A tangent is drawn to the ellipse `(x^2)/(27)+y^2=1` at `(3sqrt(3)costheta(0,pi/2)dot` Then find the value of `theta` such that the sum of intercepts on the axes made by this tangent is minimum.

Tangent is drawn to ellipse (x^(2))/(27)+y^(2)=1 at (3sqrt(3)cos theta,sin theta) Iwhere theta in(0,(pi)/(2))] Then the value of theta such that sum of intercepts on axes made by this tangent is mintercepts on (pi)/(6)(c)(pi)/(8)(d)(pi)/(4)

Let a tangent be drawn to the ellipse x^2/(27) +y^2=1" at "(3sqrt3 cos theta, sin theta)," where "theta in (0,pi/2) , Then the value of theta such that the sum of intercepts on axes made by this tangent is minimum is equal to :

A tangent is drawn to the ellipse (x^(2))/(27)+y^(2)=1 at (3sqrt(3)cos theta,sin theta) where theta varepsilon(0,(pi)/(2)) .Then find the value of theta such that the sum of intercepts on the axes made by this tangent is minimum.

A tangent is drawn to the ellipse (x^(2))/(27)+y^(2)=1 at the point (3 sqrt(3) cos theta sin theta) where 0 lt theta lt (pi)/(2) . The sum of intecepts of the tangents with the coordinates axes is least when theta equals

Normal is drawn to the ellipse (x^(2))/(27)+y^(2)-1 at a point (3sqrt(3)cos theta,sin theta) where theta

A tangent is drawn at the point (3sqrt(3)cos theta,sin theta) for 0

The slope of tangent to the ellipse x^(2)+4y^(2)=4 at the point (2cos theta,sin theta) is sqrt(2) Find the equation of the tangent

A tangent of slope 2 to the ellipse (x^(2))/(36)+(y^(2))/(49)=1 has an intercept on the y-axis of length