" (ii) "t_(n)=(n^(2))/(2^(n));t_(4),l_(6)

Find the indicated terms in each of the following sequences whose nth nth terms are: t_(n)=(n^(2))/(2^(n)),t_(4),t_(6)

Write the indicated terms in each of the following sequences whose nth terms are: t_(n)=(n(n^(2)+5))/(4):t_(4),t_(5)

Find the terms (s) indicated in each case: (i) t_(n)=t_(n-1)+3(ngt1),t_(1)=1,t_(4) (ii) T_(n)=(T_(n-1))/(T_(n-2)),(ngt2),T_(1)=1,T_(2)=2,T_(6)

Write the indicated terms in each of the following sequences whose nth terms are: t_(n)=n^(2)(n+1):t_(4),t_(5)

Find the term indicated in each case: (i) t_(n)=4^(n)+n^(2)-n-1,t_(3) (ii) h(n)=n^(2)-3n+4, h(10)

Let the n^(th) term of a series be given by t_(n)=(n^(2)-n-2)/(n^(2)+3n),n<=3. Then product t_(3)t_(4).....t_(50) is equal to

If t_(n)=(1+(-2)^(n))/(n-1) , find t_(6)-t_(5)

For a GP, If S_(n)=(4^(n)-3^(n))/(3^(n)), then t_(2)= . . .

Find the term(s) indicated in the following case : T_(n)=(T_(n-1))/(T_(n-2)),(ngt2),T_(1)=1,T_(2)=2, T_(6) .

if in a series t_(n)=(n+1)/((n+2)!) then sum_(n=0)^(10)t_(n) equal to