How do you write #P(x) = x^3 − 27x − 54# in factored form? Algebra Polynomials and Factoring Factoring Completely 1 Answer Mr. Mike Apr 18, 2018 #x^3-27x-54=(x-6)(x+3)^2# Explanation: #x^3-27x-54# First note that #P(-3)=0#. This means that #x+3# is a factor of #P(x)#. Lets synthetically divide #P(x)# by #x+3# and see what remains. #x^3-27x-54=x^3+3x^2-3x^2-9x-18x-54# #=x^2(x+3)-3x(x+3)-18(x+3)# #=(x^2-3x-18)(x+3)# #=(x-6)(x+3)(x+3)# #=(x-6)(x+3)^2# Answer link Related questions What is Factoring Completely? How do you know when you have completely factored a polynomial? Which methods of factoring do you use to factor completely? How do you factor completely #2x^2-8#? Which method do you use to factor #3x(x-1)+4(x-1) #? What are the factors of #12x^3+12x^2+3x#? How do you find the two numbers by using the factoring method, if one number is seven more than... How do you factor #12c^2-75# completely? How do you factor #x^6-26x^3-27#? How do you factor #100x^2+180x+81#? See all questions in Factoring Completely Impact of this question 4750 views around the world You can reuse this answer Creative Commons License