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Question 13
A cylindrical bucket of height 32 cm and base radius 18 cm is filled with sand. This bucket is emptied on the ground and a conical heap of sand is formed. If the height of the conical heap is 24 cm, find the radius and slant height of the heap.


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Solution

Given, radius of the base of the bucket = 18 cm.
Height of the bucket = 32 cm

So , volume of the sand in cylindrical bucket
=πr2h=π(18)2×32=10368π

Also, given height of the conical heap (h) = 24 cm
Let radius of heap be r cm.

Then, volume of the sand in the heap
=13πr2h
=13πr2×24=8πr2

According to the question.
Volume of the sand in cylindrical bucket = Volume of the sand in conical heap

10368π=8πr210368=8r2r2=103688=1296r=36 cm

Again, let the slant height of the conical heap = l
Now,
l2=h2+r2=(24)2+(36)2=576+1296=1872
l=43.267 cm

Hence, radius of conical heap of sand = 36 cm
and slant height of conical heap = 43.267 cm


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