Abstract
Thermal and mass transport in the Carreau Yasuda fluid stagnation point MHD flow is addressed through a stretchable surface in this study. Thermal and solutal stratifications are analyzed. They occur due to temperature and concentration variation. The activation energy in the mass transfer is used to enhance the results. It is the initial input of energy due to which reaction proceeds. The velocity slip effect is implemented at the boundary for the momentum equation. Soret and Dufour's impact on a given flow is also studied. The entropy generation rate is computed mathematically and the results are presented through different plots for pertinent flow parameters. The governing PDE system is changed into an ordinary one by appropriate transformations. The obtained system is tackled through the ND-Solve MATHEMATICA for numerical results. It is seen that the concentration, temperature, and velocity distributions are diminished against rising values of thermal and solutal stratified parameters and slip. Also, we have seen that stratification is very useful in entropy generation minimization.