Solving Exponentials using Logarithms!

Presentation

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Mathematics

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10th - 11th Grade

•

Practice Problem

•

Medium

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CCSS

6.EE.B.7, HSF.LE.A.4

Standards-aligned

Sabine Moses

Used 162+ times

FREE Resource

9 Slides • 5 Questions

Solving Exponentials!

Let's use logarithms to solve equations!

Now that we know WHAT a logarithm is, how does it help us?

Sometimes we are given a problem where x is in the exponent and we'll need to use logarithms to solve for x.

See how we can use the inverse of -2 to cancel the +2?

What next??

Now we have to "un-do" the exponent
We now know the inverse of exponent is logarithm!!
So we "take the log" of both sides (I know, super fancy sounding!!)
THEN, x-5 is no longer an exponent, and can move to the front of the equation!
NOW, we can continue solving!

Fill in the Blanks

Type answer...

Multiple Select

One more...

7^{\left(x+3\right)}=46

$x=\log\left(39\right)-3$

$x=\frac{\log\left(46\right)}{\log\left(7\right)-3}$

$x=\frac{\log\left(46\right)}{\log\left(7\right)}-3$

$x=\log_746-3$

Wait... There were two answers?

We can write our answer in multiple ways!!

Wait... What was that log₇46??

We need a way to go back and forth between base 10 and other bases.

This is called the CHANGE OF BASE formula!

Using Desmos

Desmos will evaluate logarithms, whether they simplify to whole numbers or not!

This also shows you WHERE to find the log buttons in the Desmos keyboard! (Or you can type it out as log)

Multiple Choice

Which one of these is NOT equal to the others?

$\frac{\log\left(29\right)}{\log\left(6\right)}$

$\log_629$

$\log_{29}6$

$\approx1.879$

Multiple Choice

Solve this one!

3\cdot4^{x-1}=24

$x=1$

$x=\frac{\log8}{\log4}+1$

$x=\frac{\log21}{\log4}+1$

$x=1.5$

This is how the last problem should be solved!!

Multiple Choice

Solve:

5(6)^{3x}=20

2.3

.26

.04

That's all, folks!

Let's practice!

Solving Exponentials!

Let's use logarithms to solve equations!

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