In the hyperbola `4x^2 - 9y^2 = 36`, find the axes, the coordinates of the foci, the eccentricity, and the latus rectum.

In the hyperbola x ^(2) - y ^(2) = 4, find the length of the axes, the coordinates of the foci, the ecentricity, and the latus rectum, and the equations of the directrices.

For the hyperbola, 3y^(2) - x^(2) = 3 . Find the co-ordinates of the foci and vertices, eccentricity and length of the latus rectum.

If (x^(2))/(36) - (y^(2))/(64) =1 represents a hyperbola, then find the co-ordinates of the foci and the vertices, the eccentricity and the length of the latus rectum.

Find the length of the axes, the co-ordinates of the foci, the eccentricity, and latus rectum of the ellipse 3x^(2)+2y^(2)=24 .

Find the lengths of the major and the minor axes, the coordinates of the foci, the vertices, the eccentricity, the length of latus rectum and the eqatuion of the directrices of that ellipses : 3x^2 + 2y^2 = 18

Find the lengths of the major and the minor axes, the coordinates of the foci, the vertices, the eccentricity, the length of latus rectum and the eqatuion of the directrices of that ellipses : x^2/169 + y^2/25 = 1

Find the lengths of the major and the minor axes, the coordinates of the foci, the vertices, the eccentricity, the length of latus rectum and the eqatuion of the directrices of that ellipses : x^2/25 + y^2/169 = 1

Find the lengths of the major and the minor axes, the coordinates of the foci, the vertices, the eccentricity, the length of latus rectum and the eqatuion of the directrices of that ellipses : x^2 + 16y^2 = 16 .

For each of that parabolas, find the coordinates of the focus, the equation of the directrix and the length of latus rectum : x^2 = -9y

For the following parabola find the coordinates of the foci, the equation of the directrix and the lengths of the latus rectum: y^2=8x