please check your answer Question Details Let W be the solid in the first octant bounded by the top half of the cyl...
please check your answer Let W be the solid between a hemisphere of radius 3 and a hemisphere of radius 6, but not in the first octant (a) Suppose the density at a point (x, y, z) is proportional to the distance from the origin. Find a formula P(x,y, z) = (b) Use spherical coordinates to set up the integral to find the mass of W For instructor's notes only. Do not write in the box below. Let W be...
Question 11 A solid in the first octant, bounded by the coordinate planes, the plane (x= a) and the curve (z=1-y). Find the volume of the solid by using : #-Double integration technique (Use order dy dx) a=51 b-Triple integration technique (Use order dz dy dx) ..
please check your answer x,y and z are measured in cm Let W be the solid between a hemisphere of radi us 3 and a hemisphere of radius 6, but not in the first octant (a) Suppose the density at a point (x, y, z) is proportional to the distance from the origin. Find a formula P(x,y, z) = (b) Use spherical coordinates to set up the integral to find the mass of W For instructor's notes only. Do not...
Please try helping with all three questions.......please 1 point) Integratef(x, y, z) 6xz over the region in the first octant (x,y, z 0) above the parabolic cylinder z = y2 and below the paraboloid Answer Find the volume of the solid in R3 bounded by y-x2 , x-уг, z-x + y + 24, and Z-0. Consider the triple integral fsPw xyz2 dV, where W is the region bounded by Write the triple integral as an iterated integral in the order...
Evaluate ∫∫∫T 2xy dx dy dz where T is the solid in the first octant bounded above by the cylinder z = 4 − x^2 below by the x, y-plane, and on the sides by the planes x =0, y = 2x and y = 4. Answer: ∫ (4, 0) ∫ (y/2, 0) ∫ (4−x^2, 0) 2xy dz dx dy = ∫ (2, 0) ∫ (4, 2x) ∫ (4−x^2, 0) 2xy dz dy dx = 128/3
8. Let E be the solid in the first octant bounded by: the plane 2x + y + z = 8, the vertical cylinder y = x2, and the coordinate planes x = 0 and z = 0. For each of the three parts below you must illustrate your solution with diagrams in 2 and 3 dimensions. Marks will be given for the quality of the diagrams and how they are able to help the reader understand the way in...
Find the volume of the given solid region in the first octant bounded by the plane 2x + 2y + 4z4 and the coordinate planes, using triple integrals 0.0(020 Complete the triple integral below used to find the volume of the given solid region. Note the order of integration dz dy dx. dz dy dx Use a triple integral to find the volume of the solid bounded by the surfaces z-2e and z 2 over the rectangle (x.y): 0 sxs1,...
(a) Let R be the solid in the first octant which is bounded above by the sphere 22 + y2+2 2 and bounded below by the cone z- r2+ y2. Sketch a diagram of intersection of the solid with the rz plane (that is, the plane y 0). / 10. (b) Set up three triple integrals for the volume of the solid in part (a): one each using rectangular, cylindrical and spherical coordinates. (c) Use one of the three integrals...
please show complete work 25) Use a triple integral in the coordinate system of your choice to find the volume of the solid in the first octant bounded by the three planes y =0 z 0, and z 1-x x y2. Include a sketch of the solid as well as appropriate projection and an Hint: for rectangular coordinates, use dV might not be given in the exam dz dy dx. This hint 25) Use a triple integral in the coordinate...
calculus 3. Answer all of the following, I will rate your work if you do so. Evaluate the double integral || xy2da, where Ris the region in the first quadrant enclosed by the circle x2 + y2 = 4 and the lines x = 0 and y = x. Evaluate the iterated integral. 1 ya x-y xy dz dx dy xy dz dx dy 0 V The figure below shows the solid region Ein the first octant bounded by the...