Factoring by grouping
Operating with polynomials
Factoring a trinomial
Factoring with AC
100

8x3-5x2-16x+10

(x2-2)(8x-5)

100

(4x2 – 12xy + 9y2) + (25x2 + 4xy – 32y2)

29x2 – 8xy – 23y2

100

h2-4h-96

(h+8)(h-12)

100

4x2+16x+15

(2x+5)(2x+3)

200

28n3+7n2-56n-14

7(n2-2)(4n+1)

200

(14x3y2 – 5xy + 14y) – (7x3y2 – 8xy + 10y)

7x3y2 + 3xy + 4y.

200

4x2+36x-40

4(x-1)(x+10)

200

2x2-7x+3

(x-3)(2x-1)

300

128x3+48x2+320x+120

8(2x2+5)(8x+3)

300

(3x + 2y – 4z ) + (45x – y + 75z)

48x + y + 71z

300

x2-3x+30

prime

300

3n2+14n-5

(n+5)(3n-1)

400

150a3-90a2-90a+54

(30a2-18)(5a-3)

400

(3x4y3 + 5x3y2 – 2x2y2) –  (−2x4y3 + 4x3y2 – 2x2y3 – 1)

5x4y3 + x3y2 – 2x2y2+ 2x2y3 + 1.

400

2x3-6x2+8x

2x(x2-3x+4)

400

-2x2-5x-3

(-2x+3)(x-1)

500

50b4-20b3+70b2-28

2b(5b2+7)(5b-2)

500

(16a-8a2)/(a3-4a2+4a)

8a/a2-2

500

6a4bc-18a3b2c+24a2b3c

6a2bc(a2-3ab+4b2)

500

3x2-x-2

(3x+2)(x-1)

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