If #x=2y# into #-4x+11y=15#, what are #x#, and #y#? Algebra Systems of Equations and Inequalities Linear Systems with Addition or Subtraction 1 Answer anor277 Jan 24, 2017 #y=5; x=10# Explanation: We substitute #x=2y# into #-4x+11y=15# #-8y+11y=15# #3y=15#, #y=5# #x=2y=2xx5=10.# Answer link Related questions What if the elimination method results in 0=0? How do you use the addition and subtraction method to solve a linear system? Can any system be solved using the addition and subtraction method? When is the addition and subtraction method easier to use? How do you solve #-x-6y=-18# and #x-6y=-6# using the addition and subtraction method? How do you solve #5x-3y=-14# and #x-3y=2# using elimination? Do you need to add or subtract the equations #5x+7y=-31# and #5x-9y=17# to solve the system? How do you solve the system of equations #3y-4x=-33# and #5x-3y=40.5#? What is the solution to the system #x+y=2# and #x-y=6#? What is the common point of #x+2y=6# and #x+y=2#? See all questions in Linear Systems with Addition or Subtraction Impact of this question 1928 views around the world You can reuse this answer Creative Commons License