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Question
Solve for x:
`sqrt(27^(x + 1)) = 9^(x - 2)`
Sum
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Solution
Given expression is `sqrt(27^(x + 1)) = 9^(x - 2)`.
We have to find the value of x in given expression.
Thus, `sqrt(27^(x + 1)) = 9^(x - 2)`
`(27^(x + 1))^(1/2) = 9^(x - 2)` ...`[∴ root(n)(a) = a^(1/n)]`
`((3^3)^(x + 1))^(1/2) = (3^2)^(x - 2)`
`(3)^((3x + 3 1/2)) = (3)^(2x - 4)` ...[∴ (an)m = anm]
`(3)^((3x + 3)/2) = (3)^(2x - 4)`
Equating the powers with same bases.
`(3x + 3)/2 = 2x - 4`
3x + 3 = 2(2x – 4)
3x + 3 = 4x – 8
8 + 3 = 4x – 3x
11 = x
Therefore, the value of x in the given expression is 11.
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Chapter 6: Indices - EXERCISE 6 [Page 67]
