Normal depth
Department of Civil and Environmental Engineering...New Mexico State University
Contents
1 What is normal depth?
- Definition
- Depth of flow under uniform flow conditions
- Flow depth does not change along the channel
- Occurs when driving force balances resistance
- Condition
- Energy slope equals bed slope
- $S_f = S_0$
- Interpretation
- Depth at which gravity and friction are in equilibrium
2 Finding normal depth from discharge
- Goal
- Given discharge $Q$
- Find normal depth $y_n$
- Condition
- Uniform flow
- $S_f = S_0$
3 Governing equation
- Unknown
- Depth $y$
- Known
- $Q, n, S, \text{geometry}$
- Challenge
- Equation is nonlinear in $y$
4 Geometry for rectangular channel
- Area
- $A = b y$
- Wetted perimeter
- $P = b + 2y$
- Hydraulic radius
- $R = \frac{A}{P}$
- Substitute into Manning’s equation
5 Solution approach
- Cannot solve explicitly for $y$
- Use trial and error
- Steps
- Guess $y$
- Compute $A, P, R$
- Compute $Q$
- Compare with given discharge
- Adjust $y$
6 Iteration logic
- If computed $Q$ is too small
- Increase $y$
- If computed $Q$ is too large
- Decrease $y$
- Continue until convergence
7 Example
- Given
- $Q = 10 \ \text{m}^3/\text{s}$
- $b = 3.0 \ \text{m}$
- $n = 0.015$
- $S = 0.001$
- Find normal depth $y_n$
8 Trial 1
- Assume $y = 1.0 \ \text{m}$
- $A = 3.0$
- $P = 5.0$
- $R = 0.60$
- Compute discharge
- $Q \approx 5.6 \ \text{m}^3/\text{s}$
- Too small
- Increase $y$
9 Trial 2
- Assume $y = 1.5 \ \text{m}$
- $A = 4.5$
- $P = 6.0$
- $R = 0.75$
- Compute discharge
- $Q \approx 9.2 \ \text{m}^3/\text{s}$
- Still small
- Increase $y$
10 Trial 3
- Assume $y = 1.6 \ \text{m}$
- $A = 4.8$
- $P = 6.2$
- $R = 0.77$
- Compute discharge
- $Q \approx 10.1 \ \text{m}^3/\text{s}$
- Close enough
- Answer
- $y_n \approx 1.6 \ \text{m}$
11 Key points
- Normal depth occurs under uniform flow
- Determined from Manning’s equation
- Requires iteration
- Depends on
- Discharge
- Roughness
- Slope
- Channel shape
12 Common mistakes
- Using energy equation instead of Manning
- Forgetting to update $R$
- Arithmetic errors in iteration
- Stopping too early
13 Quick check
- If discharge increases
- Normal depth increases
- If slope increases
- Normal depth decreases
- If roughness increases
- Normal depth increases