Question

pls help me

Container A is cylinder with a radius of 6 units and a height of 6 units. A right cone has been carved from its base and has a height of 6 units. Container B has the same radius as container A. Which statement derives the formula to find the volume of container A?

container A is a right cylinder that has had a right cone subtracted from its base, container B is half of a sphere

1 over 3π(62)(6) − π(6^2)(6)
2[1 over 3π(62)(6) − π(6^2)(6)]
2[π(62)(6) − 1 over 3π(6^2)(6)]
π(62)(6) − 1 over 3π(6^2)(6)

Answer 1

so container A is a right cylinder that has a right cone subtracted from its base

Can you screenshot the image for more clarity?

otherwise, the volume of container A is going to be

(volume of right cylinder) minus (volume of right cone)

do you know the formula for volume of a cylinder and volume of a cone?

Answer 2

Good, that image helps

Do you know the formulas?

\( \text{Volume of cylinder} = \pi r^2 h\)

\( \text{Volume of cone} =\dfrac{1}{3} \pi r^2 h\)

remember what I said about the volume for your question?

It's volume of the cylinder minus volume of cone

can you plug in r = 6 and h = 6

what is your final answer?