Mathematics
Grade-1
Easy
Question
Which equation is shown in the hundred chart?
![](data:image/png;base64,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)
- 44 + 5 = 49
- 44 + 10 = 54
- 44 + 6 = 50
- 44 + 15= 59
The correct answer is: 44 + 15= 59
In the hundred chart the equation shows 44 +15= 59.
Related Questions to study
Mathematics
Use the part of the hundred chart and add 24 + 16 =___
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1tMV0hvGUDZW3bNuXexodJwx7SzfqbmZqLw32vWHy8Rn4w9uOIiPjk459Y55akaeGDOTPZw1CvF6603GjaWsi2s3YhsXLZQvofjP247EI4uwtvfdbqzUzNxVjhjo1KGqzSBTD5ytZwUdm1SzeKj16pNlus2uMWsjWxrTbA485bE+nrORgRnqXXaAOnBhetB7g5UrColofawKnBRdOgSqdNsXJbtm+uOG06GzwzXX31sk0f7ELbONmgwsK12tnXLxzau+ZtanbZbp5mQlVWusxnqc31dvf2xNb2tuJO3xEPBniy97baddiG+fn5+bIDGzbUvYve+O2JsoIuVPrzntt1qOrIz+kLJ5r+Q6+7o7eu+tZa2+xuRTVHTh5o+l0n86ptROV+2wr9NZNnbRdqtTtvedV2ZmquOKBT6futIO9+O3BqMIaHRotf7923p2Uu0vKubXbR24qDkXnWttJrW63OedX35khh0TP0WuHaq1S9tV0qE0TEouuAha9vpfp2d/RGFtkaEt6oXb0dm9qpbX7UNj9qmx+1zY/a5kdt86W++VHb/JSGN9MmAQAAEiC8AQAAJEB4AwAASIDwBgAAkADhDQAAIAHCGwAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRAeAMAAEiA8AYAAJAA4Q0AACABwhsAAEAChDcAAIAECG8AAAAJEN4AAAASILwBAAAkQHgDAABIgPAGAACQAOENAAAgAcIbAABAAoQ3AACABAhvAAAACRDeAAAAEiC8AQAAJEB4AwAASIDwBgAAkADhDQAAIAHCGwAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRAeAMAAEiA8AYAAJAA4Q0AACABwhsAAEAChDcAAIAECG8AAAAJEN4AAAASILwBAAAkQHgDAABIgPAGAACQAOENAAAgAcIbAABAAoQ3AACABAhvAAAACRDeAAAAEiC8AQAAJEB4AwAASIDwBgAAkADhDQAAIAHCGwAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRAeAMAAEiA8AYAAJAA4Q0AACABwhsAAEAChDcAAIAECG8AAAAJEN4AAAASILwBAAAkQHgDAABIgPAGAACQgA3z8/PzZQc2bIgFh2gg9c2P2uZHbfOjtvlR2/yobX7UNl/qmx+1zU9pbSuGNwAAAB4OWWR7pNI3b90dWdPGtJLujl71zYna5kdt86O2+VHb/KhtftQ2X+qbH7XNT3dHb/Hv1rwBAAAkQHgDAABIgPAGAACQAOENAAAgAcIbAABAAoQ3AACABFR8VMBKHNvfH2OFO2XHltou9OZIIfqPnouuns746jdON6oZTanW2mY1LXX6wonY3duTa/tSprb5qfecEBFx7dKNuHj2akREXC9ciS3bN+fWvpTVWtvSrYVLHTl5IF586dlc2pa6evvtwKnBGB4aLTum71ZWS20r1bPU3n174viZw7m0L2X19NuFr93a3hbffPdyru1LXT31fW7XoZienC1+7Xy7tHpqu/D80KoZoiHhbeDUYGzZvrms2N0dvRWf9zAzNRd9PQcb8WtbQq21Hb89Ef1Hz5UdGzg1WAwcQsZiapufes4JpbLgRnW11nZmai4iXOzWo95+293RG1vb2zzXqAa11vb4mcMV+2s2gPZHXX+4Ju1NST399rldhyIiFr32uV2HBLgq6qnvwnNC6cCvALdYPbXNQl52