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log -> exponential
exponential -> log
Solve Simple Logs
Solve for x
What is the equation?
100

log_6(36)=2

6^2=36

100

5^x=r

log_5(r)=x

100

log_x(216)=3

x=6

100

3^x=17

2.57

100

Exponential growth, with an initial value of 120 and a growth rate of 22%.

y=120(1.22)^x

200

log_9(x)=w

9^w=x

200

t^k=m

log_t(m)=k

200

log_2(512)=x

x=9

200

20^x=56

1.3437

200

Exponential decay, with an initial value of 940 and a decay rate of 12%.

y=940(0.88)^x

300

log_p(4r)=u

p^u=4r

300

6^(2x-3)=60

log_6(60)=2x-3

300

log_4(x)=5

x=1024

300

9^(x+10)=78

-8.0172

300

Facebook has 100 million users. The number of users increase by 14% each month.

y=100,000,000(1.14)^x

400

log_18(4x+2)=23x-1

18^(23x-1)=4x+2

400

(2z+1)^d=f-2

log_(2z+1)(f-2)=d

400

log(x)=4

x=10000

400

5*18^(6x)=26

0.0951

400

Suppose that you are observing the behavior of cell duplication in a lab. In one experiment, you started with 10,000 cells and the cell population decreased by 10% every minute.

y=10000(.90)^x

500

log of 100 equals 2

10^2=100

500

two g to the power of 5 equals x

log_(2g)(x)=5

500

log_2.5(3814.697)=x

x=9

500

16^(x-7)+5=24

8.062

500

Suppose that you are observing the behavior of cell duplication in a lab. In one experiment, you start with two cells and the cell population is tripling every minute.

y=2(3)^x