Download a 2

Survey
yes no Was this document useful for you?
   Thank you for your participation!

* Your assessment is very important for improving the work of artificial intelligence, which forms the content of this project

page
1
page
2
page
3
page
4
page
5
page
6
page
7
page
8
page
9
page
10
page
11
page
12
page
13
page
14
page
15
page
16
page
17
page
18
page
19
page
20
page
21
page
22
page
23
page
24
page
25
page
26
Document related concepts
no text concepts found
Transcript 
Lesson 1
MULTIPLYING MONOMIALS
What are we going to
do…

Multiply monomials.

Simplify expressions involving
powers of monomials.
Monomial

A monomial is a number, a
variable, or a product of a number
and one or more variables.

An expression involving the division
of variables is not a monomial.

Monomials that are real numbers
are called constants.
Examples of Monomials
1. -5
2. x
3. abc3
4. 5xy2
7
Not a monomial: 4cd3
9ab
Why?
Rule #1:
Product of Powers

To multiply two powers that have
the same base, add the exponents.

For any number x, xm(xn) = xm+n.

x12 ● x5 = x17
Example 1

(5x6)(x3)
= 5(x6x3)
= 5x9
Example 2

(4ab4)(-5a2b3)
= (4)(-5)(aa2)(b4b3)
= -20a3b7
Example 3…on your own!

(2ab5)(-a2b)
= (4)(-1)(aa2)(b5b)
= -4a3b6
Rule #2:
Power of a Power
 To
find the power of a power,
multiply the exponents.
 For
any number a, (am)n = amn.
 (a4)3
= a12
Example 4

[(a2)3]2
= [a6]2
= a12
OR….
= [a] 2*3*2
=a12
Example 5

(x2)4
= x2*4
= a8
Example 6…on your own!

[(32)3]2
= [36]2
= 312
= 531,441
Rule #3:
Power of a Product

To find the power of a product, find the
power of each factor and multiply.

For all numbers x and y,
(xy)m = xmym.

(-2x2y3)3 = (-2)3(x2)3(y3)3 = -8x6y9

Think of it like distributing the
exponent!
Example 7

(3ab)3
= (3)3(a)3(b)3
= 27a3b3
Example 8

(5x2yz3)2
= (5)2(x2)2(y)2(z3)2
= 25x4y2z6
Example 9…on your own!

(-2x3yz4)2
= (-2)2(x3)2(y)2(z4)2
= 4x6y2z8
Simplifying Monomial
Expressions

To simplify an expression involving
monomials, write an equivalent
expression in which:
1. each base appears exactly once
2. there are no powers of powers
3. all fractions are in simplest form
Example 10

[(8g3h4)2]2(2gh5)4
= [(8)2(g3)2(h4)2]2(2)4(g)4(h5)4
= [64g6h8]2(16g4h20)
= (64)2(g6)2(h8)2(16g4h20)
= 4096g12h16(16g4h20)
= (4096)(16)(g12g4)(h16h20)
= 65,536g16h36
Example 11
(ab4)(ab2)
= (aa)(b4b2)
= a2b6
Example 12…on your own!
(-4c4d4)(4cd)
= (-4)(4)(c4c)(d4d)
= -16c5d5
Example 13
(5a2b3c4)(4a2b4c3)
= (5)(4)(a2a2)(b3b4)(c4c3)
= 20a2b7c7
Example 14
(7pq7)2
= (7)2(p)2(q7)2
= 49p2q14
Example 15…on your own!
(5x3)2
= (5)2(x3)2
= 25x6
Example 16
(4cd)2 (-2d2)3
= (4)2(c)2(d)2 (-2)3(d2)3
= 16c2d2
(-8d6)
= (16)(-8)(c2)(d2d6)
= -128c2d8
Example 17
(2ag2)4 (3a2g3)2
= (2)4(a)4(g2)4 (3)2(a2)2(g3)2
= 16a4g8(9a4g6)
= (16)(9)(a4a4)(g8g6)
= 144a8g14
Review
1.
When multiplying powers with the same base,
we ______ the exponents.
add
2.
When raising a power to a power, we
_____________ the exponents.
multiply
Related documents