Answer to Question #171139 in Analytic Geometry for Jon jay mendoza

Question #171139

Find the standard equation of the parabola which satisfies the given conditions.

1. Focus (−2, −5), directrix x = 6

2. Vertex (−4,2), focus (−4, −1)

3. Vertex (−8,3), directrix x = −10.5

4. Focus (7,11), directrix y = 4

Expert's answer

1. The distance of the directrix x=6 to the focus is 8 units therefore, 2p=-8, p=-4. Thus, the vertex is (2,-5).

The axis of symmetry is parallel to the x-axis:

(y - k)² = 4p(x - h) h=2 and k=-5

(y-(-5))²= 4(-4)(x-2)

(y+5)² = -16(x-2)

2. "(x-h)^2=4p(y-k)"

h=-4

k=2

p=-1-2=-3

"(x+4)^2=-12(y-2)"

"x^2+8x+16=-12y+24"

"y=-x^2\/12-2\/3x+2\/3"

3. (y - k)²= 4p(x - h) h=-8 and k=3

k-p=-10.5

p=10.5-8=2.5

"(y-3)^2=10(x+8)"

4."\\sqrt{(y-k)^2 }=\\sqrt{(x-a)^2+(y-b)^2}"

k=4

a=7

b=11

"\\sqrt{(y-4)^2 }=\\sqrt{(x-7)^2+(y-11)^2}"

"(y-4)^2 =(x-7)^2+(y-11)^2"

"y^2-8y+16=x^2-14x+49+y^2-22y+121"

"14y=x^2-14x+154"

"y=x^2\/14-x+11"

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