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#1 2024-05-19 04:45:58
- mathxyz
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- From: Brooklyn, NY
- Registered: 2024-02-24
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Factor Difference of Cubes
Factor 27 - 8x^3.
Problem 36; page 57.
I will use formula 5 on page 44.
(x - a)(x^2 + ax + a^2)
Let 27 be 3^3. This means a = 3 in the formula.
Let 8x^3 be (2x)^3.
(2x - 3)(2x^2 - 3x + 3^2)
27 - 8x^3 = (2x - 3)(2x^2 - 3x + 9)
You say?
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#2 2024-05-19 05:08:03
- Bob
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- Registered: 2010-06-20
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Re: Factor Difference of Cubes
Let 27 be 3^3. This means a = 3 in the formula.
Let 8x^3 be (2x)^3.
Good
But then
(2x - 3)[(2x)^2 - 3(2x) + 3^2]
Bob
Children are not defined by school ...........The Fonz
You cannot teach a man anything; you can only help him find it within himself..........Galileo Galilei
Sometimes I deliberately make mistakes, just to test you! …………….Bob 
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#3 2024-05-19 07:06:56
- mathxyz
- Member
- From: Brooklyn, NY
- Registered: 2024-02-24
- Posts: 1,053
Re: Factor Difference of Cubes
Let 27 be 3^3. This means a = 3 in the formula.
Let 8x^3 be (2x)^3.
Good
But then
(2x - 3)[(2x)^2 - 3(2x) + 3^2]
Bob
Oh yes. I forgot the final step.
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