SOLUTION: Write an equation in standard form for the conic section. Hyperbola with vertices (4,3) and (2,3) and foci at (0,3) and (6,3)

Algebra ->  Quadratic-relations-and-conic-sections -> SOLUTION: Write an equation in standard form for the conic section. Hyperbola with vertices (4,3) and (2,3) and foci at (0,3) and (6,3)      Log On


   

Question 448807: Write an equation in standard form for the conic section.
Hyperbola with vertices (4,3) and (2,3) and foci at (0,3) and (6,3)
Answer by ewatrrr(24785) About Me  (Show Source):
You can put this solution on YOUR website!
 

Hi

Hyperbola with vertices (4,3) and (2,3) and foci at (0,3) and (6,3)

Opens right and left C(3,3) a = 1

 (x-3)^/1 - (y-3)^2/b^2 =1

foci at (0,3) and (6,3)  c = sqrt%281%5E2+%2B+b%5E2%29 = 3, b^2 = 8

%28x-3%29%5E2%2F1+-+%28y-3%29%5E2%2F8+=1+







Standard Form of an Equation of a Circle is %28x-h%29%5E2+%2B+%28y-k%29%5E2+=+r%5E2 

where Pt(h,k) is the center and r is the radius



 Standard Form of an Equation of an Ellipse is %28x-h%29%5E2%2Fa%5E2+%2B+%28y-k%29%5E2%2Fb%5E2+=+1+

where Pt(h,k) is the center and a and b  are the respective vertices distances from center.



Standard Form of an Equation of an Hyperbola is  %28x-h%29%5E2%2Fa%5E2+-+%28y-k%29%5E2%2Fb%5E2+=+1 where Pt(h,k) is a center  with vertices 'a' units right and left of center.

Standard Form of an Equation of an Hyperbola opening up and down is:

  %28y-k%29%5E2%2Fb%5E2+-+%28x-h%29%5E2%2Fa%5E2+=+1 where Pt(h,k) is a center  with vertices 'b' units up and down from center.



Using the vertex form of a parabola opening up or down, y=a%28x-h%29%5E2+%2Bk

 where(h,k) is the vertex

 The standard form is %28x+-h%29%5E2+=+4p%28y+-k%29, where  the focus is (h,k + p)