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dvdt

dv/dt, read as “the derivative of v with respect to t,” is a fundamental concept in calculus used to express the instantaneous rate of change of a quantity v as time t changes. When v represents velocity, dv/dt is the acceleration, the rate at which velocity changes. More generally, dv/dt describes how any dependent variable v changes over time.

Notation and meaning: The derivative is defined mathematically as dv/dt = lim Δt→0 (Δv/Δt). For vector-valued v,

Applications: dv/dt appears across physics and engineering, in motion analysis, control theory, and differential equations. It

Limitations: The derivative dv/dt exists only if v is differentiable with respect to time at the point

See also: derivative, rate of change, velocity, acceleration, calculus, differential equations.

dv/dt
is
the
time
derivative
taken
componentwise,
yielding
a
vector.
If
v
is
itself
a
function
of
t
through
other
variables,
the
derivative
follows
the
standard
rules
of
differentiation
(chain
rule,
product
rule).
In
many
texts
dv/dt
is
abbreviated
as
a,
especially
when
v
is
velocity,
but
dv/dt
remains
valid
for
any
time-dependent
quantity.
The
concatenated
form
dvdt
is
common
in
informal
writing
or
programming
contexts
but
is
not
a
standard
mathematical
symbol
in
formal
notation.
is
used
to
relate
velocity
changes
to
applied
forces,
to
model
how
systems
evolve
over
time,
and
to
formulate
equations
of
motion.
Higher-order
derivatives—such
as
d^2v/dt^2,
the
derivative
of
acceleration—describe
the
rate
at
which
acceleration
changes
(jerk).
of
interest.
If
v
is
discontinuous
or
non-differentiable,
dv/dt
may
be
undefined.