There are n different objects 1, 2, 3, …, n distributed at random in n places marked 1, 2, 3,…, n. If p be the probability that atleast three of the object occupy places corresponding to their number, then the value of 6p is

Five different objects A_1,A_2,A_3,A_4,A_5 are distributed randomly in 5 places marked 1, 2, 3, 4, 5. One arrangement is picked at random. The probability that in the selected arrangement, none of the object occupies the place corresponding to its number, is

The probability of ‘n’ independent events are P_(1) , P_(2) , P_(3) ……., P_(n) . Find an expression for probability that at least one of the events will happen.

If p^(2)-p+1=0 , then the value of p^(3n) can be

A number n is chosen at random from {1,2,3,..,1000}. The probability that n is a number which leaves a remainder 1 when divided by 7, is

There are n letters and n addressed envelopes . If the letters are placed in the envelopes at random , what is the probability that all the letters are not placed in the right evelope ?

Let theta=(a_(1),a_(2),a_(3),...,a_(n)) be a given arrangement of n distinct objects a_(1),a_(2),a_(3),…,a_(n) . A derangement of theta is an arrangment of these n objects in which none of the objects occupies its original position. Let D_(n) be the number of derangements of the permutations theta . The relation between D_(n) and D_(n-1) is given by

Let x = 33^n . The index n is given a positive integral value at random. The probability that the value of x will have 3 in the units place is

Let x = 33^n . The index n is given a positive integral value at random. The probability that the value of x will have 3 in the units place is

Let x = 33^n . The index n is given a positive integral value at random. The probability that the value of x will have 3 in the units place is

If n is a positive integer then the probability that 3^(n) has 3 at unit place is