In the curve x^a y^b=K^(a+b) , prove tha...

In the curve `x^a y^b=K^(a+b)` , prove that the potion of the tangent intercepted between the coordinate axes is divided at its points of contact into segments which are in a constant ratio. (All the constants being positive).

Similar Questions

Explore conceptually related problems

For the curve x y=c , prove that the portion of the tangent intercepted between the coordinate axes is bisected at the point of contact.

For the curve xy=c, prove that the portion of the tangent intercepted between the coordinate axes is bisected at the point of contact.

In the curve x^(m)y^(n)=k^(m+n)(m,n, k gt0) prove that the portion of the tangent intercepted between the coordinate axes is divided at its point of contact in a constant ratio,

The equation of the curve in which the portion of the tangent included between the coordinate axes is bisected at the point of contact, is

In the curve `x^a y^b=K^(a+b)` , prove that the potion of the tangent intercepted between the coordinate axes is divided at its points of contact into segments which are in a constant ratio. (All the constants being positive).

Similar Questions

Recommended Questions