Evaluate the improper iterated integral.
We have to first integrate with respect to y and then integrae with respect to x.
4) Evaluate the iterated integral dx dy.
4) Evaluate the iterated integral dx dy.
Evaluate the iterated integral by converting to polar coordinates
Evaluate and then determine if the improper integral $. de converges.
Sketch the region of the integral and evaluate the iterated integral: Slot V1 + x^dxdy.
(a) Set up the appropriate limit(s) to evaluate the improper integral Do not evaluate the limit(s). = dr. (6) Determine whether the following integrals is proper, improper and convergent, or improper and divergent. Justify your answer. *1 + arctan(1) 10 (c) Evaluate the following integral or determine whether it is convergent.
for the iterated integral
sin(x^2) rewrite the integral reversing the order of integration
and evaluate the new integral
Evaluate the given improper integral or show that it
diverges
In a In dx
a) Set up the appropriate limit(s) to evaluate the improper integral Do not evaluate the limit(s). Ś 4. 12 - 31 dr. (b) Determine whether the following integrals is proper, improper and convergent, or improper and divergent. Justify your answer. x + arctan(a) x + 3 $ (c) Evaluate the following integral or determine whether it is convergent. 1 S Edi X-V
Evaluate the iterated integral. (x+y-2xy) dy dx
p® 4.0 + 10 (1) (5 points) Determine whether the improper integral diverges. Evaluate the integral if it converges. Jo .2 + 5x + 2 de converges or دم dr converges or di- (2) (5 points) Determine whether the improper integral verges. Evaluate the integral if it converges.