The volume of a sphere is 48 m3. What is the volume of a cylinder if its radius is the same as the sphere’s and its height is equal to the sphere’s diameter?(1 point)

The formula for the volume of a cylinder is given by:

Volume = πr^2h

Since the radius of the cylinder is the same as the sphere's, and the height is equal to the sphere's diameter, we can replace r with the sphere's radius and h with twice the sphere's radius:

Volume = π(r^2)(2r)

The volume of the sphere is given to be 48 m^3. Since the volume is the same for both the sphere and the cylinder, we can equate the two:

48 = π(r^2)(2r)

Simplifying the equation, we get:

48 = 2πr^3

To find the volume of the cylinder, we need to solve for r:

r^3 = (48 / (2π))

r^3 = (24 / π)

r = (24 / π)^(1/3)

Substituting this value of r back into the equation for the volume of the cylinder, we get:

Volume = π((24 / π)^(2/3))(2(24 / π)^(1/3))

Simplifying, we can calculate the approximate value of the volume.

so whats the answer

The exact volume of the cylinder cannot be determined without knowing the value of π. However, the approximate value of the volume can be calculated using a rough approximation for π.

Let's assume π is approximately equal to 3.14.

Plugging this approximation into the equation, we get:

Volume ≈ 3.14((24 / 3.14)^(2/3))(2(24 / 3.14)^(1/3))

Calculating these values, we find that the approximate volume of the cylinder is approximately 334.64 m^3.