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5. Find the area of the surface obtained by revolving the curve y = sin(x), for 0 S&ST, about the x-axis. (10) 6. Work out dr. [10] 23-2+2-1
5. Find the area of the surface obtained by revolving the curve y = sin(x), for 0 < x <TT, about the z-axis. [10] 6. Work out si 23 - 22 +7 +59 dx. [10] 23 x2 + x - 1
Find the area of the surface generated by revolving the curve x = 50sys5, about the y-axis. The area of the surface generated by revolving the curve x = (Type an exact answer in terms of .) Osys5, about the y-axis is square units.
Set up the integral to represent the surface area of the solid obtained by revolving y=x^2 + sin(2x) on the interval [ 0, (π/2) ] about the x-axis. DO NOT solve.
1 Question 1 Not yet Find the area of the surface generated by revolving the curve about the indicated axis. Marked out of 1.00 Flag question V , 0.5 SX s 1.5; x-axis Select one: A. TE B. 6 . C. 71 D.51
Find the area of the surface obtained by revolving the curre ya 83 osxs 2, about the t-axis
Find the area of the surface generated by revolving the curve y= 0sxs6, about the x-axis The area of the surface is (Type an exact answer, using t as needed.) n Enter your answer in the answer box Find the area of the surface generated by revolving the curve y= 0sxs6, about the x-axis The area of the surface is (Type an exact answer, using t as needed.) n Enter your answer in the answer box
a. Set up an integral for the area of the surface generated by revolving the curve x = 3 sin y, 0 sys about the y-axis. b. Graph the curve. c. Use technology to find the surface area numerically. a. Set up an integral for the area of the surface generated by revolving the curve x = 3 sin y, 0 sys about the y-axis. b. Graph the curve. c. Use technology to find the surface area numerically.
Question 5. Write an integral for the area of the surface generated by revolving the curve y = cost, for Sos, about the n-axis. 2 Question 6.
(1 point) Find the area of the surface obtained by rotating the curve y = yæ about y-axis for 1 < y < 2. Area: