How do you write the equation of the parabola in vertex form given vertex (5,-2) and focus (5,-4)?

1 Answer
Jan 22, 2018

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

Explanation:

As vertex is #(5,-2)# and focus is #(5,-4)#

as axis of symmetry passes through both and abscissa is common in both, equation of axis of symmetry is #x=5#

and as directrix is perpendicular to it, its equation is of type #y=k#

Now vertex is midway between directrix and focus and hence directrix is #y=0#

The parabola is locus of a point #(x,y)# which moves so that it is equidistant from directrix anf focus, hence its equation is

#(x-5)^2+(y+4)^2=y^2#

or #(x-5)^2+y^2+8y+16=y^2#

or #8y=-(x-5)^2-16#

i.e. #y=-1/8(x-5)^2-2#

graph{y(x^2-10x+8y+41)(x-5)((x-5)^2+(y+2)^2-0.03)((x-5)^2+(y+4)^2-0.03)=0 [-5.04, 14.96, -7.16, 2.84]}