Final answer:
The original question seems to have a typo, and without the correct expression, we cannot factorize it correctly. Basic factorization techniques involve finding two binomials that multiply to the original expression. The quadratic formula is an alternative when the expression doesn't neatly factor.
Step-by-step explanation:
Given the complexity of the provided expressions and numbers in this query, it appears there might be an error or typo in the original question, making it challenging to factorize the expression as requested. To factorize an expression properly, the equation or expression must be clearly defined. There might be a need to revisit the provided expression to ensure it is correct and complete.
However, if the student is referring to basic factorization techniques, we can review how to factorize quadratic expressions. This involves finding two binomials that when multiplied together give the original quadratic expression. The factorization is often conducted using techniques such as finding common factors, applying the difference of squares, or using the quadratic formula. Without an accurate expression, providing a precise answer is not possible.
In cases where the quadratic does not factor neatly, the quadratic formula, -b ± √(b² - 4ac) / (2a), is used to find the solutions to the quadratic equation ax² + bx + c = 0, which can also be used to express the factors.