objective: the students will simplify expressions by using the laws of exponents
TRANSCRIPT
HISTORY of the word HISTORY of the word EXPONENT.EXPONENT.
The term EXPONENT The term EXPONENT was introduced by was introduced by Michael Stifel (1487-Michael Stifel (1487-1567) in 1544 in 1567) in 1544 in Arithmetica integra. Arithmetica integra.
So 4³ is the same as (4)(4)(4), three identical factors of 4. And x³ is just three factors of x, (x)(x)(x).
ExponentsExponents
35power
base
exponent
3 3 means that is the exponential
form of t
Example:
he number
125 5 5
.125
Using the CalculatorUsing the Calculator
5 5 44
Press 5Press 5
Press Press ^̂Press 4Press 4
Then =Then =
7 Laws of Exponents #17 Laws of Exponents #1PRODUCT LAWPRODUCT LAW
To To MultiplyMultiply LIKE Bases… LIKE Bases…
……Copy the Base, Add Exponents Copy the Base, Add Exponents
Product Law or Product RuleProduct Law or Product Rule
m n m nx x x 3 4 3 4 7Example: 2 2 2 2
3 4
7
Proof: 2 2 2 2 2 2 2 2 2
2 2 2 2 2 2 2 2
7 Laws of Exponents #27 Laws of Exponents #2QUOTIENT LAWQUOTIENT LAW
To Divide LIKE Bases…To Divide LIKE Bases…
……Subtract ExponentsSubtract Exponents
6
2
a
a a4
Quotient Law or Quotient Rule:Quotient Law or Quotient Rule:
mm n m n
n
xx x x
x
44 3 4 3 1
3
5Example: 5 5 5 5 5
5
4
3
5 5 5 5 5Proof: 5
5 5 5 5
7 Laws of Exponents #37 Laws of Exponents #3EXPONENT of EXPONENT LAWEXPONENT of EXPONENT LAW
To Raise a Power to a Power…To Raise a Power to a Power…
……Multiply ExponentsMultiply Exponents
43a a12
Exponent of Exponent Law or Exponential Rule:Exponent of Exponent Law or Exponential Rule:
nm mnx x
23 3 2 6Example: 4 4 4
2 23
6
Proof: 4 4 4 4 4 4 4 4 4 4
4 4 4 4 4 4 4
To Raise a QUANTITY To Raise a QUANTITY to a Power, raise EACH to a Power, raise EACH Factor to that Power.Factor to that Power.
(-3ab)2= 9a2b2
7 Laws of Exponents #47 Laws of Exponents #4Raising a product to a Raising a product to a
powerpower
7 Laws of Exponents #57 Laws of Exponents #5Raising a quotient or a Raising a quotient or a
fraction to a powerfraction to a power To Raise a FRACTION To Raise a FRACTION
to a Power, raise BOTH to a Power, raise BOTH Numerator & Denominator Numerator & Denominator to that power. to that power.
4a
b
a4
b4
7 Laws of Exponents #67 Laws of Exponents #6NEGATIVE EXPONENT LAWNEGATIVE EXPONENT LAW
Negative Exponents Negative Exponents
……Reciprocal with a Positive ExponentReciprocal with a Positive Exponent
3a a3
#6: Negative Law of Exponents: If the base is powered by the negative exponent, then the base becomes reciprocal with the positive exponent.
1mm
xx
33
1 1Example #1: 2
2 8
33
3
1 5Example #2: 5 125
5 1
7 Laws of Exponents #77 Laws of Exponents #7
Any nonzero number raised to the ZERO Power = Any nonzero number raised to the ZERO Power = ONEONE
0a
02
03,263,546
The Laws of Exponents:The Laws of Exponents:
#7: Zero Law of Exponents: Any base powered by zero exponent equals one
0 1x
0
0
0
Example: 112 1
51
7
1flower