Chance of Flipping Head Again
What was the problem?
For a coin to always show head on flip we assume both it's sides are heads and the coin which is showing tail always we assume both of it's sides are tails.
There is no way that you have selected tail only coin since there are 2 heads in first 2 flips.
So it could be either head only coin say D coin or regular fair coin say F.
Let H1 and H2 be the sides of head coin and H, T are side of fair coin.
If it's head only coin D, then possible scenarios on 2 flips are -
DH1 DH1
DH1 DH2
DH2 DH1
DH2 DH2
And if it's fair coin F then possible scenarios on 2 flips are -
FH FH
FH FT
FT FH
FT FT
There are total five combinations (all 4 of head coin + first one of fair coin) where there are 2 consecutive heads on 2 flips.
So, the chances that you have picked a head coin is (4/5) and that you picked fair coin is (1/5).
For head coin, the probability of getting head again is 1 and that for fair coin is (1/2).
Since you holding either head coin or fair coin,
Probability (Head on third flip) =
Probability (You picked Head coin) x Probability (Head on head coin) + Probability (You picked fair coin) x Probability (Head on fair coin)
Probability (Head on third flip) = (4/5) x 1 + (1/5) x (1/2)
Probability (Head on third flip) = 9/10.
Hence, the chance of flipping head again on third flip is 90%.
