SOLUTION: If a coin is tossed 11 times, find the probability of the sequence H, T, T, H, T, H, H, T, T, T, T.

Question 1114488: If a coin is tossed 11 times, find the probability of the sequence H, T, T, H, T, H, H, T, T, T, T.
Answer by ikleyn(52851) (Show Source): You can put this solution on YOUR website!
.

The set of all possible outcome sequences for 11 tossings  has  elements, in all.


Therefore, the probability to have any one particular sequence is   = :  they all are equally possible.


In particular, the probability to have the given sequence is the same   = .

RELATED QUESTIONS
A coin is tossed. If a head appears, a spinner that can land on any of the numbers from (answered by ikleyn)

If h(t)=t^2-2t find the following: h(2) H(-1)... (answered by checkley77)

find the domain of the function... (answered by stanbon,solver91311)

h(t) = t^2 − t + 5 find... (answered by advanced_Learner)

I= {h(t)*([4]t^4 + [2]t^3 + [6]t^2 + [4]t + [5]) + k(t)*([3]t^3 + [5]t^2 + [6]t):h(t),... (answered by venugopalramana)

Using the following sample space: {(H, H, H), (H, H, T), (H, T, H), (T, H, H), (H, T,... (answered by Edwin McCravy)

Suppose we toss two coins and suppose that each of the four points in the sample space S (answered by ikleyn,mccravyedwin)

Show all the possible outcomes of tossing two coins Heads-H Tails T Event 1... (answered by stanbon)

Find the domain of the function. H(t) = (36-t^2)/(6 -... (answered by josgarithmetic)