The coordinates (2, 3) and (1, 5) are th...

The coordinates (2, 3) and (1, 5) are the foci of an ellipse which passes through the origin. Then the equation of the (a)tangent at the origin is `(3sqrt(2)-5)x+(1-2sqrt(2))y=0` (b)tangent at the origin is `(3sqrt(2)+5)x+(1+2sqrt(2)y)=0` (c)tangent at the origin is `(3sqrt(2)+5)x-(2sqrt(2+1))y=0` (d)tangent at the origin is `(3sqrt(2)-5)-y(1-2sqrt(2))=0`

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The coordinates (2, 3) and (1, 5) are the foci of an ellipse which passes through the origin. Then the equation of the (a)tangent at the origin is (3sqrt(2)-5)x+(1-2sqrt(2))y=0 (b)tangent at the origin is (3sqrt(2)+5)x+(1+2sqrt(2)y)=0 (c)tangent at the origin is (3sqrt(2)+5)x-(2sqrt(2)+1))y=0 (d)tangent at the origin is (3sqrt(2)-5)x-y(1-2sqrt(2))=0

Radius of the circle that passes through the origin and touches the parabola y^(2)=4ax at the point (a,2a) is (a) (5)/(sqrt(2))a (b) 2sqrt(2)a (c) sqrt((5)/(2))a (d) (3)/(sqrt(2))a

sqrt(2)x + sqrt(3)y=0 sqrt(5)x - sqrt(2)y=0

Radius of the circle that passes through the origin and touches the parabola y^2=4a x at the point (a ,2a) is (a) 5/(sqrt(2))a (b) 2sqrt(2)a (c) sqrt(5/2)a (d) 3/(sqrt(2))a

The equation of tangent to the curve y=int_(x^(2))^(x^(3))(dt)/(sqrt(1+t^(2))) at x=1 is sqrt(3)x+1=y (b) sqrt(2)y+1=x sqrt(3)x+y=1(d)sqrt(2)y=x

For which of the following curves, the line x + sqrt3 y = 2sqrt3 is the tangent at the point ((3sqrt3)/(2), 1/2) ?

The distance between the origin and the tangent to the curve y=e^(2x)+x^2 drawn at the point x=0 is (a) (1/sqrt(5)) (b) (2/sqrt(5)) (c) (-(1)/sqrt(5)) (d) (2/sqrt(3))

The equations of the tangents to the circle x^2+y^2=a^2 parallel to the line sqrt3x+y+3=0 are

Consider an ellipse whose foci are (+-2 sqrt3,0) and which passes through (2 sqrt3,1) Prove that the equation of the ellipse may be written as x^2/a^2+y^2/(a^2-12)=1

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