12 x1 t01 01 log laws (2013)

Logarithms
Logarithms are the inverse of exponentials.

Logarithms
If y  a x

Logarithms
If y  a x then x  log a y

Logarithms
If y  e x

Logarithms
If y  e x then x  log e y

Logarithms

x  ln y

Logarithms

x  ln y
x  log y

Logarithms

x  ln y
x  log y

log base e is known as
the natural logarithm.

Logarithms

x  ln y
x  log y

y  log a x

y

1

x

a  1

Logarithms

x  ln y
x  log y

y  log a x

y

1

a  1

x
y  log a x

0  a  1

Logarithms

x  ln y
x  log y

y  log a x

y

domain : x  0


1

a  1

x
y  log a x

0  a  1

Logarithms

x  ln y
x  log y

y  log a x

y

domain : x  0
range : all real y


1

a  1

x
y  log a x

0  a  1

Log Laws
1 log a m  log a n  log a mn

Log Laws
m
2 log a m  log a n  log a  
n

Log Laws
m
n

3 log a m n  n log a m

Log Laws
m
n

4 log a 1  0

Log Laws
m
n

4 log a 1  0
5 log a a  1

Log Laws
m
n

4 log a 1  0
5 log a a  1

6 a log x  x
a

Log Laws
m
n

4 log a 1  0
5 log a a  1
6 a log x  x
a

7  log a x 

log b x
log b a

e.g. (i) x  log 5 125
5 x  125

e.g. (i) x  log 5 125
5 x  125
x3

e.g. (i) x  log 5 125
5 x  125
x3

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

ii  log x 343  3
x 3  343

e.g. (i) x  log 5 125
5 x  125
x3

ii  log x 343  3
x 3  343
x7

e.g. (i) x  log 5 125
5 x  125
x3

iii  Evaluate;
a) log 4 16

ii  log x 343  3
x 3  343
x7

e.g. (i) x  log 5 125
5 x  125
x3

a) log 4 16
 log 4 4 2

ii  log x 343  3
x 3  343
x7

e.g. (i) x  log 5 125
5 x  125
x3

a) log 4 16
 log 4 4 2
 2 log 4 4

ii  log x 343  3
x 3  343
x7

e.g. (i) x  log 5 125
5 x  125
x3

a) log 4 16
 log 4 4 2
 2 log 4 4
2

ii  log x 343  3
x 3  343
x7

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3

6

log 6 32

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

c) log 216  log 2 8

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

c) log 216  log 2 8
 log 2 128

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

c) log 216  log 2 8
 log 2 128
 log 2 27

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

c) log 216  log 2 8
 log 2 128
 log 2 27
7

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

d) log10125  log10 32  log10 4

c) log 216  log 2 8
 log 2 128
 log 2 27
7

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 

c) log 216  log 2 8
 log 2 128
 log 2 27
7

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000

c) log 216  log 2 8
 log 2 128
 log 2 27
7

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

b) 6 2log 6 3
log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000
3

c) log 216  log 2 8
 log 2 128
 log 2 27
7

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

c) log 216  log 2 8

b) 6 2log 6 3

 log 2 128
 log 2 27
7

log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000
3

e)

log 7 8
log 7 2

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

c) log 216  log 2 8

b) 6 2log 6 3

 log 2 128
 log 2 27
7

log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000
3

e)

log 7 8
log 7 2
 log 2 8

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

c) log 216  log 2 8

b) 6 2log 6 3

 log 2 128
 log 2 27
7

log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000
3

e)

log 7 8
log 7 2
 log 2 8
3

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

c) log 216  log 2 8

b) 6 2log 6 3

 log 2 128
 log 2 27
7

log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000
3

e)

log 7 8
log 7 2
 log 2 8
3

f) log 2

1
8

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

c) log 216  log 2 8

b) 6 2log 6 3

 log 2 128
 log 2 27
7

log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000
3

e)

log 7 8
log 7 2
 log 2 8
3

f) log 2

1
8

1
1
 log 2
2
8

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

c) log 216  log 2 8

b) 6 2log 6 3

 log 2 128
 log 2 27
7

log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000
3

e)

log 7 8
log 7 2
 log 2 8
3

f) log 2

1
8

1
1
 log 2
2
8
1
  3
2

ii  log x 343  3

e.g. (i) x  log 5 125
5 x  125
x3

x 3  343
x7

a) log 4 16
 log 4 4 2
 2 log 4 4
2

c) log 216  log 2 8

b) 6 2log 6 3

 log 2 128
 log 2 27
7

log 6 32

6
 32
9

d) log10125  log10 32  log10 4
125  32 
 log10 

 4 
 log10 1000
3

e)

log 7 8
log 7 2
 log 2 8
3

f) log 2

1
8

1
1
 log 2
2
8
1
  3
2
3

2

iv  32 x 1 

1
27

32 x 1  33

iv  32 x 1 

1
27

32 x 1  33
2 x  1  3
2 x  4
x  2

iv  32 x 1 

1
27

32 x 1  33
2 x  1  3
2 x  4
x  2

v  2 x  9

iv  32 x 1 

1
27

32 x 1  33
2 x  1  3
2 x  4
x  2

v  2 x  9
log 2 x  log 9

iv  32 x 1 

1
27

32 x 1  33
2 x  1  3
2 x  4
x  2

v  2 x  9
log 2 x  log 9
x log 2  log 9

iv  32 x 1 

1
27

32 x 1  33
2 x  1  3
2 x  4
x  2

v  2 x  9
log 2 x  log 9
x log 2  log 9
log 9
x
log 2

iv  32 x 1 

1
27

32 x 1  33
2 x  1  3
2 x  4
x  2

v  2 x  9
log 2 x  log 9
x log 2  log 9
log 9
x
log 2

x  3.17 (to 2 dp)

iv  32 x 1 

1
27

32 x 1  33
2 x  1  3
2 x  4
x  2

v  2 x  9
log 2 x  log 9
x log 2  log 9
log 9
x
log 2

x  3.17 (to 2 dp)

Exercise 12A; 2, 3aceg, 4bdfh, 5ab, 6ab, 7ac, 8bdh, 9ac, 14, 18*
Exercise 6B; 8

12 x1 t01 01 log laws (2013)

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