• Rupa Rani Sharma
• Priyanka Sharma
• andeep Kumar Tiwari

This research study provides an expansion of the classic Baskakov-Sz´asz operators, integrating an unique limitation classified as q, which provides a modified method to the initial operators. This modification broadens the traditional theory to encompass q-calculus, an extension of standard calculus that incorporates a new parameter q. This extension allows for a broader exploration of operators within a more comprehensive mathematical framework. Our approach builds upon the fundamental principles important in approximation theory, but adapts them to align with q-calculus, offering new perspectives and techniques for managing functions and sequences in this context. We provide a detailed analysis of the moment computations associated with these q-operators, which is crucial for comprehending their behavior and setting the foundation for different approximation methods. Moments play a key role in approximation theory by offering insights into how well the operators can represent certain classes of functions accurately. By conducting this computation, we create a structure for delving further into the properties of the operators, such as their rates of convergence and limits on errors. In addition to calculating moments, we also analyze the modulus of continuity, which smoothness in functions. This continuity measure is important in approximation theory as it helps determine how accurately an operator can approximate a function, especially considering its smoothness. Our study shows that the q-Baskakov-Sz´asz operators possess favorable properties for approximation, making them useful tools for function approximation in the field of q-calculus. As specific variables approach infinity, we create mathematical qoperators. This mathematical representation serves as a useful resource for the extended-term behaviors of these operators and provides insight into their effectiveness in predicting outcomes over prolonged durations. Our work has revealed several outstanding issues that require additional exploration. These issues involve exploring different q-operators, investigating their potential applications in various fields, and conducting a more comprehensive analysis of their convergence properties. Attending to these unconcluded issues are going to lead the way for improvements in the research study of q-calculus and its real-world effects in estimation concept.

"An Analysis of q-Baskakov - Szasz Operators", International Journal of Emerging Technologies and Innovative Research (www.jetir.org), ISSN:2349-5162, Vol.13, Issue 2, page no.b264-b272, February-2026, Available :http://www.jetir.org/papers/JETIR2602136.pdf

"An Analysis of q-Baskakov - Szasz Operators", International Journal of Emerging Technologies and Innovative Research (www.jetir.org | UGC and issn Approved), ISSN:2349-5162, Vol.13, Issue 2, page no. ppb264-b272, February-2026, Available at : http://www.jetir.org/papers/JETIR2602136.pdf