Mathematics
Grade-4-
Easy
Question
Multiplication problem represented by the following area model.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAS8AAACvCAYAAACsGVi0AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACfPSURBVHhe7Z0HVBRXG4aH3kSqSuwlaFRs2HtL7L1rjAUFuxILiooaEexi19gbAioWFFEBFQRFwYIaxQ6KSEfpbff9Z4fJL8JidAOZXfiec+457jdzF3fvnWe+e+fOLAOCIAgFhORFEIRCQvIiCEIhIXkRBKGQkLwIglBISF4EQSgkJC+CIBQSkhdBEAoJyYsgCIWE5EUQhEJC8iIIQiEheSkwYrEYuSIRxPzrb+HvOkRpRcy2sQi5ubn/WERsX/ieviNvkLwUDXEaHlw/g5W/T0LPbp1g3roDeg8bhzU7DuNRxEd+pwKIU3Hn0nHYTv8V3Tq1R3O2zsBxs7D79A3EZShy9yUKk4FrR5agg3ljNG1qjubmzQuVFi1bo02bNug1Ygq8X37i6ykeJC8FQpwWjcMrJqNmOQaMkjpMqtbCj7VqwkBbDQzDoE6bYTgRHMXvzZOdhJPrrFBTh62jpoWqNeuhgWkdGOhI6hhh0JzNeJucze9MKD4ZuLBzNupVq4Lq1aujZoFSu1Yt1K5sBCW2vzD6TeESmsTXUzxIXgpDNvz2zoce2+mUjBth2W53PPgrDK9fhCHIxw0TutfjBFZ/kC2eJ/NVWO6dtEc1DQbqlZti3RFP/PXsDSLevMKti/vRt0lFtk55zNzpiyx+fyIXnxKi8OrtB6RkK+LwWozk+Pd4HvYEYWFhePYsf3mGV6+f49SaSVw/ajpyFSIU+MRF8lIQcpOeYka36qxsVDB5/TkUPKzeBhxGi4pKYMo3wpHAaC4mTn6DuT1/ZOtow3KzNxfLz6Oz61BbjYFBs19x5z1lXxyiVJzeMAXt+0yCzzPFzUqKIufDXYxtWwVaNTvgdGgcH1VMSF4KQlZyOE7udsSylY4Iikzho/mICsK4lrpgVGrCyeMZF/rw4ATMKyhDrVoneLzI4GJfkBQCi05VwChXh9PFJ3ywjCNOxuZJ7cBomcMlJJYPlhLEqTgyvy93Mpu0wZPN5RUbkpeC8E/T6slhl9CrpioYgyZwvZ3IxULdl6GSCoMfuszG80wuVIBYbJjUnu3MyrBw8mIHTIREXjumdoaSXhu43lXszKQgkYGHYKbPoHJ7S4TGKn6mTfIqFWTDY4MFNBgGDQYvxmtuAisX3psnQ5uNmY1ah0SpZsqCM3cmZtBn/hFIyc3KICLsm9UNygbtcS4snY+VAjLew35UCzBKFWB3/BYfVGxIXgpPLoLdndDIgIGmSRsc8A/n41k4Zz8GqqyY2kzahnSpqZsIZ1eOhjK7T8cpO5BS5pZ/iZGa+B6PH97H/fv3ERoaitD7t7BwaAso6ZhhvZsfHj4MxYMHD3D/3j08fRWB1By+qoLx6tIG1NFiUKvXPDz/VDpybJKXQpOGa84OqF9RC2qVzLDGPSjfPMZnebVl5ZVZhLwk+0jk1cFqexmUVzZuHFqIOiYG0DcwgJGREVsMoanGDr8ZJejoGsC4gjEXM9DXQ8Me0xGkiCPJzGisGt2M/Ux6WHT4Nh9UfEheikraexxeMwMG6srQqNoG2y7cLzABm4NL6yZAkxVTK4ttSJUqrxy4243g1vx0n7UHaWVuvWoOHl07illW4zHRYhImW1rBymIsWpiagFGrhC79f4WVlSUmTZqEiRMmwmb1frxO5asqENFBR9FIn4F+42G4HVl6JgdIXgpIZuwjbJjai8uYKpgPhZt/GL8lP2IE7reGgRKDugOX473UkUIKds3owc15DV15ukyu9ZLcXCUSi7hbZfICSdg+tTOU9dvg+J0YLiS5pUokktxKo4h2z8KZVaOgwmaSfRYcZHP10gPJS8HIinmIZSOacsJpPGA+Al8l8FsK88pvO34sx6Bck5G4lSDFXulh+L2PKfteBrB1C1HIQ7P4ScOuaV1YebXFiQd5V20Vmk+PMadndTDqlbHW/REfLB2QvBSJ1Eist+wMNVZcncc74HHc12ePM9/fxDCz8mBUa2GzdwQf/Uz8vRPoYKIMplJHnHlY+hZkyoQ4GdusOoLRbQWXEMVfKhF77xQ6VFKCRs3uuPiydC1EJnkpCuIsXN1tDX1lBqa9rRH2TUlBMo4vHsTNaTUdZovHSZ8HhuL0CGyd1p3L4DpabkFc6erXsiP+hC2T2rDyag6XUrDO6/4ZR1RQYVC5w1Q8Lk1jRhaSl4KQ/tYPI5sacrJpMXAqNm1ywvq1a7B2zerPZbUDVjmshcetp/g7J0uOuAmLDjXYesow/3kMHNdtwhanDbAa0hm67HtVatwfFx+XspXk/wb2JHHf2wVb9jrjRZyir/PKwSWnCVBh27nRqDXIm8ErPZC8FISom3vR/Ac1qKioQFVVFarKylApWJTynjYxcuUp5D/soh5dxbxx/VBFVx1KyqpQV1WBsqYRugydAvfbb/i9iNJHBlyWjYAq22c6Td4JKTeVKTQkLwUhPf4VvM+fhJubG1tc4eLqAteCxcUFLsddEfj07f8zr7/JTY9D6M3LOOl6HM7HXeB1PRhRn2isWLrJQfijmzjB9hnfkOel7vYvkhdBEAoJyYsgCIWE5EUQhEJC8iIIQiEheREEoZCQvAiCUEhIXgRBKCQkL4IgFBKSF0EQCgnJiyAIhYTkRRCEQkLyIghCISF5EQShkCiMvMRiEfcscSpU/qvC9rq8zid5er2U7VRKvnwNuZdXTk4OPDw8sGP7dhw/fhzOzs5UqJR4kfS1A/v3w8nJCUePHqG+J1DZtWsXd/zn5hZ+oI/cyys1NRXz5s3DksWLcfr0aZw8eZIKlRIvkr7muMoe/fr248R16tQpqftRKbni7u4OW1tb2CxYgMyMwj/ZJvfySk5OgaOjI/z9/fkIQfw3BAcHY+nSpfwrQgh8fX2xbt06pKcXfiS33MsrJSUFDg4O8Pb25iME8d9w8+ZN7syfmZnJR4j/Gi8vL05eGYqYeZG8CKEgeQkPyYsgZIDkJTwkL4KQAZKX8JC8CEIGSF7CQ/IiCBkgeQkPyYsgZIDkJTwkL4KQAZKX8JC8CEIGSF7CQ/IiCBkgeQkPyYsgZIDkJTwkL4KQAZKX8JC8CEIGSF7C8+/klRaL+0EBuBXyCDGpWXzwa+QiKuIF7t0JQmDgLTx4/AwJaYWfxfOtkLwIoSB5CY/M8op6dAW2436GnioD9ertceROFL9FOmmxz7B9xRy0bVQTmsoMGIaBplENdB81B65+T5HD7/c9kLwIoSB5Cc93y0uUFgPvgyvRqbYe1NQ0ocZKSL2KOQ7ees/vUZishJdwmNiZE1bluq0xdvIczJ2/ACP6doIuG9Ou0RX7/cL5vb8dkhchFCQv4flOeeXi2vbpqKiqjOqtxsDpwF70qKoBVZOmOBRUlLxE8N87F0aspExaj4TXwyhk54q5J4BnpnzAUbsxUGe31Ru4CM8+fv251AUheRFCQfISnu+TlygdLvbjMXjqCoS8zUBOcjCG1FaFcqUmRcpLlPoeS3vVAKOsj/kHg/joZ3Iib2JYY30wug2w2+cFH/02SF6EUJC8hOc75ZWN+Ji3+Jid9zIjzh8Dan5dXqnPL6GLiRq0q7WG59M4PpoPcSK2TOnODilVYeHkgW+Z9v8bkhchFCQv4ZF5wl5CWuw/y+ud91ZU0WRQucU4PIqR1tAinFs/CZrs0LHzzD2IE/Hhb4DkRQgFyUt4SlxeoW4rYaDCwLTXArxKkm6mwH0LuDmx+sMc8K7w/6NISF6EUJC8hKfE5RVydAn0JGIatALhqXywALcP2cKQ3adWL1u8S+GD3wDJixAKkpfwlLi87h6zg54Sg58GLMObZD5YgNsHF3GZV+2+S/GuCMFJg+RFCAXJS3hKXF5Pz6yGsSorpq6z8CJB+mr6q7vnwoCVV5OxG/DuO/oCyYsQCpKX8JS4vGIC9qK2jhKMzYbizntpaVUO3Jb9ClVWXr0XHUIiTdgTCgDJS3hKXF6Z729h4E86UDFqgEO33vLRfGRFYtngxmAYHczff41bvPqtlHV5iTPiEejpAgfbObCcPBFWM37H6s17EPTkHYq6Y1ScHoMbF45i2fwZsLCYiCnzlmKXqxciEgr/6nB+ol+E4Oh2R8yZZoHxk6xg47ANvsHPZbqtqzQgf/LKQJDHTkyxGI/xEyeybWtRuEy2hJWlJWbbOSE4qvD/O/nDc5w7tBULZ1thwkQLzF7siFM+IUjhl0bJG/9KXtlJNzFIIi+Tpjh2N5aPFiAnHjutWrJyUsew5ScLreOKDT6JFpWUoVq1C86GxvPRb6Msy+vj6yAsGvszd3sVw6hAR1cf2hoq3C1Y+nXaYOmha0grkMWmRt7B4tEdUE5SR0Ud+gYG0FJXZusoo0X/qfALk7IOD9m46bYWnX4y5t5bS9cQBgblocz+W6NCPcze5I5PZdBg8ievZJxYMwEGOtrQ0taBjk7+Ug66urrQ19Hg2pDRb4LjD7+cgH4V4IKhHepy29W19WBoaAA1yT3I6hUwxHoT3vy9uFOO+D55ibPxMSkBsTExSEhIwLsnV9CjpjqUKjTElot/ISExEXGx0UhMSkK26HMO9cJnDxoZqUDDxBwbXf0QExePT58+IeLhVczuXY/9wtQwyPYQkr7zICir8spKeIpFQyXZKoNaLQdi0/5T8Ll6A1cunILdpF4wUGKgVqEp9vp/vl9UnPYe6yw7cnXqth2K3W7ncSPwJi6dPYoZQ1pAiY2b9ZcsZ/ny9PI24DBaV1RjO7EJxi7YhItXb+JmwHUc2bwEjatogtGqhhXHg78rYy4NyJ+8chAd/gS+Pt64csWbPSZ8/l98fHzh538de5f+Cn22nev0tEZYvoMtOfwGxphXZPuGFrr9tgjuXn64dSsQ545sQe+mVdh4OYxiE49UOWvk75JXzrtALPi1O5o1a462bdujtZkpN1clOSCqmzZFh/bt0cq8KXqO/R0Bb/PNb+Um4+L2WahZTgmaWuXRsFlbdO3YDj9W0uMOmlZDbHDvw9eHLdIoq/IKdrbjLnBo1OyKUw8T+ChP2mvYjWjOtcnPcw+zeVMer7w2o44mg3Kmv+DiX19mWLnRdzCxQ022jiGWu4byUZasWKz9rTUbV0Lf+YdRcBXLjf02qMj+ncrtp+JRXNnSl8LNeaW9wIIBDaBq1AR7rr/mgxKycNZxHFTYdmw0yA4vC6wICPc7AHNjJSiZdMK5x5/4qHzwXfLKeH0dE3q1hKmpKerVrcsVs0aN0KSRGRr8lPe6LrutzYDJ8Akv8C2IUnDnsgtmjumLxvXqoV69umjWsT8Wb3TGy+gi1lD8A2VVXg+uHMbkUYOwcOsJdrBQGJ9tk6HFdsb6gx2QyDklA4dt+nNC67XgCAqfJnLhtXUSdyJqPmYtX4cdmr68hO7V1aBsaI4j9xLzgvkQRQVidDM9MJq1sO3SMz5aNlAseWXhnMOvUGeUMXjJMeS/bCZOfYbpnSuDUa6Apace8dF8ZL3DypGN2L6jBqvNl/Ad19NKnO+Slzg3E0kJcYiNjUVcnKTEIT6eL9xrtsTGcMPGrFzpHzMnK517D0ndj6mZ/2q4UVblJc7NQSbbYDm50qbls3HaMe/qbYtxW/I6asZzzO1Th+2ABljifJvbqyDPfbahljoDw2YjEMInc2EX16GaKptZtR2HB0nS/lY0Vo1vw3XsSVu9irxIUBpRJHnFPziLdpXVoG82CNcj0vhoHp+enEWHKgxUK