How do you solve $10^{3 x} + 7 = 19$ $10^(3x)+7=19$ ?

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How do you solve $10^{3 x} + 7 = 19$ $10^(3x)+7=19$ ?

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Answer 1 · 2016-08-24T16:36:20

$x = \frac{log 12}{3}$ $x=(log12)/3$

Explanation:

The first thing we do is subtract 7 from both sides:

$10^{3 x} = 12$ $10^(3x)=12$

Now we ad logarithms to both sides:

${log 10}^{3 x} = log 12$ $log 10^(3x)=log12$

One of the properties of logarithms is that we can pull the exponent to the front, like this:

$3 x \cdot log 10 = log 12$ $3x*log10=log12$

Whenever you see a $log$ $log$ without a base it is base 10 and one of the properties of logarithms is that any $log$ $log$ of a number equal to its base is equal to 1.
${log}_{x} x = 1$ $log_x x =1$

So ${log}_{10} 10 = 1$ $log_10 10 = 1$
leaving us with:

$3 x = log 12$ $3x=log 12$

so

$x = \frac{log 12}{3}$ $x=(log 12)/3$

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How do you solve $10^{3 x} + 7 = 19$ $10^(3x)+7=19$ ?

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