For each j,1β€jβ€12, an element zjβ is chosen from V at random, independently of the other choices. Let P=βj=112βzjβ be the product of the 12 numbers selected. What is the probability that P=β1?
Answer Choices:
A. 3105β 11β
B. 2β 31052β 11β
C. 395β 11β
D. 2β 3105β 7β 11β
E. 31022β 5β 11β Solution:
If zjβ is an element of the set A={2βi,β2βi}, then β£zjββ£=2β. Otherwise zjβ is an element of
and β£zjββ£=21β. It follows that β£Pβ£=βj=112ββ£zjββ£=1 exactly when 8 of the 12 factors zjβ are in A and 4 of the factors are in B. The product of 8 complex numbers each of which is in A is a real number, either 16 or -16 . The product of 4 numbers each of which is in B is one of 161β,161βi,β161β, or β161βi. Thus a product P=βj=112βzjβ is -1 exactly when 8 of the zjβ are from A,4 of the zjβ are from B, and the last of the 4 elements from B is chosen so that the product is -1 rather than i,βi, or 1 . Because the probability is 31β that a particular factor zjβ is from A, the probability is 32β that a particular factor zjβ is from B, and the probability is 61β that a particular factor zjβ is a specific element of V, the probability that the product P will be -1 is given by