How do you graph #y=x^2-5#? Algebra Quadratic Equations and Functions Quadratic Functions and Their Graphs 1 Answer Alan N. Dec 1, 2016 #y# is the standard graph of #x^2# shifted down by 5 units. Explanation: #y=x^2 +5# #y# is the standard graph of #x^2# shifted down by 5 units. #y# has zeros at #+-sqrt5# #y' = 2x # Hence: #y_min = -5# at # x=0# The graph of #y# is shown below: graph{x^2-5 [-10, 10, -5, 5]} Answer link Related questions What are the important features of the graphs of quadratic functions? What do quadratic function graphs look like? How do you find the x intercepts of a quadratic function? How do you determine the vertex and direction when given a quadratic function? How do you determine the range of a quadratic function? What is the domain of quadratic functions? How do you find the maximum or minimum of quadratic functions? How do you graph #y=x^2-2x+3#? How do you know if #y=16-4x^2# opens up or down? How do you find the x-coordinate of the vertex for the graph #4x^2+16x+12=0#? See all questions in Quadratic Functions and Their Graphs Impact of this question 6112 views around the world You can reuse this answer Creative Commons License