The number of ordered triplets of positi...

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

Text Solution

AI Generated Solution

Similar Questions

Explore conceptually related problems

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

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

Find the number of quadruplets of positive integers (a,b,c,d) satisfying the following relations . 1 le a le b le c le d and ab + cd = a + b + c + d + 3

The sum of the series ""^20C_0 - ""^20C_1 + ""^20C_2 - ""^20C_3 +…….""^20C_10 is

The number of triplets (a, b, c) of positive integers satisfying the equation |(a^(3)+1,a^(2)b,a^(2)c),(ab^(2),b^(3)+1,b^(2)c),(ac^(2),bc^(2),c^(3)+1)|=30 is equal to

The number of ordered pair (x ,\ y) satisfying correspondence C_1 is 1 b. 2 c. 3 d. 4

The sum of the series ""^20 C_0-""^20 C_1+""^20C_2-""^20C_3+...-...+""^20C_10 is:

The sum S = ""^(20)C_(2) + 2*""^(20)C_(3) + 3 *""^(20)C_(4) + ...+ 19 * ""^(20)C_(20) is equal to

Area of the region bounded by the curve y={(x^2, x lt 0),(x, x ge 0):} and the line y=4 is (A) 10/3 (B) 20/3 (C) 50/3 (D) none of these

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

Text Solution

Similar Questions

Recommended Questions

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