How do you write the equation of the parabola in vertex form given vertex at (10, 0) and a directrix x = -2?

2 Answers
May 31, 2017

#y^2=48(x-10)#

Explanation:

As the vertex is #(10,0)# and directrix is #x=-2#, the distance of vertex from directrix is #10+2=12# and as vertex is to the right of directrix, focus will be further to the right of vertex by a distance of #12# units. Hence, focus is #(22,0)#.

Now parabola is the locus of a point #(x,y)#, whose distance from focus, which is #(22,0)# and directrix #x+2=0# is always same.

As distance from directrix is #|x+2}# and from focus is #sqrt((x-22)^2+y^2)#. As such equation of parabola is

#(x-22)^2+y^2=(x+2)^2#

or #x^2-44x+484+y^2=x^2+4x+4#

or #y^2=48x-480=48(x-10)#

graph{(y^2-48x+480)(x+2)((x-10)^2+y^2-0.2)((x-22)^2+y^2-0.2)=0 [-30.33, 49.67, -18.08, 21.92]}

May 31, 2017

#y^2=48(x-10)#

Explanation:

Look at the diagram -enter image source here

The curve opens to the right, hence its equation is -

#(y-k)^2=4xxaxx(x-h)#

Where-

#h=10# - x-coordinate of the vertex
#k=0# - y-coordinate of the vertex.
#a=12# - distance from the vertex to focus.

#(y-0)^2=4 xx 12xx(x-10)#

#y^2=48(x-10)#