One ticket is selected at random from 100 tickets numbered 00, 01, 02,.., 99. Suppose A and B are the sum and product of the digit found on the ticket. Then `P(A=7//B=0)` is given by

One ticket is selected at random from 50 tickets numbered 00,01,02 …… 49 . Then the probability that the sum of the digits on the selected ticket is 8 , given that the product of these digits is zero , equals :

One ticket is drawn at random from a bag containing 24 tickets numbered 1 to 24. Represent the sample space and the event of drawing a ticket containing number which is a prime. Also, find the number of elements in them.

A bag contains 4 tickets numbered 00, 01, 10 and 11. Four tickets are chosen at random with replacement, the probability that the sum of numbers on the tickets is 22 is

Numberse are selected at random, one at a time, from the two-digit numbers 00,01,02,….99 with replacement. An event E occurs if and only if the product of the two digits of a selected number is 18. If four numbers are selected, find probability that the event E occurs at least 3 times.

A bag contains four tickets marked with numbers 112, 121, 211,222. One ticket is drawn at random from the bag. Let E_i ( i = 1,2,3) denote the event that i^th digit on the ticket is 2. Then which of the following is incorrect ?

From numbers 3, 5, 7, 7, 7, 9, 9, 9, 9, one number is selected at random. The probabilty that the selected number is mean, is given by:

There are two sets A and B each of which consists of three numbers in AP whose sum is 15 and where D and d are the common differences such that D=1+d,dgt0. If p=7(q-p), where p and q are the product of the nymbers respectively in the two series. The value of p is

A bag contains 17 tickets numbered from 1 to 17. A ticket is drawn at random, the another ticket is drawn without replacing the first one. The probability that both the tickets may show even number is

There are two sets A and B each of which consists of three numbers in AP whose sum is 15 and where D and d are the common differences such that D=1+d,dgt0. If p=7(q-p) , where p and q are the product of the numbers respectively in the two series. The value of 7D+8d is

There are two sets A and B each of which consists of three numbers in AP whose sum is 15 and where D and d are the common differences such that D=1+d,dgt0. If p=7(q-p) , where p and q are the product of the nymbers respectively in the two series. The value of q is