(generally, the opening of the filling system is non-linear). In the same way
we could derive the equation for the time to equalize the water levels
between two locks of areas A 1 andA 2. For an instantaneous full opening of
the filling system,
T. (11.15)
IfA 1 A 2 ,
T (11.16)
and for A 1 ∞we again obtain equation (11.10).
The time of filling of a lock by an overfall height h 1 over a gate width
Bis given approximately by
T. (11.17)
(Equation (11.17) neglects the change from a modular to non-modular
overflow at the end of the filling.)
If the opening of the filling system is gradual but not linear, we have
to compute the filling time by a step method, e.g. from equation (11.10) it
follows that
∆t (h1/2i 1 h1/2i); (11.18)
thus
hih1/2i 1 ∆t
2
. (11.19)
Equation (11.19) gives also the rate of change of the depth in the lock
(H hi), and it permits us to compute the change of discharge with time
from equation (11.9a):
Qicai(2ghi)1/2 (11.9b)
(in equations (11.18) and (11.19), ais a function of time).
Of particular interest, of course, is the maximum discharge Qmax. In
the special case of a linear opening of the filling (emptying) system we can
determineQmaxand the head at which it occurs analytically from the two
equations
c(2g)1/2a
2 A
2 A
ca(2g)1/2
AH
2/3CdB(2g)1/2h 1 3/2
AH1/2
ca(2g)1/2
2 A 1 A 2 H1/2
(A 1 A 2 )ca(2g)1/2