F ′ ( x ) = ( f ( x ) + g ( x ) ) ′ = f ′ ( x ) + g ′ ( x ) F'(x)=(f(x) + g(x))' = f'(x) + g'(x) F′(x)=(f(x)+g(x))′=f′(x)+g′(x)

F ′ ( x ) = ( f ( x ) − g ( x ) ) ′ = f ′ ( x ) − g ′ ( x ) F'(x)=(f(x) - g(x))' = f'(x) - g'(x) F′(x)=(f(x)−g(x))′=f′(x)−g′(x)

F ′ ( x ) = ( f ( x ) × g ( x ) ) ′ = f ′ ( x ) g ( x ) + f ( x ) g ′ ( x ) F'(x)=(f(x) \times g(x))' = f'(x)g(x) + f(x)g'(x) F′(x)=(f(x)×g(x))′=f′(x)g(x)+f(x)g′(x)

F ′ ( x ) = { f ( x ) g ( x ) } ′ = { f ( x ) ′ g ( x ) − f ( x ) g ( x ) ′ g 2 ( x ) } F'(x) = \left \{ \frac{f(x)}{g(x)} \right \}' = \left \{ \frac{f(x)'g(x) - f(x)g(x)'}{g^2(x)} \right \} F′(x)={g(x)f(x)​}′={g2(x)f(x)′g(x)−f(x)g(x)′​}

F ′ ( x ) = ( C ⋅ f ( x ) ) ′ = C ⋅ f ( x ) ′ F'(x) = (C \cdot f(x))' = C \cdot f(x)' F′(x)=(C⋅f(x))′=C⋅f(x)′

微分常见的表示符号有三种，在偏微分方程中，以 ∂ \partial ∂表示，在通常则是以 d d d表示，某些教科书上也有以 d i f f ( x ) diff(x) diff(x)进行表示，代表一种计算方法， d x dx dx表达的含义与通常 f ( x ) f(x) f(x)是一样的，因为数学家比较懒的原因， d ( x ) d(x) d(x)就约定俗成的用 d x dx dx进行表达了。

d ( f ( x ) ± g ( x ) ) = d ( f ( x ) ) ± d ( g ( x ) ) d(f(x) \pm g(x)) = d(f(x)) \pm d(g(x)) d(f(x)±g(x))=d(f(x))±d(g(x))

d ( C f ( x ) ) = C ⋅ d ( f ( x ) ) d(Cf(x)) = C \cdot d(f(x)) d(Cf(x))=C⋅d(f(x))

d ( f ( x ) g ( x ) ) = d ( f ( x ) ) g ( x ) + f ( x ) d ( g ( x ) ) d(f(x)g(x)) = d(f(x))g(x) + f(x)d(g(x)) d(f(x)g(x))=d(f(x))g(x)+f(x)d(g(x))

d { f ( x ) g ( x ) } = { d f ( x ) g ( x ) − f ( x ) d g ( x ) g 2 ( x ) } d \left \{ \frac{f(x)}{g(x)} \right \} = \left \{ \frac{df(x)g(x) - f(x)dg(x)}{g^2(x)} \right \} d{g(x)f(x)​}={g2(x)df(x)g(x)−f(x)dg(x)​}