To solve the differential equation of the form 2y y’ = 0, we can start by breaking it down into its factors. Here, the equation can be rewritten as:
2y = 0 or y' = 01. **Solving the first factor:**
From 2y = 0, we can conclude that:
y = 0This gives us one particular solution where the function is constantly zero.
2. **Solving the second factor:**
Now for y’ = 0, it indicates that the derivative of y with respect to the independent variable (often x or t) is zero. This means that y must be a constant value. Thus:
y = Cwhere C is any constant.
3. **General Solution:**
Combining both solutions, we can express the general solution of the differential equation as:
y = 0 or y = CIn summary, the general solution to the differential equation 2y y’ = 0 includes the trivial solution (where y is always zero) and the solutions where y takes any constant value.