Evaluate limy→0+ d/dy∫sinj/j^3/2dj (limit of integral from 3 to y^2)
Evaluate limy→0+ d/dy∫sinj/j^3/2dj (limit of integral from 3 to y^2)
reverse the order of integration and evaluate : double integral e^y^2 dy dx and dy=from 2x to 2 and dx= is from 0 to 1. please explain how you reverse it, and show me all the steps in the evaluation of the new integral
score: 0 of 1 pt X 15.1.6 Evaluate the iterated integral. || (x?y-9xy) dy dx S S (x+y=9xy) dy dx= [(Type an integer or a simplified fraction.) Homework: Section 15.1 Matt Score: 0 of 1 pt X 15.1.9 Evaluate the iterated integral. In 2 In 5 3x + 24 dy dx 0 1 In 2 In 5 3x + 2y dy dx = (Type an exact answer.) ints Homework: Section Score: 0 of 1 pt X 15.1.10 Evaluate the iterated...
17. Evaluate the integral. 3 y3 - 2y2 - y dy y2
Evaluate the iterated integral. 12 [[(x2 - y2) dy dx J-13-2
please calculate directly, my answer is (3/2)pi+32/3 is that correct? (15%) Evaluate the line integral -r-y + ) dz+ (z+2cy+3)dy, where C consists of the arc Ci of the quarter circle +y 1,x 2 0,y 0, from (0,-1) to (1,0) followed by the arc C2 of the quarter ellipse 4z2y2 - 4, 2 0, y 20, from (1,0) to (0, 2) (15%) Evaluate the line integral -r-y + ) dz+ (z+2cy+3)dy, where C consists of the arc Ci of the...
v e, v, z)dzdydz where f(e.v.)3 Evaluate the triple integral D and Triple Integral Region R Remember that: H(u, t, u)|J(u, v, w)ldududu F(z, y, z)dV Preview t lower limit Preview น upper limit- U lower limit Preview upper limit w lower limit upper limit H(u, o, w)- Preview Preview Ila Preview H(u, e, w)J(u,v, wdudedu Hint: The focus of this problem is on evaluating the integral and using the Jacobian. v e, v, z)dzdydz where f(e.v.)3 Evaluate the triple...
evaluate the integral Evaluate the integral. [ 6x dy dx 0 - 1734 O 1020 0 - 204 O 102
1. Use Green's theorem to evaluate the integral $ xy dx - x^2 y^3 dy, where C is the triangle with vertices (0,0), (1,0) y (1,2)
dy dr-x2-1 when y(0) = 0. a. Set up an integral for solving y(x) b. Evaluate your answer to the previous part to find y(x) y(x) help (formulas)
(5,3,-2) Evaluate the integral y dx + x dy + 4 dz by finding parametric equations for the line segment from (2,1,5) to (5,3,-2) and evaluating the line integral of (2,1,5) F = yi + x3 + 4k along the segment. Since F is conservative, the integral is independent of the path. (5,3,-2) y dx + x dy + 4 dz= (2,1,5)