Question

(1 point) Evaluate the integral by reversing the order of
integration.

∫3 0∫3 ? 24?^(3?^2)????

Answer #1

Evaluate the integral by reversing the order of integration.
1
0
3
7ex2 dx dy
3y

Evaluate the integral by reversing the order of integration.
2
0
2
6ex/y dy dx
x

Rewrite the following integral using the indicated order of
integration and then evaluate the resulting integral. Integral from
0 to 3 Integral from negative 1 to 0 Integral from 0 to 4 x plus 4
dy dx dz in the order of dz dx dy

Evaluate by reversing the order of integration. A solution with
clear steps would be appreciated. Thank you in advance.
e3
∫
1
3
∫
ln x
1/
(e y − y)
dy dx

For the following integral
Sketch the region of integration.
Reverse the order of integration.
Evaluate the integral in (b)
04y22ex2dxdy

Draw a diagram of the region of integration.
Then reverse the order of integration and evaluate the
integral
0.∫3 0∫9−x^2 xe^5y/(9−y) dy dx

Sketch the region of integration.
3
0
3
sin
x2dx dy
y
Evaluate the iterated integral. (Hint: Note that it is
necessary to switch the order of integration. Round your answer to
four decimal places.)
3
0
3
sin
x2dx dy
y
=
0
sin
x2dy dx ≈
0

Draw a diagram of the region of integration.
Then reverse the order of integration and evaluate the
integral
0.∫3 0∫9−x xe^5y/(9−y) dy dx

Use Romberg integration to evaluate the integral of e^(-x^2 )
between the limits a=1 and b=2.5. Use the initial h=b-a. Find the
integral to an error of order O(h^6).

Evaluate the integral using integration by parts with the
indicated choices of u and dv. (Use C
for the constant of integration.)
xe5xdx; u
= x, dv =
e5xdx
2. Evaluate the integral. (Use C for the constant of
integration.)
(x2 + 10x) cos(x) dx
3. Evaluate the integral. (Use C for the constant of
integration.)
cos−1(x) dx
4. Evaluate the integral. (Use C for the constant of
integration.)
ln(
x
) dx

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