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· 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

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Page 1: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 2: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 3: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 4: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 5: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 6: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 7: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 8: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 9: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 10: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

Page 11: · 6-3 Multiplying Monomials A monomial is an algebraic expression that has one term. For example, 5, x, -3y, and 7xy are all monomials. To multiply monomials, multiply the coefficients

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