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)` =

If the tangent at any point on the curve x^4+y^4=a^4 cuts off intercepts p and q on the coordinate axes, then p^(-4//3)+q^(-4//3)=

The tangent at any point on the curve x^(4)+y^(4)=a^(4) cuts off intercepts p and q on the coordinate axes then the value of p^(-4 / 3)+q^(-4 / 3)=

If the tangents at any point on the curve x^(4)+y^(4)=a^(4) cuts off intercept p and q on the axes,the value of p^(-(4)/(3))+q^(-(1)/(3)) is

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

The portion of the tangent drawn at any point on x^(2//3)+y^(2//3)=a^(2//3)(agt0) , except the points points on the coordinate axes, included between the the coordinates axes is

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))=

Let P be any point on the curve x^(2//3)+y^(2//3)=a^(2//3). Then the length of the segment of the tangent between the coordinate axes in of length

Let P be any point on the curve x^(2//3)+y^(2//3)=a^(2//3). Then the length of the segment of the tangent between the coordinate axes in of length