Solve: 1/4x^(log2sqrt(x))=(2. x^((log)2x...

Solve: `1/4x^(log_2sqrt(x))=(2. x^((log)_2x))^(1/4)`

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Taking log on both sides with base 2, we get
` log_(2)(1/4)+(log_(2)sqrtx)(log_(2)x)=1/4+1/4(log_(2)x)^(2)`
` or (log_(2)x)^(2) = 9 or log_(2)x = pm3`
` :. x = 8 or 1/8`

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Solve: `1/4x^(log_2sqrt(x))=(2. x^((log)_2x))^(1/4)`

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