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This section focuses on factoring trinomials in the form of x² + bx + c by identifying two binomials. To start, factor out the greatest common factor if possible, then recognize that a trinomial can be expressed as (x + m)(x + n), where m and n are determined from the product and sum of the coefficients. The constant term c results from multiplying the constants of the binomials, while the middle term coefficient b is the sum of m and n. Understanding this method is essential for simplifying algebraic expressions.
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Section 6.2 Factoring Trinomials of the Form x2+bx+c
Factoring Trinomials of the Form x2 + bx + c • Factor trinomials of the form x2 + bx + c • Factor out the greatest common factor and then factor a trinomial of the form x2 + bx + c Section 6.2
Factoring Trinomials of the Form x2 + bx + c • Multiply the binomials • Trinomials of the form x2 + bx + c result from the product of two binomials of the form (x + m)(x + n). Section 6.2
Factoring Trinomials of the Form x2 + bx + c • Multiply the binomials • Notice, the first term in the trinomial comes from the product of the first terms in each binomial. Section 6.2
Factoring Trinomials of the Form x2 + bx + c • Multiply the binomials • Notice, the first term in the trinomial comes from the product of the first terms in each binomial. • Notice, the last term in the trinomial comes from the product of the last terms in each binomial. Section 6.2
Factoring Trinomials of the Form x2 + bx + c • Multiply the binomials • Notice, the first term in the trinomial comes from the product of the first terms in each binomial. • Notice, the last term in the trinomial comes from the product of the last terms in each binomial. • Notice, the middle term in the trinomial comes from the sum of the last terms in the binomial. Section 6.2
Factoring Trinomials of the Form x2 + bx + c • Proof • Multiply (x + m)(x + n) The last term, the constant, is the product of the constants in the binomials. The middle term, the coefficient of x, is the sum of the constants in the binomials. Section 6.2
Factoring Trinomials of the Form x2 + bx + c • Factor • Trinomials of the form x2 + bx + c result from the product of two binomials of the form (x + m)(x + n) where m+n=b and mn=c. • To factor a trinomial: • List all factor pairs of c • Start here since the amount of factors for a number is finite. • Find the pair whose sum or difference is b • Check the factorization by multiplying it back out • If c is positive, m and n will have the same sign and will add to b • If c is negative, m and n will have different signs and will subtract to b Which of these sum to 9? What sums to 9? What multiplies to 20? AAACK! Infinite possibilities! Limited number of options! Section 6.2
Factoring Trinomials of the Form x2 + bx + c • Factor • Trinomials of the form x2 + bx + c result from the product of two binomials of the form (x + m)(x + n) where m+n=b and mn=c. • To factor a trinomial: • List all factor pairs of c • Start here since the amount of factors for a number is finite. • Find the pair whose sum or difference is b • Check the factorization by multiplying it back out • If c is positive, m and n will have the same sign and will add to b • If c is negative, m and n will have different signs and will subtract to b Section 6.2
Factoring Trinomials of the Form x2 + bx + cSpecial Cases • Factor • A polynomial that cannot be factored is called prime. Section 6.2
Factoring Out the Greatest Common Factor • Factor • Always begin by factoring out the GCF if it exists. Section 6.2
