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dndt

dN/dt denotes the instantaneous rate of change of a quantity N with respect to time t. It is the derivative of N(t), the value of N at time t, with respect to t. The symbol d indicates an infinitesimal change, and dt is an infinitesimal increment in time. N may represent a count (such as a population size or number of molecules), a concentration, or any other quantity that varies with time.

Common models use dN/dt = rN for exponential growth if r > 0, or dN/dt = -λN for exponential

Solving the equation involves integrating with an initial condition N(t0) = N0. For linear, autonomous forms, closed-form

The derivative has units of N per unit time. If N counts objects, dN/dt has units of

decay
if
λ
>
0.
More
realistic
population
models
use
dN/dt
=
rN(1
−
N/K)
(logistic
growth),
where
K
is
carrying
capacity.
In
chemical
kinetics
or
nuclear
processes,
dN/dt
can
represent
production
minus
loss;
for
radioactive
decay,
dN/dt
=
-λN,
with
λ
the
decay
constant.
In
general,
dN/dt
=
f(N,t)
summarizes
the
net
rate:
the
difference
between
rates
adding
to
N
and
removing
from
N.
solutions
exist;
e.g.,
dN/dt
=
aN
+
b
yields
N(t)
=
(N0
+
b/a)
e^{at}
−
b/a
when
a
≠
0.
In
nonlinear
or
time-dependent
cases,
numerical
methods
or
qualitative
analysis
are
used.
objects
per
time.
ΔN/Δt
provides
a
discrete
approximation
to
dN/dt
for
observed
data.