Saturn WY15
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- 2012
Prove this by substitution. I don't know why but when i do it it equals 4 but when i do the long method of expanding the whole term it =0
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- Thread starter Saturn WY15
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Prove this by substitution. I don't know why but when i do it it equals 4 but when i do the long method of expanding the whole term it =0
Let u=x-2, du/dx=1
When x=4 u=2
When x=0 u=-2
So [maths]I=\int^2_{-2} u^3 \ du = 0[/maths]
(f(u)=u^3, f(-u) = (-u)^3 = -u^3 = -f(u), so f(u) represents an odd function ; The integration of an odd function about symmetrical limits is zero.)