Find the least positive integer n for
which there exists a set { s_1 ,s_2 ,s_3 ,...,s_n }
consisting of n distinct positive integers
such that (1−(1/s_1 ))(1−(1/s_2 ))(1−(1/s_3 ))...(1−(1/s_n ))
= ((51)/(2010)) .
find all such numbers:
if we make its last digit, say k, as its
first digit, the number becomes k
times large as before.
(□□...□k)→(k□□...□)=k×(□□...□k)
by using the Frobinus method solve the deffrentional equation
xy^(′′) −2pxy^′ +(p(p+1)+b^2 x^2 )y=0
and give for example for this when p=1,b=2
such that (p,b) be areal number ?