Converting Exponential and Logarithmic Equations

Presentation

•

Mathematics

•

10th - 12th Grade

•

Hard

Joseph Anderson

FREE Resource

13 Slides • 26 Questions

Converting Exponential to Logarithmic Equations

April 7/8

Multiple Choice

3² = 9

log ₃ 2 = 9

log ₉ 3 = 2

log ₃ 9 = 2

log ₂ 9 = 3

Multiple Choice

5³ = 125

log ₅ 125 = 3

log ₃ 5 = 125

log ₁₂₅ 3 = 5

log ₅ 3 = 125

Multiple Choice

16 = 4²

log ₄ 2 = 16

log ₁₆ 4 = 2

log ₂ 16 = 4

log ₄ 16 = 2

Multiple Choice

2⁵ = 32

log ₅ 32 = 2

log ₂ 32 = 5

log ₃₂ 5 = 2

log ₂ 5 = 32

Multiple Choice

7^x = 13

log ₇ x = 13

log ₁₃ x = 7

log ₇ 13 = x

log _x 7 = 13

Multiple Choice

b^k = m

log _b m = k

log _m k = b

log _b k = m

log _k m = b

Multiple Choice

10³ = 1000

log ₁₀₀₀ 3 = 10

log ₃10 = 1000

log 3 = 1000

log 1000 = 3

Multiple Choice

What is the logarithmic form of the exponential function?

$6^{-3}=\frac{1}{216}$

$\log_{-3}6=\frac{1}{216}$

$\log_6\left(\frac{1}{216}\right)=-3$

$\log_6-3=\frac{1}{216}$

$\log_6\left(\frac{1}{216}\right)=3$

Multiple Choice

Rewrite 3⁴ = 81 in logarithmic form.

log₃4 = 81

log₈₁3 = 4

log₃81 = 4

log₄81 = 3

Multiple Choice

What is the exponent form of the following logarithmic function?

$\log_84=\frac{2}{3}$

$8^4=\frac{2}{3}$

$8^{\frac{2}{3}}=4$

$4^{\frac{2}{3}}=8$

$4^8=\frac{2}{3}$

Multiple Choice

Rewrite log₂8 = 3 in exponential form.

2⁸ = 3

2³ = 8

3² = 8

8³ = 2

Multiple Choice

Change to Exponential Form:
log₆36 = 2

2⁶=36

6²=36

36²=6

36⁶=2

Multiple Choice

Rewrite log₂8 = 3 in exponential form/

2⁸ = 3

2³ = 8

3² = 8

8³ = 2

Multiple Choice

Change to Exponential Form:
log₆36 = 2

2⁶=36

6²=36

36²=6

36⁶=2

Multiple Choice

Convert the exponential form $5^3 = 125$ into its equivalent logarithmic form.

$\log_5{125} = 3$

$\log_5{3} = 125$

$\log_{125}{5} = 3$

$\log_{3}{125} = 5$

Multiple Choice

Convert the exponential form to logarithmic form: $2^3 = 8$

$\log_2(8) = 3$

$\log_8(2) = 3$

$\log_3(2) = 8$

$\log_2(3) = 8$

7.4 - Properties of Logarithms

Recall:

Practice next:

Product Property

Example

Multiple Choice

Condense

$\log_35+\log_34$

$\log_39$

$\log_320$

$\log_69$

$\log_620$

Multiple Choice

Condense

$\log_53+\log_5y+\log_5z$

$\log_53yz$

$\log_{15}3yz$

$\log_35yz$

$\log_z15y$

Multiple Choice

Expand

$\log_28y$

$\log_82+\log_8y$

$\log_28+\log_2y$

$\log_2y+\log_82$

$\log_y2+\log_y8$

Quotient Property

Multiple Choice

Condense

$\log_7y-\log_79$

$\log_7\frac{9}{y}$

$\log_79y$

$\log_7\frac{y}{9}$

$\log_9\frac{y}{7}$

Multiple Choice

Expand

$\log_4\frac{y}{10}$

$\log_4y+\log_410$

$\log_410-\log_4y$

$\log_{10}y-\log_{10}4$

$\log_4y-\log_410$

Power Property

Multiple Choice

Condense

$3\log_47$

$\log_47^3$

$\log_421$

$\log_43^7$

$\log_410$

Multiple Choice

Expand

$\log_2^{ }y^5$

$y\cdot\log_25$

$5\log_2y$

$2\cdot\log_5y$

$\log_25^y$

Multiple Choice

Rewrite $\log\left(5\right)+\log\left(4\right)$ as $\log\left(c\right)$

$\log20$

$\log9$

$\log1$

Multiple Choice

Write log_b(xy) as two logs

log_bx+log_by

log_bx-log_by

logbx*logby

log_bx/log_by

Multiple Choice

Rewrite as a single logarithm:

$\log_260\ -\ \log_210$

$\log_26$

$\log_250$

$\frac{\log_260}{\log_210}$

$\log_270$

Converting Exponential to Logarithmic Equations

April 7/8

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Converting Exponential and Logarithmic Equations

Converting Exponential to Logarithmic Equations

7.4 - Properties of Logarithms

Recall:

More:

Practice next:

Product Property

Quotient Property

Power Property

Converting Exponential to Logarithmic Equations

Similar Resources on Wayground

Popular Resources on Wayground

Discover more resources for Mathematics