CÁLCULO GRACELI INFINITESIMAL EM INTEGRAIS TRIGONOMÉTRICAS

funções de séries de Graceli.

p = progressão.

Gn = número de Graceli.

FUNÇÃO SÉRIE DE GRACELI.

pn -1 [pw]

Gn K Gn = B[pn pk]+1] - B / Pn [COSΠ]=

pn [pw]

Gn [1 + pz] = K $n \choose k$ pz ,

pn [pw]

Gn [1 + pz] = K $n \choose k$ pz , Gn B[pn pk]+1] - B / Pn [COSΠ]=

Gn [1 + pz] = pK $n \choose k$ pz [1 / 1 - pz],

H PK [[Z[PK]] = -1N [1 - 2] / 1 -2

H PK [[Z[PK]] = -1N [1 - 2] / 1 - PW]]

pK [pn pk] $n \choose k$ pz [1 / 1 - pz],

SEN pK [pn pk] / K pz =

COS pK [pn pk] / K pz =

SEN pK [pn pk] / K pz =

COS Gn pK [pn pk] / K pz Gn =

SEN Gn pK [pn pk] / K pz Gn=

,^[4]

a / pn - pa = 1 / 2 H 2a

a / pn - pa = 1 / 2 H 2a [pn

pk] =

^[7]

\Gamma (z)

pw [

\Gamma (z)

\Gamma (z)

pw [

\Gamma (z)

\zeta (s)

\zeta (s)

\Gamma (z)

pw [

\zeta (s)

\Gamma (z)

funções de séries de Graceli.

p = progressão.

Gn = número de Graceli.

FUNÇÃO SÉRIE DE GRACELI.

pn -1 [pw]

Gn K Gn = B[pn pk]+1] - B / Pn [COSΠ]=

pn [pw]

Gn [1 + pz] = K $n \choose k$ pz , [COSΠ]

pn [pw]

Gn [1 + pz] = K $n \choose k$ pz , Gn B[pn pk]+1] - B / Pn [COSΠ]=

Gn [1 + pz] = pK $n \choose k$ pz [1 / 1 - pz],[COSΠ]

H PK [[Z[PK]] = -1N [1 - 2] / 1 -2 [COSΠ]

H PK [[Z[PK]] = -1N [1 - 2] / 1 - PW]] [COSΠ]

pK [pn pk] $n \choose k$ pz [1 / 1 - pz], [COSΠ]

SEN pK [pn pk] / K pz [COSΠ]=

COS pK [pn pk] / K pz [COSΠ]=

SEN pK [pn pk] / K pz [COSΠ] =

COS Gn pK [pn pk] / K pz Gn [COSΠ]=

SEN Gn pK [pn pk] / K pz Gn=

,^[4]

a / pn - pa = 1 / 2 H 2a [COSΠ]

a / pn - pa = 1 / 2 H 2a [pn

pk] [COSΠ]=

^[7]

\Gamma (z)

pw [

\Gamma (z)

[COSΠ]=

\Gamma (z)

pw [

\Gamma (z)

[COSΠ] =

\zeta (s)

\zeta (s)

\Gamma (z)

pw [

\zeta (s)

\Gamma (z)

[COSΠ]=

Pesquisar este blog

CÁLCULO GRACELI INFINITESIMAL EM INTEGRAIS TRIGONOMÉTRICAS

Comentários

Postar um comentário