The line passing through the extremity A...

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 `Mdot` 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

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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 Mdot Then the area of the triangle with vertices at A ,M , and O (the origin) is (a)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 is auxiliary circle at the point Mdot Then the area of the triangle with vertices at A ,M , and O (the origin) is (a) 31/10 (b) 29/10 (c) 21/10 (d) 27/10

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 area of the triangle with vertices at A, M and the origin O is :

The line passing through the extremity A of the major axis and extremity B of the minor axis of the ellipse x^(2)+9 y^(2)=9 meets the auxiliary circle at the point M. Then the area of the triangle with vertices 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 `Mdot` 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

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