If two loaded dice each have the property yjsy 2 or 4 is there times as likely to appears as `1,3,5,or6` on each roll. When two such dice are rolled, the probability of obtaining a total of 7 is p, then value of `[1//p]` is, where `[x]` represents the greatest integer less than or euqal to x.

If tow loaded dice each have the property that 2 or 4 is three times as likely to appear as 1, 3, 5, or 6 on each roll. When two such dice are rolled, the probability of obtaining a total of 7 is p , then the value of [1//p] is, where [x] represents the greatest integer less than or equal to xdot

int_(-2)^2min(x-[x],-x-[-x])dx equals, where [ x ] represents greatest integer less than or equal to x. A. 2 B. 1 C. 4 D. 0

If f(x)=|x|+[x] , where [x] is the greatest integer less than or equal to x, the value of f(-2.5)+f(1.5) is

Two dice are thrown simultaneously, the probability of obtaining total score of 7 is a. 1//6 b. 7//36 c. 4//9 d. 11//36

A dice is weighted such that the probability of rolling the face numbered n is proportional to n^(2) (n = 1, 2, 3, 4, 5, 6). The dice is rolled twice, yielding the number a and b. The probability that a gt b is p then the value of [2//p] (where [ . ] represents greatest integer function) is _______.

The plane denoted by P_1 : 4x+7y+4z+81=0 is rotated through a right angle about its line of intersection with plane P_2 : 5x+3y+10z=25 . If the plane in its new position be denoted by P, and the distance of this plane from the origin is d, then the value of [(k)/(2)] (where[.] represents greatest integer less than or equal to k) is....

If 3 le a lt 4 then the value of sin^(-1)(sin[a])+tan^(-1)(tan[a])+sec^(-1)(sec[a]) , where [x] denotes greatest integer function less than or equal to x, is equal to :

If g:[-2,2]vecR , where f(x)=x^3+tanx+[(x^2+1)/P] is an odd function, then the value of parametric P, where [.] denotes the greatest integer function, is

Thirty-two players ranked 1 to 32 are playing in a knockout tournament. Assume that in every match between any two players the better ranked player wins, the probability that ranked 1 and ranked 2 players are winner and runner up respectively is p, then the value of [2//p] is, where [.] represents the greatest integer function,_____.

Thirty-two players ranked 1 to 32 are playing in a knockout tournament. Assume that in every match between any two players the better ranked player wins, the probability that ranked 1 and ranked 2 players are winner and runner up respectively is p, then the value of [2//p] is, where [.] represents the greatest integer function,_____.