How do you identify the vertex, focus, directrix and the length of the latus rectum and graph 4(x-2)=(y+3)^24(x2)=(y+3)2?

1 Answer
Douglas K.
Oct 30, 2016

Please see the explanation.

Explanation:

Rewrite the equation in the vertex form

x = a(y - k)^2 + hx=a(yk)2+h

where (h, k)(h,k) is the vertex and the signed distance of the vertex to the focus is f= 1/(4a)f=14a

Divide by both sides by 4:

x - 2 = 1/4(x + 3)^2x2=14(x+3)2

Write the + as a - -

x - 2 = 1/4(x - -3)^2x2=14(x3)2

Add 2 to both sides:

x = 1/4(y - -3)^2 + 2x=14(y3)2+2

Now, that the equation is in standard form, please observe that the vertex is at (2, -3)(2,3)

The distance, in the x direction, from the vertex from to the focus is:

f = 1/(4(1/4)) = 1f=14(14)=1

Therefore, we add 1 to the x coordinate of the vertex and we see that the focus is (3, -3)(3,3)

The directrix is the vertical line the same distance in the opposite direction from the vertex so we subtract 1 from the x coordinate of the vertex; making its equation:

x = 1x=1

Modifying the equation, f = 1/(4a)f=14a, to be a = 1/(4f)a=14f, the length of the latus rectum is the denominator, 4f4f:

4f = 4(1) = 44f=4(1)=4

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