Understanding the Simplified Equation for 2^-log2(x) and its Relation to x^-1

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SUMMARY

The equation 2^(-log2(x)) simplifies to x^-1 due to the properties of logarithms and exponents. Specifically, the relationship can be derived using the logarithmic identity that states -log2(x) equals log2(x^(-1)). This cancellation occurs because the base of the exponent (2) and the base of the logarithm (2) effectively negate each other, leading to the conclusion that 1/2^(log2(x)) equals 1/x. Understanding these mathematical principles is crucial for manipulating logarithmic expressions.

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2^(-log2(x)) It reads, 2 to the power of -log base2 x

The problem is that I don't understand why this can also be written as x^-1

For some reason the base and the log2 cancel out. Can anyone explain to me why this happens, please?

1/2^(log2(x)) = 1/x
 
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-log2(x)=log2(x^(-1)),
by the rule for logarithms:
blog(a)=log(a^(b))
 
Or you could use that:

a^{bc} = \left(a^c \right)^b

As - \log_2 x = (-1) \log_2 x
 

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