In this paper, we introduce random Jungck-Picard-Krasnoselskii hybrid iterative process which is a
hybrid of random Jungck, Picard and krasnoselskii iterative processes. We prove under j-contractive condition,
our random hybrid iterative scheme converges faster than all of random Jungck-Picard, Jungck-Mann, JungckKrasnoselskii and Jungck-Ishikawa iterative processes. Finally, we use it to find a solution of random nonlinear
integral equation. Our results generalize and improve several known results in stochastic and deterministic cases.