A hyperbola has axes along the coordinate axes. Its trasverse axis is 2a and it passes through (h.k). Find its eccentricity.

Find the equation to the hyperbola referred to its axes as coordinate axes whose conjugate axis is 7 and passes through the point (3,-2).

Find the equation of the hypeerbola whose axes are along the coordinate axes and which passes through (-3,4), and (5,6)

The major axis of an ellipse is twice its minor axis. Find its eccentricity.

Equation of the hyperbola whose axes are the axes of coordinates (focus lying on x-axis) and which passes through the point (-3, 1) and has eccentricity sqrt(3) can be

Let the eccentricity of the hyperbola with the principal axes along the coordinate axes and passing through (3, 0) and (3sqrt2,2) is e, then the value of ((e^(2)+1)/(e^(2)-1)) is equal to

Find the equation of an ellipse whose axes lie along the coordinate axes, which passes through the point (-3,1) and has eccentricity equal to sqrt(2//5)

Find the equation of an ellipse whose axes lie along coordinate axes and which passes through (4,3) and (-1,4).

The asymptotes of a hyperbola are parallel to lines 2x+3y=0 and 3x+2y=0 . The hyperbola has its centre at (1, 2) and it passes through (5, 3). Find its equation.

Find the equation of the hyperbola, referred to its axes as the axes of coordinates, the distance between whose foci is 4 and whose eccentricity is sqrt2,

An ellipse and a hyperbola have their principal axes along the coordinate axes and have a common foci separated by distance 2sqrt(3)dot The difference of their focal semi-axes is equal to 4. If the ratio of their eccentricities is 3/7 , find the equation of these curves.