1. Let's clarify the problem: you are asking if there is a singular formula to find $h$, but the context or the equation involving $h$ is not provided. 2. In mathematics and physics, the formula to find $h$ depends entirely on the specific problem or context. For example: - In geometry, $h$ might represent height, and formulas vary depending on the shape (e.g., $h = \frac{2A}{b}$ for the height of a triangle with base $b$ and area $A$). - In physics, $h$ could be Planck's constant, a known constant, or height in kinematic equations like $h = v_0 t - \frac{1}{2}gt^2$. 3. Without a specific context or equation, there is no single universal formula for $h$. 4. Please provide the equation or context where $h$ appears, so I can help derive or identify the correct formula.