could use some help on this one, thanks in advance i will rate Suppose that R is the finite region bounded by )v and f(a) Find the exact value of the volume of the object we obtain when rotating...
Use the method of cylindrical shells to find the volume V generated by rotating the region bounded by the given curves about the y-axis. y=2+r-ra, r+y = 2 V = Sketch the region and a typical shell. (Do this on paper. Your instructor may ask you to turn in this sketch.) Need Help? Read It Master It Talk to a Tutor
Find the volume of the solid obtained by rotating the region in the first quadrant bounded by the given curve about the y-axis. y=4-(3-9) Preview Get help: Video Points possible: 1 This is attempt 1 of 5. Submit 0123movies.to.2 Please install a new upgra- INSTALL CANCEL assessment/showtest pholation skip to 7 search
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
Use the method of cylindrical shells to find the volume V generated by rotating the region bounded by the curves about the given axis. y = 3ex, y = 3e-x, x = 1; about the y-axis V = _______
Let R be the region bounded by the following curves. Find the volume of the solid generated when R is revolved about the y-axis. X -1 20 x0, y y sin cubic units The volume of the solid is (Type an exact answer.)
Let R be the region bounded by the following curves. Find the volume of the solid generated when R is revolved about the y-axis. X -1 20 x0, y y sin cubic units The volume of the...
1 Let R be a region bounded between two curves on the r, y-plane. Suppose that you are asked to find the volume of the solid obtained by revolving the region R about the r-axis If you slice the region R into thin horizontal slices, i.e., parallel to the r-axis, in setting up the Riemann sum, then which method will come into play? A. Disc method B. Washer method C. Either disc or a washer method depending on the shape...
Find the volume of the solid region R bounded superiorly by the paraboloid z=1-(x^2)-(y^2), and inferiorly by the plane z=1-y taking into account that when equaling the values of z we obtain the intersections of the two surfaces produced in the circular cylinder given by 1-y=1-(x^2)-(y^2) => (x^2)=y-(y^2), as the volume of R is the difference between the volume under the paraboloid and the volume under the plane you can obtain the dimensions for the integrals and calculate the volume