Exponent Law DescriptionAlgebraic representations To multiply powers with the same base, add the...

Exponent Law Description Algebraic representations

To multiply powers with To multiply powers with the same base, add the the same base, add the

exponentsexponents

nnaa x n x nbb = n = na+ba+b

exponentsexponents

To divide powers with To divide powers with the same base, subtract the same base, subtract

the exponentsthe exponents

nnaa n nbb = n = na-ba-b

exponentsexponents

To divide powers with To divide powers with the same base, subtract the same base, subtract

the exponentsthe exponents

nnaa n nbb = n = na-ba-b

To determine the power To determine the power of a power multiply the of a power multiply the exponentsexponents

(n(naa))bb = n = nabab

The power of a product The power of a product is equal to the product is equal to the product

of the powersof the powers

(m x n)(m x n)aa = m = maa x n x naa

The power of a quotient The power of a quotient is equal to the quotient is equal to the quotient

mn( )a

Zero exponentZero exponent xx00 = 1, x = 1, x00

mn( )a

Zero exponentZero exponent xx00 = 1, x = 1, x00Negative ExponentsNegative Exponents xx-n-n = =

mn( )a

(4x3y2)(5x2y4)

Solution

(4x3y2)(5x2y4) means 4 * x3 * y2 * 5 * x2 * y4

We can multiply in any order.

(4x3y2)(5x2y4) = 4 * 5 * x3 * x2 * y2 * y4

= 20x5y6

Solution

3a2b2means 6

b2x x6a5b3

= 22aa33bb

Solution

means x2

z3(( ))22

z3(( ))22 xx22

zz33xx22

c-3 * c5

Solution

c-3 * c5 = c-3+5

Same methods apply if Same methods apply if some of the exponents are some of the exponents are negative integersnegative integers

m2 * m-3

Solution

m2 * m-3 = m2 +(-3)

(a-2)-3

Solution

(a-2)-3 = a(-2)(-3)

Remember exponent Remember exponent law #2law #2

( power of powers)( power of powers)

(3a3b-2)(15a2b5)

Solution

(3a3b-2)(15a2b5) means 3* 15 * a3 * a2 * b-2 * b5

We can multiply in any order.

(3a3b-2)(15a2b5) = 3* 15 * a3 * a2 * b-2 * b5

= 45a5b3

Solution

42x-1y4

7x3y-2

means 42 7

y-2x x

= 66xx-4-4yy66

42x-1y4

7x3y-2

42x-1y4

7x3y-242 7

y-2x x

x4 Positive ExponentsPositive Exponents

(a-3b2)3

Solution

(a-3b2)3 means a(-3)(3) * b(2)(3)

(a-3b2)3 = a(-3)(3) * b(2)(3)

= a-9b6

a9 Positive ExponentsPositive Exponents

CLASSWORK• PAGE 294• #3-8• #9 (e,f,g,h,I,j)• #10 – 13

• Page 295• #18, #20

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