taylor series cheat sheet, Cheat Sheet of Mathematics

cheat sheet for some taylor series

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Series de Taylor-Maclaurin
f(x) =
n=0
f(n)(0)
n!xn=f(0) + f0(0)x+f00(0)
2! x2+f000(0)
3! x3+···+f(n)(0)
n!xn+···
Función Desarrollo de Taylor-Maclaurin Válido para
1
1x
n=0
xn=1+x+x2+···+xn+··· x(1,1)
1
1+x
n=0
(1)nxn=1x+x2+···+ (1)nxn+··· x(1,1)
1
1+x
n=01/2
nxn=11
2x+1·3
2·4x21·3·5
2·4·6x3+···+ (1)n(2n1)!!
(2n)!! xn+··· x(1,1)
(1+x)α
n=0α
nxn=1+αx+α(α1)
2! x2+···+α(α1). . . (αn+1)
n!xn+··· x(1,1)
log(1+x)
n=1
(1)n+1
nxn=x1
2x2+1
3x31
4x4+···+(1)n+1
nxn+··· x(1,1]
ex
n=0
1
n!xn=1+x+1
2x2+1
3! x3+1
4! x4+···+1
n!xn+··· xR
senx
n=0
(1)n
(2n+1)!x2n+1=x1
3! x3+1
5! x51
7! x7+···+(1)n
(2n+1)!x2n+1+··· xR
cosx
n=0
(1)n
(2n)!x2n=11
2! x2+1
4! x41
6! x6+···+(1)n
(2n)!x2n+··· xR
tgx
n=0
tg(2n+1)(0)
(2n+1)!x2n+1=x+1
3x3+2
15 x5+17
315 x7+62
2835 x9+···+tg(2n+1)(0)
(2n+1)!x2n+1+··· x(
π
2,π
2)
arcsenx
n=0
(2n1)!!
(2n)!!(2n+1)x2n+1=x+1
6x3+3
40 x5+5
112 x7+···+(2n1)!!
(2n)!!(2n+1)x2n+1+··· x[1,1]
arctgx
n=0
(1)n
2n+1x2n+1=x1
3x3+1
5x51
7x7+···+(1)n
2n+1x2n+1+··· x[1,1]
Brook TAYLOR Colin M ACL AUR IN
1685 1731 1698 1746
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Series de Taylor-Maclaurin

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

1 + x

n= 0

n

xn^ = 1 −

2 x^ +^

2 · 4 x

2 − 1 ·^3 ·^5

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