Evaluate: ∫_2^7 sqrtx/(sqrtx + sqrt(9 − x))dx - Mathematics and Statistics

Evaluate the following integrals : `int_2^7 sqrt(x)/(sqrt(x) + sqrt(9 - x))*dx`

Evaluate: `∫_2^7 sqrtx/(sqrtx + sqrt(9 − x))dx`

Evaluate

Let I = `int_2^7 sqrt(x)/(sqrt(x) + sqrt(9 - x)) . dx` ...[i]

= `int_2^7 sqrt(2 + 7 - x)/(sqrt(2 + 7 - x) + sqrt(9 - (2 + 7 - x))) . dx ...[∵ int_"a"^"b" f(x) . dx = int_"a"^"b" f("a" + "b" - x) . dx]`

∴ I = `int_2^7 sqrt(9 - x)/(sqrt(9 - x) + sqrt(x))*dx` ...[ii]

Adding [i] and [ii], we get

2I = `int_2^7 sqrt(x)/(sqrt(x) + sqrt(9 - x)) . dx + int_2^7 sqrt(9 - x)/(sqrt(9 - x) + sqrt(x)) . dx`

= `int_2^7 (sqrt(x) + sqrt(9 - x))/(sqrt(x) + sqrt(9 - x))*dx`

= `int_2^7 1 . dx`

= `[x]_2^7`

∴ 2I = 7 – 2 = 5

∴ I = `(5)/(2)`

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Chapter 6: Definite Integration - EXERCISE 6.2 [Page 148]

Chapter 6 Definite Integration
EXERCISE 6.2 | Q 6) | Page 148

Q 2. (B) (iii) | 4 marks