If `S_n=(1.2)/(3!) +(2.2^2)/(4!) +(3.2^3)/(5!)+...` upto n terms then the sum infinite terms is

If S_(n)=(1.2)/(3!)+(2.2^(2))/(4!)+(3.2^(2))/(5!)+...+ up to n terms, then sum of infinite terms is

If S_(n)=3+(1+3+3^(2))/(3!)+(1+3+3^(2)+3^(3))/(4!) ………… upto n -terms Then the value of [lim_(ntooo)S_(n)] is (where [.] represent G.I.F)

(1)/(2)+(3)/(4)+(5)/(8) The sum of the series infinite terms is

The sum of 1+(2)/(5)+(3)/(5^(2))+(4)/(5^(3))+.... upto n terms

The sum of the series 1+ 2/3+ (1)/(3 ^(2)) + (2 )/(3 ^(3)) + (1)/(3 ^(4)) + (2)/(3 ^(5)) + (1)/(3 ^(6))+ (2)/(3 ^(7))+ …… upto infinite terms is equal to :

If S_(1), S_(2), S_(3),….., S_(n) are the sum of infinite geometric series whose first terms are 1,3,5…., (2n-1) and whose common rations are 2/3, 2/5,…., (2)/(2n +1) respectively, then {(1)/(S_(1) S_(2)S_(3))+ (1)/(S_(2) S_(3) S_(4))+ (1)/(S_(3) S_(4)S_(5))+ ........."upon infinite terms"}=

The sum of the series (2)/(1.2)+(5)/(2.3)2^(1)+(10)/(3.4)2^(2)+(17)/(4.5)2^(3)+.... upto n terms is equal:

Sum of the following series 1+(2)/(2)+(3)/(2^(2))+(4)/(2^(3))+... to n terms