|
Differentials |
|
|
|
Differentials
Previously, The derivative was defined as:
(D is the Greek letter delta which
implies the difference between two numbers)
The expression dy/dx was never considered before as a
quotient of two separate quantities of dy and dx,
Differentials allow to give separate meanings to dy and dx
in such a way when dx ¹ 0
then dx is equal to the derivative of y with respect to x.
Let y = f(x) be a differentiable function. The
differential of x, dx, is any nonzero real number and
the differential of y, dy, is defined as
dy = f '(x) dx.
|
|
