= x(9 Let R be the region in the first quadrant bounded by y x²)¹/2 and the x-axis. The volume of the solid of revolution 2 obtained by rotating R about the y-axis is given by the integral M ST™ T (9ª T(94 – 4y²) ¹/2 dy where M is the maximum value of y in the region R. Do not compute this integral. Instead, determine the value of M. Enter the exact value of M.

Transcribed Image Text:

Let R be the region in the first quadrant bounded by y = x (9 2 — x²)¹/² and the x-axis. The volume of the solid of revolution obtained by rotating R about the y-axis is given by the integral M 1/2 for π (9¹ π( 94 – 4y²) ¹/² dy where M is the maximum value of y in the region R. Do not compute this integral. Instead, determine the value of M. Enter the exact value of M.