The goal of this paper is to investigate the almost periodic solutions in distribution sense of the stochastic Lasota-Wazewska red blood cell models with mixed delays. Using the Banach fixed point theorem, we first establish the existence of almost periodic solutions in distribution sense.In the next step, we use stochastic analysis and inequality techniques to assess Lasota-Wazewska red blood cell model mean square global exponential stability. To illustrate the practicality of our results, we provide two numerical examples and simulations.