For the law of conservation of energy, the amount of kinetic energy the proton gained in [tex]d=0.5 m[/tex] is equal to the amount of electric potential energy it losts covering the same distance.
The potential difference across which the proton travelled is given by
[tex]\Delta V = E d[/tex]
where E is the electric field intensity. Replacing the numbers, we get
[tex]\Delta V = (50000 V/m)(0.5 m)=25000 V[/tex]
The electric potential energy lost by the proton is given by
[tex]\Delta U = q \Delta V[/tex]
where [tex]q=1.6 \cdot 10^{-19}C[/tex] is the charge of the proton. Therefore, this quantity is equal to
[tex]\Delta U = (1.6 \cdot 10^{-19}C)(25000 V)=4 \cdot 10^{-15}J[/tex]
And based on what we said at the beginning, this electric potential energy lost by the proton is exactly equal to the amount of kinetic energy it gained:
[tex]\Delta K = 4 \cdot 10^{-15}J[/tex]
