If `x + 1/x=1 and p=x^100+1/x^1000 and q` be the digit at unit place in the number `2^(2^n)+1,n in N and n>1`, then p+q is equal to .........

If x + (1)/(x) = 1 " and" p = x^(4000) + (1)/(x^(4000)) and q is the digit at unit place in the number 2^(2^(n)) + 1, n in N abd n gt 1 , then p + q is .

If x + (1)/(x) = 1 " and" p = x^(4000) + (1)/(x^(4000)) and q is the digit at unit place in the number 2^(2^(n)) + 1, n in N abd n gt 1 , then p + q is .

If p and q are the coefficients of x^n in (1+x)^(2n-1) and (1+x)^(2n) respectively then 2p=

If lim_(x->1)((x^n-1)/(n(x-1)))^(1/(x-1))=e^p , then p is equal to

In in the expansion of (1+px)^(q) , q belongs to N , the coefficients of x and x^(2) are 12 and 60 respectively then p and q are

In in the expansion of (1+px)^(q) , q belongs to N , the coefficients of x and x^(2) are 12 and 60 respectively then p and q are