Ratio of the volumes of a right circular cylinder and a cone on equal bases is 3: 2. Prove that the height
of the cone is twice the height of the cylinder.
Answers
Answered by
0
Answer:
Step-by-step explanation:
V
1
= Volume of cylinder =πr
2
h
V
2
=Volume of cone =
3
1
πr
2
h
∴V
2
=
3
1
V
1
Therefore, V
1
=3V
2
Similar questions