7fF2QIZeR45OLnmN26E1M5yI+LlKMH+VxP2QlOWJ+yLIif2Hiy71GCFYgybY/e4mCjyBsY212UzJFPsvvKKixUk4a47OlRQglqV9rj4NO+ADNhtjfJsp6030A4fCvcPlhwcshnIZXS9bY4WGlaWZhRGXqJ47ODmOvUwfbd/oWQhwnsn6usw0DEbhttvpX+WgAOLuH5Qt99CvPzSfYJC8ipNZMdh//wBXNbVbNhiPOfvJU0Lu4wB9dTAGDSGc8AHLlaQ1KeX0KcWu49RM7iFJHGxS+smcs9aaz5uEz4WcTHlnP1ITl7tJ29DYhm66qgo8np3Yx/MDBiYtLfC3fjCo6GnZ9aguhID47aT8ThGelr16MRKVGLb+AfJ3GYRiwqEgORVSshMDMcW6yHcGbJ6x3HwzbfsIfExK6aaSmAqmMP9tvTexwmujgYY/cY4eiuvrufq3zh5tRzvhOQixOS5ehwnr9bjNiBBTtcDlQQKIa/ceGyw6MC2jxZm7r0udYrm8Ul7VGXlVaGdJZ4UIa8n7ms4eVVsNREPPsjPuJHkVQr4+CYEC0Z24jKuhj0mwSfsy8n1VImY6qqCMWyC44HRfPRLPj48j17VWcEZNYUrn3l58ZlXC1ZeRa3l8lg1ipNXO4utSKDMS65IfHgCbX9QgZbpAFx7K3Xcj6enV6OaRF5tLfFXkZnXH3mZV7speEiZV/FA8gKi7p7EhE6SOS51dLOwx30pk1PiqECMb6MPRrMedvq+4aNfEhnsjjbGDDSqdYTX87y1Xjf3z8+b6xi4DJFSj9EsHJzXi5NXz/lHpV75LK3Iv7wy4bnBgntOXnfr/UW2TeT1vdycl7bZMAQWcWNxwJ7focO+T50+i/DiOx6cUNKQvBSYiMCj6NfIGIxKRYxZdrjIRw4h/QUWDqnPSkYPc48E8MEvCT2/HpXVGFRqZ4FQfub91dWtqK3FQN98DG7HSUmrRFFYPrIJJ06rHT5l6lYheZeXOCUMNv1rg1GrBsfTf/HRwqS9vIjutdXAVGgJlwfSsvIsuKwYzp2gOk3fhgT5GTWSvBSVDw89MbCRHhiN6pjmdB4pX12Ak4Xjy0Zwl7s7TdmBT4U6YAbcluVdNewyY9//rxqmvbuBfvW1wZQ3w66Awh07+5U3etfVBKNrhoO3Ivlo2UDe5RXz4Bw6VVaCTp1uuPRM+pBRgjgzAgv6mbJtbwDrw8F8NB9pLzC3t2SZTTnuNyjkyF0kL0VEnPgXFvZlMykVPUx38uCjX+fDzcNoYsiAqdweRwr8TF3CIw/0+IkdVmrUhtOVfKuvRR+xz7onJ7WOllsR9cWEfAbOrh4PDXabab+leC1Hl9D/C+RdXg/POqKCMoOaXS3x5KvjeRH8d8/mhoW1u89CSMyXZ8HQU46oxWbf2qaDcS1Cvq7IkLwUjiwE7LPmbg9Sq9YWaw+cxRWvCzh75gzO/L+chvupU7jodxMxGfy5MisJBxcN4WRT1bwX1u9xwWUfX5w+tAVD2/7ICkoNP8/ahYI/M5D46Dx612MzPHbI2d/KDm4el9i/dx5Oiy1QU5OBulEj7Ln6nN+77CDf8sqG9+bxXKbdcvQqxP3D6uHsmIeY3VOSXTFoPWAKDridx5XLXji0aTFaVWUzazVjzN/nK3fTAiQvhSMamy0l9xuyWZSSKrS0dKChoc4WjXxFHWqqqqjYZBAuvvnc5bI/vsR2mzGoY6jG1ldGufJ63D1tTLnKGDTVAY9jpA0vRAjzPYhhHX/iDgZGXRs6Wurc36/e9Bc4nQhkdVr2kG95ZeCo7QCujdpP3oGUbxjrxT72xqxBbaCrJOlX6ihXTpurr1ejOeZuPIEkOfyYJC+FIxk3Pfbjj2XLsHzZcixdsgRLliwtVGxtF8N+8yE8K3hbT24KHvmfwZY1K2G7yBYr127Buat3kZTx1UkzpLx/Ao9jO2G/3A62S1fA6U8XhLyM4beWPeQ987