The sum pf first 9 terms of the series
`(1^(3))/(1)+(1^(3)+2^(3))/(1+3)+(1^(3)+2^(3)+3^(3))/(1+3+5)+......` is -

The sum of first 9 terms of the series 1^3/1 + (1^3 + 2^3)/(1 + 3) + (1^3 + 2^3 + 3^3)/(1 + 3 + 5) + ....... is

Find the sum of the series, (1^(3))/(1)+(1^(3)+2^(3))/(1+3) + (1^(3)+2^(3)+3^(3))/(1+3+5)+.... upto nth term.

If the sum of the first 15 terms of the series ((3)/(4))^(3)+(1(1)/(2))^(3)+(2(1)/(4))^(3)+3^(3)+(3(3)/(4))^(3)+... is equal to 225k , then k is equal to

Find the sum of the series (1^3)/1+(1^3+2^3)/(1+3)+(1^3+2^3+3^3)/(1+3+5)+ up to n terms.

The sum to n terms of the series [1. (1!)+2. (2!)+ 3.(3!)+…] is-

The sum of n terms of the following series , 1^(3)+3^(3)+5^(3)+7^(3)+……. is

Find the sum of the series, (1^(2))/(3)+(1^(2)+2^(2))/(5)+(1^(2)+2^(2)+3^(2))/(7)+.. upto n th term.

Find the sum of first n terms of the series 3/1^2+5/(1^2+2^2)+7/(1^2+2^2+3^2) +.... .

If the sum of the first ten terms pf the series (1(3)/(5))^(2)+(2(2)/(5))^(2)+(3(1)/(5))^(2)+4^(2)+(4(4)/(5))^(2)....., "is " (16)/(5)m ,then m is equal to