Question

For a homogeneous function if critical points exist the value at critical points is?​

Answer 1

Correct answer :-

For a homogeneous function if critical points exist the value at critical points is? f(a, b) = 0(a, b) → critical points. nf(a, b) = 0 ⇒ f(a, b) = 0(a, b) → critical points. Explanation: Euler's theorem is nothing but the linear combination asked here, The degree of the homogeneous function can be a real number. ✔️

Answer 2

zero

critical points are the points where the function is non-differentiable and the value of the function will turn out to be zero.

Critical points are those points on the graph of a particular function where the function's rate of change is altered that is if the function is decreasing then after a critical point it will increase or vice versa.

It helps in finding the extrema of functions.