Find the Range of f(x)=logₐx

Find the Range of \(f(x)=\log_a x\)

Question

Find the range of the function

\[ f(x)=\log_a x \]

where

\[ a>0,\quad a\ne1 \]

Given

\[ f(x)=\log_a x \]

where

\[ a>0,\quad a\ne1 \]

For logarithmic functions,

\[ x>0 \]

Let

\[ y=\log_a x \]

Converting into exponential form,

\[ x=a^y \]

Since \(a>0\) and \(a\ne1\), the expression \(a^y\) is defined for every real value of \(y\).

Therefore, corresponding to every real number \(y\), there exists a positive real number \(x\).

Hence \(y\) can take all real values.

\[ \boxed{(-\infty,\infty)} \]

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