How do you factor #2h^3+h^2-18h-9# by grouping? Algebra Polynomials and Factoring Factoring by Grouping 1 Answer Deepak G. Jul 30, 2016 #=(2h+1)(h+3)(h-3)# Explanation: #2h^3+h^2-18h-9# #=h^2(2h+1)-9(2h+1)# #=(2h+1)(h^2-9)# #=(2h+1)(h+3)(h-3)# Answer link Related questions What is Factoring by Grouping? How do you factor by grouping four-term polynomials and trinomials? Why does factoring polynomials by grouping work? How do you factor #2x+2y+ax+ay#? How do you factor #3x^2+8x+4# by using the grouping method? How do you factor #6x^2-9x+10x-15#? How do you group and factor #4jk-8j^2+5k-10j#? What are the factors of #2m^3+3m^2+4m+6#? How do you factor quadratics by using the grouping method? How do you factor #x^4-2x^3+5x-10#? See all questions in Factoring by Grouping Impact of this question 1438 views around the world You can reuse this answer Creative Commons License