What is the vertex of the parabola #y=1/8(x-2)^2+5#?

1 Answer
George C.
May 2, 2016

#(2, 5)#

Explanation:

The equation:

#y = 1/8(x-2)^2+5#

is in vertex form:

#y = a(x-h)^2+k#

with #a=1/8# and #(h, k) = (2, 5)#

So we simply read the coordinates of the vertex #(h, k) = (2, 5)# from the coefficients of the equation.

Notice that for any Real value of #x#, the resulting value of #(x-2)^2# is non-negative, and it is only zero when #x=2#. So this is where the vertex of the parabola is.

When #x=2#, the resulting value of #y# is #0^2+5 = 5#.

graph{(1/8(x-2)^2+5-y)((x-2)^2+(y-5)^2-0.03)=0 [-14.05, 17.55, -1.89, 13.91]}

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