How do you solve the system #6x^2+3y^2=12# and #y=-x+2#? Precalculus Solving Systems of Two Equations Solving by Substitution 1 Answer Ratnaker Mehta Aug 1, 2016 The Soln. Set #={(0,2), (4/3,2/3)}# Explanation: We subst. #y# from the Second eqn. into the First one, to get, #6x^2+3(2-x)^2=12# #:. 6x^2+3(4-4x+x^2)=12# #:. 9x^2-12x=12-12=0#. #:. 3x(3x-4)=0# #:. x=0, or, x=4/3# accordingly, #y=2, or, 2/3# #:.# The Soln. Set #={(0,2), (4/3,2/3)}# Answer link Related questions What is a system of equations? What does it mean to solve a system of equations by substitution? How do I use substitution to find the solution of the system of equations #c+3d=8# and #c=4d-6#? How do you write a system of linear equations in two variables? How does a system of linear equations have no solution? How many solutions can a system of linear equations have? What is the final step of completing a solve by substitution problem? How do I use substitution to find the solution of the system of equations #4x+3y=7# and #3x+5y=8#? How do I use substitution to find the solution of the system of equations #y=2x+1# and #2y=4x+2#? How do I use substitution to find the solution of the system of equations #y=1/3x+7/3# and... See all questions in Solving by Substitution Impact of this question 2019 views around the world You can reuse this answer Creative Commons License