What is the equation in standard form of the parabola with a focus at (42,-31) and a directrix of y= 2?

2 Answers

#y = -1/66x^2 +14/11x- 907/22 larr# standard form

Explanation:

Please observe that the directrix is a horizontal line

#y = 2#

Therefore, the parabola is the type that opens upward or downward; the vertex form of the equation for this type is:

#y = 1/(4f)(x -h)^2+ k" [1]"#

Where #(h,k)# is the vertex and #f# is the signed vertical distance from the vertex to the focus.

The x coordinate of the vertex is the same as the x coordinate of the focus:

#h = 42#

Substitute #42# for #h# into equation [1]:

#y = 1/(4f)(x -42)^2+ k" [2]"#

The y coordinate of the vertex is halfway between the directrix and the focus:

#k = (y_"directrix"+y_"focus")/2#

#k = (2+(-31))/2#

#k = -29/2#

Substitute #-29/2# for #k# into equation [2]:

#y = 1/(4f)(x -42)^2-29/2" [3]"#

The equation to find the value of #f# is:

#f = y_"focus"-k#

#f = -31- (-29/2)#

#f = -33/2#

Substitute #-33/2# for #f# into equation [3]:

#y = 1/(4(-33/2))(x -42)^2-29/2#

Simplify the fraction:

#y = -1/66(x -42)^2-29/2#

Expand the square:

#y = -1/66(x^2 -84x+ 1764)-29/2#

Distribute the fraction:

#y = -1/66x^2 +14/11x- 294/11-29/2#

Combine like terms:

#y = -1/66x^2 +14/11x- 907/22 larr# standard form

Sep 9, 2017

# y=-1/66x^2+14/11x-907/22,#

Explanation:

We will solve this Problem using the following Focus-Directrix

Property (FDP) of the Parabola.

FDP : Any point on a Parabola is equidistant from the

Focus and the Directrix.

Let, the point #F=F(42,-31)," and, the line "d : y-2=0,# be

the Focus and the Directrix of the Parabola, say S.

Let, #P=P(x,y) in S,# be any General Point.

Then, using the Distance Formula, we have, the distance,

#FP=sqrt{(x-42)^2+(y+31)^2}...............................(1).#

Knowing that the #bot-#dist. between a point #(k,k),# and, a line :

#ax+by+c=0,# is, #|ah+bk+c|/sqrt(a^2+b^2),# we find that,

#"the "bot-"dist. btwn "P(x,y), &, d" is, "|y-2|..............(2).#

By FDP, #(1), and (2),# we have,

# sqrt{(x-42)^2+(y+31)^2}=|y-2|, or, #

# (x-42)^2=(y-2)^2-(y+31)^2=-66y-957, i.e., #

#x^2-84x+1764=-66y-957.#

#:. 66y=-x^2+84x-2721,# which, in the Standard Form,

reads, # y=-1/66x^2+14/11x-907/22,#

as Respected Douglas K. Sir has already derived!

Enjoy Maths.!