the centre of the ellipse `((x+y-2)^(2))/(9)+((x-y)^(2))/(16)=1` , is

The straight line x+y=a will be a tangent to the ellipse (x^(2))/(9)+(y^(2))/(16)=1 if a=

The mid point of the chord 16x+9y=25 to the ellipse (x^(2))/(9)+(y^(2))/(16)=1 is

The maximum distance of the centre of the ellipse (x^(2))/(16) +(y^(2))/(9) =1 from the chord of contact of mutually perpendicular tangents of the ellipse is

If the reflection of the ellipse ((x-4)^(2))/(16)+((y-3)^(2))/(9) =1 in the mirror line x -y -2 = 0 is k_(1)x^(2)+k_(2)y^(2)-160x -36y +292 = 0 , then (k_(1)+k_(2))/(5) is equal to

Find the locus of the mid-point of the chord of the ellipse (x^(2))/(16) + (y ^(2))/(9) =1, which is a normal to the ellipse (x ^(2))/(9) + (y ^(2))/(4) =1.

An ellipse has its centre at (1,-1) and semi major axis =8 and it passes through the point (1,3). The equation of the ellipse is ((x+1)^(2))/(64)+((y+1)^(2))/(16)=1b((x-1)^(2))/(64)+((y-1)^(2))/(16)=1c((x-1)^(2))/(64)+((y-1)^(2))/(16)=1d((x-1)^(2))/(64)+((y-1)^(2))/(16)=1