The number of ordered triplets of positive integers which satisfy the inequality `20 le x. + y + z le 50` is p, then `(p - 631)/(100)` is equal to _______ .

. The number of ordered triplets of positive integers which are solutions of the equation x+y+z=100

The number of ordered triplets, positive integers which are solutions of the equation x+y+z=100 is:

The number of ordered triplets of positive integers which satisfy the inequality 20lex+y+zle50 is (A) ""^50C_3- "^19C_3 (B) ""^50C_2-"^19C_2 (C) ""^51C_3-"^20C_3 (D) none of these

The number of positive integers satisfying the inequality C(n+1,n-2)-C(n+1,n-1)<=100 is

Number of intergers satisfying the inequality x^4- 29x^2+100 le 0 is

The number of positive integers satisfying the inequality ""^(n+1)C_(3) - ""^(n-1) C_(2) le 100 is