics
Find the partial sum of the given place value block.
![](data:image/png;base64,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)
>>> Tens: 10 + 20 = 30
>>> Ones: 5 + 6 = 11
Find the partial sum of the given place value block.
![](data:image/png;base64,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)
MathematicsGrade-2
>>> Tens: 10 + 20 = 30
>>> Ones: 5 + 6 = 11
Mathematics
Find the missing number.
![](data:image/png;base64,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)
24 - 4 = 20
Find the missing number.
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)
MathematicsGrade-2
24 - 4 = 20
Mathematics
Find the partial sum of the given place value block.
![](data:image/png;base64,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)
>>> Tens: 30 + 20 = 50
>>> Ones: 7 + 2 = 9
Find the partial sum of the given place value block.
![](data:image/png;base64,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)
MathematicsGrade-2
>>> Tens: 30 + 20 = 50
>>> Ones: 7 + 2 = 9
Mathematics
Write missing tens or ones digit. 42 + 3⎕ = 75
Write missing tens or ones digit. 42 + 3⎕ = 75
MathematicsGrade-2
Mathematics
Marla walks 23 blocks. The next two days she walks 17 and 12 blocks. How many blocks Marla walk in all?
Marla walks 23 blocks. The next two days she walks 17 and 12 blocks. How many blocks Marla walk in all?
MathematicsGrade-2
Mathematics
Write an equation for the sum given below:
![](data:image/png;base64,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)
Write an equation for the sum given below:
![](data:image/png;base64,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)
MathematicsGrade-2
Mathematics
When asked about favorite sport, 15 students like to play soccer and 19 students like to play tee-ball. How many students are there in all?
When asked about favorite sport, 15 students like to play soccer and 19 students like to play tee-ball. How many students are there in all?
MathematicsGrade-2
Mathematics
Ted has 18 crayons. Terry has 47 crayons. How many crayons does they have in all?
Ted has 18 crayons. Terry has 47 crayons. How many crayons does they have in all?
MathematicsGrade-2
Mathematics
Ben has 24 stamps. He buys 46 stamps more from a store. How many stamps does he have now?
Ben has 24 stamps. He buys 46 stamps more from a store. How many stamps does he have now?
MathematicsGrade-2
Mathematics
Wendy collects 32 rocks. His sister collects 29 rocks. How many rocks do they collect in all?
Wendy collects 32 rocks. His sister collects 29 rocks. How many rocks do they collect in all?
MathematicsGrade-2
Mathematics
Find 36 + 40
Find 36 + 40
MathematicsGrade-2
Mathematics
Use partial sums to find the sum of 47 and 29.
Use partial sums to find the sum of 47 and 29.
MathematicsGrade-2