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Question
If a, b, c, d are in proportion, prove that `(a + c)^3/(b + d)^3 = (a^2(a - c))/(b^2(b - d))`.
Theorem
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Solution
`a/b = c/d` = k
a = bk and c = dk
L.H.S.
= `(a + c)^3/(b + d)^3`
= `(bk + dk)^3/(b + d)^3`
= `[k(b + d)]^3/(b + d)^3`
= `(k^3(b + d)^3)/(b + d)^3`
= k3
R.H.S.
= `(a^2(a - c))/(b^2(b - d))`
= `((bk)^2(bk - dk))/(b^2(b - d))`
= `(b^2k^2 . k(b - d))/(b^2(b - d))`
= `(b^2k^3(b - d))/(b^2(b - d))`
= k3
L.H.S. = R.H.S.
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Chapter 7: Ratio and proportion - Exercise 7B [Page 126]
