How do you evaluate ${log}_{a} x = \frac{3}{2} {log}_{a} 9 + {log}_{a} 2$ $log_a x = 3/2log_a 9 + log_a 2$ ?

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How do you evaluate ${log}_{a} x = \frac{3}{2} {log}_{a} 9 + {log}_{a} 2$ $log_a x = 3/2log_a 9 + log_a 2$ ?

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Answer 1 · 2016-02-27T22:50:18

We will use the following log properties: $a log n = {log n}^{a} and {log}_{a} n + {log}_{a} m = {log}_{a} (n \times m)$ $alogn = logn^a and log_an + log_am = log_a(n xx m)$

Explanation:

${log}_{a} x = {log}_{a} 9^{\frac{3}{2}} + {log}_{a} 2$ $log_ax = log_a9^(3/2) + log_a2$

${log}_{a} x = {log}_{a} \sqrt{9^{3}} + {log}_{a} 2$ $log_ax = log_asqrt(9^3) + log_a2$

${log}_{a} x = {log}_{a} 27 + {log}_{a} 2$ $log_ax = log_a27 + log_a2$

${log}_{a} x = {log}_{a} (27 \times 2)$ $log_ax = log_a(27 xx 2)$

${log}_{a} x = {log}_{a} 54 \to x = 54$ $log_ax = log_a54 -> x = 54$

Practice exercises

Solve for x in the following equation. Round your answers to the nearest hundredth: ${log}_{n} 2 x = \frac{1}{3} {log}_{n} 64 - 2 log 3$ $log_n2x = 1/3log_n64- 2log3$
A commonly used logarithm rule is if $a = b \to log a = log b$ $a = b -> loga = logb$ . Solve for x in $2^{2 x - 3} = 3^{3 x}$ $2^(2x - 3) = 3^(3x)$

Good luck!

Answer 2 · 2016-02-27T22:53:32

x = 54

Explanation:

using the $laws of logarithms$ $color(blue)" laws of logarithms "$

$∙ log x + log y = log x y$ $• logx + logy = logxy$

$∙ log x - log y = log (\frac{x}{y})$ $• logx - logy = log(x/y)$

$∙ {log x}^{n} = n log x \Leftrightarrow n log x = {log x}^{n}$ $• logx^n = nlogx hArr nlogx = logx^n$

$∙ If {log}_{b} x = {log}_{b} y \Rightarrow x = y$ $• "If " log_b x = log_b y rArr x = y$

$\Rightarrow {log}_{a} x = {log}_{a} 9^{\frac{3}{2}} + {log}_{a} 2$ $rArr log_a x = log_a 9^(3/2) + log_a 2$

[ now $9^{\frac{3}{2}} = {(\sqrt{9})}^{3} = 3^{3} = 27$ $9^(3/2) = (sqrt9)^3 = 3^3 = 27$ ]

$\Rightarrow {log}_{a} x = {log}_{a} (27 \times 2) = {log}_{a} 54$ $rArr log_a x = log_a (27xx2) = log_a 54$

hence x = 54

Answer 3 · 2016-02-27T23:13:00

$x = 54$ $x=54$

Explanation:

We are given ${log}_{a} x = \frac{3}{2} {log}_{a} 9 + {log}_{a} 2$ $log_ax=3/2log_a9+log_a2$ . The first thing I want to do is combine like- terms. To do that, I first must change $\frac{3}{2} {log}_{a} 9$ $3/2log_a9$ in to the same form as ${log}_{a} 2$ $log_a2$ . That means that I just take the coefficient, $\frac{3}{2}$ $3/2$ , and I raise $9$ $9$ to that power, so that $\frac{3}{2} {log}_{a} 9$ $3/2log_a9$ becomes ${log}_{a} 9^{\frac{3}{2}}$ $log_a9^(3/2)$ . I can do thanks to the third rule of logs. This says that "Logarithmic Rule 3: ${log}_{b} (m^{n}) = n \cdot {log}_{b} (m)$ $log_b(m^n) = n · log_b(m)$ ."

Anyways, I now have my equation as ${log}_{a} x = {log}_{a} 9^{\frac{3}{2}} + {log}_{a} 2$ $log_ax=log_a9^(3/2)+log_a2$ , which can be simplified to ${log}_{a} x = {log}_{a} 27 + {log}_{a} 2$ $log_ax=log_a27+log_a2$ . Now we can combine like-terms. Something you should know is that logarithms are a little backward. For example, we combine ${log}_{a} 27 + {log}_{a} 2$ $log_a27+log_a2$ by multiplying the $27$ $27$ and the $2$ $2$ , like this ${log}_{a} (27 \cdot 2)$ $log_a(27*2)$ . This is according to the first law of $log$ $log$ s.

This now gives us ${log}_{a} x = {log}_{a} 54$ $log_ax=log_a54$ . From here, I will rewrite this $log$ $log$ into exponetial form. The format for that is as follows: $b^{x} = y$ $color(blue)(b)^color(red)(x)=color(green)(y)$ becomes ${log}_{b} y = x$ $log_color(blue)(b)color(green)(y)=color(red)(x)$ and vice versa.

Applying that logic, I take ${log}_{a} x = {log}_{a} 54$ $log_color(blue)(a)color(red)(x)=color(green)(log_a54)$ and rewrite it as $color(blue)(cancel(a))^color(green)(cancel(log_a)54)=color(red)(x)$ . Now, because $a$ and $log_a$ are inverses of each other, they cancel out, which brings down $color(green)(54)$ , leaving us with $color(green)(54)=color(red)(x)$ . There we go, we are done! Nice job.

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How do you evaluate ${log}_{a} x = \frac{3}{2} {log}_{a} 9 + {log}_{a} 2$ $log_a x = 3/2log_a 9 + log_a 2$ ?

3 Answers

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