How do you factor the trinomial #x ^2 - 4 x + 32#? Algebra Polynomials and Factoring Factorization of Quadratic Expressions 1 Answer salamat Feb 7, 2017 #(x-(2- 2i sqrt(7)))(x-(2+ 2i sqrt(7)))=0# Explanation: #x^2-4x+32 =0# by using completing a square, #(x-2)^2-(2)^2+32=0# #(x-2)^2-4+32=0# #(x-2)^2+28=0# #(x-2)^2=-28 =28*(-1)# #(x-2)^2=28i^2#, where #i^2=-1# #x-2=+-sqrt(28i^2)=+-sqrt(7*4*i^2)# #x=2+- 2i sqrt(7)# #(x-2+ 2i sqrt(7))(x-2- 2i sqrt(7))=0# or#(x-(2- 2i sqrt(7)))(x-(2+ 2i sqrt(7)))=0# 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 1203 views around the world You can reuse this answer Creative Commons License