(m-1)(m%2B3).jpeg "(m-2)(m-1)(m+3)")
Factoring and Expanding (m-2)(m-1)(m+3)
This expression represents the product of three linear factors: (m-2), (m-1), and (m+3). We can approach it in two ways:
1. Expanding the Expression
We can expand the expression by multiplying the factors step by step:
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Multiply the first two factors: (m-2)(m-1) = m² - m - 2m + 2 = m² - 3m + 2
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Multiply the result by the third factor: (m² - 3m + 2)(m+3) = m³ + 3m² - 3m² - 9m + 2m + 6 = m³ - 7m + 6
Therefore, the expanded form of (m-2)(m-1)(m+3) is m³ - 7m + 6.
2. Finding the Roots
The expression (m-2)(m-1)(m+3) is equal to zero when any of the factors are equal to zero. This leads to the following solutions:
- m - 2 = 0 => m = 2
- m - 1 = 0 => m = 1
- m + 3 = 0 => m = -3
Therefore, the roots of the equation (m-2)(m-1)(m+3) = 0 are m = 2, m = 1, and m = -3.
Applications
Understanding how to factor and expand expressions like (m-2)(m-1)(m+3) is crucial in various mathematical fields, including:
- Algebra: Solving equations, simplifying expressions, and understanding the relationship between factors and roots.
- Calculus: Finding derivatives and integrals of polynomial functions.
- Linear Algebra: Working with matrices and vectors.
In addition to its mathematical significance, understanding the factorization and expansion of expressions like this can also be helpful in other areas such as:
- Physics: Modeling physical phenomena using equations.
- Engineering: Designing and analyzing structures and systems.
- Computer Science: Developing algorithms and data structures.
Overall, understanding the relationship between factored and expanded forms of expressions provides a valuable tool for solving various mathematical problems and understanding the underlying principles of many scientific and engineering fields.