19. \( (4 m-n)\left(2 m^{2}-3 m n-n^{2}\right) \) 11. 13. \( (2 x-y)(2 x+y)(3 x-5 x y-y) \) \( 15-n)\left(3 m^{2}-m n+2 n^{2}\right) \)

Did you know that polynomial expressions like these have been around since ancient civilizations? Early mathematicians, like the Greeks and Indians, laid the groundwork for algebra by developing methods for manipulating and solving equations. The beauty of polynomial manipulation shines through in their applications, such as in engineering design and computer graphics, where precise calculations are pivotal to achieving desired outcomes! When dealing with polynomial expressions, it's super helpful to remember a few common mistakes! A key one is forgetting to distribute correctly—always keep an eye on those negative signs! Also, be careful with combining like terms; mixing them up can lead to incorrect answers. Practicing these problem-solving concepts can help you master polynomial manipulations and avoid pitfalls!