`3, -3^(2), 3^(3), ……….a_(6) = …………..`

a_(n) = n/(n+2) , a_(3) = ……….

In a series a_(n) = (n(n+1))/(3), a_(2) = ………….

In an AP a_(n) = (5n-3)/(4) , then a_(7) = ………..

If a_(1), a_(2), a_(3)…..a_(n) are in A.P. with common difference d then sin d [cosec a_(1) cosec a_(2) + cosec a_(2) cosec a_(3) + cosec a_(3) cosec a_(4)+ …"n terms"] =

If a_(1), a_(2), a_(3),….a_(n) be an A.P with common difference d, then sec a_(1) sec a_(2) + sec a_(2) sec a_(3) + …+ sec a_(n-1) sec a_(n) =

Find the respective terms for the following lowing Aps. (iv) a_(1) = -4, a_(6) = 6 , find a_(2),a_(3), a_(4), a_(5) .

In a G.P. a = 81, r = -1/3, a_(3) = ……….

If a_(1), a_(2), a_(3), a_(4) are the coefficients of the 2^(nd), 3^(rd), 4^(th) and 5^(th) terms respectively in the binomial expansion of (1+x)^(n) where n is a positive integer prove that (a_(1))/(a_(1)+a_(2)) , (a_(2))/(a_(2)+a_(3)) , (a_(3))/(a_(3)+a_(4)) are in arithmetic progression.