 # 6.03 Inverse relationship between exponentials and logarithms

Lesson

## Convert equations between log and exponential forms

We have learned about exponents (indices) and ways we can manipulate them in math. In math, we have pairs of inverse functions, or opposite operations, i.e., addition & subtraction, multiplication & division. The inverse function of an exponential is called a logarithm, and it works like this:

Logarithmic form

If we have an exponential of the form:

$b^x=a$bx=a

Then we can rewrite it as the logarithm:

$\log_ba=x$logba=x

and $b$b is called the base, just like in exponentials

In other words, we use logarithms when we are interested in finding out the exponent needed ($x$x) to raise a certain base ($b$b) to a certain number ($a$a).

Careful!

An important part to remember is that you can only take the logarithm of a positive number with a positive base that's not one:

$\log_ba$logba only makes sense when $a>0$a>0 and $b>0$b>0$b\ne1$b1

#### Worked examples

##### question 1

Express $6^2=36$62=36 in logarithmic form

Think: Remember, just as in all inverse operations, we want the exponent on its own and the logarithm on the other side.

Do:

$6$6 is the base and $2$2 is the exponent, so:

$\log_636=2$log636=2

##### question 2

Rewrite in exponential form: $\log_432=2.5$log432=2.5

Think: Remember that in exponential form we want isolate the resulting number after having the base raised to the exponent.

Do: Identify the components: $base=4$base=4 and the result of the logarithm is $exponent=2.5$exponent=2.5 . So,

$4^{2.5}=32$42.5=32

##### question 3

Rewrite the equation $9^{\frac{3}{2}}=27$932=27 in logarithmic form.

Think: Remember, we want the exponent on its own and the logarithm on the other side.

Do: Identify the components: $base=9$base=9 and the exponent turns into the result $exponent=\frac{3}{2}$exponent=32 . So,

$\log_927=\frac{3}{2}$log927=32

##### question 4

Rewrite the equation $8^{-3}=\frac{1}{512}$83=1512 in logarithmic form

Think: Remember, we want the exponent on its own and the logarithm on the other side.

Do: Identify the components: $base=8$base=8 and the exponent turns into the result $exponent=-3$exponent=3 . So,

$\log_8\frac{1}{512}=-3$log81512=3

#### Practice questions

##### question 5

Evaluate $\log_216$log216.

##### Question 6

Rewrite the equation $\left(0.9\right)^0=1$(0.9)0=1 in logarithmic form.

##### question 7

Rewrite the equation $9^{\frac{3}{2}}=27$932=27 in logarithmic form.

## Inverse relations

Recall that a relation and its inverse form mirror images of each other across the line $y=x$y=x The inverse of the logarithms function $y=\log_2\left(x-1\right)$y=log2(x1) is the exponential function $y=2^x+1$y=2x+1. Note that the domain and range of the inverse function is the range and domain of the function respectively. The asymptotes are likewise reflections across the line $y=x$y=x.

When viewing the $x$x and $y$y tables for the logarithmic and exponential functions,

Exponential

$x$x $y=2^x+1$y=2x+1
$0$0 $2$2
$1$1 $3$3
$2$2 $5$5
$3$3 $9$9

Logarithmic

$x$x $y=\log_2\left(x-1\right)$y=log2(x1)
$2$2 $0$0
$3$3 $1$1
$5$5 $2$2
$9$9 $3$3

we notice that the ordered pairs switch positions - the $y$y elements move into the first position and the $x$x elements move into the second position of each ordered pair.

#### Worked examples

##### question 8

What is the inverse of $y=3^{x-2}-5$y=3x25?

Think: Before finding the inverse, we must isolate what we are to un-do - exponent. After we isolate the exponent, we need to identify the components of the equation.

Do: We rewrite $y+5=3^{x-2}$y+5=3x2, and again from the definition, $x-2=\log_3\left(y+5\right)$x2=log3(y+5).

Thus the inverse becomes:

$y-2=\log_3\left(x+5\right)$y2=log3(x+5)

$y=\log_3\left(x+5\right)+2$y=log3(x+5)+2

##### question 9

Find the inverse of $f\left(x\right)=2\log_e\left(x+1\right)-3$f(x)=2loge(x+1)3 .

Think: Finding the inverse of a natural logarithmic function can be similarly found as the previous examples. Before we start, it is best to isolate the operation we want to un-do: natural logarithm.

Do: Write the function as $y=2\log_e\left(x+1\right)-3$y=2loge(x+1)3:

 $R:$R:    $y$y $=$= $2\log_e\left(x+1\right)-3$2loge​(x+1)−3 $\therefore R^{-1}:$∴R−1:    $x$x $=$= $2\log_e\left(y+1\right)-3$2loge​(y+1)−3 $\frac{x+3}{2}$x+32​ $=$= $\log_e\left(y+1\right)$loge​(y+1) $e^{\frac{x+3}{2}}$ex+32​ $=$= $y+1$y+1 $y$y $=$= $e^{\frac{x+3}{2}}-1$ex+32​−1 $f^{-1}\left(x\right)$f−1(x) $=$= $e^{\sqrt{x+3}}-1$e√x+3−1

#### Practice questions

##### Question 10

Consider the function $f\left(x\right)=\log_5\left(x-3\right)$f(x)=log5(x3) for all $x>3$x>3.

1. By replacing $f\left(x\right)$f(x) with $y$y, find the inverse function.

Leave your answer in terms of $x$x and $y$y.

2. State the domain of the inverse function using interval notation.

3. State the range of the inverse function using interval notation.

##### Question 11

Rewrite $y=2\log_ex-3$y=2logex3 with $x$x as the subject of the equation.

##### Question 12

Consider the function $f\left(x\right)=6\log_e5x-3$f(x)=6loge5x3 for $x>0$x>0.

1. By replacing $f\left(x\right)$f(x) with $y$y, find the inverse function.

Leave your answer in terms of $x$x and $y$y.

2. State the domain of the inverse function using interval notation.

3. State the range of the inverse function using interval notation.

### Outcomes

#### A2.SSE.A.1

Develop the definition of logarithms based on properties of exponents.

#### A2.SSE.A.2

Use the inverse relationship between exponents and logarithms to solve exponential and logarithmic equations.