How do you factor the trinomial #6a^2-54a+108#? Algebra Polynomials and Factoring Factorization of Quadratic Expressions 1 Answer Shwetank Mauria Apr 7, 2016 Factors o #6a^2-54a+108# are #6*(a-6)*(a-3)# Explanation: In #6a^2-54a+108#, each of the coefficients is divisible by #6#, so taking #6# common we get #6a^2-54a+108=6xx(a^2-9a+18)# Now to factorize #a^2-9a+18# let us split middle term into components whose product is #18# and these are #6# and #3#. Hence, #6a^2-54a+108# can be written as #6(a^2-6a-3a+18)# or #6*{a(a-6)-3(a-6}# or #6*(a-6)*(a-3)# Answer link Related questions How do you factor trinomials? What is factorization of quadratic expressions? How do you factor quadratic equations with a coefficient? What are some examples of factoring quadratic expressions? How do you check that you factored a quadratic correctly? How do you factor #x^2+16x+48#? How do you factor #x^2-9x+20#? Question #3fdac How do you factor #8+z^6#? There is no GCF to be factor out, so is there another method to complete this? How do you factor #2t^2+7t+3#? See all questions in Factorization of Quadratic Expressions Impact of this question 1293 views around the world You can reuse this answer Creative Commons License