What is the axis of symmetry and vertex for the graph #y = x^2 -4x + 8#?

1 Answer
marfre
Feb 15, 2017

Axis of symmetry: #x=2#, vertex: #(2, 4)#

Explanation:

To find out the axis of symmetry and vertex, the equation must be put in standard form (vertex form): #y=a(x-h)^2+k#
where #a =# constant, axis of symmetry #=h# and vertex #= (h,k)#

Use completing of the square:

  1. Combine the x-terms: #y=(x^2-4x)+8 #
  2. half the x-term coeficient #: 1/2 (-4) = -2 # and put it inside the squared factor #(x-2)^2#
  3. Subtract the added term: #(- 2)^2 =4 #
    #y= (x-2)^2+8-4#
    Note: since #(x-2)^2 = (x-2)(x-2) = x^2-4x+4# the added term is #4#.
  4. Simplify: #y = (x-2)^2+4#

From the graph you can also see the axis & vertex:
graph{x^2-4x+8 [-10.17, 9.83, -0.76, 9.24]}

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