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Follow the method in Step 1 to determine if the third expression is a perfect...

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Basic Math

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Follow the method in Step 1 to determine if the third expression is a perfect square trinomial.The first term and the third term of the third trinomial, h - 13h + 36, are perfect squares.h = (h)36 = (6)Because the h-term is negative, if the trinomial is a perfect square, then it is the square of a binomial difference.Find the square of the binomial formed by the difference of the square roots of the perfect squares, (h - 6). You can use the distributive property to square the binomial. Or you can use the rule for squaring a binomial difference, (a - b) = a - 2ab + b, with a = h and b = 6.Compare the original trinomial to the square of the binomial.(h-6) = (h-6)(h-)=h - (2)(h) ( ) + (6)= h - h + 36

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