Radius of the base of the cylindrical oil can is 4 m find its height if it can contain 1408 kilo litres of oil

your text or your notes should have the formula for the volume of cylinder.

If you had water we could assume that 1 L = 1 kg
but not with oil

so we need more information about the mass you your oil

To find the height of the cylindrical oil can, we need to use the formula for the volume of a cylinder. The formula for the volume of a cylinder is:

Volume = π * radius^2 * height

Given that the radius of the base of the oil can is 4 m, we can substitute this value into the formula:

Volume = π * (4^2) * height

Since we know that the can can contain 1408 kilolitres of oil, we need to convert this volume to cubic meters. There are 1000 liters in a kilolitre, and 1 cubic meter is equal to 1000 liters. So, 1408 kilolitres is equal to 1408000 liters, which is equal to 1408000 cubic meters.

Now we can substitute the volume into the formula and solve for the height:

1408000 = π * (4^2) * height

Simplifying the equation:

1408000 = 16π * height

Dividing both sides by 16π:

height = 1408000 / (16π)

Using the value of π as approximately 3.14159:

height ≈ 1408000 / (16 * 3.14159)

Evaluating the right side of the equation:

height ≈ 1408000 / 50.26544

height ≈ 28044.21 meters

Therefore, the height of the cylindrical oil can is approximately 28044.21 meters.

V=area of base x height. area of base = pi R^2. 1 ml = 1 cm^3. convert all numbers to same units and divide through to get H.

1,408,000,000 / (3.14x400x400)=2802.5 cm = 28.03 M.

the radius of the base of a cylindrical oil can is 4m. Find its height if it can contain 1408 kilolitres of oil