If 'P' be a moving point on the ellipse `x^2/25+y^2/16=1` in such a way that tangent at 'P' intersect `x =25/3` at Q then circle on PQ as diameter passes through a fixed point. Find that fixed point.

The tangent at any point on the ellipse 16x^(2)+25y^(2) = 400 meets the tangents at the ends of the major axis at T_(1) and T_(2) . The circle on T_(1)T_(2) as diameter passes through

The tangent at any point on the ellipse 16x^(2)+25y^(2) = 400 meets the tangents at the ends of the major axis at T_(1) and T_(2) . The circle on T_(1)T_(2) as diameter passes through

The tangent at any point on the ellipse 16x^(2)+25y^(2) = 400 meets the tangents at the ends of the major axis at T_(1) and T_(2) . The circle on T_(1)T_(2) as diameter passes through

The tangent at any point on the ellipse 16x^(2) + 25^(2) = 400 meets the tangents at the ends of the major axis at T_(1) and T_(2) . The circle on T_(1)T_(2) as diameter passes through

A tangent to the ellipes x^2/25+y^2/16=1 at any points meet the line x=0 at a point Q Let R be the image of Q in the line y=x, then circle whose extremities of a dameter are Q and R passes through a fixed point, the fixed point is

A tangent to the ellipes x^2/25+y^2/16=1 at any points meet the line x=0 at a point Q Let R be the image of Q in the line y=x, then circle whose extremities of a dameter are Q and R passes through a fixed point, the fixed point is

A tangent to the ellipes x^2/25+y^2/16=1 at any points meet the line x=0 at a point Q Let R be the image of Q in the line y=x, then circle whose extremities of a dameter are Q and R passes through a fixed point, the fixed point is

If 3x+4y=12 intersect the ellipse x^2/25+y^2/16=1 at P and Q , then point of intersection of tangents at P and Q.