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terrylee reduction question (1 Viewer)
- Thread starter coeyz
- Start date
Timothy.Siu
Prophet 9
S(1+t^2)^n dt
u=(1+t2)n
v'=1
u'=2tn(1+t2)n-1
v=t
In=t(1+t2)n-2n S t2(1+t2)n-1 dt
=t(1+t2)n-2n S (t2(1+t2)n-1 +(1+t2)n-1-(1+t2)n-1) dt
=t(1+t2)n-2n S (1+t2)n dt + 2n S (1+t2)n-1 dt
=t(1+t2)n- 2n In+2n In-1
In= t(1+t2)n/(2n+1)+2n/(2n+1) In-1
u=(1+t2)n
v'=1
u'=2tn(1+t2)n-1
v=t
In=t(1+t2)n-2n S t2(1+t2)n-1 dt
=t(1+t2)n-2n S (t2(1+t2)n-1 +(1+t2)n-1-(1+t2)n-1) dt
=t(1+t2)n-2n S (1+t2)n dt + 2n S (1+t2)n-1 dt
=t(1+t2)n- 2n In+2n In-1
In= t(1+t2)n/(2n+1)+2n/(2n+1) In-1
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Timothy.Siu
Prophet 9
S sin^n x cos^2 x dx=S sin^n x cosx cos x dx
u=cos x v'= sin^n x cos x
u'=-sin x v=sin^(n+1) x/(n+1)
In= [sin^(n+1) x/(n+1) . cos x]pi->0 + 1/(n+1)S sin^n x sin^2 x dx
=0+1/(n+1) S sin^n x (1-cos^2 x) dx
=-1/(n+1) S sin^n . cos^2 x dx+ 1/(n+1) S sin^n x dx
In=-1/(n+1) In + 1/(n+1) S sin^(n-2) x - 1/(n+1) In-2
cant do it lol sorry
Last edited:
[maths]\int_{0}^{\pi/2}\sin^nx\cos^2xdx[/maths]
let u=sinx
du=cosxdx
x=0, u=0
x=pi/2, u=1
[maths]I_n=\int_{0}^{1}u^n\sqrt{1-u^2}du\\=\int_{0}^{1}u^{n-1}(u\sqrt{1-u^2})du\\=\int_{0}^{1}u^{n-1}\frac{\mathrm{d} }{\mathrm{d} u}(\frac{-(1-u^2)^\frac{3}{2})}{3})du\\=0+\frac{n-1}{3}\int_{0}^{1}u^{n-2}(1-u^2)^\frac{3}{2}du\\=\frac{n-1}{3}\int_{0}^{1}u^{n-2}(1-u^2)\sqrt{1-u^2}du\\=\frac{n-1}{3}I_{n-2}-\frac{n-1}{3}I_n[/maths]
Rearranging, [maths]I_n=\frac{n-1}{n+2}I_{n-2}[/maths]
let u=sinx
du=cosxdx
x=0, u=0
x=pi/2, u=1
[maths]I_n=\int_{0}^{1}u^n\sqrt{1-u^2}du\\=\int_{0}^{1}u^{n-1}(u\sqrt{1-u^2})du\\=\int_{0}^{1}u^{n-1}\frac{\mathrm{d} }{\mathrm{d} u}(\frac{-(1-u^2)^\frac{3}{2})}{3})du\\=0+\frac{n-1}{3}\int_{0}^{1}u^{n-2}(1-u^2)^\frac{3}{2}du\\=\frac{n-1}{3}\int_{0}^{1}u^{n-2}(1-u^2)\sqrt{1-u^2}du\\=\frac{n-1}{3}I_{n-2}-\frac{n-1}{3}I_n[/maths]
Rearranging, [maths]I_n=\frac{n-1}{n+2}I_{n-2}[/maths]
Last edited:
Timothy.Siu
Prophet 9
ur working out is wrong and u read the question wrong lol
S sin^n x cos x dx is just sin^(n+1)/(n+1) lol
Timothy.Siu
Prophet 9
ah i see, my bad
Timothy.Siu
Prophet 9
too good