%5E2%3D16-square-root-method.jpeg "(x-7)^2=16 Square Root Method")
Solving (x-7)² = 16 using the Square Root Method
This article will guide you through solving the equation (x-7)² = 16 using the square root method.
Understanding the Square Root Method
The square root method is a simple and effective way to solve equations that involve a squared term. The core idea is to isolate the squared term, take the square root of both sides, and then solve for the unknown variable.
Steps to Solve (x-7)² = 16
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Isolate the squared term: The squared term is already isolated on the left side of the equation.
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Take the square root of both sides: This eliminates the square on the left side. Remember that taking the square root can result in both positive and negative solutions.
√(x-7)² = ±√16
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Simplify:
x - 7 = ±4 -
Solve for x: x = 7 ± 4
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Find the two possible solutions:
- x = 7 + 4 = 11
- x = 7 - 4 = 3
Solution
Therefore, the solutions to the equation (x-7)² = 16 are x = 11 and x = 3.
Verification
You can verify your solutions by substituting them back into the original equation.
- For x = 11: (11-7)² = 4² = 16 (This confirms the solution)
- For x = 3: (3-7)² = (-4)² = 16 (This confirms the solution)
Conclusion
The square root method provides a straightforward approach to solving equations with squared terms. By understanding the steps and considering both positive and negative solutions, you can effectively find the solutions to such equations.