PMsTx/b3t1yAa8i0yUon29MXTkTEg45b6uU/f7XYsbe2tzXi1ze1Wmu786kdizp69r7R6+/k3Mo0raa2LxzaGxFqW00954TMwKnB2NreFkdOHsi9fSlbSW2pTT21HTg1GBHhgrdGq+23lweGYmt7m8GyCmqt7fjtiZienI1Dx/eVvfbIyQMxPTkb47cn8m5qkmqt77VLNyIi4vzfvFY8tru3J7p6Og1MVlGpttk1wMK+O1a4U6x7RMSW7Zvj9IUTMVa403J9N7c1b5s2fzIiIt6f/nnZ8W++e9mH3SpVq20lW9vb4l7J7XuWVmttTYmq31K1nZmai+Gh0UUXFdSmnnMC9alU26y/GmhYnVr7bRY6nnn+T9egVc2hUm3vz32wXs1pOpXq+953xiNi8fXBnr7PRUS0XMBYqce3fmrRsW+//W5ELJ7ptOPTv1f2/VaR+4Yllf4n0Bi11nabO5x1W6622Un4M5/duQataS6VajtwajC6ejqNqq+S821+Sms78cN/jIiIJz/zB+vVnKayXL/NLsz+ZE/3WjSnqZTWNju/Lly/ffHs1ejq6YydT+1Y07Y1g4V9t9KMsizoCc+1+cHYjyPi42AW8WDArFJts6CcLRNoFbmFt+xkW1p8GqPW2majlQJG7Wqt7eG+VyLCHPZ6VKttNh3iwNE/W4dWNYel+u3w0GhxDUF3R29xag+1qVTbbLT9/twHZbXt7ug1ul6HWs632V3Orp5OMx7qUK22g9dfj4gH64qO7e8vrtFqtTVDq1Wpvlu2b47pydmqQcLMiOXdHCnE8NBo7N23p+zf+73J2ao3IlpxCVbDdpssNX57omLxWb16anvm+PmIEDBqtVRtx29PFANbxiYFtVuqtlcv/J1R31WoVtuFi8AjPt7Nc/befZuY1GC58+3lgaGyGh/b3x+H+16Jweuv68/LqPWz7O9Hb0XEx1PPWN5Std351I64XrgSfT0Hizv8ma5en2r1/fwzu2J4aDTeuDxcdn7NrsWobOEOkjbZWl4ud96yjqr4jVdrba9duhHTk7NliztZ2lK1zTYtyf4cOXkgujt6i5sWsLRqtb05Uoixwh3nilWo53z74kvPxt59e2J4aLTlppmsxHK1Ld2YoPR1rbb+YiVq7bdvv/ktG5XUaanaHtvfH309B+PIyQNx6+5IdPV0Rv/Rc3Fsf/9aNzNZ1eq786kdMXj99UWzHbK1mqa1V3b8zOGy66vv/cP3zWJYRsPD27H9/TE9OVu8NU/j1FrbmyOFuHj2auzdt8cHXo3q7belF8FOMEtbqraXB4bcoV+FlZxvs63WP3j/F3k1qynUUtuFNWzV9Rf1quezzEYl9Vmqttcu3Sju2JfNyPnqN07HkZMHYqxwx5TqGizXdxcO9N66O1JcG5utfWNp2aaGC+9YVtt8b3pytuWuIRoa3gZODRZPDKaMNFattc2eSdbV0+luRo1W2m89b2h5S9V2ZmoupidnF41SZlsq9/UcLD6TiMVW2m+tu1jecrXNRtBtQFC/evpt9igWG5XUZrnavved8Yp3MbP6zt67vybtTNVKz7nZnXjXxbXr6uks+3pbe1vZg88z2UBZ27ZNa9Kuh0XDwtu1SzeKWye729NYtdZ2ZmouDve9YvFxHVbTb7MdkT75+CfyaFrylqtttiZr4Z9s+/XrhSseK1LFavpttp21C4nKaqlttklBdg7IZHfhrc+qrJ5+OzM1F2OFOzYqqVGtta10AczyVnPOzdbHUbuxwp2yDUqqPW4hWxPbagM8DQlvpdP0bI7RWPXUtq/nYER4aGytaq3twKnBResBqu2IxAPOCfmpp98unAZVOm2KxWqt7ZbtmytOm84GzwxgLlbvOeGNy8MREXahrUGttc0ugBeu1c6+fuHQ3vwambDVfJ5lu3maCVVZd0dv2cO4I6J4vVX6b393b09sbW8r2zhuZmqu+P+l1a7DNszPz8+XHdiwoe5d9J7bdWjJ0ZzrhSvFwi712tMXTjT9h153R29d9a21ttkuctUcOXmg6S+i86pttde2Qn/N5FnbhbK+vNRrmkletZ2ZmisO6JRqpV1S8+63rbxLWt61zS56W3EwMs/aVto5udXqnFd9b44UFj1DrxWuvUrVW9tK/TGi+ufUwv8XrVTf7o7eyCJbQ8Ibtau3Y1M7tc2P2uZHbfOjtvlR2/yobb7UNz9qm5/S8JbbQ7oBAABoHOENAAAgAcIbAABAAoQ3AACABAhvAAAACRDeAAAAEiC8AQAAJEB4AwAASIDwBgAAkADhDQAAIAHCGwAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRAeAMAAEiA8AYAAJAA4Q0AACABwhsAAEAChDcAAIAECG8AAAAJEN4AAAASILwBAAAk4JH1bgDAenni/BvFv//s5RfWsSUAAMsT3oCW9cT5N4t/F94AgIedaZMAAAAJEN4AAAASILwBAAAkQHgDAABIgPAGAACQAOENAAAgAcIbAABAAoQ3AACABAhvAAAACRDeAAAAEiC8AQAAJEB4AwAASIDwBgAAkADhDQAAIAHCGwAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRAeAMAAEiA8AYAAJAA4Q0AACABwhsAAEAChDcAAIAECG8AAAAJEN4AAAASILwBAAAkQHgDAABIgPAGAACQAOENAAAgAcIbAABAAoQ3AACABAhvAAAACRDeAAAAEiC8AQAAJEB4AwAASIDwBgAAkADhDQAAIAHCGwAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRgw/z8/HzZgQ0b1qstAGuq9OTnzAcAPKyyyPZIpW/eujuypo1pJd0dveqbE7XNT9PWtqO3+Nf1+u9r2to+BNQ2P2qbH7XNl/rmR23z011yvWLaJAAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRAeAMAAEhAxUcFrMSx/f0xVrhTdmyp7UJvjhSi/+i56OrpjK9+43SjmtGUaq1tVtNSpy+ciN29Pbm2r9ldu3QjLp69WnZs8PrrsfOpHWXHZqbmoq/nYNmxvfv2xPEzh3Nv48Oo3nNCRHmtrxeuxJbtm3NrX8pqrW3p1sKljpw8EC++9GwubUtdvf124NRgDA+Nlh3TdyurpbaV6lmqlc+pS6mn3y587db2tvjmu5dzbV/q6qnvc7sOxfTkbPFr59vaZbWrlg0Wnh9aNUM0JLwNnBqMLds3l3Xk7o7eis97qHSBS3W11nb89kT0Hz1Xdmzg1GAxzAlwK3NzpBBvv/mtsroe298fh/teWRTg+noOlh0rDdOtdrFRzzmh1MKQ3CiP/OrXERHx0WMba37Po/fux4fbNuXSntWotbYzU3MR4WK3HvX22+6O3tja3ua5RjWotbbHzxyu2F+z8+kfdf3hmrQ3JfX02+d2HYqIWPTa53YdEuCqqKe+C88JpdcBAtzSbo4UykLvQlmAzmqb5Ylj+/tbLsA1ZNpkpZPtkZMHIuLB/4xSL//5q8WOvbW9rRG/vqnVWtudT+1YdBLJ3jd6/Z2cW9m8dvf2LPpAO3D0zyIi4ttvv1t2/NbdkbIwt7u3J7a2ty05itys6jknZAZODcbW9rbi6xpl48RPovNf/0X88c7/I37ruz+q+T2f3vN/xWc7emPjxE8a2p7VWkltqU09tR04NRgR4YK3Rqvtt5cHhmJre5uByApqre347YmYnpyNQ8f3LXrt9ORsjN+eyLupSaq1vtcu3YiIiPN/81rx2O7enujq6cxtYLKZ9B89F0dOHqiYDcZvT8RY4U6cvnCieGzL9s1x+sKJGCvcabm+m9uat8e3fqri8W++e9mH3SpVq20lW9vb4t4SIxnU75OPf6Lm124zQFG0VL+dmZqL4aHRRRcVjfDovfvFO2+/e/x8Te/peO1rxfdsnPhpw9vUaPWcE6hPpdpm/bXRAw2tptZ+m4WOZ57/03wb1EQq1fb+3Afr0JLmVKm+731nPCJi0ZTpPX2fi4houYBRjyz4Vrs7mQ2WLxy82fHp3yv7fqvILbz9YOzHEfFxYWmcemsrQDTWxA//MSKipuk7Y4U70dXTmXeTkrBUvx04NRhdPZ25jKr/6ukni9MlH713P9q+/vaSr2/7+tvFO3QfPbYxfvn0kw1vU6M53+anUm2zc8CTn/mDdWlTs6i132YXZn+ypzv3NjWLSrXNzq8L18ZfPHs1uno6F63jprpqfbfSXaNNmz8ZEcJzNTNTc3Hx7NWyu2qVXlOptllQzpYJtIpcwtvNkUIMD43G3n17LGqnPrEAAAsjSURBVNpusHpqm41WfuazO9emcS1gZmou+o+eq2n6zrH9/RHx8TTLVrZUv82mQ+RVp48e2xh3X/14ne0T59+MR+/dr/jaR37163ji/JvFr2e/9IWHct1bqeXOCcNDo8X1Gd0dvcURTpZXrbbvT/88Ih5cjJXWtruj1+h6jWr9LMvucnb1dLqeqNFStR28/npEPFibdWx/f3GNVqutGVqNavXdsn1zTE/OVg0S2XmDcm9cHl72mure5GzVGxGtuASrYbtNLtwBxiL5xllpbc/88xQxi2RXZ+EunkvtzLVwd79Ku1K2ilr77dULf5f7qO/9L34unjj/RnEK5RPn34h/Gnh50eueOP9mcbrkh9s2xeyXnsmtTatRS20XLrCP+Hg3z9l7952fq6jnfHt5YKimzYx4YCWfZX8/eisiPp56RmW11nbnUzvieuFK9PUcLO6emMd09WZTS30//8yuGB4ajTcuD5d970yN0/VbUTY4s9RdNxZr2J2342cOx627I8U/3/uH7xuFbJCV1PbapRsxPTnrH0QD7O7tKav/H/+bf1X1Dkbp6wavvx6H+14p7u7VamrptzdHCjFWuLMmQaI0rG16651FG5FsnPhJfOqtm8Wvf/rqwbp2p1xLKz3fvvjSs7F3354YHhptuWkmtaqntqUbE2TvjWi99Re1Wkm/ffvNb9mopAa11vbY/v7o6zkYR04eiFt3R6KrpzP6j54rzhShslrqu/OpHTF4/fVFsx2ytZrWJi+W55KJZpbbmrfszoQRh8ZbrrY3Rwpx8ezV2Ltvj38QOTh+5nBx96ilLoB3PrUjTl84EdOTs6aqReV+e3lgaM2mV//y6SfjF59/uvj17x7/z2XfL92k5Beff7rstQ+7es632VrND97/Ra5tahZL1XZhDVt1/cVK1fJZZqOSlalU22uXbhR37Mtm5Hz1G6fjyMkDMVa443OqDtX6brbzd+mfbG1stvaNB+pdMlFt873pydmWm1KdW3iLCBs15KhabbPnvXX1dJoWlaNa1xHaQKJcab+dmZqL6cnZRaOU2ZbKfT0HG37XsvTu28I7b6WblPzs5ecb+nvXQq3nW+su6rewttkIug0IVm+pfps95sZGJSuzsLbvfWe84l3MrL6zVdYCU1mt59zsTryp1OV+9N5/i4iIw32vlF0DTE/OxljhTtkMp23tbRWfAZcNlLU95GvTGy3X8DZWuGOnw5xUqu3M1Fwc7nvF4uM1UG1L4IWyXelMl3igtN9ma7IW/sm2X79euNLwx4rUEsx+/sXd8esdv9PQ37sWaj3fZn3XhUTtFtY2G5TJdpzLZFOorM+qXbV+OzM1V9ytt9VG1RulUm2Xeggy9an1nJttbkK5F196tuI1wNb2tujq6Yxbd0eKd4irPW4hWxPbagM8DQlv3R29ix6yaae9xqintn09D3bU8xy9xjm2v7/4MN5MNvWk9BlPN0cKizYrqWdnymbzMJ8TZr/0TNUdJFO461ZrbQdODS6aBlU6bYrFaq3tlu2bi2sHSy8mssGzVvv3Xot6zwlvXB6u+j3K1Vrb7AJ44Wda9vULh/bm2cxkrebzLNvN00yo1dnd2xNb29vicN8rxWPZIwZacWf7DfPz8/NlBzZsWLRD2XLGb0+UFTRT6ec8t+tQ1ZGf0xdONP2HXndHb131rbW22S5y1Rw5eaDpd52st7b1/NyFKu0mt3A3qojm2XU1r35bSdaXrxeu5HZC/sS3vxu/f+gri47/9NUvr/kOk3nVdmZqrjigs9Trmlne/baVd1nOu7bZRW8rDkbmWdtKr221OudV34U7U0e0xrVXqUZchz2361BsqzKDbGGGaKX6dnf0RhbZGhLeqF1eAQO1zVMz1vbTe/5d2bq3Xz79ZPz4b//jmrejGWv7sFDb/KhtftQ2X+qbH7XNT2l4y3XNG8DD6r9f/suyr+895NMlAQCEN6AlfbhtU9z/4oM1IL/4/NPxy6efXOcWAQAsTXgDWtbdVw/Gh9s2xU9fXbw2DADgYfPIejcAYL189NjG+OHoX8VHj21c76YAACzLnTegpQluAEAqhDcAAIAECG8AAAAJEN4AAAASILwBAAAkQHgDAABIgPAGAACQAOENAAAgAcIbAABAAoQ3AACABAhvAAAACRDeAAAAEiC8AQAAJEB4AwAASIDwBgAAkADhDQAAIAHCGwAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRAeAMAAEiA8AYAAJAA4Q0AACABwhsAAEAChDcAAIAECG8AAAAJEN4AAAAS8Mh6NwAAAKAWj/zq19H29bfj0Xv3Y/ZLX4hf7/id9W7SmhLeAACAJDx67/144vybERGx6a134v4XPxc/e/mF+HDbpnVu2doQ3oCW1/b1t4sfBAv9f49trPq+jx77F1WOV35PpZ81HBG/f+grVd/z4H3Vfs//VvU9S7dj9e2u5X3V6rPUz1yqDgDw4bbH48Ntm+LRe/cj4kGA2/TWO/HTV78cs196Zp1blz/hDSAeTMOo53hExKNxf9W/93+PiPj2d1f9c1pBveHypxHxqT3/riE/a/n3rU3AXvo9Sw00CNhAc/josY3xw9G/io7XrsSmt94pHv/t174Wm976v+NnLz8fv/j80+vYwnwJb0DLWyqg8fCoN2B3RERM/CS/BrWw+YiIjt5Fx1cWLOu7E7z8z2vsXey1Dth/FBEbS/qtgA2LffTYxvingZdj9ktfiN8/9JXiXbiNEz+J3z/0laaeSim8AS3vZy+/UHWqxW8uEewe+dX/W+V45fdU+ln//tBX4j9d/sslA+Rv1vl7Pv7+/2zIz1uqBku9r1p9lvqZgnTa1usOdjP5fkRElTvGjdDqAftAPJhm5w52c/j1jt+J9/6fv462r78dv/3a14rHs6mUP3v5+fjZyy+sYwsbT3gDiKU+lKt/wH4Yqx/R+68RcaKJp3c0Ur3h8ov/+i/iv47+54b8rKXe8+B9AjZpaPWA/V8iIo6fX+9mLKvecLlUgGxkUH3wvsq/6z9ExBPn36izDY1p9//c8Tvx3y//ZTxx/s2yO9dPnH8zPvHtsZj90hfi/hc/V/V3pUR4AyAJ9QbsuxEtt4X0Wunu6I1bd0cWHV9ZKG5cUG2GgP0/Jn4S/7Kk3wrYranekP0wBOz+iIgqm3+tp40TP4nfPX4+Hvvuj5piKqXwBgA0xHrdwW4m3R29cavKHeNGWO+AvfT78g/Yo2+9E19YYrbDSgYHBOw0bHrrnXj03v348d/+x/VuyqoIbwAALaLVA/b/+dY7cevyX653M5a0FgF7+Z9Xf8D++vk340svP1/l+/XdwV66DdXbvXHiJxXf99FjG+NnLz8fP//i7qrvTYXwBgAAD4lUA/Z/OP9m/Nt12hzkkV/9etF6t4jy0NYsm8QIbwAAQJI+8e3vxm+/dqX4uIDML59+Mv5p4OXk17gtJLwBAABJ+a3v/ig6Xvvaorttv3z6ybj76pebdsMq4Q0AAEjGb7/2tWj7+ttlx5pximQlwhsAAJCE3/ruj8qCW6uEtozwBgAAJOF/bXu8+PdmXde2FOENAABIwofbNsX3xv82IpbegbNZCW8AAEAyWjG0ZX5jvRsAAADA8oQ3AACABAhvAAAACRDeAAAAEiC8AQAAJEB4AwAASIDwBgAAkADhDQAAIAHCGwAAQAKENwAAgAQIbwAAAAkQ3gAAABIgvAEAACRAeAMAAEiA8AYAAJAA4Q0AACABwhsAAEAChDcAAIAEbJifn58vO7Bhw3q1BQAAgAWyyPZItW8AAACw/v76r/86IiL+f5OZThsTc/c4AAAAAElFTkSuQmCC)
Use the part of the hundred chart and add 24 + 16 =___
![](data:image/png;base64,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)
MathematicsGrade-1
Mathematics
20 + 36 = ?
20 + 36 = ?
MathematicsGrade-1
Mathematics
Some hens lay 30 eggs. Then they lay 36 more eggs. How many eggs did the hens lay in all ?
Some hens lay 30 eggs. Then they lay 36 more eggs. How many eggs did the hens lay in all ?
MathematicsGrade-1
Mathematics
Which equation shows the correct sum for 63 + 17 = ?
Which equation shows the correct sum for 63 + 17 = ?
MathematicsGrade-1
Mathematics
What is the sum of 28 + 12 = ___? Use part a hundred chart to solve the equation.
