8/11 Algebra - Polynomial Unit Review
Give the y-intercept of y=-3x⁴-2x³+2x-1.
-1
Find the zeros and their multiplicities. y = -3(x+1)²(x-4)³
-1 (mult. of 2) 4 (mult. of 3)
Give the y-intercept of y=3x⁶-4x⁵+7x²-3.
-3
Find the zeros and their multiplicities. y = (x+3)²(x-1)³
-3 (mult. of 2) 1 (mult of 3)
Give the y-intercept of y=4x-3x³.
0
Find the zeros and their multiplicities. y = -3x(x+2)(x-5)
0 (mult of 1) -2 (mult of 1) 5 (mult of 1)
Find the zeros and their multiplicities. y = -2x(x-4)²
0 (mult of 1) 4 (mult of 2)
For a polynomial of degree 4, what would be the maximum number of real zeros and what would be the minimum number of real zeros possible?
The maximum would be 4 real zeros. The minimum would be 0 real zeros.
For a polynomial function of degree 5, what is the maximum number of real zeros and what is the minimum number of real zeros possible?
The maximum would be 5 real zeros. The minimum would be 1 real zero.
Approximate the real zero(s) to the nearest hundredth. y=3x³-2x²+1
x≈-.53
Approximate the real zero(s) to the nearest hundredth. y=-2x⁴+3x²+5
x≈-1.58 or x≈1.58
Approximate the real zero(s) to the nearest hundredth. y=x³+2x-1
x≈.45
Approximate the real zero(s) to the nearest hundredth. y=x⁴-2x+1
x≈.54 or x=1
Give the y-intercept of y=8x⁵-3x³+2.
2
Find the zeros and their multiplicities. y = (x-2)(x+5)(x+1)(x-4)
2 (mult of 1) -5 (mult of 1) -1 (mult of 1) 4 (mult of 1)
If 2+3i is a zero of a polynomial function, what other zero must exist for the function?
2-3i (from the Complex Conjugates Theorem)
Give the y-intercept of y=2x³-3x²+4x+3.
3
If -4i is a zero of a polynomial functions, what other zero must exist for the function?
4i (from the Complex Conjugates Theorem)
