Answer:
A. S = {HHH, HHT, HTH, HTT, THH, THT, TTH, TTT}
B
Step-by-step explanation:
From the given information:
Suppose that a coin is tossed three times and on each toss heads and tails are equally likely.
Hint:
For the first two tosses ; Let HHT indicate the outcome heads and tails on the third toss
For the first and the third tosses: Let THT indicate the outcome tails and heads on the second toss. (and so on and so forth)
The objectives are to :
A. List the eight elements in the sample space whose outcomes are all the possible head–tail sequences obtained in the three tosses.
So; if a coin is tossed thrice, and sample S is the list of the 8 possible outcomes, Then :
S = {HHH, HHT, HTH, HTT, THH, THT, TTH, TTT}
B. Write each of the following events as a set and find its probability:
i) The event that exactly one toss results in a head.
For a toss to result into one head:
Let consider the above sample S = {HHH, HHT, HTH, HTT, THH, THT, TTH, TTT}
n(S) = 8
So; Let represent [tex]E_{h1[/tex] to be the event for one head to appear, we have ;
[tex]E_{h1[/tex] = { HTT, THT, TTH}
n([tex]E_{h1[/tex]) = 3
Probability P = [tex]\dfrac{number \ of favourable \ outcome}{Total \ number \ of \ possible \ outcomes}[/tex]
P([tex]E_{h1[/tex] ) = [tex]\dfrac{3}{8}[/tex]
ii) The event that at least two tosses result in a head.
Let represent [tex]E_{h2[/tex] to be the event that at least two tosses result in a head., we have ;
[tex]E_{h2[/tex] = { HHH, HHT, HTH, THH }
n([tex]E_{h2[/tex] ) = 4
P([tex]E_{h2[/tex] ) = [tex]\dfrac{4}{8}[/tex]
P([tex]E_{h2[/tex] ) = [tex]\dfrac{1}{2}[/tex]
iii) The event that no head is obtained.
Let [tex]E_{no \ head}[/tex] be the event that no head is obtained.
Then [tex]E_{no \ head}[/tex] = {TTT}
n([tex]E_{no \ head}[/tex] ) = 1
P([tex]E_{no \ head}[/tex] ) = [tex]\dfrac{1}{8}[/tex]
