? ᇱᇱ(?) = 5 sin ?, ? ᇱ(0) = −2 and ?(0) = 4. Find ?(?)....

The region bounded by ?=2+sin?, ?=0, ?=0 and 2? is revolved about the ?y-axis. Find the...

The region bounded by ?=2+sin?, ?=0, ?=0 and 2? is revolved about the ?y-axis. Find the volume that results. Hint: ∫?sin???=sin?−?cos?+? Volume of the solid of revolution:

5. Find the area bounded by the curves: two x = 2y - y^2 ; x...

5. Find the area bounded by the curves: two x = 2y - y^2 ; x = 0. 6. Find the surface area of ​​the solid of revolution generated by rotating the region along the x-axis. bounded by the curves: ? = 2?; y = 0 since x = 0 until x = 1

1- Find the area enclosed by the given curves. Find the area of the region in...

1- Find the area enclosed by the given curves. Find the area of the region in the first quadrant bounded on the left by the y-axis, below by the line   above left by y = x + 4, and above right by y = - x 2 + 10. 2- Find the area enclosed by the given curves. Find the area of the "triangular" region in the first quadrant that is bounded above by the curve  , below by the curve y...

Let F = < 2?, −2? > and ?, the region bounded by ? = sin...

Let F = < 2?, −2? > and ?, the region bounded by ? = sin ? and ? = 0, for 0 ≤ ? ≤ ? oriented counterclockwise. a) Evaluate the line integral ∮ ? ∙ ??, b) Find the same result using an appropriate area integral.

1) Using the right endpoint with n = 4, approximate the area of the region bounded...

1) Using the right endpoint with n = 4, approximate the area of the region bounded by ? = 2?2 + 3, and x axis for x between 1 and 3. 2) Use Riemann sums and the limit to find the area of the region bounded by ?(?) = 3? − 4 and x-axis between x = 0 and x = 1

Sketch the region bounded by the given curves. y = 3 sin x, y = ex,...

Sketch the region bounded by the given curves. y = 3 sin x, y = ex, x = 0, x = π/2 Find the area of the region.

et S be the solid obtained by rotating the region bounded by the curves ?=sin(?2) and...

et S be the solid obtained by rotating the region bounded by the curves ?=sin(?2) and ?=0 with 0≤?≤root(?) about the ?y-axis. Use cylindrical shells to find the volume of S. Volume =

The curves x = sin y and y = (x − 1)^2 + π/2 along with...

The curves x = sin y and y = (x − 1)^2 + π/2 along with the line x = 0 create a bounded region, D, in x ≥ 0, 0 ≤ y ≤ 3. (a) Sketch D and identify a type I region D1 and a type II region D2 such that D = D1∪D2. (b) Find the area of D using the regions from a)

A. For the region bounded by y = 4 − x2 and the x-axis, find the...

A. For the region bounded by y = 4 − x2 and the x-axis, find the volume of solid of revolution when the area is revolved about: (I) the x-axis, (ii) the y-axis, (iii) the line y = 4, (iv) the line 3x + 2y − 10 = 0. Use Second Theorem of Pappus. B. Locate the centroid of the area of the region bounded by y = 4 − x2 and the x-axis.

Find the volume generated by rotating the region bounded by y=sin(x), y=0, x=2π, x=3π about the...

Find the volume generated by rotating the region bounded by y=sin(x), y=0, x=2π, x=3π about the y-axis. Express your answer in exact form.