CGHMaastricht
New member
- Joined
- Sep 16, 2016
- Messages
- 6
How do I compute the elasticity of the function f(x) = x^a?
My work:
I think the way to find it is to use the formula for Elasticity:
f'(x)*(x/f(x)) (f'(x) being the derivative of the function f(x))
so I can get that derivative to a*x^(a-1)
and multiply is by (x/f(x)) which is (x^1)/(x^a)
to get a*x^(a-1) * (x^1)/(x^a)
I think I can use exponents rule to take it to
ax^(a-1) * x^(1-a)
but I can't work out how to take it any further
Help would be much appreciated!
My work:
I think the way to find it is to use the formula for Elasticity:
f'(x)*(x/f(x)) (f'(x) being the derivative of the function f(x))
so I can get that derivative to a*x^(a-1)
and multiply is by (x/f(x)) which is (x^1)/(x^a)
to get a*x^(a-1) * (x^1)/(x^a)
I think I can use exponents rule to take it to
ax^(a-1) * x^(1-a)
but I can't work out how to take it any further
Help would be much appreciated!
