A cone has a height of 18 cm and its base has a radius of 9 cm. If the cone is horizontally cut into two segments 3 cm from the base, what would the surface area of the bottom segment be?

1 Answer
Solace M.
Sep 21, 2017

Surface area ~~148.833cm^2

Explanation:

For a really detailed explanation of how to solve questions like these, check out my other similar answers at

https://socratic.org/questions/a-cone-has-a-height-of-16-cm-and-its-base-has-a-radius-of-3-cm-if-the-cone-is-ho-1#478093 and

https://socratic.org/questions/a-cone-has-a-height-of-16-cm-and-its-base-has-a-radius-of-8-cm-if-the-cone-is-ho-1#476669

R_2 equals
18/3=3/R_2
18R_2=9
R_2=9/18=1/2=0.5

s equals
s=sqrt((3-0.5)^2+3^2)
s=sqrt(6.25+9)
s=sqrt(15.25)

Surface area equals
A_s=pi(sqrt15.25(3-0.5)+3^2+0.5^2)
A_s=pi(38.125+9+0.25)
A_s=pi(47.375)
A_s~~148.833cm^2,
Therefore the surface area of the bottom cone segment is roughly 148.833cm^2.

I hope I helped!

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