Question

A cone has a height of `16 cm` and its base has a radius of `5 cm`. If the cone is horizontally cut into two segments `12 cm` from the base, what would the surface area of the bottom segment be?

Answer 1

`330.31cm^2 "to the nearest 2 decimal places"`

Explanation:

`16/5=tan theta=72^@38'46''`

`cot72^@38'46'' xx4.0=1.25cm="r top area"`

`:."F=lateral area"=pi(r_1+r_2) sqrt ((r_1-r_2)^2+h^2)`

`:.F=pi(5+1.25) sqrt( (5-1.25)^2+12^2)`

`:.F=pi(6.25) sqrt( (3.75)^2+12^2)`

`:.F=19.63495408 sqrt( 14.0625+144)`

`:.F=19.63495408 sqrt( 158.0625)`

`:.F=19.63495408 xx 12.57229096`

`:.F=246.8563557`

`:.S=F+pi(r_1^2+r_2^2)`

`:.S=246.8563557+pi(5^2+1.25^2)`

`:.S=246.8563557+pi(25+1.5625)`

`:.S=246.8563557+pi(26.5625)`

`:.S=246.8563557+83.44855486`

`:.S=330.3049105`

`:."Total surface area o frustum or truncated cone=330.31"cm^2 "`

`"to the nearest 2 decimal places"`