Rewrite the following equation as a logarithm #=10^3x # is just some number. a) log(#)/log(10^3) = x b) log(#)/log(10) = 3x c) log(#)/log(3) = 10x d) log(#)/log(3) = x

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asked Dec 27, 2024 67.5k views

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Hoppy · Answer 1 · 2024-12-31T13:32:51+0000

Final answer:

The correct answer is a) log(#)/log(10^3) = x.

Step-by-step explanation:

The correct answer is a) log(#)/log(10^3) = x.

The given equation is # = 10^3x. To rewrite this equation as a logarithm, we can use the property that the logarithm of a number raised to an exponent is the product of the exponent and the logarithm of the number. In this case, the number is 10 and the exponent is 3x.

So, the equation can be rewritten as log(#)/log(10^3) = x.

Rewrite the following equation as a logarithm #=10^3x # is just some number. a) log(#)/log(10^3) = x b) log(#)/log(10) = 3x c) log(#)/log(3) = 10x d) log(#)/log(3) = x

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