Mathematics
Grade-4-
Easy
Question
A factory manufactures 90 donuts in a day. The total number of donuts that would be manufactured by them in the month of December.
- 2,790
- 300
- 3,500
- 200
The correct answer is: 2,790
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The expression that can be solved by completing the following whole model.
![](data:image/png;base64,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)
The expression that can be solved by completing the following whole model.
![](data:image/png;base64,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)
MathematicsGrade-4-
MathematicsVideo
Multiplication problem represented by the following area model.
![](data:image/png;base64,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)
Multiplication problem represented by the following area model.
![](data:image/png;base64,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)
MathematicsGrade-4-
MathematicsVideo
Break apart 12 into _____.
Break apart 12 into _____.
MathematicsGrade-4-
MathematicsVideo
95 x 12 = ____.
95 x 12 = ____.
MathematicsGrade-4-
MathematicsVideo
A car factory manufactures 75 cars each month. The number of cars will be manufactured in the factory in one year is
A car factory manufactures 75 cars each month. The number of cars will be manufactured in the factory in one year is
MathematicsGrade-4-
MathematicsVideo
An orchard has 46 rows of mango trees. If there are 50 trees in each row. The total number of mango trees in the orchard is
An orchard has 46 rows of mango trees. If there are 50 trees in each row. The total number of mango trees in the orchard is
MathematicsGrade-4-
MathematicsVideo
carton holds 24 packets of biscuits. Each packet has 12 biscuits. The number of biscuits are there is
carton holds 24 packets of biscuits. Each packet has 12 biscuits. The number of biscuits are there is
MathematicsGrade-4-
Mathematics
25 X 72 = ________.
![](data:image/png;base64,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)
25 X 72 = ________.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIoAAABTCAMAAAB3aG+xAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAIBUExURf////7+/v39/fz8/Pv7+/r6+vLy8unp6eLi4uDg4OHh4eXl5ePj49/f3+bm5ujo6OTk5PPz8/Hx8c3Nzaenp52dnampqaqqqqioqKysrKurq6KiopaWlqampqOjo8vLy3FxcXR0dJGRkZWVlZOTk5KSkpSUlI+Pj5CQkGtra0BAQEtLS3d3d46Ojn5+fnJycvj4+NbW1qCgoIWFhaWlpc7OztHR0dDQ0M/Pz8PDwzQ0NE5OTsbGxszMzHx8fJubm/b29kJCQmFhYcnJyd3d3dXV1aSkpD4+PllZWcLCwvn5+d7e3tjY2JqamvT09L+/v5+fn0NDQ1xcXMHBwdra2p6enj8/P/f39+fn511dXdfX16GhoV9fX/X19dzc3F5eXtvb29nZ2cTExEFBQcXFxVtbW4yMjK2trdPT09TU1NLS0ouLi1hYWLOzs4GBgXNzc319fZeXl5iYmJmZmW1tbU9PT39/f2lpaWVlZYmJiYiIiIaGhoqKioeHh4ODg2BgYDc3N2pqaoKCgoSEhHt7e2ZmZry8vPDw8Hp6eri4uLm5ubW1tba2trS0tLCwsLGxsXV1dTY2NklJSbe3t7u7u+/v7+7u7mJiYr6+vsfHx+zs7O3t7Tw8PFpaWkRERJycnMDAwK6ursrKyjg4OFNTUz09PVZWVrq6ur29vevr6wAAAGEJ3iQAAACrdFJOU///////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////ALcqPWwAAAAJcEhZcwAAFxEAABcRAcom8z8AAAPmSURBVGhD7VpLsqwgDHUXbMIVdBUzdsSMuTuwGDrsdb78QO5TPtVRq9/nCIqBG+IhBJvr9B9/BmJ0glz4AZRCm6LytB20iKLxU0RrvGkBa33w7UYAb6yo/BTOLDN0FIpjT3QLx7Jt0ChwJctySs3mxTjR+SGcD8Za6yDzmUuAXLA2vN6eBJxSXdHCWTN73Qjh+PQfxr+WLvvOK02ZwJRuL9Fs71XKVYAp6gHqmwKs3G4KMOrGWFnWHvsuKN02gikNDdx/BFa69trbfQXVk69AodoVVqhZGTPFb4ut2JHFLmhZEV8hLQdVSeDTDDrtjIXqGYRxJbFy2g8CfKXKSoZ+gJzprx3JV5rQx5WhELdH27pBt88g0t6ZQSx+jpV+tNX5CjzPYLR9991WPYPcwCsPRVsx5dQiFOp9pcMKaSdfodsziAFP+crIAF2xHKIp7Y52U+rtLmGlqwFZ6c6gZ3wlsXLelUj1M+h7fGUoruwrc4UZFD7lKwPR9lpfQVWQc6KMl99X5tyiEOon8+ga1J/Mj/hKO9oKnoq2A29xal/pRVuSl75y2hCFl7JSM4dZoQLdnsM+5ystMxD6aNt+X+H+KdpSqQGYQT1rOxiNtv3AD6yobBl7izMDv5mvYCUY68oNpAOcDdvb/NhkOsDZddbOIOfnmXbVGqC9OClXMS8DI92E88sSGDPl/cjCsLw2bJSEexM+qNW8zN1Z1gaw4tfVpFTk4phfW5AKvMdUZkONgtZZcAbFKUbKcuEMZ5aBubjrtNflQpGnuHpdjIPAP7D1i/srUqzDeiUrI8th+RZXRQRTdFNoaGXGuNJ4YqrCAVKxklbmOlB9WoNaXV3CSlcB/WaW8gHJPDUr5Rp0UJR7AVbaaxBUwqupdgbxbna7I5zMUuTLCS5l5dgRPixecQalumN3LFH7ytB/PprvK2QInC5mpYaSlRoeiivCStMaJSvwpx1WWPkjrIzvJEiRLz/Asr/NV9oKwARipWkKNrqKlYoSESMrXDqBtHnQV7BHyBWboeKf8hVAM9oSkK67WWHlTVak4vG4Use1MyidcpL7xAoWWZpKfEe4xFe+hJX+uy2i6SuCm1mR7of24i6dQaToVBuyAheoy23KTNDPoLH/kvXWIMAD0RbVCys1kAVXsNKKtvyYpa9UH/wBVgBDu9loyrf4CgyQjhVrApgS6eC0H5LAV14cV9I9X4uEJy0ruMcJvcQ2yJQ2Jqc3xZpVvj2sIDrr5wCNzj9szFhNNyI3Ac9jQQ1+IynfScIpJwbYslpuVUgziqai9FPQQKfxpkJRYuAAHoQZuUI03Yi79RP2Th7proJp+gX8eQSuQ3H+oQAAAABJRU5ErkJggg==)
MathematicsGrade-4-