The eccentricity of the ellipse whose axes are coincident with the co-ordinate axes and which touches the straight line `3x-2y-20=0 and x+6y-20=0` is

The equation of the ellipse whose axes are coincident with the coordinates axes and which touches the straight lines 3x-2y-20=0 and x+6y-20=0 is (x^2)/(40)+(y^2)/(10)=1 (b) (x^2)/5+(y^2)/8=1 (x^2)/(10)+(y^2)/(40)=1 (d) (x^2)/(40)+(y^2)/(30)=1

The equation of the ellipse whose axes are coincident with the coordinates axes and which touches the straight lines 3x-2y-20=0 and x+6y-20=0 is (x^2)/(40)+(y^2)/(10)=1 (b) (x^2)/5+(y^2)/8=1 (x^2)/(10)+(y^2)/(40)=1 (d) (x^2)/(40)+(y^2)/(30)=1

The equation of the ellipse whose axes are coincident with the coordinates axes and which touches the straight lines 3x-2y-20=0 and x+6y-20=0 is (x^(2))/(40)+(y^(2))/(10)=1( b) (x^(2))/(5)+(y^(2))/(8)=1(x^(2))/(10)+(y^(2))/(40)=1 (d) (x^(2))/(40)+(y^(2))/(30)=1

The equation of the ellipse whose axes are coincident with the coordinates axes and which touches the straight lines 3x-2y-20=0 and x+6y-20=0 is (a) (x^2)/(40)+(y^2)/(10)=1 (b) (x^2)/5+(y^2)/8=1 (c) (x^2)/(10)+(y^2)/(40)=1 (d) (x^2)/(40)+(y^2)/(30)=1

The eccentricity of the ellipse with centre at the origin which meets the straight line x/7 + y/2 = 1 on the axis of x and the straight line x/3 - y/5 = 1 on the axis of y and whose axes lie along the axes of coordinates, is

Equation of the ellipse whose axes are the axes of co-ordinates and which passes through the point (-3,1) and has eccentricity sqrt(2//5) is :

The equation of the circle in the first quadrant which touch the co-ordinate axes and the line 3x+4y=12 is

The eccentricity of the ellipse which meets the straight line x//7+y//2=1 on the axis of x and the straight line x//3-y//5=1 on the axis of y and whose axes lie along the axes of coordinates, is