Show that the angle between the tange...

Show that the angle between the tangent at any point `P` and the line joining `P` to the origin `O` is the same at all points on the curve `log(x^2+y^2)=ktan^(-1)(y/x)` .

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Show that the angle between the tangent at any point P and the line joining P to the origin O is same at all points on the curve log(x^2+y^2)=ktan^(-1)(y/x)

Show that the angle between the tangent at any point P and the line joining P to the origin O is same at all points on the curve log(x^2+y^2)=ktan^(-1)(y/x)

Show that the angle between the tangent at any point P and the line joining P to the origin O is same at all points on the curve log(x^2+y^2)=ktan^(-1)(y/x)

Show that the angle between the tangent at any point P and the line joining P to the origin O is same at all points on the curve log(x^2+y^2)=ktan^(-1)(y/x)

Show that the angle between the tangent at any point P and the line joining P to the origin O is same at all points on the curve log(x^2+y^2)=ktan^(-1)(y/x)

Show that the angle between the tangent at any point P and the line joining P to the origin O is same at all points on the curve log(x^(2)+y^(2))=k tan^(-1)((y)/(x))

The angle between the tangents at any point P and the line joining P to the orgin, where P is a point on the curve ln (x^(2)+y^(2))=ktan^(1-)""(y)/(x),c is a constant, is

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