Let X₁, X₂ be a random sample from a population having probability density function f ∈ { f₀, f₁} where 

\(\rm f_0(x)=\left\{\begin{matrix}\frac{1}{2}& if\ 0\le x\le 2\\\ 0&otherwise\end{matrix}\right.\ and \ \rm f_1(x)=\left\{\begin{matrix}\frac{1}{4}& if\ 0\le x\le 4\\\ 0&otherwise\end{matrix}\right.\)

For testing the null hypothesis H₀ : f = f₀ against the alternate hypothesis H₁ : f = f₁, the power of a most powerful test of size α = 0.05 is equal to