Step 1 :Given the equation \((2x - 3)^2 = 23\)
Step 2 :According to the square root property, if \(x^2 = a\), then \(x = \sqrt{a}\) or \(x = -\sqrt{a}\)
Step 3 :Applying this to our equation, we get two equations: \(2x - 3 = \sqrt{23}\) and \(2x - 3 = -\sqrt{23}\)
Step 4 :Solving these two equations for x, we get two solutions: \(x = 3.8979157616563596\) and \(x = -0.8979157616563596\)
Step 5 :Final Answer: The solutions to the equation \((2 x-3)^{2}=23\) are \(x = \boxed{3.8979157616563596}\) and \(x = \boxed{-0.8979157616563596}\)