Show:
Classifying Polynomials
Addition
Subtraction
Multiplication
Division
100

Classify by degree and number of terms.

2x3

3rd degree, 1 term; Cubic Monomial

100

Add the Polynomials

(4x + 9) +(x - 4)

5x + 5

100

Subtract the polynomials:

(g - 4) - (3g - 6)

-2g + 2

100

Multiply the Polynomials:

3x2 (2x4)

6x6

100

Divide the polynomial

(5x4-10x2+15x) / 5x

x3-2x+3

200

Classify the polynomial by Exponent and Type.

 - 6a - 5a2

2nd and Binomial; Quadratic Binomial

200

Add the polynomials:

(-3a - 2) + (7a + 5)

4a + 3

200

Subtract the polynomials:

(-5h - 2) - (7h +6)

-12h - 8

200

Multiply the Polynomials:

(x - 3)(x + 2)

x2 - x - 6

200

Divide the polynomial

(8x - 4) /2

4x - 2

300

Classify by degree and number of terms. 

-10k3 + k +1 

3rd degree and  Trinomial; Cubic Trinomial

300

Add the polynomials:

(x2 +3x + 5) + ( -x2 +6x)

9x + 5

300

Subtract the polynomials:

(-x2 - 5) - (-3x2 -x -8)

2x2 + x +3

300

Multiply the Polynomials:

(2m - 1)(m + 2)

2m2 + 3m - 2

300

Divide the polynomial:

(2x4-4x3+8x2) / x2

2x2 - 4x + 8

400

Classify by degree and number of terms.

10a3 - 6a4

4th degree, 2 terms; Quatric binomial

400

Add the polynomials:

(t2 + 3t3 -3) + (2t2 +7t -2t3

t3 +3t2 +7t -3

400

Subtract the Polynomials:

(k2 + 6k3 -4) - (5k3 + 7k -3k2)

k3 + 4k2 -7k -4

400

Multiply the Polynomials:

(4x - 1)(3x + 4)

12x2 + 13x - 4

400

Divide the following Polynomials:

(2x+ 8x - 4) / 2x

x + 4 - 2/x

500

Classify by degree and number of terms.


4x - 9x2 + 4x3 - 5x4

4th degree, 4 terms; Quartic polynomial

500

Add the polynomials:

(-1 + x2 + 2x) + (1 -2x + 2x2)

3x2

500

Subtract the Polynomials:

(2x - 3x) - (x2 -2x + 4)

-x2 + x - 4

500

Multiply the Polynomials:

(d + 3)(d2 - 4d + 1)

d3 - d2 -11d + 3

500

Divide the Polynomials:

(2x4y3+12x3y6-3x6y12) / 2x2y4

x2/y  + 6xy2 - 3x4y8/2