If the sum to the infinity of the series `3+5r+7r^2+....` is `44/9` then find the value of r

If the sum to infinity of the series 1+2r+3r^(2)+4r^(3)+ is 9/4, then value of r is (a)1/2 b.1/3 c.1/4 d.none of these

Sum to infinity of a GP is 15 and the sum to infinity of their squares is 45 .If a is the first term and r is the common ratio then the sum of the first 5 terms of the AP with first term a and common difference 3r is

If the sum to infinity of the series 3+(3+d)(1)/(4)+(3+2d)(1)/(4^(2))+...oo is (44)/(9) then find d.

Find the sum to infinity of the series 1 + (1+a)r+(1 + a + a ^(2))r^(2) + … where 0 lt a, r le 1

The sum to infinity of the series 1+(4)/(7)+(9)/(49)+(16)/(343)+.... is

(1)/(r(r+1)) Find the sum to infinity terms.

If the sum of the series sum_(n=0)^(oo)r^(n),|r|<1 is s then find the sum of the series sum_(n=0)^(oo)r^(2n)

If the sum to infinity of the series 3 + (3 + d). (1)/(4) + (3 + 2d) (1)/(4^(2)) + ..... " is " (44)/(9) then find d

Find the sum of the series sum_(r=1)^(n)r xx r!