Solving with Unlike Bases. Warm Ups on the next 3 slides….
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Transcript of Solving with Unlike Bases. Warm Ups on the next 3 slides….
![Page 1: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/1.jpg)
Solving with Unlike Bases
![Page 2: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/2.jpg)
Warm Ups on the next 3 slides….
![Page 3: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/3.jpg)
Solve.5
3 1 132
4
x
x
Graph. 42 3xy
Condense. 2 2 23log 4log log 5x y
17
15
1517
102515
22
22102515
52135
x
x
xx
xx
xx
5log
5logloglog43
2
24
23
2
yx
yx
UPWARM
![Page 4: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/4.jpg)
Warm Up
0loglog: 34 xSolve
3
3
1log
log4
1
3
30
x
x
x
x
![Page 5: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/5.jpg)
Warm Up
xSolve 8log:2
1
3
3
22
82
1
3
x
x
x
x
![Page 6: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/6.jpg)
The Common Logarithm
The base-10 logarithm is called the common logarithm.
The common logarithm is usually written as logx.
If we can manage to make everything into log base 10, we can use our calculators to solve.
xx loglog 10
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For Example….Solve .625 x
56.2
5log
62log
62log5log
62log5log
625
x
x
x
x
x
![Page 8: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/8.jpg)
Solve: 5 28x
07.2
5log
28log
28log5log
28log5log
285
x
x
x
x
x
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Solve: 6.4 59x
20.2
4.6log
59log
59log4.6log
59log4.6log
x
x
x
x
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Solve: 8 73x
06.2
8log
73log
73log8log
73log8log
x
x
x
x
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Solve:34 45x
92.0
74593.23
4log
45log3
45log4log3
45log4log 3
x
x
x
x
x
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Solve: 5 29x
09.2
5log
29log
29log5log
29log5log
x
x
x
x
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Solve:73 76x
06.3
73log
76log
3log
76log7
76log3log)7(
76log3log 7
x
x
x
x
x
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Solve: 7 2 19x
58.3
2log
12log
12log2log
12log2log
122
x
x
x
x
x
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Solve: 21
123
x
13.1
26186.22
3
1log
12log2
12log3
1log2
12log3
1log
2
x
x
x
x
x
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Change of Base
There is a way to write equivalent logarithmic expressions with different bases.
There is a formula to find the change of base.
Let’s derive the change of base formula…..
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Let’s derive the change of Base Formula!
logb x
b
xy
xby
xb
xb
yx
y
y
b
log
log
loglog
loglog
log
b
xxb log
loglog
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Change of Base Formula:
loglog
logb
xx
b
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Evaluate to the nearest hundredth.
6log 78
43.26log
78log78log 6
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Evaluate to the nearest hundredth.
2log 23
52.42log
23log23log 2
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Evaluate to the nearest hundredth.
1
4
log 35
56.2
4
1log
35log
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Evaluate to the nearest hundredth.
42 log 17
04.44log
17log2
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Natural Log
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Warm Up: Find the final amount of money if you invested
$6700 compounded monthly at 5.4% for 20 years.
$4500 compounded continuously at 7% for 20 years.
61.681,19
12
054.016700
1
2012
A
A
n
rPA
nt
40.248,18
4500 2007.0
A
eA
PeA rt
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Warm Up: $1000 is invested at 15% per annum interest, compounded monthly. Calculate the minimum number of months required for the value of the investment to exceed $3000.
MONTHSxt
YEARSt
t
t
n
rPA
t
t
t
nt
894.8812
369762662.7
0125.1log
3log12
0125.1log123log
0125.1log3log
0125.13
12
15.0110003000
1
12
12
12
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Warm Up:
25.0
.2,1
xgf
equationtheSolvexgandxxfLet x
21
2
1 :1
xxf
xy
yx
xy
xffindst
1
22
22
4
12
25.02
:
22
2
2
x
x
ncompositiothefindNext
x
x
x
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Natural Base
e = 2.718281828…
Models a variety of situations of growth & decay in nature
Represented as: ln (means loge)
elogln
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Evaluate to the nearest thousandth.
4e
598.54
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Evaluate to the nearest thousandth.
2.3e
100.0
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Evaluate to the nearest thousandth.
2
5e
492.1
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Evaluate to the nearest thousandth. (Think of 2 Ways…….
ln6
792.16ln
:
DirectlyCalculatorWith
792.1
log
6log
6log
6ln
:1
e
stBaseofChangeUse
e
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Evaluate to the nearest thousandth.
ln(2.5)
916.0
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Evaluate to the nearest thousandth.
ln( 2)
.
:
numbersrealPOSITIVEall
isDomainREMEMBER
SolutionNo
!valuedomainNegative
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Find
ln( )e
1
log
x
ee
xex
e
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Simplify each expression.
ln7e
7
7lnln
7lnlog
7ln
x
x
x
xe
e
![Page 36: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/36.jpg)
Simplify each expression.
ln12e
12
12lnln
12lnlog
12ln
x
x
x
xe
e
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Simplify each expression.
2ln3e
9
9lnln
3lnln
3ln2log2
3ln2
x
x
x
x
xe
e
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Simplify each expression. (2 Ways)
9lne
9
log
ln
9
9
9
x
ee
xe
xe
x
e or x
x
xe
xe
9
19
ln9
ln 9
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Simplify each expression. (2 Ways)46lne
2446
46
6
log6
ln6
4
4
4
x
ee
xe
xe
x
e or
x
x
xe
xe
24
124
ln24
ln64
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Solve – Round to the nearest hundredth. (2 Ways)
77.1 x
67.3
7.1log
7log
7log7.1log
7log7.1log
x
x
x
x
or
67.37.1ln
7ln
7ln7.1ln
7ln7.1ln
x
x
x
x
![Page 41: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/41.jpg)
Solve – Round to the nearest hundredth. (Use ln)
8xe
08.2
8ln
8ln1
8lnln
8lnln
x
x
x
ex
e x
![Page 42: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/42.jpg)
Solve – Round to the nearest hundredth.
2 18xe
20.2
9ln
9lnln
9
2
18
2
2
x
x
ex
e
e
x
x
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Solve – Round to the nearest hundredth.
312 48xe
46.03
4ln
4ln3
4lnln3
43
x
x
x
ex
e x
![Page 44: Solving with Unlike Bases. Warm Ups on the next 3 slides….](https://reader035.fdocuments.net/reader035/viewer/2022070403/56649f325503460f94c4e5d4/html5/thumbnails/44.jpg)
Solve – Round to the nearest hundredth.
74.5 90xe
00.4
720ln
20ln7
20lnln7
207
x
x
x
ex
e x