Evaluate the iterated integral by converting to polar coordinates. pV 32 – v2 V22 + y2...
Evaluate the iterated integral by converting to polar coordinates
Evaluate the iterated integral by converting to polar coordinates points) | sin(x² + y2)dydx T SHARE Y COMO
Evaluate the iterated integral Sa Wa?-? (x2 + y2); dxdy that is given in cartesian coordinates by converting to polar coordinates.
11. Use polar coordinates to evaluate the integral 1,8-2V(+ y2)<dy dx
Evaluate the iterated integral. 12 [[(x2 - y2) dy dx J-13-2
Change the Cartesian integral to an equivalent polar integral, and then evaluate. 810 PV100 - y2 dx dy -10 - V100 - y2 A) 107 B) 1007 C) 2007 D) 4007 Evaluate the integral. ho 5x + 10y 25° 525-y? j*x + 10% de dx dy to dz dx dy 0 0 A) 625 B) 3125 C) 125 D) 25
(1 point) Evaluate the integral by changing to cylindrical coordinates. 2 ,2 (a2 +y2)32 dz dy dz 2L,2 (1 point) Evaluate the integral by changing to cylindrical coordinates. 2 ,2 (a2 +y2)32 dz dy dz 2L,2
2. Sketch the region of integration, and then evaluate the integral by first converting to polar coordinates. 1 V2-x2 (x + y)dydx
4) Evaluate the iterated integral dx dy. 4) Evaluate the iterated integral dx dy.
Problem #2: Evaluate the following by changing to polar coordinates. 81 - y2 81 - y2 8 + x2 + y2 dx dy + 8 + x2 + 16 - y2 Problem #2: Enter your answer symbolically, as in these examples