Tangent at any point of the curve `(x/a)^(2//3)+(y/b)^(2//3)=1` makes intercepts `x_1` and `y_1` on the axes. Then

Tangent at any point of the curve ((x)/(a))^(2//3)+((y)/(b))^(2//3)=1 makes intercepts x_(1) and y_(1) on the axes show that (x_(1)^(2))/(a^(2))+(y_(1)^(2))/(b^(2))=1

If the tangent at any point on the curve ((x)/(a))^(2//3)+((y)/(b))^(2//3)=1 makes the intercepts, p,q and the axes then (p^(2))/(a^(2))+(q^(2))/(b^(2))=

If the tangent at any point on the curve x^(1//3)+y^(1//3)=a^(1//3)(agt0) cuts of intercepts p and q on the coordinate axes then sqrt(p)+sqrt(q) =

At any point on the curve (a)/(x^(2))+(b)/(y^(2))=1, the y-intercept made by the tangent is proportional to

At any point on the curve (a)/(x^(2))+(b)/(y^(2))=1 , then y-intercept made by the tangent is proportional to

The portion of the tangent of the curve x^(2/3)+y^(2/3)=a^(2/3) ,which is intercepted between the axes is (a>0)