Degree of Polynomials
Adding or Subtracting Polynomials
Dividing Polynomials by a Monomial
Multiplying Binomials
Distributive Principle
100
4y + 7
What is a first degree polynomial
100
(3x+5) + (4x+1)
7x + 6
100

16x2 ÷ 4x2

4

100
(x+2)(x+3)
x2 + 3x + 2x + 6 x2+5x+6
100
4(3x + 4)
12x + 16
200
3x
What is a first degree polynomial
200
(6x-7) + (4x+5)
10x-2
200

4xy2 ÷ 2x

2y2

200
(x-7)(x+2)
x2 + 2x - 7x - 14 x2-5x-14
200
2(5x + 6)
10x + 12
300

4x2 + 5x + 6

What is a second degree polynomial

300
(5x-7) - (8x-2)
-3x - 5
300

12x +15y2 ÷ 3xy

4y + 5y

300
(2x+4)(x-8)
2x2 - 16x + 4x - 32 2x2-12x-32
300
6(x+12)
6x+72
400
7
What is a zero degree polynomial
400
(5x-3) + (4x+7) + (2x-6)
11x-2
400

(12x3+16x2-8x)÷(2x)

(6x2 +8x -4)

400
(x-4)2
(x-4)(x-4) x2 - 4x - 4x + 16 x2-8x+16
400
4(3x-y+5)
12x-4y+20
500
-15
What is a zero degree polynomial
500
(6x-8) - (6x+8)
-16
500

6n2 + 12ny7 - 9 ÷ 3ny

2ny + 4n6 -3ny

500

7ab2c7(7c4v9g4b7 - 9a)

49ab9c11v9g4 - 63a2b2c7  

500
-3(2x-6)
-6x+18
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