p3xQXL2P5x5MLtb75tK+fjO1w7ewhrVy2H7RI7rN68F1fvvpLbCzEkL4KQAXmf8yoLkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCUnL7EIyUlxiE34iBxRyTy2n+RFCAXJS3hKTl6Z0fhz6Xj0tVyBx/El86BgkhchFCQv4Sk5eaW9hnVXEzDV++BGEb/W+28heRFCQfISnpKTV+obzO9RHRp1BiKA5EWUMkhewlNy8hJ9gG2fmtA0HYrgWD5WzJC8CKEgeQlPMckrFylJ0Qh/8xpvwsMRHh6B8CcBsOpYBRo1esD95jNEREji4Xj95g0+xCWhOH6+kuRFCAXJS3iKSV5JcHMcix8M9WFgaAQj4wowMjSEhooSGGU1GBgYwdjYGEZGhtDTN0RnSwe8KIY5fJIXIRQkL+EpJnmlwc9tDUYPHYwhQ4di+PARGDGwN+pV1ASjZYIuv/THyBHDMZTdNnjIUMxzckVUMfwYHMmLEAqSl/AU25xXbm4W25AZXGNmZWUhK+EZ5v5SDRq1++Pac3aYyMYk2zLYkp2Ti+JY+UXyIoSC5CU8JTdhn/UOC3tJJuyHIOjDt/5m7/chkdfq1asRGBDARwjiv+He/QdYvnwF/4oQAj8/P2zcuLEE5CVZKsFmXmq1BpTYOq+0tDRYW1vjt9/GYc2aNZzIHKlQKeGydu1aTJkyBZ06dYS9vT3WsK+l7UelZIrkOJcc76PH/obfreew2W86b4TP/Et5vYZ19ypQrdUXAW8Lv3lxkJqaCtvFi7HG0ZG18HVcvXoVV319qVAp0SI542/dugWjRo3khi7Xr7N9T8p+VEqosMe55DtfuXIl7BYvLP7MS5z1EZ7HtmLNzmOITC6524McOXH58RGC+G8ICQmBnZ0d/4oQAl9fH2zYsL4Eho3/ATRhTwgFTdgLT8lN2P8HkLwIoSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJTQvLKQXJSIqKjoxEbn4TMnOL4raDCkLzyeB50EauWL8ZSxy0IeZ/CR6WTGf8Sl0/sw8qlC2A9xxrzFi7HvuPn8Dz66/XiIx7D/YAT7GxtMNfGFmu2HURAaDhK5qdV5B95l1da3Ct4ue7FH0ttYD3PBvZOB3Dt/mv2yCya6Ff34X54J+ztFmHegoVYvmYr3C4HITqlGH6nsAQodnlFPryCtfMs0L1TG9SvXx+NW3bE8AnWOOP3EMXdzGVeXmkxOLN9McxrGoJhGDDlG2JPUCy/sTCRt09gcg8z6KgqQdugMuqY1kONSgZQU1ZDwy7D8KfPcym/ZJ6JYI/t6N66Pvc3lLX0oKdbjvu3ce0WWLzrIpLLoMHkWV5R9y5g3C/NoSXpE2o6MNBR49pLv3Zr2Oy8iI8FXSRKQ4CzI35u+SOUJXVUdVCeb2NG2wQdRszHtbB4fmf5oRjlJcJjz+3oamrEfWijKqbo3KUbmtarwb3WrdQIfxwP/qr5v5eyLK+4MH8sHN0JukqqqNeoOarpsx3UsBn235HeydIj/DG+dQW2LbTQa9IKXPEPwZNnzxF62x9O1sNgwLaRTu3euPA0ga+Rx4dgN3SuocXWM8Cw2atx9oof/K/54MDaeTAzVgZTrhYcTt3n9y47yKu8Ut/ewpSOFdn2UkO3sTZw9byGgKuXcNBhFuobsDJSr4O1Ho/Zo/VvxHjisQFmuuw2laoYNMMBLud9cc3XB25/OuKXRibc8dtsxDK8SeOryAnFJq/0V9cwulmeuHpYOSLkeRSSk1MQ/+E1XNfNRiU2rmnaCxefFp/By668MnHMpj9U1Qww/o8DuHfXE/0alGczryZFyEuMgF2zoMO2QbXO0/A4kQ//jeRn6vo14Npu1GrPzx07JwFbLDtz8f6/b0P8F6N/MXx3/w59dlvVrrPxV0LJTA3IK/Ipr3S4LhsOJbZN2o75A2++mAnIgsem6TBv2ADWOzz/PwoSZ7zCor41uTbuY+OMgs340mc3GldgT1LadbHHP4qPygfFJK8cXP9zDrTZL6BS619xO65AfiVKxLYZPdgvVQljVp9FdjH18zIrL1Eqrjmvh5PLdba7st9+nD/61mfT/CLllQVn28FcB+0wYx8+8dHPZODYsoHc9k7T9nPvKSHlzVX0MtWCkn5jHL0bzUc/k/v+BoY31WU7dj3svhbOR8sG8iivnKhADG3AZsnlG+NAQGHRZKXE4dnrd0hI/3x8ilKfw2npVAwaNxcXnxc8q7HEPYRlG0nGbojlLg/5oHxQTPJKxL65P3Odv8e8g//v/Pl55rka1dQZ/NB1Ll5lfE5a/w1lVl5iEXJzPh80ye980Punr8lLBO9NllBh26fJqFWILTRHlYJdM7py7Tdo6en/Z15hlzeiihoDo5ZjcS9RWpvFwGFCW7aeKiy3eRXrlIC8I4/yenFxG2qoMKjCZtfPvvmnUkVIS0/Hp9QMqRdfciNvYqQZm9WrVce2KxF8VD4oJnnFsZ2/Pdf5B9q5Su3EUSEH0dSYgWqNX3DtfeE/JgtlfsKe55/lBUSHnkeXWppg9Jtim+fDfHMeIrwKcEPXmppQYuvvvfG5gwbunw9dtk3rDVqOSKnHqAhH+Yyu59zDSOajZQF5lNeV3dZQY0c3naZsRmR8JE5vW4LRg3qhXYfOGDBmIrY5X0Dkd1xdyfwYCWe7kdzEf9WuMxEaXzxJR3FRTPJKg6v9SK4Tm49dA2nXu15e2YjaOgx78LSAS2jhgYsskLzy+BZ5SYb2989tRpe6JjCs1hCTZi3CurWrsXTuJLSvWwkV6zTHKudAdgD5N2J4rZ0AdbZNW4x3wqci0iqPVaO4dm9nsRUJZSj1kj95ZcFtzXi2LVTQob8FZo/pilo/VEHjli3RuOGPMNBQYrfpoP2vq/DgQ9HJw8tgb2zbsA6rlttiVO+2qKRvBPPB1rgc+p7fQ34otgn7Z15bUEeTzayMmmG79ys+mkdO/FMsH9GCuwyrbNQIh4K/vKIlKySvPL5NXmz3jgvD6sk/510OV9aEsbExdNlhoUQ+zQYvgN/L/CcVETxX/8bJqyUrr+QixOS5ehxXv/W4DUgovM6i1CJ/8krGsWXDocq2haaqHtoNnokzAXcRHh2DyMiXCHDfjZ4/SeauNDHI7mQRy1vEOLvqVzZ7y+sTkmLcoAc2ngzKd1KTH4pNXpIrVuvHt+M+sF7t1phvvxVuJ05gz2ZH1uDtUe/HuqiqpwEVw8Y4HCJlYlAGSF55fIu8kl74YVq/5jAw+hHDZ6+DywU/BN25A//LHnCytUSjKgao3Ho4XEL+nugV49K6iZy8mv+2qfDaIJ5zfMbdfvJ2JFLmJSCpcF45mjsxaVTtALe7hftBsJs9qmkzUDftB98I6ZNi70KvwfXgTmzftQ8OdvPQq40ZKlSsjhHztuFFonydnYpPXiwpkaFYYTUAPxhK1gWx5lZRg1b5imjVdzIO7t+JnvUMoWTYCmeefn0197dC8srjH+Ul+ohDCwdwbdKKzaLeFey34kQct8vb3mSUA6J4Cd3cOxfl2VjdAUsRKbWvZ+OgTd5Vyj42R1E8raoYyJ+8cnHaaSq3TKJOz9/xSkqqlBrhhz71DcCoVsPuGx/46Nd5c/cc+jWULILWwcxdPuzgVH4oVnlx5KYgxP8iDux0wkanbXD2uI4PKblICj2G5pVUoFV/KO4U0/iC5JXHP8orIRhWnSVDBhOscpd+ufuN/37U12CHHHV+gc+7vLUsL69uR3U2ZtLmNwRLu9ooeo/lY5qz76uJmXt8ytStQvI4YR94dBm32Lhmj3l4LuVkkxkZhF+bsf1AuQo2+0ZysdysTCQmxiM2KQW5UpcwsUPJ9ZK5NAZmw/7AWznKrotfXkVw+/B8GCqxZ/Eh9vhQTPomeeXxj/L6EIDf2pQHo1QJ9mely+u1/17UlQwpanSH18s8UaWG+6KPqTqU9JtgT1AMF8tP5msf9PtJE0y5ujgUKF+X0UsaeZRXXLArWhuyJ6DaPXDlRWF7Jf7lgc7VJO1lhiP3PnKx2LvuGNatJcz7zkBwERP5HpssuIyuwZDFeCM/H7f45JUeFw7f0wfg7HkdhU7SaRGwG9yItbc2pu/2K7YzNMkrD3HSTfRvqAtGrxmOPZbSAbPf4Y/R5tzZs9ucfQVWykvIheeG8dBkt1fuMAtP/h7/ZSdgx7RuefVmbEPcFw2XA4/1k1GO3Var13y8yDsWygzyKC9kRMB+hOQeVE0MX3KkwNKVDJxaPYFb+mLScSaefcxrzJSwC+haVTI5Xx5WGzwK3X8siruPGT3rcH2g76IjcjU1UGzySn3mxY6Ny0G9ohnWns1371T2J5zbOAWV1BhUajoKAeHSJwploazKKzc9BncDvOFx3hOXLl3GmX0r0ayiKhj1GrDedJKNXcL58+dx5cZtxGVITCXGo3MbUN9AGYxmFYxZsAU+AfcQ9vQpQu8G4fD6+TCrwNbXqAzr/be+OLnEPDyP7j+yYlQ1xvBZjnD39MX1a1ewa/lMmBowUKlghs1er/m9yw5yKS+WtwFH0ao6m4VrVsKouRvgefk6/Lw9sWWxBWrpq4DRrYkVJx98Pj5FGbiwaQqMJFedy1XD+PmOcDvrCW8fb5w6th1T+7fkLtro1eqOU/eKvulfCIpv2JidiCNLR3D3z6nq1cXwSTawX7EU43u3ha4qGzNpDiePkM9fWjFQVuWV+vwC+jSpCHUNTWhpa0NLlZUS+71LioqqFrS0tKGhoYFKjXrD6w0/SZGbiqtHV6NLQxOoKKlAz8gE1atWRRUT9n1UVKBdpSWsN59HbGbBtEyEv678iQHmP3Dvr6ali/Lly3FXtfTqdIaDcyAKVSkDyKu8JFn07XM70b1xFa69tHXY9iqXdwFNp5o55u3yQlKBeStxRgyOO0yGWSWNvD6koYVy5cpxyy4kd0/UaTUIO70eFeuxWxwU65yX+NMbHHacgZY/VmE7uB50y5eHnr4xWvUahz0X7xX7WpGyKq/s6PtwsreBldVUTJs2DdNnzMRsa2tYW8/BzBnTudgUKyvY2G/G44QvB+nx4Q9x9pATFs+fg6lTrDDz94XY9OcxhDyLYvOzokkID4Xrno1YYD0N02bMxpot+xEcljfpWxaRX3nlkfDmHo7uWIV5MyZj8vTZWOF0ANe/+jyvLLwJ9cexXeuwaN4cTJ8+Hb/b2mOHsyeeRcrnnEAJTNhnI/rVQ1y/6o0LXpfhd+sePiSVzLM0aM6LEAp5l1dZoATk9d9B8iKEguQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZIXsJD8iIIGSB5CQ/JiyBkgOQlPCQvgpABkpfwkLwIQgZu3brFySsrS55+T6dsodDySk5OwapVDrh27TofIYj/hqCgICxevBgikbw9X7TscIVNWtauXYv09MKPlpd7eaWmpmHhgvlYumQRTrm7w83NjQqVEi+nTp3CSnt79O0/EMeOHcPJkyel7kel5IrkO1+00AYLbGwUM/PKzc3FJS9P7N3zJ1zZD+Ti4kKFSokXV1dXHD58GDt27MBxZ2futbT9qJRskRz3Fy54Iie38MOt5V5eBEEQ0iB5EQShkJC8CIJQSEheBEEoJCQvgiAUEOB/1soQh/+KH10AAAAASUVORK5CYII=)
- 20 x 7
- 27 x 19
- 19 + 20
- 20 + 7 + 10 + 9
The correct answer is: 27 x 19
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Mathematics
25 X 72 = ________.
![](data:image/png;base64,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)
