The line passing through the extremity A of the major axis and extremity B of the minor axis of the ellipse `x^(2) + 16y^(2) = 16` meets its auxiliary circle of the point M. Then the area of the triangle with vertices of A, M and the origin O is ____________ .

The line passing through the extremity A of the major exis and extremity B of the minor axis of the ellipse x^(2)+9y^(2)=9 meets is auxiliary circle at the point M. Then the area of the triangle with vertices at A,M, and O (the origin) is 31/10(b) 29/10(c) 21/10 (d) 27/10

The line passing through the " extremity "A" of the major axis and extremity "B" of the minor axis of the ellipse x^(2)+9y^(2)=9 ," meets its auxiliary circle at the point "M" Then the integer closest to the area of the triangle with "vertices at "A,M" and the origin O is

The line passing through the extremity A of major axis and extremity B of the minor axes of the ellipse 9x^2 + 16y^2 = 144 meets the circle x^2+ y^2 =16 at the point P. Then the area of the triangle OAP, O being the origin (in square units) is

If one extremity of the minor axis of the ellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1 and the foci form an equilateral triangle,then its eccentricity,is

Normal is drawn at one of the extremities of the latus rectum of the hyperbola (x^(2))/(a^(2))-(y^(2))/(b^(2))=1 which meets the axes at points A and B . Then find the area of triangle OAB(O being the origin).