Question
5^((log_5)(x))
Convert the Logarithmic equation to Exponential form
Convert the Logarithmic equation to Exponential form
Answers
GPT-4o mini
The expression \( 5^{(\log_5)(x)} \) can be interpreted as follows:
In general, the logarithmic equation \( \log_b(a) = c \) can be converted to exponential form as \( b^c = a \).
Here, we have:
\[
\log_5(x) = y
\]
This implies that:
\[
5^y = x
\]
Thus, combining these concepts, we can see that:
\[
5^{(\log_5)(x)} = x
\]
So, the expression simplifies to \( x \) when you convert it. Therefore, we have:
\[
5^{(\log_5)(x)} = x
\]
In summary, the conversion gives you the result that \( 5^{(\log_5)(x)} = x \).
In general, the logarithmic equation \( \log_b(a) = c \) can be converted to exponential form as \( b^c = a \).
Here, we have:
\[
\log_5(x) = y
\]
This implies that:
\[
5^y = x
\]
Thus, combining these concepts, we can see that:
\[
5^{(\log_5)(x)} = x
\]
So, the expression simplifies to \( x \) when you convert it. Therefore, we have:
\[
5^{(\log_5)(x)} = x
\]
In summary, the conversion gives you the result that \( 5^{(\log_5)(x)} = x \).