There is only 1 two-headed coin in the collection of 65 coins.
The probability of selecting the two headed coin is 1/65.
The outcome achieved when any of the other coins is tossed a number of times is based purely on chance.
Although if the 2-headed coin is selected, the only possible outcome is having a head, but It also possible to have 6 heads in 6 tosses with a coin that is not 2-headed.
What we're concerned with, is the probability that the 2-headed coin was selected from the lot of 65 coins, which is 1/65.
Answer:
There is only 1 two-headed coin in the collection of 65 coins.
The probability of selecting the two-headed coin is 1/65.
The outcome achieved when any of the other coins is tossed a number of times is based purely on chance.
Although if the 2-headed coin is selected, the only possible outcome is having a head, but It is also possible to have 6 heads in 6 tosses with a coin that is not 2-headed.
What we're concerned with, is the probability that the 2-headed coin was selected from the lot of 65 coins, which is 1/65.
Step-by-step explanation:
