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(Solved): Arrange the integrals in increasing order. In the answer boxes, you should enter the letters associa ...
Arrange the integrals in increasing order. In the answer boxes, you should enter the
letters associated to the integrals, starting with the letter representing the integral
with the smallest value
A=\int_0^1 xsin^(2)(\pi x)dx
B=\int_0^(\pi ) sin^(3)xdx
C=\int_(-1)^1 (sin(\pi x)+cos(\pi x))^(4)dx
D=\int_(-\pi )^(\pi ) xcos^(3)xdx
E=\int_(-\pi )^(\pi ) xsinxcos^(3)xdx
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Blank # 5 Please read the following instructions carefully.
If asked which method(s) you should use to evaluate an integral, you
should select all methods you use. So, if you have to use basic substi-
tution before using integration by parts, for example, you would select
both methods.
The basic integrals are 1-17 listed here. So, an integral of the form
\int (dx)/(x^(2)+a^(2)) would be considered basic substitution, NOT trigonometric sub-
stitution. But to evaluate the integral \int lnxdx you would need to use
integration by parts, not the table.
Enter all numbers as a decimal, if it is not a whole number. For example,
0.5 instead of (1)/(2)
