How do you solve $3^{x} = 729$ $3^x=729$ ?

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How do you solve $3^{x} = 729$ $3^x=729$ ?

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Answer 1 · 2017-01-17T05:29:23

Multiply each side by ${log}_{10}$ $log_10$ . Eventually, x = 6

Explanation:

Usually, just log means ${log}_{10}$ $log_10$ , so we can multiply both sides by log.
${log 3}^{x} = log 729$ $log3^x = log 729$
Then, with the log law, we can move the exponent x to the left of log3.
$x log 3 = log 729$ $xlog3 = log729$
Since the x is attached by multiplication, we can divide both sides by log 3.
$x = \frac{log (729)}{log (3)}$ $x = log(729)/log(3)$
Plug into your calculator and voila!
$x = 6$ $x = 6$

I used log since this question was posted in log, but you could also solve by making 729 base 3, then set the exponents equal to each other.
$3^{x} = 3^{6}$ $3^x = 3^6$
$x = 6$ $x = 6$
You could also say $x = {log}_{3} (729)$ $x = log_3 (729)$ (by using the log function) and plug that into your calculator as well.

Answer 2 · 2018-08-05T02:36:53

$x = 6$ $x=6$

Explanation:

We can rewrite $729$ $729$ as $3^{6}$ $3^6$ . With this in mind, we now have

$3^{x} = 3^{6}$ $3^x=3^6$

Since the bases are the same, we can equate the exponents. We get

$x = 6$ $x=6$

Hope this helps!

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