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Question
If `25x^2 + 1/(4x^2) = 20,` find the value of `5x + 1/(2x)`
Sum
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Solution
Given: `25x^2 + 1/(4x^2) = 20,`
Here, let A = `5x + 1/(2x)`
Now, squaring both sides:
`(A)^2 = (5x + 1/(2x))^2`
`(A)^2 = 25x^2 + 1/(4x^2) + 2(5x) (1/(2x))`
`(A)^2 = 25x^2 + 1/(4x^2) + 5`
(A)2 = 20 + 5
(A)2 = 25
∴ A = `+-sqrt25`
∴ A = ±5
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Chapter 3: Expansions - EXERCISE B [Page 36]
