If `P(u_i)) oo i` , where `i = 1, 2, 3, . . ., n`then `lim_(nrarrw) P(w)` is equal to

There are n turns each continuous (n+1) balls such that the ithurn contains 'I' white balls and (n+1-i) red balls. Let u_(1) be the event of selecting ith urn, i=1,2,3……..n and W denotes the event of getting a white balls. If P(u_(i)) prop i , where i=1,2,3,........,..n, then lim_(n to oo) P(W) is equal to

If z_(r)=(cos(pi alpha))/(n^(2))+i(sin(r alpha))/(n^(2)), where r=1,2,3...,n, then lim_(n rarr oo)z_(1)z_(2)z_(3)...z_(n) is equal to

There are n urns numbered 1 to n . The ith urn contains i white and (n+1-i) black balls. Let E_(i) denote the event of selecting ith urn at random and let W denote the event that the ball drawn is white. If P(E_(i))propi for i=1,2..........,n then lim_(nrarroo) P(W) is

If P_(1) = 1 - (w)/2 + (w^2)/4 - (w^3)/(8) + ……… oo and P_(2) = (1 - omega^2)/2 { where w is non-real root of equation x^3 = 1 } , then P_(1)P_(2) is equal to

There are n urns each containing (n + 1) balls such that the i^(th) urn contains i white balls and (n + 1 - i) red balls. Let u_i be the event of selecting i^(th) urn, i = 1,2,3,.... , n and w denotes the event of getting a white balls. If P(u_i) = c where c is a constant, then P(u_n/w ) is equal

Let U_(n)=(n!)/((n+2)!) where n in N. If S_(n)=sum_(n=1)^(n)U_(n), then lim_(n rarr oo)S_(n), equals

If I_(n)=int_(0)^(2)(2dx)/((1-x^(n))) , then the value of lim_(nrarroo)I_(n) is equal to

If ((p)/(q))=0 for p