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Syllabus

If a, b, c are in continued proportion and a(b – c) = 2b, prove that: a-c=2(a+b)a.

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Question

If a, b, c are in continued proportion and a(b – c) = 2b, prove that: `a - c = (2(a + b))/a`.

Sum
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Solution

Since a, b, c are in continued proportion,

`a/b = b/c`

`\implies` b2 = ac  ...(i)

a(b – c) = 2b

`\implies (a(b - c))/b = 2`  ...(ii)

Now,

R.H.S. = `(2(a + b))/a`

`\implies (a(b - c))/b xx (a + b)/a`   ...Using equation (ii)

`\implies (cancela(b - c))/b xx (a + b)/cancela` 

`\implies (b - c)/b xx a + b`

`\implies (ba + b^2 - ac - bc)/b`

`\implies (ba + ac - ac - bc)/b`    ...(Using equation (I))

`\implies (ba - bc)/b`

`\implies (cancel(b)(a - c))/cancel(b)`

`\implies` a – c

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Proportion
  Is there an error in this question or solution?
Q 7.(ii)
Chapter 7: Ratio and Proportion (Including Properties and Uses) - Exercise 7 (B) [Page 94]

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Selina Concise Mathematics [English] Class 10 ICSE
Chapter 7 Ratio and Proportion (Including Properties and Uses)
Exercise 7 (B) | Q 7.(ii) | Page 94

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