Question #6445973Fill in the Blank
Algebra-1
Question
Solve the equation . The solutions are and .
Answer & Analysis
Analysis
Question Analysis
This question tests the student's ability to solve a quadratic equation when the independent term is zero. The equation given is in the form , and the student needs to factor out the common factor and solve for the roots.
This question tests the student's ability to solve a quadratic equation when the independent term is zero. The equation given is in the form , and the student needs to factor out the common factor and solve for the roots.
Key Concept Explanation
When the constant term in a quadratic equation, the equation can be factored as . The solutions are found by setting each factor equal to zero.
When the constant term in a quadratic equation, the equation can be factored as . The solutions are found by setting each factor equal to zero.
Step-by-step Solution
1. Factor out the common factor from the equation .
2. This gives
1. Factor out the common factor from the equation .
2. This gives
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