Find the axis, coordinates of vertex and focus, length of latus rectum, equation of directrix and the coordinates of the ends of latus rectum of the following parabola :
`y^(2) = 20 x `

Find the axis, coordinates of vertex and focus, length of latus rectum, equation of directrix and the coordinates of the ends of latus rectum of the following parabola : x^(2) = - 12 y

Find the axis, coordinates of vertex and focus, length of latus rectum, equation of directrix and the coordinates of the ends of latus rectum of the following parabola : 3y ^(2) = - 4 x

Find the axis, coordinates of vertex and focus, length of latus rectum, equation of directrix and the coordinates of the ends of latus rectum of the following parabola : 5x^(2) = 16 y

Find the axis, coordinates of vertex and focus, length of latus rectum, equation of directrix and the coordinates of the ends of latus rectum of the following parabola : y^(2) - 4 x - 2 y - 7 = 0

Find the axis, coordinates of vertex and focus, length of latus rectum, equation of directrix and the coordinates of the ends of latus rectum of the following parabola : y^(2) = 6 ( x + y )

Find the axis, coordinates of vertex and focus, length of latus rectum, equation of directrix and the coordinates of the ends of latus rectum of the following parabola : ( y + 3) ^(2) = 2 (x + 2)

Find the axis, coordinates of vertex and focus, length of latus rectum, equation of directrix and the coordinates of the ends of latus rectum of the following parabola : 4 (x - 2) ^(2) = - 5 ( y + 3)

Find the axis, coordinates of vertex and focus, length of latus rectum and the equation of directrix for the following parabola : y^(2)=18x

Find the axis, coordinates of vertex and focus, length of latus rectum and the equation of directrix for the following parabola : 3x^(2) = - 8y

Find the axis, coordinates of vertex and focus, length of latus rectum and the equation of directrix for the following parabola : y = lx^(2) + mx + n (l ne 0)