Understanding Engineering Mathematics

(やまだぃちぅ) #1
So ∫
sinxcosxdx=

1
2


sin 2xdx

=−

1
4

cos 2x+C

Refer back to Review Question 9.1.6(iv) for an alternative form of
this.

9.2.9 Using trig substitutions in integration



252 283➤

Trig or hyperbolic substitutions may help you to deal with some rational and irrational
functions. Thus if you have



a^2 −x^2 tryx=asinθ orx=tanhθ

x^2 −a^2 tryx=acoshθ orx=secθ

a^2 +x^2 tryx=asinhθ orx=tanθ

The form of the substitution may depend on the range of values ofx.
Another useful trig substitution is


t=tanθ/ 2

With this we have


cosθ=

1 −t^2
1 +t^2

, sinθ=

2 t
1 +t^2

We also have to change betweendθanddtof course. We have



dt

=

1
2

sec^2

θ
2

=

1
2

(
1 +tan^2

θ
2

)
=

1
2

( 1 +t^2 )

from which


dθ=

2 dt
1 +t^2

This substitution can sometimes be used to convert an integral of the form



f(cosθ,sinθ)dθ

to an integral of a rational function int, which may be easier to deal with.

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