Sketch the region of the integration, V . Please include the region that is on the z − x plane also.
Sketch the region of the integration, V . Please include the region that is on the z − x plane also. dydzdr = dydzdr...
y/2 a) Sketch the region of integration in the xy plane. [3] b) Apply the transformation u= 2x and v =>. Invert the transformation to x =f(u,v) and y=g(u,v) for some mappings fand g. [5]
- notaion, to evaluate the integral. Also give a sketch of the region of integration. Please use proper #1. Use the limit-sum definition notation and give details. 2 – 3x) dx (15 points)
To evaluate the following integrals carry out these steps. a. Sketch the original region of integration R in the xy-plane and the new region S in the uv-plane using the given change of variables. b. Find the limits of integration for the new integral with respect to u and v. c. Compute the Jacobian. d. Change variables and evaluate the new integral. х x,y): 0 5x57, 7 sys 6 - -x}; use x=7u, y = 6v - u. S5x25x+7y da,...
(2) In each case, sketch the region of integration, and write down the integral with the order of integration reversed: a,v) dydz;
(2) In each case, sketch the region of integration, and write down the integral with the order of integration reversed: a,v) dydz;
(1 point) Consider the following integral. Sketch its region of integration in the xy-plane. . miten de dy (a) Which graph shows the region of integration in the xy-plane? ? (b) Write the integral with the order of integration reversed: [Ia inte de dy- ." mtej dy de with limits of integration (c) Evaluate the integral (Click on a graph to enlarge it)
Q3. Sketch the region of integration for the integral [5(8,19,2) dr dz dy. (2, y, z) do dzdy. Write the five other iterated integrals that are equal to the given iterated integral. Q4. Use cylindrical coordinates and integration (where appropriate) to complete the following prob- lems. You must show the work needed to set up the integral: sketch the regions, give projections, etc. Simply writing out the iterated integrals will result in no credit. frs:52 (a) Sketch the solid given...
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...
To evaluate the following integral carry out these steps Sketch the original region of integration in the plane and the new regions in the plane using the given change of variables b. Find the limits of integration for the new integral with respect to and Compute the Jacobian d. Change variables and evaluate the new integral sexy-2- S23, where = {x} Os 105x2 - y2- a. Sketch the original region of integration in the wy plane Choose the comed graph...
Sketch the following region in the complex plane: the set of z such that z (32i) 2
Let ∭E (yz)dV, where E = {(x,y,z)/ x = 1 - y^2 - z^2, x>=0} a. Sketch E, the solid of integration. b. Sketch D, the region of integration in the plane the solid is projected onto. c. Evaluate the integral using cylindrical coordinates.