Question

The cross-sectional areas of a triangular prism and a right cylinder are congruent. The triangular prism has a height of 5 units, and the right cylinder has a height of 5 units. Which conclusion can be made from the given information?

The volume of the prism is half the volume of the cylinder.
The volume of the prism is twice the volume of the cylinder.
The volume of the prism is equal to the volume of the cylinder.
The volume of the prism is not equal to the volume of the cylinder.

Answer 1

what do you think?

Answer 2

volume of triangular prism=area of triangle *height
volume of cylinder=area of circular base * height
now look at the questin and tell me the answer.

Answer 3

Use @jhonyy9's drawing here to help you figure it out @kekeman.

Answer 4

I feel like it is The volume of the prism is equal to the volume of the cylinder.

Answer 5

\(\color{#0cbb34}{\text{Originally Posted by}}\) @jhonyy9
Created with Raphaël55Reply Using Drawing
\(\color{#0cbb34}{\text{End of Quote}}\)
Am i right?

Answer 6

??????????????

Answer 7

you need prove this so make the calcules

Answer 8

Mmmm ok

Answer 9

Idk how to start by doing that

Answer 10

the area of sector AOB is what fractional part of the area of circle O?
1/6
1/4
1/3

Answer 11

it is 1/6

Answer 12

So what does that mean