Sum and Difference of Cubes
Sum & Difference of Cubes
Slide: 1
Sum of Cubes A sum of two cubed terms, x3 + y3, can be factored as: (x + y)(x2 – xy + y2)
Factor the following expression: 8a3 + 125b3
8a3 + 125b3 can be rewritten as (2a)3 + (5b)3 Using the sum of cubes rule:
8a3 + 125b3 = (2a)3 + (5b)3 = (2a + 5b)[(2a)2 – (2a)(5b) + (5b)2] = (2a + 5b)(4a2 – 10ab + 25b2)
Slide: 2
Difference of Cubes A difference between two cubed terms, x3 – y3, can be factored as: (x – y)(x2 + xy + y2)
Factor the following expression: 64p3 – 27q3
64p3 – 27q3 can be rewritten as (4p)3 – (3q)3 Using the difference of cubes rule:
64p3 – 27q3 = (4p)3 – (3q)3 = (4p – 3q)[(4p)2 + (4p)(3q) + (3q)2] = (4p – 3q)(16p2 + 12pq + 9q2)
Slide: 3
Factor the following expression completely: 1 + 1,000a3
Slide: 4
Factor the following expression completely: 2x2z9 – 432x5y3
Slide: 5
Slide: 1
Sum of Cubes A sum of two cubed terms, x3 + y3, can be factored as: (x + y)(x2 – xy + y2)
Factor the following expression: 8a3 + 125b3
8a3 + 125b3 can be rewritten as (2a)3 + (5b)3 Using the sum of cubes rule:
8a3 + 125b3 = (2a)3 + (5b)3 = (2a + 5b)[(2a)2 – (2a)(5b) + (5b)2] = (2a + 5b)(4a2 – 10ab + 25b2)
Slide: 2
Difference of Cubes A difference between two cubed terms, x3 – y3, can be factored as: (x – y)(x2 + xy + y2)
Factor the following expression: 64p3 – 27q3
64p3 – 27q3 can be rewritten as (4p)3 – (3q)3 Using the difference of cubes rule:
64p3 – 27q3 = (4p)3 – (3q)3 = (4p – 3q)[(4p)2 + (4p)(3q) + (3q)2] = (4p – 3q)(16p2 + 12pq + 9q2)
Slide: 3
Factor the following expression completely: 1 + 1,000a3
Slide: 4
Factor the following expression completely: 2x2z9 – 432x5y3
Slide: 5
