0303 ch 3 day 3

3.3 Real Zeros of
Polynomials

Philippians 4:6-7 do not be anxious about
anything, but in everything by prayer and
supplication with thanksgiving let your requests
be made known to God. And the peace of God,
which surpasses all understanding, will guard
your hearts and your minds in Christ Jesus.

Rational Zeros Theorem

If P(x) = an x + an−1 x
n n−1
+ an−2 x n−2
+ ... + a1 x + a0

has integral coefﬁcients, then every rational zero
p
of P(x) is of the form where
q
p is a factor of the constant term, and

q is a factor of the leading coefﬁcient.

Find all rational zeros of P(x) = x − 11x + 23x + 35
3 2

3 2

p 1 5 7 35
=± , , ,
q 1 1 1 1

3 2

p 1 5 7 35
=± , , ,
q 1 1 1 1

set the window on your grapher to [-35,35]

3 2

p 1 5 7 35
=± , , ,
q 1 1 1 1

graph and test

3 2

p 1 5 7 35
=± , , ,
q 1 1 1 1

graph and test
(we are applying the Remainder Theorem here)

3 2

p 1 5 7 35
=± , , ,
q 1 1 1 1

graph and test
(we are applying the Remainder Theorem here)

x = − 1, 5, 7

Factor 3x − 4x − 13x − 6
3 2

Factor 3x − 4x − 13x − 6
3 2

This means we are looking for the zeros.

Factor 3x − 4x − 13x − 6
3 2

p 1 2 3 6 1 2 3 6
=± , , , , , , ,
q 1 1 1 1 3 3 3 3

Factor 3x − 4x − 13x − 6
3 2

p 1 2 3 6 1 2 3 6
=± , , , , , , , window: [-6,6]
q 1 1 1 1 3 3 3 3

Factor 3x − 4x − 13x − 6
3 2

p 1 2 3 6 1 2 3 6
=± , , , , , , , window: [-6,6]
q 1 1 1 1 3 3 3 3
2
Zeros are: −1, − , 3
3

Factor 3x − 4x − 13x − 6
3 2

p 1 2 3 6 1 2 3 6
=± , , , , , , , window: [-6,6]
q 1 1 1 1 3 3 3 3
2
2 3
x=−
3
3x = −2
3x + 2 = 0

Factor 3x − 4x − 13x − 6
3 2

p 1 2 3 6 1 2 3 6
=± , , , , , , , window: [-6,6]
q 1 1 1 1 3 3 3 3
2
2 3
x=−
3
x = −1
3x = −2
3x + 2 = 0 x +1 = 0

Factor 3x − 4x − 13x − 6
3 2

p 1 2 3 6 1 2 3 6
=± , , , , , , , window: [-6,6]
q 1 1 1 1 3 3 3 3
2
2 3
x=−
3
x = −1 x=3
3x = −2
3x + 2 = 0 x +1 = 0 x−3= 0

Factor 3x − 4x − 13x − 6
3 2

p 1 2 3 6 1 2 3 6
=± , , , , , , , window: [-6,6]
q 1 1 1 1 3 3 3 3
2
2 3
x=−
3
x = −1 x=3
3x = −2
3x + 2 = 0 x +1 = 0 x−3= 0

(3x + 2)(x + 1)(x − 3)

Factor 3x − 4x − 13x − 6
3 2

p 1 2 3 6 1 2 3 6
=± , , , , , , , window: [-6,6]
q 1 1 1 1 3 3 3 3
2
2 3
x=−
3
x = −1 x=3
3x = −2
3x + 2 = 0 x +1 = 0 x−3= 0
⎛ 2 ⎞
(3x + 2)(x + 1)(x − 3) Do not use ⎜ x + ⎟
⎝ 3 ⎠

3
Find the exact zeros of f (x) = x − 6x + 4

3
p
= ± 1, 2, 4 standard window
q

3
p
q
graph and test

3
p
q
graph and test
x=2

3
p
q
graph and test
x=2 but then the other 2 roots
must be irrational

3
p
q
graph and test
must be irrational

“exact zeros” ... no calculator!

3
p
q
graph and test
must be irrational

“exact zeros” ... no calculator!

use synthetic division until it’s a quadratic
then use the Quadratic Formula

3
2 1 0 -6 4
2 4 -4
1 2 -2 0

3
2
x + 2x − 2 2 1 0 -6 4
2 4 -4
1 2 -2 0

3
2
x + 2x − 2 2 1 0 -6 4
−2 ± 4 − (4)(−2) 2 4 -4
x=
2 1 2 -2 0

3
2
x + 2x − 2 2 1 0 -6 4
−2 ± 4 − (4)(−2) 2 4 -4
x=
2 1 2 -2 0
−2 ± 12
x=
2

3
2
x + 2x − 2 2 1 0 -6 4
−2 ± 4 − (4)(−2) 2 4 -4
x=
2 1 2 -2 0
−2 ± 12
x=
2
−2 ± 2 3
x=
2

3
2
x + 2x − 2 2 1 0 -6 4
−2 ± 4 − (4)(−2) 2 4 -4
x=
2 1 2 -2 0
−2 ± 12
x=
2
−2 ± 2 3
x=
2
x = −1 ± 3

3
2
x + 2x − 2 2 1 0 -6 4
−2 ± 4 − (4)(−2) 2 4 -4
x=
2 1 2 -2 0
−2 ± 12
x=
2
x = 2, − 1 ± 3
−2 ± 2 3
x=
2
x = −1 ± 3

Find the exact zeros of P(x) = x + 4x + 3x − 2
3 2

Find the exact zeros of P(x) = x + 4x + 3x − 2
3 2

x = −2, − 1 ± 2

4 2
Find all real zeros of f (x) = 10x − x + 4x − 6

4 2

Doesn’t say exact ... approximations OK!

4 2

p
→ [ −6,6 ] standard window
q

4 2

p
q
graphing suggests 2 zeros ... they are:

4 2

p
q
graphing suggests 2 zeros ... they are:

x ≈ −1.03, .77
and the other two are imaginary

HW #3

“Never doubt that a small group of thoughtful
committed people can change the world; indeed
it is the only thing that ever has.”
Margaret Mead

0303 ch 3 day 3

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