Finding the Factoring of Binomial n^2-1 by Difference of Squares

Given equation is n^2-1

Convert the equation into the form of a² - b²

So, n^2-1 = (n)²-(1)²

The difference of squares formula is a² - b² = (a + b)(a - b)

After substituting the values in the formula

(n)²-(1)²

=(n+1)(n-1)

Therefore, the factors for the equation n^2-1 are (n+1)(n-1)

1. How do you find the factor of the difference of two squares?

When an expression can be viewed as the difference between two perfect squares, i.e. a²-b², then we can factor it as (a+b)(a-b). For example, x²-25 can be factored as (x+5)(x-5). This method is based on the pattern (a+b)(a-b)=a²-b², which can be verified by expanding the parentheses in (a+b)(a-b).

2. What is the Factoring of Binomial n^2-1 using the Difference of Squares method?

The Factoring of Binomial n^2-1 using the Difference of Squares method is (n - 1) (n + 1).

3. How can you use the difference of squares to find the factors of n^2-1?

The difference of squares formula is a²-b² = (a + b)(a - b). Convert the given equation n^2-1 and find the factors.

4. How to Factor Binomial n^2-1 by Difference of Squares on a calculator?

Simply enter the input Binomial n^2-1 in the corresponding input field and hit on the calculate button to get the concerned result ie., (n - 1) (n + 1).

5. Where do I get detailed steps on solving Factoring Difference Square Binomial n^2-1?

You can get detailed steps on solving Factoring Difference Square Binomial n^2-1 from this page.