&KDSWHU
14-7
Divide Polynomials by Monomials
Objective To model division by a monomial with algebra tiles •To apply the Law of Exponents
to divide a polynomial by a monomial
The triangle at the right has an area of (2x^2 3 x) square units
and a height of 2xunits. What is the length of the base?
To find the length of the base, first transform the formula
for the area of a triangle as b , and substitute the
given dimensions, 2x^2 3 x for Aand 2xfor h:
b
Then to find b, divide the polynomial 4x^2 6 xby the monomial 2x.
When dividing a polynomial by a monomial, make sure the
quotient has the same number of terms as the dividend.
In this case, both the dividend and quotient have 2 terms.
You can use algebra tiles to model
the division of polynomials by monomials.
To model (4x^2 6 x) 2 x, start by building
a rectangle from four x^2 tiles and six xtiles.
Be sure the rectangle has a width of 2x.
To find the quotient, find the length
of the remaining side. In this case, it is 2x 3.
So (4x^2 6 x) 2 x 2 x3.
You can also divide a polynomial by a monomial
algebraically by following these steps:
Rewrite the division of a polynomial by a
monomial as the multiplicationof the polynomial
by the reciprocalof the monomial.
Apply the Distributive Property to distribute the
monomial across the terms of the polynomial.
Simplify if necessary.
Divide the coefficients.
Apply the Law of Exponents for Division to
divide variables.
Simplify.
So the length of the base of the triangle is (2x3) units.
4 x^2 6 x
2 x
2 ( 2 x^2 3 x)
2 x
2 A
h
Remember:abba a•^1 b
(4x^2 6 x) •
4 x^2 • 6 x•
() ()
2 x(21) 3 x(11)
2 x 3
x
x
6
2
x^2
x
4
2
6 x
2 x
4 x^2
2 x
1
2 x
1
2 x
1
2 x
4 x^2 6 x
2 x
A 2 x^2 3 x
2 x
Remember:
Area of a Triangle
A bh, where Aarea,
bbase, and hheight
1
2
Area of rectangle 4 x^2 6 x
?
xx 111
2 x
x
x