Point 'O' is the centre of the ellipse with major axis AB & minor axis CD. Point F is one focus of the ellipse. If OF = 6 & the diameter of the inscribed circle of triangle OCF is 2, then find the product `(AB).(CD)`

point 'O' is the centre of the ellipse with major axis AB & miror axis CD. Point F is one focus of the ellipse. If OF=6 & the diameter of the inscrided circle of triangle OCF is 2, then the products (AB) (CD) is

An ellipse with major axis 4 and minor axis 2 touches both the coordinate axes,then locus of its focus is

Find the equation of the ellipse with major axis on the x-axis and passes through the points (4,3) and (6,2)

F is one of the foci of the ellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1 with O as centre. bar(AB) and bar(CD) are major and minor axes respectively. If OF=6 and the diameter of the incircle of triangle OCF is 2. The values of a & b are

Consider an ellipse E,(x^(2))/(a^(2))+(y^(2))/(b^(2))=1, centered at point O andhaving AB and CD as its major and minor axes,respectively.If S_(1) is one of the focus of the ellipse,the radius of the incircle of triangle OCS_(1) is unit,and OS_(1)=6 units, then the value of (a-b)/(2) is

The relationship between, the semi-major axis, seimi-minor axis and the distance of the focus from the centre of the ellipse is

The relationship between, the semi-major axis, seimi-minor axis and the distance of the focus from the centre of the ellipse is

AB and CD are diameters of a circle with centre O.If /_OBD=50^(@) then find /_AOC

Find the equation to the ellipse with axes as the axes of coordinates. major axis = 6, minor axis = 4,