Joe,naz,hedger.  Factor each binomial if possible. Solution: Factoring Differences of Squares.

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Presentation transcript:

Joe,naz,hedger

 Factor each binomial if possible. Solution: Factoring Differences of Squares

 Factor each difference of squares. Factoring Differences of Squares Solution:

 Th e formula for the product of the sum and difference of the same two terms is Reversing this rule leads to the following special factoring rule. The following conditions must be true for a binomial to be a difference of squares: 1.Both terms of the binomial must be squares, such as x 2,9y 2,25,1,m 4. 2.The second terms of the binomials must have different signs (one positive and one negative). For example,.