This year I will continue my problem-solving style shown in '22 and demonstrate the problem-solving skills in these four domains: geometry, combinatorics, number theory and algebra/analysis. I have selected couple of problems and examples from the following published resources: R. Honsberger's From Erdös to Kiev: Problems of Olympia Caliber (or related Crux volumes), M. H. Weissman's An Illustrated Theory of Numbers, S. Savchev and T. Andreescu's Mathematics Miniatures, R. Stanley's Enumerative Combinatorics. Wolfram Language's built-in functions and Wolfram Function Repository resources have a unique charm to make the exploration of the solutions very expressive. It is critical to see the connection between the "Aha!" moment and solid examples generated by Wolfram Language. It is my wish for all my audience to enjoy the talk and start their own journeys of solving challenging problems with Wolfram Language.