How do you solve $3^b=17$ ?

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How do you solve $3^b=17$ ?

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Answer 1 · 2018-03-15T22:36:24

$b=2.5789$

Explanation:

Lets take the logarithm of both sides of the equation:

$b*log3=log17$

then divide both sides by $log3$ :

$b=log17/log3$

My pocket calculator (HP 15C) reads

$b=2.5789$

Answer 2 · 2018-03-15T22:39:50

Real solution:

$b = ln 17 / ln 3$

Complex solutions:

$b = (ln 17 + 2kpi i)/ ln 3" "$ for any integer $k$

Explanation:

Given:

$3^b = 17$

Note that $e^(2kpi i) = 1$ for any integer $k$ .

So, if $e^a = b$ then $a = ln b + 2kpi i$ for any integer $k$ .

So while we find the real solution by taking the real valued natural log, we can also add any integer multiple of $2pi i$ to find all the complex solutions too...

Take natural log of both sides of the given equation to get:

$b ln 3 = ln 17 color(grey)(+ 2kpi i)$

Divide both sides by $ln 3$ to get:

$b = (ln 17 color(grey)(+2kpi i))/ln 3$

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How do you solve $3^b=17$ ?

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