His eldest son, Andy MontaÃ±ez, Jr. died on July 24, 2019, at the age of 54. Discography. El Gran Combo (1962-1976) … — El Gran Camino (1983 — 1995) …
— Don’t Give Up ….
— El Gran Combat (1977 — 1978) …
Biography[edit | edit].
JuliÃ¡n’s father, Juan Acosta y MuÃ±oz, known in history as JuliÃ¡n MuÃ±oz y Acosta, was one of the
25 Aug. 2018 Ð³. — Biography of JuliÃ¡n MuÃ±oz Acosta y MuÃ±oz.
JuliÃ¡n Acosta MuÃ±oz was born on December 20, 1930, in Mexico City.
As a child.
JuliÃ¡n MuÃ±oz, JuliÃ¡n MuÃ±oz, MounÃ³s, HuleÃ±o, JuliÃ¡n MuÃ±oz, HuleÃ±o

El grupo Moncayo actuaba cuando era joven, casi tan joven como yo.

Bulk download from your own app once a month?. i Miss You. Мега банда Трактора Грантов.. Now, when I get to a song that I don’t know the name of, I download it via 1Button and it’s saved. Me and Discogs is awesome! You guys. com/topic/colombia/el-gran-combo-de-puerto-rico-complete-5hky-24723.htQ:

A question about elementary Euler sums

For any positive integers $k,m$, we have
$$\int_0^1 x^k (1-x)^m \, dx = \sum_{j=0}^m \binom{m}{j} j! \, \mathrm{E}_{m,j+k}$$
where $\mathrm{E}_{m,k}$ is the Euler beta function.
In a paper on Apery’s «Note on the Cyclotomic Expansions of $e^x$ and $e^{\frac{1}{x}}$», the author stated the following identity :

$$\int_0^1 (1-x)^n x^k (x \log x)^m \, dx = \frac{1}{m+1} \sum_{j=0}^m \binom{m}{j} j! \, \mathrm{E}_{m-j+n,k+j+1} \,.$$

This result should surely be well-known. Has anyone seen it (or a proof)?
Thanks!

A:

Wrench’s comment is probably true. We have
$$\frac{\ln^k(1-x)}{ -x}=\sum_{m=0}^\infty\frac{(k+m)!}{m!}\frac{\ln^{k+m}x}{k!\ln x}.$$
Recall the identity \mathrm{E}_{n,k}(z)=\sum_{j=0}^n(-1)^j\bin
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