Factoring is an important process that helps us understand more about mathematical impressions or equation. Through (1) factoring ,you can rewrite your (2) polynomialsin a simpler form, and when you apply the factoring (3) techniqueto mathematical expressions or equations, it can yield a lot of useful information. You have learned in this lesson about factoring perfect square trinomial. This trinomial is a result of (4) squaring a binomial. The first term of the trinomial is the square of the (5) first term of the binomial. The second term is the product of the (6) first term and (7) second term of the binomial which will always be (8) multiplied by (9) two. The third term of the trinomial is the (10) square of the (11) second term of the binomial. If the trinomial follows the pattern in squaring a binomial, then it is a (12) perfect square. To factor this, you should recognize first whether the (13) first termand (14) second termare (15) perfect square. After recognizing whether the given trinomial is a perfect square then you can proceed to factoring the pattern (16) a² + 2ab + b² = (a + b)² or (17) a² - 2ab - b² = (a - b)².
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Factoring is an important process that helps us understand more about mathematical impressions or equation. Through (1) factoring , you can rewrite your (2) polynomials in a simpler form, and when you apply the factoring (3) technique to mathematical expressions or equations, it can yield a lot of useful information. You have learned in this lesson about factoring perfect square trinomial. This trinomial is a result of (4) squaring a binomial. The first term of the trinomial is the square of the (5) first term of the binomial. The second term is the product of the (6) first term and (7) second term of the binomial which will always be (8) multiplied by (9) two. The third term of the trinomial is the (10) square of the (11) second term of the binomial. If the trinomial follows the pattern in squaring a binomial, then it is a (12) perfect square. To factor this, you should recognize first whether the (13) first term and (14) second term are (15) perfect square. After recognizing whether the given trinomial is a perfect square then you can proceed to factoring the pattern (16) a² + 2ab + b² = (a + b)² or (17) a² - 2ab - b² = (a - b)².