Find the centre, the length of latus rectum, the eccentricity, the coordinates of foci and the equations of the directrices of the hyperbola `((x+2)^(2))/(9) - ((y-1)^(2))/(16) = 1.`

The equation of the directrices of the hyperbola 9x^(2) -16y^(2) -18x-64y =199 arc-

Find (i) the centre, (ii) vertices, (iii) equations of the axes, (iv) lengths of the axes (v) eccentricity,(vi) the length of latus rectum, (vii) coordinates of foci and (viii) the equations of the directrices of each of the following ellipses : ((x+1)^(2))/(9)+((y-2)^(2))/(5)=1

Find the length of latus rectum and the equations of the directrices of the hyperbola 3y^(2) - 4x^(2) = 12

Find (a) length of axes (b) length of latus rectum ( c) coordinates of vertices (d) eccentricity ( e) coordiantes of foct and (f) the equations of the directrices of the hyperbola(i) 9x^(2) - 25y^(2) = 225 (ii) 9y^(2) - 4x^(2) = 36.

Find (i) the centre (ii) the vertices (iii) the equations of the axes (iv) the length of axes (v) the eccentricities (vi) the lengths of latera recta (vii) the coordinates of foci and (viii) the equations of the directrices of the following two hyperbolas: 4x^(2) - 9y^(2) + 8x + 36y = 68 3x^(2) - 3y^(2) - 18x + 12y + 2 = 0

Find (i) the eccentricity, (ii) the coordinates of foct and (iii) the length of semi-latus rectum of the hyperbola x^(2) - y^(2) = a^(2) .

Find the coordinates of the foci, the eccentricity, the latus rectum, and the equations of directrices for the hyperbola 9x^2-16 y^2-72 x+96 y-144=0

Find (a) the lengths of the major and minor axes (b) the length of latus rectum (c) coordinates of vertices (d) eccentricity (e) coordinates of foci and (f) the equations of directrices for the following ellipse : 25x^(2) + 9y^(2) = 225

The equations of directrices of hyperbola 4x^2-9y^2-16x-54y-101=0 are

Find the (i) centre, (ii) eccentricity, (iii) vertices and (iv) the equations of the directrices of the hyperbola 4x^(2) - 9y^(2) + 8x + 36y = 68.