25 X 72 = ________.
![](data:image/png;base64,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)
MathematicsGrade-4-
MathematicsVideo
The missing terms are
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)
The missing terms are
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)
MathematicsGrade-4-
MathematicsVideo
The missing term is
![](data:image/png;base64,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)
The missing term is
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)
MathematicsGrade-4-
MathematicsVideo
The missing term is
![](data:image/png;base64,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)
The missing term is
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)
MathematicsGrade-4-
MathematicsVideo
The missing partial product is
![](data:image/png;base64,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)
The missing partial product is
![](data:image/png;base64,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)
MathematicsGrade-4-
MathematicsVideo
The missing partial product in the given area model is
![](data:image/png;base64,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)
The missing partial product in the given area model is
![](data:image/png;base64,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)
MathematicsGrade-4-
MathematicsVideo
23 x 26= __________.
23 x 26= __________.
MathematicsGrade-4-
MathematicsVideo
20 x 14= _______.
20 x 14= _______.
MathematicsGrade-4-
MathematicsVideo
The missing partial product
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)
The missing partial product
![](data:image/png;base64,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)
MathematicsGrade-4-
MathematicsVideo
Name the multiplication strategy.
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)
Name the multiplication strategy.
![](data:image/png;base64,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)
MathematicsGrade-4-