Three different numbers are selected at random from the set `A={1, 2, 3,…, 10}`. The probability that the product of two of the numbers is equal to third, is

Three different numbers are selected at random from the set A = (1, 2, 3,...., 10). The probability that the product of two of the numbers is equal to the third is

Three different numbers are selected at random from the set A={1,2,3,……..,10} . Then the probability that the product of two numbers equal to the third number is (p)/(q) , where p and q are relatively prime positive integers then the value of (p+q) is :

Two different numbers are selected at random from the set S={1, 2, 3, ……10}, then the probability that sum of selected numbers is divisible by 2 a/b, where a and b are co-prime then b is equal to ___.

Three numbers are chosen at random from the first 20 natural numbers. The probability that their product is even is

Three numbers are selected at random one by one with replacement from the numbers 1,2,3,….60. The probability that the A.M. of the numbers selected is 15 is.

Statement-1 : Three natural number are taken at random from the set A={x:1 lt x lt= 100, x in N} the probability that the A.M of the numbers taken is 25 is equal to (""^74C_2)/(""^100C_3) . Statement-2 : Let A = {2, 3, 4 …. 20}. A number is chosen at random from set A and it is bound to be a prime number. The probability that it is more than 10 is 1/5 . Statement-3 : The probability of three person having the same date month for the birthday is 1/((365)^2) .

Three numbers are chosen at random from 1 to 20 .The probability that they are consecutive is

Three numbers are chosen at random from the first 20 natural numbers. The probability that they are not consecutive is

Three numbers are selected at random without replacement from the set of numbers {1, 2, 3, … n}. The conditional probability that the 3rd number lies between the 1st two. If the 1st number is known to be smaller than the 2nd, is

Three numbers are chosen at random without replacement from {1,2,3,....10}. The probability that the minimum of the chosen number is 3 or their maximum is 7 , is: