Factoring Polynomials
Adding Polynomials
Subtracting Polynomials
Multiplying Polynomials
Dividing Polynomials
100
x2+3x+2
(x+2)(x-2)
100
(5p2 −3)+(2p2 −3p3 )
-3p3 +7p2 −3
100
(6x2 + 4x + 1) – (4x + 20)
6x2– 19
100
6v(2v + 3)
12v2 + 18v
100
(n2–n–29)÷(n–6)
n+5+1/n–6
200
a2-15a+36
(a-3)(a-12)
200
(5a+4)−(5a+3)
1
200
(–7x9 + 12x6– 12) – (5x9 + 4x6– 9)
-2x9+8x6-3
200
(2n+2)(6n+1)
12n2 +14n+2
200
9x5+9x4+45x3/9x2
x3+x2+5x
300
b2+8b+16
(b+4)2
300
Sketch the graph of P(x)=−x5+4x3
300
(a3–2a2)–(3a2–4a3)
5a3–5a2
300
(6p+8)(5p−8)
30p2 −8p−64
300
3v3+v2+2v/9v3
1/3+1/9v+2/9v2
400
2x2+6x+4
2(x+2)(x+1)
400
(−75x +14−2x)+(104x +7x+5x5 )
−2x5 +10x4 +5x+14
400
(3x4–3x)–(3x–3x4)
6x4–6x
400
(3x−4)(4x+3)
12x −7x−12
400
(3k2–18k–46)÷ (3k + 6)
k–8+2/3k+6
500
3x4-21x3+10x2
x2(3x2-21x+10)
500
If the length of a rectangle in terms of x is 9x2 + x – 5, and its width is 3x2+ 4x + 4, what is the perimeter of this rectangle? Don’t leave any spaces in your solutions.
P = 2l + 2w
P = 2(9x2 + x – 5) + 2(3x2 + 4x + 4)
= 18x2 + 2x – 10 + 6x2 + 8x + 8
= 24x2 + 10x - 2
= 2(12x2 + 5x - 1)
500
(12a5 − 6a − 10a3) − (10a − 2a5 − 14a4)
14a5 + 14a4 − 10a3− 16a
500
(m2 −7m−6)(7m2 −3m−7)
7m4 −52m3 −28m2 +67m+42
500
(6p3+150p+5p)÷ 15p
2p2/5+10p+1/3