What are the x and y intercepts of #-3y=2x^3-3#? Algebra Graphs of Linear Equations and Functions Intercepts by Substitution 1 Answer Shwetank Mauria Mar 7, 2016 Intercept on #x# axis is #1.1447# and intercept on #y# axis is #1#. Explanation: To find #x# intercepts of #−3y=2x^3−3#, one needs to put #y=0# in the equation which gives us #−3xx0=2x^3−3# or #2x^3-3=0# or #x=root(3)3/2=1.1447#. For #y# intercepts, put #x=0#, i.e. #-3y=0-3=-3# or #y=1# Hence, intercept on #x# axis is #1.1447# and intercept on #y# axis is #1#. Answer link Related questions What is the x and y Intercepts? How many intercepts can a line have? How do you use substitution to find intercepts? How do you identify the intercepts on a linear graph? How do you use the x and y intercepts to graph a linear equation? How do you find the x and y intercept for #y=2x+3#? How do you find the x intercept for #y=2#? What is the y intercept for the #y=2# graph? What is the y intercept for #x=-1#? How do you find the intercepts of #x^2y-x^2+4y=0#? See all questions in Intercepts by Substitution Impact of this question 1250 views around the world You can reuse this answer Creative Commons License