SOLUTION: Question: Find the equation for the parabola with focus at (-1,-1) and vertex at (4,-1) POssible Answers: (a) x^2-8x+20y+28=0 (b) -4x^2-7x-4y^2+5y-5+0 (c) 5y^2-7x-5y=-8 (d)

Algebra ->  College  -> Linear Algebra -> SOLUTION: Question: Find the equation for the parabola with focus at (-1,-1) and vertex at (4,-1) POssible Answers: (a) x^2-8x+20y+28=0 (b) -4x^2-7x-4y^2+5y-5+0 (c) 5y^2-7x-5y=-8 (d)      Log On


   

Question 30360: Question:
Find the equation for the parabola with focus at (-1,-1) and vertex at (4,-1)
POssible Answers:
(a) x^2-8x+20y+28=0
(b) -4x^2-7x-4y^2+5y-5+0
(c) 5y^2-7x-5y=-8
(d)5x^2-7x+10y^2-5y=-3
Thanks!
Answer by sdmmadam@yahoo.com(530) About Me  (Show Source):
You can put this solution on YOUR website!
Find the equation for the parabola with focus at (-1,-1) and vertex at (4,-1)
The focus S(-1,-1) and the vetex A(4,-1) are on the line y =-1 which is a horizontal line parallel to the x-axis at a distance 1 unit below it
Axis horizontal means the parabola is square in y and linear in x
The focus is to the left of the vertex, which means the parabola is facing west
The equation to the parabola will be of the form
(y-k)^2 = -4a(x-h)----(1)
Where A(h,k ) = A(4,-1) and a = distance of the focus from the vertex.
The distance SA = (one unit to the y-axis plus 4 units to the vertex) = 1+4 = 5
Therefore putting h =4, k = -1 and a = 5
Therefore (1) becomes
[y-(-1)]^2 = -4X5(x-4)
(y+1)^2 = -20(x-4)
y^2+2y+1= -20x+80
y^2+2y+20x+1-80 =0
y^2+2y+20x-79 = 0
which DOES NOT tally with any of the following given answers:
(a) x^2-8x+20y+28=0
(b) -4x^2-7x-4y^2+5y-5+0
(c) 5y^2-7x-5y=-8
(d)5x^2-7x+10y^2-5y=-3
Remark: Either the set of answers given is wrong or the given particulars about the parabola are wrong. Please give the correct problem