Question

please help with Q1 and 3

1. Let V be the solid region in R3 that lies within the sphere 2+y+z2-4, above the zy-plane, and below the cone z -Vx2 + y2 (a) Sketch the region V (b) Calculate the volume of V by using spherical coordinates. (c) Find the surface area of the part of V that lies on the sphere z2 y 24, by calculatinga surface integral. (d) Verify your solution to (c) by calculating the surface integral using MATLAB. 2. For the double integralV+1 dyda (a) Sketch the region of integration in the ry-plane. (b) Obtain an equivalent double integral with the order of integration reversed. (c) Evaluate the reversed integral. 3. Let C be the circular helix with vector equation r(t)c(t)i tjsin(t)k from the point (1,0,0) to (1, 6T, 0) (a) Use MATLAB to sketch the curve C (b) Calculate the work done by the force field F(x, y, z)-ri+ryzj +zk in moving a particle along C. (c) Find the length of C.

Answer 1

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