CIV E 632 - COMPUTATIONAL HYDRAULICS AND HYDROLOGY
FALL 2019
HOMEWORK No. 3
A flood wave passes through a point located at the upstream end
of a river reach 500 miles long and generates the following
sinusoidal hydrograph (unit-width analysis):
q(t)= 125 - 75 cos ( π t / 48) (0 ≤ t ≤ 96 hr)
q(t) = 50 (t ≥ 96 hr)
Discharge is given in cfs/ft. The channel bed slope
is 1 ft/mi. The Manning n = 0.02972.
-
Calculate the constant-parameter
Muskingum-Cunge method of flood routing.
-
Plot the flood hydrograph at the downstream
end of the river reach.
- Use a reference discharge qo = 125 cfs/ft (the average
of peak and base flows).
- Time interval (Delta t) Δt = 6 hr.
- Space
interval (Delta x) Δx = 25 mi.
- Total simulation time = 30 days.
- Report the Courant and cell Reynolds numbers,
the peak flow, the time-to-peak,
and the percentage of mass conservation (excluding baseflow).
-
Recalculate the hydrograph obtained in step 1 four times,
each time increasing the space interval to 50, 100, 250 and 500 miles.
Plot the results and compare with the results that you obtained in step 2.
- Analyze the results using Muskingum-Cunge accuracy criteria.
-
Verify the applicability of the diffusion wave model to this
particular routing problem.
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