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)
What is the sum of 28 + 12 = ___? Use part a hundred chart to solve the equation.
![](data:image/png;base64,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)
MathematicsGrade-1
Mathematics
Choose another equal set of the given equation 34 + 5 = 39
Choose another equal set of the given equation 34 + 5 = 39
MathematicsGrade-1
Mathematics
Use the part of the chart to add 23 + 7 = ?
![](data:image/png;base64,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)
Use the part of the chart to add 23 + 7 = ?
![](data:image/png;base64,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)
MathematicsGrade-1
Mathematics
10 + 23 = ?
10 + 23 = ?
MathematicsGrade-1
Mathematics
Ben bought 25 stationary items. Then he bought 14 more stationary items. How many stationary items did he have in all?
Ben bought 25 stationary items. Then he bought 14 more stationary items. How many stationary items did he have in all?
MathematicsGrade-1
Mathematics
Write the missing addend in the equation 37 + __ = 57. Use part of hundred chart to add.
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)
Write the missing addend in the equation 37 + __ = 57. Use part of hundred chart to add.
![](data:image/png;base64,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)
MathematicsGrade-1
Mathematics
How could you use the hundred chart to find the sum of 9 and 45 ?
How could you use the hundred chart to find the sum of 9 and 45 ?
MathematicsGrade-1
Mathematics
Which equation shows the correct sum for 50 + 3 ?
Which equation shows the correct sum for 50 + 3 ?
MathematicsGrade-1
Mathematics
Which equation is shown in the hundred chart ?
Which equation is shown in the hundred chart ?
MathematicsGrade-1
Mathematics
Use the part of the hundred chart to add.
33 + 20 = ___
Use the part of the hundred chart to add.
33 + 20 = ___
MathematicsGrade-1
Mathematics
Sam had some apples in the basket. She bought 25 more apples. Now she has 40 apples in the basket. How many apples did she have in the beginning?
___ + 25 = 40
Sam had some apples in the basket. She bought 25 more apples. Now she has 40 apples in the basket. How many apples did she have in the beginning?
___ + 25 = 40
MathematicsGrade-1