how many wooden cubical blocks of edge 12 cm can be cut from another cubical block of wood of edge 3 m and 60 cm?
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first we have to find the volume of the cut cubical block whose volume is 1728 cu. cm. and then the volume of the whole cubical block whose volume is 46656 cu. cm.
and then divide it
the answer is 27
if it helps mark it as the brainliest
and then divide it
the answer is 27
if it helps mark it as the brainliest
Answered by
4
Each side of big block is 360cm in length. So volume of big block = $360 \times 360 \times 360 \;cm^3$Each side of small block is 12cm in length. So volume of big block = $12 \times 12 \times 12 \;cm^3$So number of small blocks that can fit in big block = $\frac{volume\;of\;big\;block}{volume\;of\;small\;block}$= $\frac{360 * 360 * 360}{12 * 12 * 12} = \frac{12 * 30 * 12 * 30 * 12 * 30}{12 * 12 * 12} = 30 * 30 * 30 = 27,000\; blocks$
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