A number is chosen randomly from one of the two sets X={2001, 2002, 2003,…., 2100}, Y={1901, 1902, 1903,……, 2000}. If the number chosen represents a calander year and p is the probability that selected year has 53 Sunday, then 2800p is equal to

A number x is chosen at random from the set {1, 2, 3,…., 100}. Define event: A = the chosen number x satisfies (x-20)/(x-40) ge 2 . Then P(A) is

One hundred cards are numbered from 1 to 100. The probability that a randomly chosen card has a digit 5 is :

A number is chosen at random from the set {1,2,3, . . . 2000} Let p be the probability that the chosen number is a multiple of 3 or a multiple of 7 Then the value of 500p is

Three numbers are chosen at random, one after another with replacement, from the set S = {1,2,3, … ,100} . Let P_1 be the probability that the maximum of chosen numbers is at least 81 and P_2 be the probability that the minimum of chosen numbers is at most 40. then the vaue of 625/4 P_1 is

Three numbers are chosen at random, one after another with replacement, from the set S = {1,2,3, … ,100} . Let P_1 be the probability that the maximum of chosen numbers is at least 81 and P_2 be the probability that the minimum of chosen numbers is at most 40. then the vaue of 125/4 P_2 is

Two numbers x and y are chosen from 0,1,2,...,10 with replacement the probability that |x-y|le5 is P then 121P

A number x is chosen at random from the set {1,2,3,4, ………., 100} . Defind the event : A = the chosen number x satisfies ((x-10)(x-50))/((x-30))ge0 , then P(A) is

Three numbers are selected from the set {1,2,3,...,23,24}, without replacement.The probability that the selected numbers form an A.P.is equal to