Finding Factoring of h^3-8 Using Sum or Difference of Cubes
Factoring Binomials as Sum or difference of cubes Calculator tool is helpful to find the factors of a^3+27 with the sum or difference of cubes process. Get the manual process for Finding Factoring of a^3+27 Using Sum or Difference of Cubes here.
Use '^' for exponent
Solution for Factoring Binomials as Sum or Difference of Cubes h^3-8
The given expression is h^3-8
By separating each expression we get
(h^3-8)
The given polynomial is (h^3-8)
The polynomial can be written as h^3 - 8
=(h)(h^2)+(-2)(h^2)+(h)(2h)+(-2)(2h)+(h)(4)+(-2)(4)
=(h)((h2 + 2h + 4))+(-2)((h2 + 2h + 4))
=(h - 2) (h^2 + 2 h + 4)
After getting indivisual factoring we can cancelout similar terms and The final result will be (h - 2) (h^2 + 2 h + 4)
FAQs on Factoring h^3-8 with Sum or Difference of Cubes
1. What are the factors for a h^3-8 using the sum or difference of cubes?
The factor for h^3-8 is (h - 2) (h^2 + 2 h + 4)
2. How can I use the sum or difference of cubes method to factorize the given equation?
You can first find the factors of the given equation h^3-8, then by performing simple mathematical calculations you can get the desired factors.
