SBHS4EVER
Member
THis is in Patel's blue book-
the integral of 1/ sqrt x times srqt(1 - x)
HOW??????
the integral of 1/ sqrt x times srqt(1 - x)
HOW??????
-
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Integration sUBSTITion (1 Viewer)
- Thread starter SBHS4EVER
- Start date
a = integral sqrt(1 - x)/sqrt(x) dx
so let x = cos^2(@)
dx/d@ = -2sin@cos@
dx = -2sin@cos@ d@
so,
a = integral sqrt(1 - x)/sqrt(x) * (-2sin@cos@) d@
= integral sqrt(1 - cos^2(@))/sqrt(cos^2(@)) * (-2sin@cos@) d@
= integral sqrt(tan^2(@)) * (-2sin@cos@) d@
= integral -2sin@cos@tan@ d@
= integral -2sin^2(@) d@
now use the identity, sin^2(@) = 1/2 - (cos2@)/2
so
a = integral -2(1/2 - (cos2@)/2) d@
= integral (-1 + cos2@) d@
= -@ + (sin2@)/2 + C
= -@ + sin@cos@ + C
= -@ + cos@sqrt(1 - cos^(@)) + C
now @ = acos(sqrt(x))
{acos means inverse cosine}
so,
a = -acos(sqrt(x)) + sqrt(x) * sqrt (1 - x) + C
= -acos(sqrt(x)) + sqrt(x/(1-x)) + C
so let x = cos^2(@)
dx/d@ = -2sin@cos@
dx = -2sin@cos@ d@
so,
a = integral sqrt(1 - x)/sqrt(x) * (-2sin@cos@) d@
= integral sqrt(1 - cos^2(@))/sqrt(cos^2(@)) * (-2sin@cos@) d@
= integral sqrt(tan^2(@)) * (-2sin@cos@) d@
= integral -2sin@cos@tan@ d@
= integral -2sin^2(@) d@
now use the identity, sin^2(@) = 1/2 - (cos2@)/2
so
a = integral -2(1/2 - (cos2@)/2) d@
= integral (-1 + cos2@) d@
= -@ + (sin2@)/2 + C
= -@ + sin@cos@ + C
= -@ + cos@sqrt(1 - cos^(@)) + C
now @ = acos(sqrt(x))
{acos means inverse cosine}
so,
a = -acos(sqrt(x)) + sqrt(x) * sqrt (1 - x) + C
= -acos(sqrt(x)) + sqrt(x/(1-x)) + C