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cheat sheet for some taylor series
Typology: Cheat Sheet
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f (x) =
∞
n= 0
f (n)( 0 ) n!
xn^ = f ( 0 ) + f ′( 0 )x +
f ′′( 0 ) 2!
x^2 +
f ′′′( 0 ) 3!
x^3 + · · · +
f (n)( 0 ) n!
xn^ + · · ·
Función Desarrollo de Taylor-Maclaurin Válido para
1 − x
∞
n= 0
xn^ = 1 + x + x^2 + · · · + xn^ + · · · x ∈ (− 1 , 1 )
1 + x
∞
n= 0
(− 1 )n^ xn^ = 1 − x + x^2 + · · · + (− 1 )nxn^ + · · · x ∈ (− 1 , 1 )
1 + x
∞
n= 0
n
xn^ = 1 −
2 x^ +^
2 · 4 x
2 · 4 · 6 x
(^3) + · · · + (− 1 )n (^2 n^ −^1 )!! ( 2 n)!! x
n (^) + · · · x ∈ (− 1 , 1 )
( 1 + x)α^
∞
n= 0
α n
xn^ = 1 + αx +
α(α − 1 ) 2!
x^2 + · · · +
α(α − 1 )... (α − n + 1 ) n!
xn^ + · · · x ∈ (− 1 , 1 )
log( 1 + x)
∞
n= 1
(− 1 )n+^1 n
xn^ = x −
x^2 +
x^3 −
x^4 + · · · +
(− 1 )n+^1 n
xn^ + · · · x ∈ (− 1 , 1 ]
ex^
∞
n= 0
n!
xn^ = 1 + x + 1 2
x^2 + 1 3!
x^3 + 1 4!
x^4 + · · · + 1 n!
xn^ + · · · x ∈ R
sen x
∞
n= 0
(− 1 )n ( 2 n + 1 )! x
2 n+ (^1) = x − 1 3! x
5! x
7! x
(^7) + · · · + (−^1 )n ( 2 n + 1 )! x
2 n+ (^1) + · · · x ∈ R
cos x
∞
n= 0
(− 1 )n ( 2 n)!
x^2 n^ = 1 −
x^2 +
x^4 −
x^6 + · · · +
(− 1 )n ( 2 n)!
x^2 n^ + · · · x ∈ R
tg x
∞
n= 0
tg(^2 n+^1 )( 0 ) ( 2 n + 1 )!
x^2 n+^1 = x +
x^3 +
x^5 +
x^7 +
x^9 + · · · +
tg(^2 n+^1 )( 0 ) ( 2 n + 1 )!
x^2 n+^1 + · · · x ∈ (−
π 2
π 2
arc sen x
∞
n= 0
( 2 n − 1 )!! ( 2 n)!!( 2 n + 1 )
x^2 n+^1 = x + 1 6
x^3 + 3 40
x^5 + 5 112
x^7 + · · · + (^2 n^ −^1 )!! ( 2 n)!!( 2 n + 1 )
x^2 n+^1 + · · · x ∈ [− 1 , 1 ]
arc tg x
∞
n= 0
(− 1 )n 2 n + 1 x
2 n+ (^1) = x − 1 3 x
5 x
7 x
(^7) + · · · + (−^1 )n 2 n + 1 x
2 n+ (^1) + · · · x ∈ [− 1 , 1 ]
Brook TAYLOR Colin MACLAURIN 1685 – 1731 1698 – 1746