How do you solve: #x^3/2=125#? Algebra Quadratic Equations and Functions Comparing Methods for Solving Quadratics 1 Answer Harish Chandra Rajpoot Jul 5, 2018 #x=5root[3]2, \ 5\root[3]2e^{i{2\pi}/3},\ 5\root[3]2e^{i{4\pi}/3}# Explanation: #x^3/2=125# #x^3=125\cdot 2# #x^3=250# #x^3=250e^{i0}# #x^3=250e^{i2k\pi}# #x=(250e^{i2k\pi})^{1/3}# #x=\root[3]{250}e^{i{2k\pi}/3}# #x=5\root[3]{2}e^{i{2k\pi}/3}# Where, #k=0, 1, 2# Now, setting the values of #k#, we get three roots of given cubic equation as follows #x=5root[3]2, \ 5\root[3]2e^{i{2\pi}/3},\ 5\root[3]2e^{i{4\pi}/3}# Answer link Related questions What are the different methods for solving quadratic equations? What would be the best method to solve #-3x^2+12x+1=0#? How do you solve #-4x^2+4x=9#? What are the two numbers if the product of two consecutive integers is 72? Which method do you use to solve the quadratic equation #81x^2+1=0#? How do you solve #-4x^2+4000x=0#? How do you solve for x in #x^2-6x+4=0#? How do you solve #x^2-6x-16=0# by factoring? How do you solve by factoring and using the principle of zero products #x^2 + 7x + 6 = 0#? How do you solve #x^2=2x#? See all questions in Comparing Methods for Solving Quadratics Impact of this question 2690 views around the world You can reuse this answer Creative Commons License