A jar contains initially one amoeba. Every minute, every amoeba either dies or does nothing or splits into 2 or splits into 3 amoebae, with probability 1/4 of each event. The probability that amoeba population eventually dies out within two minutes, is

A box contains four slips numbered 1, 2,3,4 and another contains three slips numbered 1,2,3 If one slip is taken from each, what is the probability of the product being odd? The probability of the product being even?

An amobeba either splits into two or remains the same or eventually dies out immediately after completion of evary second with probabilities, respectively, 1/2, 1/4 and 1/4. Let the initial amoeba be called as mother amoeba and after every second, the amoeba, if it is distinct from the previous one, be called as 2nd, 3rd,...generations. The probability that amoeba population will be maximum after completion of 3 s is

An amobeba either splits into two or remains the same or eventually dies out immediately after completion of evary second with probabilities, respectively, 1/2, 1/4 and 1/4. Let the initial amoeba be called as mother amoeba and after every second, the amoeba, if it is distinct from the previous one, be called as 2nd, 3rd,...generations. The probability that amoeba population will be maximum after completion of 3 s is

An amobeba either splits into two or remains the same or eventually dies out immediately after completion of evary second with probabilities, respectively, 1/2, 1/4 and 1/4. Let the initial amoeba be called as mother amoeba and after every second, the amoeba, if it is distinct from the previous one, be called as 2nd, 3rd,...generations. The probability that amoeba population will be maximum after completion of 3 s is

An amobeba either splits into two or remains the same or eventually dies out immediately after completion of evary second with probabilities, respectively, 1/2, 1/4 and 1/4. Let the initial amoeba be called as mother amoeba and after every second, the amoeba, if it is distinct from the previous one, be called as 2nd, 3rd,...generations. The probability that amoeba population will be maximum after completion of 3 s is

An amobeba either splits into two or remains the same or eventually dies out immediately after completion of evary second with probabilities, respectively, 1/2, 1/4 and 1/4. Let the initial amoeba be called as mother amoeba and after every second, the amoeba, if it is distinct from the previous one, be called as 2nd, 3rd,...generations. The probability that after 2 s all the amoeba population dies out is

A box contains four slips nümbered '1,2,3,4' and another box contains two slips numbered 1,2 If one slip is taken from each, what is the probability of the sum of numbers being odd? What is the probability of the sum being even?

An amobeba either splits into two or remains the same or eventually dies out immediately after completion of evary second with probabilities, respectively, 1/2, 1/4 and 1/4. Let the initial amoeba be called as mother amoeba and after every second, the amoeba, if it is distinct from the previous one, be called as 2nd, 3rd,...generations. The probability that immediatly after completion of 2 s all the amoeba population dies out is

An amobeba either splits into two or remains the same or eventually dies out immediately after completion of evary second with probabilities, respectively, 1/2, 1/4 and 1/4. Let the initial amoeba be called as mother amoeba and after every second, the amoeba, if it is distinct from the previous one, be called as 2nd, 3rd,...generations. The probability that immediatly after completion of 2 s all the amoeba population dies out is