Cylinder A has a radius of 1m nad a height of 3m. Cylinder B has a rauis of height 3m. What is the ratio of the volume of cylinder A to the volume of cylinder B?

To find the ratio of the volume of cylinder A to the volume of cylinder B, we need to calculate the volume of each cylinder.

The volume of a cylinder is given by the formula: V = π * r^2 * h

Let's calculate the volume of cylinder A first:

V_A = π * (r_A)^2 * h_A

Given that cylinder A has a radius (r_A) of 1m and a height (h_A) of 3m, we substitute these values into the formula:

V_A = π * (1)^2 * 3
V_A = 3π

Now, let's calculate the volume of cylinder B:

V_B = π * (r_B)^2 * h_B

Given that cylinder B has a radius (r_B) of 3m and a height (h_B) of 3m, we substitute these values into the formula:

V_B = π * (3)^2 * 3
V_B = 27π

Finally, we can find the ratio of the volume of cylinder A to the volume of cylinder B:

Ratio = V_A / V_B
Ratio = 3π / 27π
Ratio = 1 / 9

Therefore, the ratio of the volume of cylinder A to the volume of cylinder B is 1:9.

To find the ratio of the volume of cylinder A to the volume of cylinder B, we first need to calculate the volumes of both cylinders.

The volume of a cylinder can be calculated using the formula V = πr^2h, where V is the volume, r is the radius, and h is the height.

For cylinder A:
- Radius (r) = 1m
- Height (h) = 3m

Using the formula, we can calculate the volume of cylinder A:
V(A) = π * (1^2) * 3 = 3π cubic meters

For cylinder B:
- Radius (r) is not given, but we know the height is 3m.

Since the radius is not given, we cannot directly calculate the volume of cylinder B. However, we can compare the volumes of the cylinders using the given ratio.

Therefore, the ratio of the volume of cylinder A to the volume of cylinder B is 3π : unknown, or simply 3π to 1.

V/v = (R/r)^2 * H/h

Not clear just what that ratio is; you garbled the problem.