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QUESTION 9 Set up the iterated integral for evaluating S SS Fr, 0, 2) dz r...
Enter the correct limits of integration. Use increasing limits of integration. Set up the iterated integral for evaluating SS S40,0,.2)dz f(r,0,z)dz r dr de over the region D, D where D is the solid right cylinder whose base is a region in the xy-plane that lies inside the cardioid r = 6 +6 cos 0 and outside the circle r=6, and whose top lies in the plane z = 24 SSS fr, 0z) dz r dr de (Type exact answers,...
5. Set up the iterated integral for evaluating SSS, f(r,0,z)dzrdrde over the given region D. D is the prism whose base is the triangle in the xy-plane bounded by the x-axis and the lines y = x and x = 1 and whose top lies in the plane z = 2 – y. z 2 z = 2 - y y = x
14.7.35 firez) dz r dr do as an iterated integral over the region that is R Give the limits of integration for evaluating the integra SSS«.02) . bounded below by the plane z = 0 on the side by the cylinder r = 2 cos 0 and on top by the paraboloid z = 4r? IssType exact answers, using a as needed) The limits of integration for z are
7. (5 pts) By completing the limits and integrand, set up (without evaluating) an iterated inte- gral which represents the volume of the ice cream cone bounded by the cone z = V x2 + y2 and the hemisphere z = V8 - 22 - y2 using (a) Cartesian coordinates. volume = dz dar dy. (b) polar coordinates. volume = dr de.
Question Use cylindrical coordinates to set up the triple integral needed to find the volume of the solid bounded above by the xy-plane, below by the cone z = x2 + y2 , and on the sides by the cylinder x2 + y2 = 4. a) 06.* %* ["dz dr do b) $* * S*rde de do JO 0% ] raz dr do a) $** [Lºdz dr do 0906.*|*Lºrdz dr do 2 po dz dr do Jo J- O J-...
can someone explain the solution for this? 2. Set up an iterated integral for S. 6zdV L" SLO པ་ཁ་ནི where is the region inside the cylinder x2 + y2 - 9 and between the planes 2 = 4 + and 2 = 10. Evaluate the innermost part of the integral only. Solution: In cylindrical coordinates we can write this as 6z dx dr de Jo Jetron) evaluating the inner integral gives 6" / 33 ir con() dr de - 6...
16. Question Details LarCalc11 14.6.017. (3865000) Set up a triple integral for the volume of the solid. Do not evaluate the integral. The solid that is the common interior below the sphere x2 + y2 + 2+ = 80 and above the paraboloid z = {(x2 + y2) dz dy dx L J1/2012 + y2 Super 17. LarCalc11 14.7.004. (3864386] Question Details Evaluate the triple iterated integral. 6**6*6*2 2/4 2 2r rz dz dr de Jo lo 18. Question Details...
U Question 15 "C 7 pts "С If S is the surface of the cylinder E= {(x,y,z) : 32 + y < 4,1523}, oriented outwards, which of the following (after applying the Divergence Theorem) will compute zyz) - dS? 40 O (1 + y2 cos & sin 6)r dr de dz REC O 1988 6%" /*(1 + == sin ®)r dr do dz %%% %%% %%% (r cos 0 + 32 + y2 z cos ( sin 0), dr do...
Problem 1: A) Evaluate the iterated integral. A1) S S**** S*yz dy dz dx Ans: A2) SS, (x + 2y) dV, where E is bounded by the parabolic cylinder y - xand the planes x -2, x = y, and z o Ans: And
and inside the The volume of the solid in-between the half-cones 2= 13.x2 + 3y2 and z= sphere x2 + y2 + x2 = 9 can be given by the integral BDF sin(o) dp do do, with JA JC JE A = [ Select ] B = [Select ] C = [Select ] D = [ Select ] E = [Select ] F = [ Select ] Let f be a continuous function defined on all of R3. Which of...