Choose the odd one out (1) Vertex (h,k)
(2) Equation of directrix is x = h + a
(3) Axis of symmetry is y = k
(4) Length of latus rectum = 4a

Choose the odd one out (1) Transverse axis is parallel to x-axis (2) Directrix are x = -+ a/e (3) Cenre is (0,0) (4) Transvervse axis parallel to y-axis

Find axis, Vertex, focus and equation of directrix for x^(2)-6x-12y-3=0 .

y^2+2y-x+5=0 represents a parabola. Find its vertex, equation of axis, equation of latus rectum, coordinates of the focus, equation of the directrix, extremities of the latus rectum, and the length of the latus rectum.

Find axis, vertex focus and equation of directrix for y^(2)+8x-6y+1=0

The area between y^(2) = 4x and its latus rectum is

Consider the parabola y^(2) = 4ax (i) Write the equation of the rectum and obtain the x co-ordinates of the point of intersection of latus rectum and the parabola. (ii) Find the area of the parabola bounded by the latus rectum.

Find the value of lambda if the equation (x-1)^2+(y-2)^2=lambda(x+y+3)^2 represents a parabola. Also, find its focus, the equation of its directrix, the equation of its axis, the coordinates of its vertex, the equation of its latus rectum, the length of the latus rectum, and the extremities of the latus rectum.

Find the equation of the parabola if the curve is opened upward, vertex is (-1, -2) and the length of the latus rectum is 4.

A parabola having directrix x +y +2 =0 touches a line 2x +y -5 = 0 at (2,1). Then the semi-latus rectum of the parabola, is