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Logarithm – Solving Problems Based On Laws Of Logarithm

CONTENT

  • Logarithm of numbers (Index & Logarithmic Form)
  • Laws of Logarithm
  • Logarithmic Equation
  • Change of Base
  • Standard forms
  • Logarithm of numbers greater than one
  • Multiplication and divisions of numbers greater than one using logarithm
  • Using logarithm to solve problems with roots and powers (no > 1)
  • Logarithm of numbers less than one.
  • Multiplication and division of numbers less than one using logarithm
  • Roots and powers of numbers less than one using logarithm

Logarithm of numbers (Index & Logarithmic Form)

The logarithm to base a of a number P, is the index x to which a must be raised to be equal to P.

Thus if P = ax, then x is the logarithm to the base a of P. We write this as x = log a P. The relationship logaP = x and

ax =P are equivalent to each other.

ax =P is called the index form and logaP = x is called the logarithm form

Conversion from Index to Logarithmic Form

Write each of the following in index form in their logarithmic form

a)         26 = 64                       b)         251/2 = 5                      c)  44= 1/256

Solution

a)         26 = 64

            Log2 64 = 6

b)         251/2 = 5

            Log255=1/2

c)         4-4= 1/256

Log41/256 = -4

Conversion from Logarithmic to Index form

a)         Log2128 = 7              b)           log10 (0.01) = -2                  c)            Log1.5 2.25 = 2

Solution

a)         Log2128 = 7

            27 = 128

b)         Log10 (0.01) = -2

            10-2= 0.01

c)         Log1.5 2.25 = 2

1.52 = 2.25

Laws of Logarithm

a)         let P = bx, then logbP = x

            Q = by, then logbQ = y

            PQ = bx X by = bx+y (laws of indices)

            Logb PQ = x + y

:.          Logb PQ = logbP + LogbQ

b)         P÷Q = bx÷by = bx+y

            LogbP/Q = x –y

:.          LogbP/Q = logbP – logbQ

c)         Pn= (bx)n = bxn

            Logbpn = nbx

:.          LogPn = logbP

d)         b = b1

:.          Logbb = 1

e)         1 = b0

            Logb1 = 0

Example 

Solve each of the following:

a)         Log327 + 2log39 – log354

b)         Log313.5 – log310.5

c)         Log28 + log23

d)         Given that log102 = 0.3010 log103 = 0.4771 and log105 = 0.699 find the log1064 + log1027

Solution

a)         Log327 + 2 log39 – log354

= log3 27 + log3 92 –log354

= log3 (27 x 92/54)

= log3 (271 x 81/54) = log3 (81/2)                  

= log3 34/log32

= 4log3 3 – log3 2

= 4 x (1) – log3 2 = 4 – log3 2

= 4 – log3 2

b)         log3 13.5 – log3 10.5

            = log3 (13.5) – Log310.5 = log3 (135/105)

            = log3 (27/21) = log3 27 – log3 21

            = log3 33 – log3 (3 x 7)

= 3log3 3 – log3 3 -log37

= 2 – Log3 7

c)         Log28 + Log33

            = log223+ log33

            = 3log22 + log33

             = 3 +1 = 4

d)         log10 64 + log10 27

            log10 26 + log1033

            6 log10 2 + 3 log10 3

            6 (0.3010) + 3(0.4771)

            1.806 + 1.4314 = 3.2373.

EVALUATION

1.         Change the following index form into logarithmic form.

            (a)  63= 216   (b) 33 = 1/27   (c) 92 = 81

2.         Change the following logarithm form into index form.

            (a)  Log88 = 1             (b) log ½¼ = 2

3.         Simplify the following

             a)  Log512.5 + log52               b)      ½ log48 + log432 – log42      c) log381

4.         Given that log 2 = 0.3010, log3 0.4770, log5 = 0.6990,   find the value of log6.25 + log1.44

Logarithmic Equation

Change of Base

Let logbP = x and this means P = bx

LogcP = logcbx = x logcb

If x logcb = logcP

          x = logcP

                 logc b

:.          logcP = logcP

                          logcb

Example :

Shows that logab   x   logba  = 1

                 Logab = logcb

                               logca

                 Logba = logca

                               logcb

:.          logab   x logba  =  logcb  x logca

            logca  +  logcb = 1

Evaluation

Solve (i) Log3 (x2 + 7x + 21) = 2 (ii) Log10 (x2 – 3x + 12) = 1

 (iii) 52x+1 – 26(5x) + 5 = 0 find the value of x

Logarithm of numbers greater than one   

Numbers such as 1000 can be converted to its power of ten in the form 10n where n can be term as the number of times the decimal point is shifted to the front of the first significant figure i.e. 10000 = 104

Number                                                 Power of 10

  1. 102
  2. 101
  3. 100 
    1. 10-3
    1. 10-1

Note: One tenth; one hundredth, etc are expressed as negative powers of 10 because the decimal point is shifted to the right while that of whole numbers are shifted to the left to be after the first significant figure.

A number in the form A x 10n, where A is a number between 1 and 10 i.e. 1 < A < 10 and n is an integer is said to be in standard form  e.g. 3.835 x 103 and 8.2 x 10-5 are numbers in standard form.

Multiplication and Division of number greater than one using logarithm

To multiply and divide numbers using logarithms, first express the number as logarithm and then apply the addition and subtraction laws of indices to the logarithms. Add the logarithm when multiplying and subtract when dividing.

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