Let Surface S be that portion of the sphere x2 + y2 + z2 = 9, which is above the plane z = 1. Parametrize this surface and write your final answer in vector function notation.
Find the center and radius of the sphere x2+6x+y2+18y+z2+6z=−50
Let P = (0,0, 2)and let S be the unit sphere with equation x2 + y2 + z2 = 1.The collection of points on the sphere where the tangent plane of the sphere contains the point Pforms a curve. Parametrize this curve.
orientation. Find the volume of the piece of the sphere x2 + y2 + z2-1 which lies both inside the cylinder x2 + y2-1/2 and inside the first coordinate octant (that is, x,y,z 2 0). 4. 5. For the vector field F (2x(y +2)-y2-Z2), what is the surface integral of this field over the unit-radius
1. (13 pts.) Use spherical coordinates to set up the triple integral for the solid that is constructed from a portion of a sphere, x2 +y2 +Z2-1 that lies above the cone φ = π/4 . Do NOT evaluate. 1. (13 pts.) Use spherical coordinates to set up the triple integral for the solid that is constructed from a portion of a sphere, x2 +y2 +Z2-1 that lies above the cone φ = π/4 . Do NOT evaluate.
5. (2 points) Let S be the solid inside both x2+y2 = 16 and x2+y2 + z2 = 32. Consider (a) Write an iterated integral for the triple integral in rectangular coordinates. (b) Write an iterated integral for the triple integral in cylindrical coordinates. (c) Write an iterated integral for the triple integral in spherical coordinates. (d) Evaluate one of the above iterated integrals. 5. (2 points) Let S be the solid inside both x2+y2 = 16 and x2+y2 +...
10. -5 points My Notes Let F be the solid sphere osx2 +y2 + z2 s 1 of radius 1 centered on the origin and let F, be the portion of F that lies in the first octant. Assume that fx, y, z) is a continuous function that is symmetric with respect to reflections through the coordinate planes. That is: r-x, y, z) = f(x, y, z), Rx,-y, z)-/(x, y, z), f(x, y,-z) =rx, y, z). IIL If f(x, y,...
2. Find the area of the part of the surface of the sphere x2 + y2 + Z2-42 that lies within the paraboloid z-x2 + y2. Hints: * Complete the square for ×2 + y2 + Z2-42+ (it is a sphere with center (0, 0,) Find the intersection to determine the region of integration 2. Find the area of the part of the surface of the sphere x2 + y2 + Z2-42 that lies within the paraboloid z-x2 + y2....
You have been asked to find the points on the sphere x2 + y2 + z2 = 36 that are closest to and farthest from the point (1, 2, 2). Then which of the following is incorrect from the following: Select one: A. The point on the sphere farthest to the point (1,2,2) is (-2,-4,-4) B. The point on the sphere closest to the point (1,2,2) is (2, 4,4) C. The solutions to the question can be found by solving...
Find the area of the surface. The portion of the sphere x2 + y2 + z2 = 625 inside the cylinder x2 + y2 = 400 d Help? Read It Talk! Talk to a Tutor Tutor