The edges of the bases of the frustum of a regular square pyramid have lengths 5 and 9, and the slant height of the frustum is 6. What is the volume of the frustrum I will give …

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asked Nov 17, 2023 115k views

1 Answer

Aserwin · Answer 1 · 2023-11-23T20:51:24+0000

We know that,

$V = (1)/(3) (a{}^(2) + ab + b{}^(2))h \\$

Also,

$l {}^(2) = h {}^(2) + (b - a) {}^(2)$

$6{}^(2) = h {}^(2) + (9 - 5) {}^(2)$

$36 = h {}^(2) +16$

$h {}^(2) = 36 - 16$

h = √(20)

h = 4.47

Now , putting the value in the formula of volume

we get,

$V = (1)/(3) (5{}^(2)+ 5 * 9 + 9{}^(2))4.47 \\$

$V = (1)/(3) (25 + 5 * 9 + 81)4.47 \\$

$V = (1)/(3) (25 + 45 + 81)4.47 \\$

$V = (1)/(3) * 151 * 4.47 \\$

V = 224.99

Hence, the volume of the given frustum is 224.99 cubic unit