This paper investigates the application of the least squares method for obtaining numerical solutions to Volterra-Fredholm  integrodifferential equations. The least squares method is a wellestablished approach for solving integral equations, and in this study, it  is utilized to find approximate solutions to such equations. To enhance the accuracy of the solutions, Chebyshev polynomials are used as  basis functions for the approximation process. These polynomials are chosen due to their favorable convergence properties and their  ability to provide accurate approximations over a wide range of problems. Several examples are included in this study to demonstrate the  effectiveness and reliability of the proposed method. The numerical results obtained using the least squares method with Chebyshev  polynomial approximations are compared with exact solutions, showing excellent agreement. The outcomes of this study  indicate that the method is both efficient and reliable for solving Volterra-Fredholm integro-differential equations, offering a robust  approach for practical applications.