\( (x-y)(3 x-2 x y+4) \) 5. \( (7 m-3 n)\left(5 m^{2}-2 m n-7 n^{2}\right) \) 7. \( (2 x-y)\left(4 x^{2}+2 x y-y^{2}\right) \) 9. \( (4 m-n)\left(2 m^{2}-3 m n-n^{2}\right) \)

Did you know that factoring polynomial expressions has a rich history? Ancient mathematicians, including the Greeks, laid the groundwork for algebraic concepts that eventually led to polynomial factoring. It wasn't until the Renaissance that mathematicians like François Viète began developing more systematic approaches, which allowed us to break down polynomials and understand their roots more easily. When it comes to real-world applications, factoring polynomials can be incredibly useful in areas such as physics and engineering. Engineers often need to simplify complex equations to determine forces, motion, and energy in structures. For example, factoring can help streamline calculations for trajectories in projectile motion, making it easier for them to design safe and efficient structures and vehicles. So next time you’re simplifying an expression, remember that you’re part of a long-standing mathematical tradition!