Compute the surface area of revolution of ?=4?+3 about the x-axis over the interval [2,3]. ? = ??
Compute the surface area of revolution of ?=4?+3 about the x-axis over the interval [2,3]. ?...
Compute the surface area of revolution about the x-axis over the interval [0, 1] for y = -6 (Use symbolic notation and fractions where needed.) S =
Compute the surface area of revolution about the x-axis over the interval [0,1] for y=e^(−3x.) (Use symbolic notation and fractions where needed.)
3. Find the area of the surface of revolution obtained by rotating the graph of y = 2x around the x-axis for the interval 0 Sxs To Give exact answer only.
Find the surface area of the solid of revolution obtained by
rotating the curve
x=(1/12)(y^2+8)^(3/2)
from ?=2 to ?=5 about the x-axis:
(1 point) Find the surface area of the solid of revolution obtained by rotating the curve X= +8)3/2 from y = 2 to y = 5 about the x-axis:
Determine the total surface area and total volume generated by a
complete revolution about the Y-axis of the given figure
Find the area under the graph off over the interval [ - 2,3]. x2 + 4 x51 f(x) = { 5X X> 1 The area is (Simplify your answer.)
find the volume of the solid of revolution generated by rotating
the given area about the given axis
x y22, y + 4; about the line 1 (ignore the lines in the area) = 2 y22 1 6 4 -1
x y22, y + 4; about the line 1 (ignore the lines in the area) = 2 y22 1 6 4 -1
Can
you please do 3 a, b and 4 (b&c)
3. Find an integral that represents the area of the given surface of revolution. 2, about the vertical line, 2. (b) (22+ 8vi), 1sts4, about the horizontal line, y 4. 4. Find an integral that represents the volume of the given solid of revolution. (b)(22+플, 8vE). (e)(2 + cost, sin t), 4, about the horizontal line, y=4. 1st about they-axis. 2π, 0 t
3. Find an integral that represents the...
Identify the integral used to determine the surface area of the surface of revolution for the shape described Byy=3 sin() +3, where 0sxsrevolved about the x-axis. ° 675,* (sin(ž) /1+cos?(łJdx © 205,* (sin(?) / 1+cos ( Jax ® 615,*(sum() + 1)/2+cos( © 608,5 (sin(5) + 1) /1-cos?(łJax
Compute the volume of the solid of revolution obtained by
rotating the region
about the x-axis
fist 50 7 7 1 : (8 *r)} = x