Find lengths of the principal axes, co-ordinates of the foci, equations of directrices, length of the latus rectum, distance between foci, distance between directrices of the curve : `x^2-y^2=16`

Find lengths of the principal axes, co-ordinates of the foci, equations of directrices, length of the latus rectum, distance between foci, distance between directrices of the curve : 16x^2+25y^2=400

Find lengths of the principal axes, co-ordinates of the foci, equations of directrices, length of the latus rectum, distance between foci, distance between directrices of the curve : x^2/144+y^2/25=1

Find length of the principal axes, eccentricity, co-ordinates of the foci, equation of directices, length of the latus rectum, distacne between foci, distance between directrices, of the following ellipse : 2x^2+6y^2=6

Find length of the principal axes, eccentricity, co-ordinates of the foci, equation of directices, length of the latus rectum, distacne between foci, distance between directrices, of the following ellipse : x^2/25+y^2/9=1

Find length of the principal axes, eccentricity, co-ordinates of the foci, equation of directices, length of the latus rectum, distacne between foci, distance between directrices, of the following ellipse : 3x^2+4y^2=12

Find length of the principal axes, eccentricity, co-ordinates of the foci, equation of directices, length of the latus rectum, distacne between foci, distance between directrices, of the following ellipse : 3x^2+4y^2=1

The distance between directrices of the ellipse 9x^2+25y^2=225 , is :

Find the equation of ellipse in standard form if,: The distance between foci is 6 and the distance between directrices is 50/3

Find the coordinates of focus, equation of directrix, length of latus rectum and the co-ordinates of end points of latus rectum of the following Parabola. : x^2=-8y

Find coordinatesof focus, equation of directrix, length of latus rectum and the co-ordinates of end points of latus rectum of the following Parabola. : y^2=28x