Final answer:
The given equation, y = 5^{2} + \frac{\sin x}{2}, is not a wave equation but a simple expression that can be solved by calculating 5^{2}, finding the value of \sin x for any given x, dividing it by 2, and adding the result to 25.
Step-by-step explanation:
To solve the given equation y = 5^{2} + \frac{\sin x}{2}, it is crucial to understand it isn't a wave equation but rather a simple algebraic expression with a trigonometric function involved. The solve the equation or simplify it further, we assume that x is given, or if we need to find y for specific values of x, we then substitute those values into the expression.
First, calculate the constant term:
5^{2} equals 25.
Then, if we know the value of x, we can find \sin x using a calculator or trigonometric tables and divide that result by 2. The final step is to add this result to 25 to find the total value of y.
If we are not given a specific value for x, the expression remains as an equation with one variable, y, depending on x.