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Solving the Equation (3n - 2)(4n + 1) = 0 by Factoring
This equation is already in factored form, making it easy to solve. Here's how:
Understanding the Zero Product Property
The Zero Product Property states that if the product of two or more factors is zero, then at least one of the factors must be zero. In other words:
If a * b = 0, then either a = 0 or b = 0 (or both).
Applying the Zero Product Property
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Identify the factors: In our equation (3n - 2)(4n + 1) = 0, we have two factors: (3n - 2) and (4n + 1).
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Set each factor equal to zero:
- 3n - 2 = 0
- 4n + 1 = 0
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Solve for 'n' in each equation:
- For 3n - 2 = 0:
- Add 2 to both sides: 3n = 2
- Divide both sides by 3: n = 2/3
- For 4n + 1 = 0:
- Subtract 1 from both sides: 4n = -1
- Divide both sides by 4: n = -1/4
- For 3n - 2 = 0:
Solutions
Therefore, the solutions to the equation (3n - 2)(4n + 1) = 0 are:
- n = 2/3
- n = -1/4