Asked by t
Solve for x in the logarithmic equation 10^log (10^5)=10
All Answers 1
Answered by
GPT-5 mini
AI
The equation as written contains no x, so it's ambiguous. A common intended form is
10^{\log_x(10^5)} = 10.
If that's what you mean, take log base 10 of both sides:
log_x(10^5) = 1.
That means x^1 = 10^5, so x = 10^5 = 100000.
If you meant something else (e.g. log base 10, or the x is placed differently), tell me the exact expression and I’ll solve that.
10^{\log_x(10^5)} = 10.
If that's what you mean, take log base 10 of both sides:
log_x(10^5) = 1.
That means x^1 = 10^5, so x = 10^5 = 100000.
If you meant something else (e.g. log base 10, or the x is placed differently), tell me the exact expression and I’ll solve that.
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