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## i am back

Moderator: galactus

### i am back

Sat Mar 22, 2014 9:02 am

Posts: 850
Location: Jaipur, India

Hey guys,

Sorry I was busy and could could not participate much for a few weeks. But now I am back again !!

### Re: i am back

Sat Mar 22, 2014 5:13 pm
galactus
Global Moderator

Posts: 902
Welcome back, S man

### Re: i am back

Sun Mar 23, 2014 4:57 pm

Posts: 30
Location: St. Augustine, FL., USA's oldest city
Welcome back!
Living in the pools, They soon forget about the sea...— Rush, "Natural Science" (1980)

### Re: i am back

Mon Mar 24, 2014 12:59 pm
zaidalyafey
Global Moderator

Posts: 354
HOPEFULLY, me too
$\displaystyle \sum_{k\geq 0}\frac{f^{(k)} (s)}{(s+1)_k} (-s)^{k}= \int^{1}_0x^{s} f(s x) \left( \frac{x}{s}\right) \, dx$

Wanna learn what we discuss , see tutorials

### Re: i am back

Thu Mar 27, 2014 8:55 am
galactus
Global Moderator

Posts: 902
Shobhit wrote:
Hey guys,

Sorry I was busy and could could not participate much for a few weeks. But now I am back again !!

I thought you were back?. Where you guys been?. Oh well, I am all alone and by myself (sigh )

### Re: i am back

Thu Mar 27, 2014 9:35 am

Posts: 850
Location: Jaipur, India

galactus wrote:
Shobhit wrote:
Hey guys,

Sorry I was busy and could could not participate much for a few weeks. But now I am back again !!

I thought you were back?. Where you guys been?. Oh well, I am all alone and by myself (sigh )

It looks like we have run out of problems to solve!!

### Re: i am back

Thu Mar 27, 2014 12:17 pm
zaidalyafey
Global Moderator

Posts: 354
Oops , maybe we should think about new questions.
$\displaystyle \sum_{k\geq 0}\frac{f^{(k)} (s)}{(s+1)_k} (-s)^{k}= \int^{1}_0x^{s} f(s x) \left( \frac{x}{s}\right) \, dx$

Wanna learn what we discuss , see tutorials