Question

A straight pyramid with a square base is inscribed in a sphere with radius R. Determine the maximum volume of the pyramid.

Answer 1

Answer:

In this problem, first derive an equation for volume using similar triangles in terms of the height and radius of the cone. Once we have the modified the volume equation, we'll take the derivative of the volume and solve for the largest value. The volume of the inscribed cylinder is V = πx^2(h-y).

Step-by-step explanation:

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