So, the volume of the solid of revolution is Volume = V = TI (9 - x2)2 dx. To find the volume, integrate from x = to x = 3. V = T (x4 – 18x² + 81) dx 18x + 81 18. 0 + (81 · 3-0) 243 + 243 3. 15
So, the volume of the solid of revolution is Volume = V = TI (9 - x2)2 dx. To find the volume, integrate from x = to x = 3. V = T (x4 – 18x² + 81) dx 18x + 81 18. 0 + (81 · 3-0) 243 + 243 3. 15
Holt Mcdougal Larson Pre-algebra: Student Edition 2012
1st Edition
ISBN:9780547587776
Author:HOLT MCDOUGAL
Publisher:HOLT MCDOUGAL
Chapter10: Measurement, Area, And Volume
Section10.8: Volumes Of Pyramids And Cones
Problem 13E
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