Answer:
Since 0.33 + 0.75 = 1.08 is greater than one, this production function therefore exhibits increasing returns to scale.
Explanation:
From the question, we have the following restated equation:
[tex]q=10L^{0.33} K^{0.75}[/tex]
Where q is the output, and L and K are inputs
To determine the types of returns to scale, we increase each of L and K inputs by constant amount c as follows:
[tex]q = 10(cL)^{0.33}(cK)^{0.75}[/tex]
We can now solve as follows;
[tex]q = 10c^{0.33+0.75} L^{0.33}K^{0.75}[/tex]
[tex]q=c^{1.08} L^{0.33} K^{0.75}[/tex]
Since 0.33 + 0.75 = 1.08 is greater than one, this production function therefore exhibits increasing returns to scale.
