Introduction to Logarithm

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Definition of a logarithm

If

x>0

and there is a constant

b1

, then

y=logbx

, then if and only if

by=x

In the equation

logbx

, y is referred to as the logarithm, b is the base, and x is the argument.

The notation is read “the logarithm (or log) base b of x .” The definition of a logarithm indicates that a logarithm is an exponent

y=logbx

is the logarithmic form of

by=x by=x by=x

is the exponential form of

y=logbx

Example
1 Write each equation in its exponential form.

      1.  a.
        2=log7x b.

        3=log10(x+8)c.

        log5125=x

2 Write the following in its logarithmic form:

x=25(1/2)

Solution:

Use the definition

y=logbx

if and only if

by=x

(a)

2=log7x

if and only if

72=x

(b).

3=log10(x+8)

if and only if

103=x+8

(c)

log5125=x

if and only if

5x=125

  1. Use the definition
    by=xif and only if

    y=logbx

x=25(1/2)ifandonlyif 1/2=log25x

Introduction to Logarithms
Introduction to Logarithms

EQUALITY OF EXPONENTS THEOREM

If b is a positive real number

(b1)

such that

bx=by,thenx=y

Example:

evaluate

log232=x

Solution: Use the definition

y=logbx

if and only if

by=x x=log232

if and only if

2x=32

2x=25

⇒ Thus, by Equality of Exponents,

x=5

PROPERTIES OF LOGARITHMS

b1

If b, a, and c are positive real numbers,

, and n is a real number, then:

  1. Product:
    logb(a×c)=logba+logbc
  2. Quotient:
    logba/c=logbalogbc
  3. Power:
    logban=n.logba
  4. loga1=0
  5. logbb=1
  6. Inverse 1:
    logbbn=n
  7. Inverse 2:
    blogbn=n,n>0
  8. One-to-one:
    logba=logbc ifandonlyifa=c
  9. Change of base:
    logba=logca/logcb=loga/logb=lna/lnb

Examples

  1. Use the properties of logarithms to rewrite each expression as a single logarithm:

(a)

2logbx+1/2logb(x+4)

(b)

4logb(x+2)3logb(x5)

  1. Use the properties of logarithms to express the following logarithms in terms of logarithms of x, y and z

(a)

logb(xy2)

(b)

logb(x2y)/Z5

Solutions: 1. Use the properties of logarithms to rewrite each expression as a single logarithm:

(a)

2logbx+1/2logb(x+4)=logbx2+logb(x+4)(1/2)

power property

=logb[x2(x+4)(1/2)]

product property

(b)

4logb(x+2)logb(x5)=logb(x+2)43logb(x+4)3

power property

=logb(x+2)4/(x5)3

quotient property

  1. Use the properties of logarithms to express the following logarithms in terms of logarithms of x, y and z

(a)

logbxy2=logbx+logby2

product property ⇒

logbxy2=logbx+logby2

(b)

logb(x2y)/Z5 =logb(x2y)logbZ5

quotient property

=logbx2+logbylogbZ5

product property

=2logbx+logby5logbZ

power property

COMMON LOGS

A common logarithm has a base of 10. If there is no base given explicitly, it is common. You can easily find common logs of powers often. You can use your calculator to evaluate common logs.

NATURAL LOGS

A natural logarithm has a base of e. We write natural logarithms as ln. In other words,

logex=lnx

.

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