(2x−1)2=81

2 min read Jun 16, 2024
(2x−1)2=81

Solving the Equation (2x-1)^2 = 81

This article will guide you through the steps involved in solving the equation (2x-1)^2 = 81.

Understanding the Equation

The equation presents a squared term, (2x-1)^2, which is equal to 81. To solve for x, we need to isolate it.

Solving the Equation

  1. Take the square root of both sides:

    • √(2x-1)^2 = ±√81
    • 2x-1 = ±9
  2. Solve for two possible cases:

    • Case 1: 2x-1 = 9

      • 2x = 10
      • x = 5
    • Case 2: 2x-1 = -9

      • 2x = -8
      • x = -4

Solutions

Therefore, the solutions to the equation (2x-1)^2 = 81 are:

  • x = 5
  • x = -4

Verification

We can verify our solutions by plugging them back into the original equation:

  • For x = 5:

    • (2(5)-1)^2 = 9^2 = 81
    • This solution is valid.
  • For x = -4:

    • (2(-4)-1)^2 = (-9)^2 = 81
    • This solution is also valid.

Conclusion

We have successfully solved the equation (2x-1)^2 = 81 and found two solutions: x = 5 and x = -4. By taking the square root of both sides and considering both positive and negative values, we were able to isolate x and determine its possible values.

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