What is the vertex form of #4(y-1)=(x-2)^2#? Algebra Quadratic Equations and Functions Vertex Form of a Quadratic Equation 1 Answer David L. May 2, 2017 #y=1/4(x-2)^2+1# Explanation: Vertex form has the form #y=a(x-b)^2+c# Divide both sides by #4# #4*4(y-1)=1/4(x-2)^2# #cancel4*cancel4(y-1)=1/4(x-2)^2# #y-1=1/4(x-2)^2# Add #1# to both sides #y-1+1=1/4(x-2)^2+1# #y-cancel1+cancel1=1/4(x-2)^2+1# #y=1/4(x-2)^2+1# Answer link Related questions What is the Vertex Form of a Quadratic Equation? How do you find the vertex form of a quadratic equation? How do you graph quadratic equations written in vertex form? How do you write #y+1=-2x^2-x# in the vertex form? How do you write the quadratic equation given #a=-2# and the vertex #(-5, 0)#? What is the quadratic equation containing (5, 2) and vertex (1, –2)? How do you find the vertex, x-intercept, y-intercept, and graph the equation #y=-4x^2+20x-24#? How do you write #y=9x^2+3x-10# in vertex form? What is the vertex of #y=-1/2(x-4)^2-7#? What is the vertex form of #y=x^2-6x+6#? See all questions in Vertex Form of a Quadratic Equation Impact of this question 1639 views around the world You can reuse this answer Creative Commons License