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Find the volume of the shape created when rotating the curve In(2x) from x = 1...
Find the exact area of the surface obtained by rotating the curve about the x-axis. y 2x 2 6 1SXS를 플+을- 263 X\ 266 Find the exact area of the surface obtained by rotating the curve about the x-axis. y 2x 2 6 1SXS를 플+을- 263 X\ 266
Find the volume of the solid when rotating the region bounded by the curve f ( x ) = sin ( x 2 ), the line x = π 2, and the line y = 0 about the y-axis. Group of answer choices 2pi pi/3 pi/2 pi
Find the exact surface area obtained by rotating the curve about x-axis y 1,0 3 Find the exact surface area obtained by rotating the curve about x-axis y 1,0 3
Find the volume of the solid created by rotating y=x + 4 around the y-axis, O SX54. Give your answer as a decimal rounded to four decimal places.
Compute the volume of the solid created by rotating the area bounded by the curve y= ex and the x-axis between 2 = O anda 1 around the y-axis. -
Compute the volume of the solid created by rotating the area bounded by the curve y=er and the x-axis between 2 = O and x = 1 around the y-axis.
5. Find the volume of the solid obtained by rotating the region bounded by the curves, y = 2x, x = 0 and y = 10 about the x axis, 5. Find the volume of the solid obtained by rotating the region bounded by the curves, y = 2x, x = 0 and y = 10 about the x axis,
Incorre Find the volume of the solid that results from rotating the region bounded by the graphs of y - 6x - 5 = 0, y = 0, and x = 1 about the x-axis. Write the exact answer. Do not round. Answer Keypad
Instructions: Show all your work for FULL credit. Calculators are NOL final answer. Neatness is highly appreciated. 1. A region R, bounded by y 2x, y 6-x, and x-axis, is rotated around the y-axis. Sketch the region R, in the box a) 15 strip/slice you will use to find the volume of the solid of revolution. b) Write the definite integral that gives a X the volume of the solid of revolution. (DO NOT evaluate the integral.) Find the circumference...
4. Find the volume of the solid formed by rotating the region bounded by y = e^(2x) and y = 2Vx from x = 0 to x =1 about the x- axis. Your answer should be correct to 3 places after the decimal point. The volume is