tabla-derivdadas+ejemplos

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TABLA DE DERIVADAS TIPO FUNCIÓN DERIVADA EJEMPLOS Potencial a y x = a y f = 1 a y ax ′= 1 . a y af f = 4 () (2 5) fx x = + 3 3 () 4(2 5) .2 8(2 5) f x x x = + = + y x = 1 2 y x ′= Raíz cuadrada y f = 2 f y f ′= 2 () 3 f x x x = 2 2 3 () 2 3 x f x x x = x y e = x y e ′= f y e = . f y fe = 4 3 () x f x e = 4 3 () 4. x f x e = x y a = .log x y a a ′= Exponencial f y a = . .log f y fa a = 2 () 5 x x gx + = 2 () (2 1).5 .log 2 x x g x x + = + log y x = 1 y x = Logaritmo neperiano log y f = f y f ′= 3 () log(2 5) f x x x = + 2 3 6 5 () 2 5 x f x x x + = + y senx = cos y x ′= Seno y senf = .cos y f f = 2 () ( ) f x sen x x = + 2 () (2 1).cos( ) f x x x x = + + cos y x = y senx ′=− Coseno cos y f = ( ) y f senf = () cos 5 f x x = () 5.( 5) 5 5 f x sen x sen x = =− y tgx = 2 2 1 1 cos y tg x x ′= = + Tangente y tgf = 2 2 1 . .(1 ) cos y f f tg f f = = + () 5 f x tg x = 2 2 1 5 () 5. 5 5 f x tg x tg x = = O bien 2 () 5.(1 5) f x tg x = + y ctgx = 2 1 y sen x = Cotangente y ctgf = 2 1 . y f sen f = 3 () x f x ctg e = 3 3 2 3 2 3 1 3 () 3 . x x x x e f x e sen e sen e = = DERIVADAS DE OPERACIONES CON FUNCIONES Suma o resta ( ) f g f g ± = ± 2 3 () 5 x f x x e senx = + 3 () 10 3 cos x f x x e x = + Producto ( .) . . f g f g g f = + () x f x e senx = () . cos . ( cos ) x x x f x e senx xe e senx x = + = + Cociente 2 . . f f g g f g g = 2 1 () 2 1 x fx x + = 2 2 2 2(2 1) 2(2 1) 4 2 4 2 4 () (2 1) (2 1) (2 1) x x x x f x x x x + = = =

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Page 1: tabla-derivdadas+ejemplos

TABLA DE DERIVADAS

TIPO FUNCIÓN DERIVADA EJEMPLOS

Potencial ay x= ay f=

1ay ax −′ = 1.ay af f−′ ′=

4( ) (2 5)f x x= + 3 3( ) 4(2 5) .2 8(2 5)f x x x′ = + = +

y x= 1

2y

x′ =

Raíz cuadrada

y f= 2fyf′

′ =

2( ) 3f x x x= −

2

2 3( )2 3xf xx x−′ =−

xy e= xy e′ = fy e= . fy f e′ ′=

4 3( ) xf x e −= 4 3( ) 4. xf x e −′ =

xy a= .logxy a a′ = Exponencial

fy a= . .logfy f a a′ ′=

2

( ) 5x xg x += 2

( ) (2 1).5 .log 2x xg x x +′ = +

logy x= 1yx

= Logaritmo neperiano logy f=

fyf′

′ =

3( ) log(2 5 )f x x x= + 2

3

6 5( )2 5xf xx x

+′ =+

y senx= cosy x′ = Seno y senf= .cosy f f′ ′=

2( ) ( )f x sen x x= + 2( ) (2 1).cos( )f x x x x′ = + +

cosy x= y senx′ = − Coseno cosy f= ( )y f senf′ ′= −

( ) cos5f x x= ( ) 5.( 5 ) 5 5f x sen x sen x′ = − = −

y tgx= 22

1 1cos

y tg xx

′ = = + Tangente

y tgf= 22

1. .(1 )cos

y f f tg ff

′ ′ ′= = +

( ) 5f x tg x=

2 2

1 5( ) 5.5 5

f xtg x tg x

′ = =

O bien 2( ) 5.(1 5 )f x tg x′ = +

y ctgx= 2

1ysen x−

= Cotangente

y ctgf= 2

1.y fsen f−′ ′=

3( ) xf x ctg e= 3

32 3 2 3

1 3( ) 3 .x

xx x

ef x esen e sen e− −′ = =

DERIVADAS DE OPERACIONES CON FUNCIONES Suma o resta

( )f g f g′ ′ ′± = ± 2 3( ) 5 xf x x e senx= + −

3( ) 10 3 cosxf x x e x′ = + −

Producto ( . ) . .f g f g g f′ ′ ′= + ( ) xf x e senx= ( ) . cos . ( cos )x x xf x e senx x e e senx x′ = + = +

Cociente 2

. .f f g g fg g

′ ′ ′ −=

2 1( )2 1xf xx+

=−

2 2 2

2(2 1) 2(2 1) 4 2 4 2 4( )(2 1) (2 1) (2 1)x x x xf x

x x x− − + − − − −′ = = =

− − −