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Transcript 
Section 4.6
The Fundamental Theorem of Algebra
Pairs of complex numbers of the forms
π‘Ž + 𝑏𝑖 and π‘Ž βˆ’ 𝑏𝑖, where 𝑏 β‰  0
Notes:
4. Determine the possible number of positive or negative real zeros, and imaginary
zeros for f(x).
6
2
f ( x) ο€½ 2 x ο€­ 3 x ο€­ x  1
Positive Zeros:
2 sign changes in f(x) , so (2 or 0)
f (ο€­ x) ο€½ 2(ο€­ x)6 ο€­ 3(ο€­ x)2 ο€­ (ο€­ x)  1
ο€½ 2 x 6 ο€­ 3x 2  x  1
Negative Zeros: 2 sign changes in f(-x), so (2 or 0)
Imaginary Zeros:
(2, 4, 6)
𝑦 = (π‘₯ + 4)(π‘₯ βˆ’ 1)(π‘₯ βˆ’ 7)
𝑦 = (π‘₯ + 4)(π‘₯ 2 βˆ’ 8π‘₯ + 7)
𝑦 = (π‘₯ βˆ’ 10)(π‘₯ βˆ’ (βˆ’ 5))(π‘₯ βˆ’ ( 5))
𝑦 = (π‘₯ βˆ’ 10)(π‘₯ + 5)(π‘₯ βˆ’ 5)
𝑦 = π‘₯ 3 βˆ’ 8π‘₯ 2 + 7π‘₯ + 4π‘₯ 2 βˆ’ 32π‘₯ + 28
𝑦 = (π‘₯ βˆ’ 10)(π‘₯ 2 βˆ’ 25)
𝑦 = π‘₯ 3 βˆ’ 4π‘₯ 2 βˆ’ 25π‘₯ + 28
y = (x βˆ’ 10)(π‘₯ 2 βˆ’ 5)
𝑦 = π‘₯ 3 βˆ’ 10π‘₯ 2 βˆ’ 5π‘₯ + 50
𝐴𝑙𝑙 π‘Ÿπ‘Žπ‘‘π‘–π‘π‘Žπ‘™π‘  π‘Žπ‘›π‘‘ π‘–π‘šπ‘Žπ‘”π‘–π‘›π‘Žπ‘Ÿπ‘¦ #β€² 𝑠 β„Žπ‘Žπ‘£π‘’ π‘‘π‘œ β„Žπ‘Žπ‘£π‘’ π‘Ž π‘π‘œπ‘›π‘—π‘’π‘”π‘Žπ‘‘π‘’ π‘π‘’π‘π‘Žπ‘’π‘ π‘’ π‘‘β„Žπ‘’π‘¦
come in pairs
,3 + 𝑖
𝑦 = (π‘₯ βˆ’ 8)(π‘₯ βˆ’ 3 βˆ’ 𝑖 )(π‘₯ βˆ’ 3 + 𝑖 )
𝑦 = (π‘₯ βˆ’ 8)(π‘₯ βˆ’ 3 + 𝑖)(π‘₯ βˆ’ 3 βˆ’ 𝑖)
+𝟏
𝑦 = (π‘₯ βˆ’ 8)(π‘₯ 2 βˆ’ 3π‘₯ βˆ’ ix βˆ’ 3x + 9 + 3i + ix βˆ’ 3i βˆ’ 𝑖 2 )
𝑦 = (π‘₯ βˆ’ 8)(π‘₯ 2 βˆ’ 6x + 10)
𝑦 = π‘₯ 3 βˆ’ 6π‘₯ 2 + 10π‘₯ βˆ’ 8π‘₯ 2 + 48π‘₯ βˆ’ 80
𝑦 = π‘₯ 3 βˆ’ 14π‘₯ 2 + 58π‘₯ βˆ’ 80
See next slide for problem
𝑦 = π‘₯(π‘₯ βˆ’ 2 βˆ’ 2 )(π‘₯ βˆ’ 2 + 2 )(π‘₯ βˆ’ 2 + 3𝑖 )(π‘₯ βˆ’ 2 βˆ’ 3𝑖 )
𝑦 = π‘₯(π‘₯ βˆ’ 2 + 2)(π‘₯ βˆ’ 2 βˆ’ 2)(π‘₯ βˆ’ 2 βˆ’ 3𝑖) (π‘₯ βˆ’ 2 + 3i)
𝑦 = π‘₯(π‘₯ 2 βˆ’ 2π‘₯ βˆ’ π‘₯ 2 βˆ’ 2π‘₯ + 4 + 2 2 + π‘₯ 2 βˆ’ 2 2 βˆ’ 4)(π‘₯ 2 βˆ’ 2π‘₯ + 3𝑖π‘₯ βˆ’ 2π‘₯ + 4 βˆ’ 6𝑖 βˆ’ 3𝑖π‘₯ + 6𝑖 βˆ’ 9𝑖 2 )
𝑦 = π‘₯(π‘₯ 2 βˆ’ 4π‘₯ + 2)(π‘₯ 2 βˆ’ 4π‘₯ + 13)
𝑦 = π‘₯(π‘₯ 4 βˆ’ 8π‘₯ 3 + 31π‘₯ 2 βˆ’ 60π‘₯ + 26)
𝑦 = π‘₯ 5 βˆ’ 8π‘₯ 4 + 31π‘₯ 3 βˆ’ 60π‘₯ 2 + 26π‘₯
A French mathematician Rene’ Descartes found the following relationship between the coefficients of a polynomial function
and the number of positive and negative zeros of the function.
Descartes’ Rule of Signs
Let f(x) =
be a polynomial function with real coefficients.
*The number of positive real zeros of f is equal to the number of changes in sign of
the coefficients of f(x) or is less than this by an even number.
*The number of negative real zeros of f is equal to the number of changes in sign of
the coefficients of f(-x) or is less than this by an even number.
Example:
4. Determine the possible number of positive or negative real zeros, and imaginary
zeros for f(x).
6
2
f ( x) ο€½ 2 x ο€­ 3 x ο€­ x  1
Positive Zeros:
2 sign changes in f(x) , so (2 or 0)
f (ο€­ x) ο€½ 2(ο€­ x)6 ο€­ 3(ο€­ x)2 ο€­ (ο€­ x)  1
ο€½ 2 x 6 ο€­ 3x 2  x  1
Negative Zeros: 2 sign changes in f(-x), so (2 or 0)
Imaginary Zeros:
(2, 4, 6)
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