The probability that a candidate secures a seat in Engineering through "EAMCET"is `1//10.7` candidates are selected at random from a centre. The prbability that exactly two will get seats, is

The probability that a candidate secure a seat in Engineering through EAMCET is 1/10 Seven candidate are selected at random from a centre.The probability that exactly two will get seats is

Column I, Column II If the probability of getting at least one head is at least 0.8 in n trials, then value of n can be, p. 2 One mapping is selected at random from all mappings of the set s={1,2,3, ... ,n} into itself. If the probability that the mapping being one-one is 3/32, then the value of n is, q. 3 If m is selected at random from set {1,2,..., 10} and the probability that the quadratic equation 2x^2+2m x+m+1=0 has real roots is k , then value of 5k is more than, r. 4 A man firing at a distant target as 20% chance of hitting the target in one shoot. If P be the probabililty of hitting the target in "n" attempts , where 20 P^2-13 P+2lt=0, then the ratio of maximum and minimum value of n is less than, s. 5

If A and B are two candidates seeking admission in an engineering college. The probability that A is selected is 0.5 and the probability that both A and B are selected is at most 0.3. Is it possible that the probability of B getting selected is 0.7 ?

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

Two numbers are selected at random from the integers 1 to 13. If the sum is even, find the probability that both numbers are odd

Two integers are selected at random from the integers 1 to 11. If their sum is even find the probability that both integers are odd.

An urn contains r red balls and b black balls. Column I, Column II If the probability of getting two red balls in first two draws (without replacement) is 1/2, then value of r can be, p. 10 If the probability of getting two red ball in first two draws (without replacement) is 1/2 and b is an even number, then r can be, q. 3 If the probability of getting exactly two red balls in four draws (with replacement) from the urn is 3/8 and b=10 ,t h e nr can be, r. 8 If the probability of getting exactly n red ball in 2n draw (with replacement) is equal to probability of getting exactly n black balls in 2n draws (with replacement), then the ratio r//b can be, s. 2

Aa n dB are two candidates seeking admission in ITT. The probability that A is selected is 0.5 and the probability that Aa n dB are selected is at most 0.3. Is it possible that the probability of B getting selected is 0.9?

Aa n dB are two candidates seeking admission in IIT. The probability that A is selected is 0.5 and the probability that Aa n dB are selected is at most 0.3. Is it possible that the probability of B getting selected is 0.9?

Aa n dB are two candidates seeking admission in ITT. The probability that A is selected is 0.5 and the probability that Aa n dB are selected is at most 0.3. Is it possible that the probability of B getting selected is 0.9?