Question

if a right cylinder have the same radius and height as the oblique cylinder shown here, what is the volume of the right cylinder? Use 3.14 for pi. Round to the nearest whole number.​

Answer 1

Answer:

Approximately 1696 units cubed.

Step-by-step explanation:

The volume for an oblique cylinder is the same for the volume of a right cylinder.

Therefore, if we find the volume of the given oblique cylinder, then a right cylinder with the same height and radius will have the same volume.

The volume for an oblique cylinder is given by the formula:

$V_{oblique}=\pi r^2h$

The radius is 6, height is 15, and we're using 3.14 for π. Therefore:

$V_{oblique}=(3.14)(6)^2(15)$

Use a calculator:

$V_{oblique}\approx1695.6\approx1696$

And, like previously said, if an oblique and right cylinder has the same radius and height, then their volumes are the same. This means that the volume of the right cylinder is:

$V_{right}=V_{oblique}\\V_{right}\approx1696\text{ units}^3$