(x-7)^2/5=9

2 min read Jun 17, 2024
(x-7)^2/5=9

Solving the Equation: (x-7)^2/5 = 9

This article will guide you through the steps to solve the equation (x-7)^2/5 = 9.

Understanding the Equation

The equation involves a few key elements:

  • Parentheses: The expression (x-7) is enclosed in parentheses, indicating that we need to perform the operations inside them first.
  • Exponent: The term (x-7) is squared, meaning it is multiplied by itself.
  • Division: The entire squared term is divided by 5.
  • Equality: The equation uses the equals sign, meaning the left side must equal the right side.

Step-by-Step Solution

  1. Multiply both sides by 5: (x-7)^2 = 45

  2. Take the square root of both sides: x - 7 = ±√45

  3. Simplify the square root: x - 7 = ±3√5

  4. Add 7 to both sides: x = 7 ± 3√5

Solutions

The equation has two solutions:

  • x = 7 + 3√5
  • x = 7 - 3√5

Conclusion

The solutions to the equation (x-7)^2/5 = 9 are x = 7 + 3√5 and x = 7 - 3√5. By carefully applying the rules of algebra and simplifying the expression, we arrive at the solutions.

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