How do you factor #x^6/8-y^3/27#? Algebra Polynomials and Factoring Factor Polynomials Using Special Products 1 Answer Nghi N. May 23, 2015 Use the identity: a^3 - b^3 = (a - b) (a^2 + ab + b^2) Let #x^2 = X,# then #(X/2)^3 - (y/3)^3# = #(X - y)(X^2 + Xy + y^2) #= = #(x^2 - y)(x^4 + x^2y + y^2)# Answer link Related questions How do you factor special products of polynomials? How do you identify special products when factoring? How do you factor #x^3 -8#? What are the factors of #x^3y^6 – 64#? How do you know if #x^2 + 10x + 25# is a perfect square? How do you write #16x^2 – 48x + 36# as a perfect square trinomial? What is the difference of two squares method of factoring? How do you factor #16x^2-36# using the difference of squares? How do you factor #2x^4y^2-32#? How do you factor #x^2 - 27#? See all questions in Factor Polynomials Using Special Products Impact of this question 1280 views around the world You can reuse this answer Creative Commons License