Polynomials

X, +, - polynomials

Dividing Polynomials

Finding Possible Solutions/Zeros

Solving Polynomials

Miscellaneous

100

(3x² + 5x + 2) +( 2x² -x + 7)

5x² + 4x + 9

100

Synthetic division: (2x² - 9x - 5)/(x - 5)

2x+1

100

Use Descartes rule of signs to determine the possible positive negative and imaginary zeros.

f(x)=5x³ - x² + x + 6

+: 2 or 0

-: 2 or 0

imaginary: 3 or 1

100

See my computer for graph.

(-2,0) (-1,0) (1/2,0)

100

Expand (x - 2)⁴ using Pascal's triangle.

x⁴ - 8x³ + 24x² - 32x + 16

200

(4x³ - 2x + 1) + (7x² + 12x)

4x³ + 7x² + 10x + 1

200

Long division: (x² + 5x + 6)/(x + 2)

x+3

200

Use Descartes rule of signs to determine the possible positive negative and imaginary zeros.

f(x)=2x⁵ + 3x⁴ - 2x³ - 12x² + x + 4

+: 2 or 0

-: 3 or 0

imaginary: 4, 2, or 0

200

Solve using possible solutions and synthetic division f(x)= x³ - 2x² - 5 + 6

x= 1, 3, -2

200

Find the polynomial function f(x) of least degree that has rational coefficients, a leading coefficient of one, and the zeros 3 and 2 + root 5

f(x)= x³ - 7x² + 11x + 3

300

(4x² - 3x + 7) - (7x² + 2x - 5)

-3x² - 5x + 2

300

Synthetic Division: (2x² - 4x + 3)/(x + 6)

2x-16 remainder: 99/(x + 6)

300

Use the rational root theorem to identify all real possible solutions.

f(x)= x³ - 5x² + 4x + 24

p/q= positive or negative 1, 2, 3, 4, 6, 8, 12, 24

300

Solve using possible solutions and synthetic division

f(x)= x³ - 2x² - 2x+ 4

x= positive or negative root 2, 2

300

Expand (2x + 6)⁵ using Pascal's triangle

3x⁵ + 480x⁴ + 2,880x³ + 8,640x² + 12,960x + 7,776

400

(x + 3)(x - 4)

x² - x - 12

400

Synthetic division: (5x³ - 2x + 5)/(x + 4)

5x² - 20x + 78 remainder: -307/(x + 4)

400

Use the rational root theorem to identify all real possible solutions.

f(x)= 3x⁴ - 4x³- 14x² + 24x + 12

p/q= positive or negative 1, 1/3, 2, 2/3, 3, 4, 4/3, 6, 12

400

If you have a rectangular container with dimensions 2x + 1, x + 3, and x + 2, what is the expression of its volume?

2x³ + 11x² + 17x + 6

400

Find the polynomial function f(x) of least degree that has rational coefficients, a leading coefficient of one, and the zeros 4 and 2 + i

f(x)= x³ - 8x² + 19x - 12

500

(2x - 1)(3x² + 4x - 5)

6x³ + 5x² - 14x + 5

500

Long Division: ( 2x³ + 6x² + 4)/(x² - 2)

2x + 6 remainder: (4x - 8)/(x² - 2)

500

Use Descartes rule of signs to determine the possible positive negative and imaginary zeros and Use the rational root theorem to identify all real possible solutions.

f(x)= x³ - 5x² - 4x + 15

p/q= positive or negative 1, 3, 5, 15

+: 2 or 0

-: 2 or 0

imaginary: 3 or 1

500

You were trying to find the dimensions of a pool that has a volume of 2x³ + 16x² + 42x + 36. You know two of its dimensions: x + 3 and x + 2. What is the third dimension?

2x+6

500

Graph 4x⁴ - 2x³ - 12x² - 2x + 4

include the factored form, degrees of freedom, whether it's even or odd, and the zeros including the multiplicities.

See my computer for graph and info.