 Hello and welcome to the session. In this session we discussed the following question which says a cylinder and the cone are of the same base radius and the same height. Find the ratio of the volume of the cylinder to that of the cone. Let's proceed with the solution now. Let the base radius of the cylinder and the cone be equal to r since it's given that the cylinder and the cone have the same base radius so we have taken that to be r. Also suppose the height of the cylinder and the cone be equal to h since the cone and cylinder have the same height so we have taken that to be h. Now volume of the cylinder be equal to V1 is given by pi r square into h. Let's consider volume of the cone be equal to V2 is given by 1 by 3 pi r square h. We have to find the ratio of the volume of the cylinder to that of the cone. That is V1 upon V2 is equal to pi r square h upon 1 upon 3 pi r square h. Now pi r square h and pi r square h gets cancelled and we have V1 upon V2 is equal to 1 upon 3 or you can say we have V1 upon V2 is equal to 3 upon 1. That is V1 is 2, V2 is equal to 3 is to 1 or you can say that the ratio of the volume of the cylinder to the volume of the cone is equal to 3 is to 1. So this is our final answer. This completes the session. Hope you have understood the solution of this question.