consider a coin with p(head)=0.45 and p(tail)=0.55.the coin is flipped 100times. let X be the number...

consider a coin with P(head) =0.45 and P(tail)=0.55. the coin is flipped 1000 times. let X...

consider a coin with P(head) =0.45 and P(tail)=0.55. the coin is flipped 1000 times. let X be the number of heads obtained .using chebyshev's inequality, find a lower bound for P(30<X<60)

A particular coin is biased. Each timr it is flipped, the probability of a head is...

A particular coin is biased. Each timr it is flipped, the probability of a head is P(H)=0.55 and the probability of a tail is P(T)=0.45. Each flip os independent of the other flips. The coin is flipped twice. Let X be the total number of times the coin shows a head out of two flips. So the possible values of X are x=0,1, or 2. a. Compute P(X=0), P(X=1), P(X=2). b. What is the probability that X>=1? c. Compute the...

A coin, having probability p of landing heads, is continually flipped until at least one head...

A coin, having probability p of landing heads, is continually flipped until at least one head and one tail have been flipped.   Find the expected number of flips that land on heads. Find the expected number of flips that land on tails.

A coin, having probability p of landing heads, is continually flipped until at least one head...

A coin, having probability p of landing heads, is continually flipped until at least one head and one tail have been flipped.   Find the expected number of flips needed.

Consider an unfair coin where P(tail)=1/3. The coin is flipped over and over until the tail...

Consider an unfair coin where P(tail)=1/3. The coin is flipped over and over until the tail is observed a second time. What is the probability that the tail is observed a second time on the 5th flip

a coin flips to show head with probability p. the coin is flipped until head occurs....

a coin flips to show head with probability p. the coin is flipped until head occurs. find the expected number of flips.

A fair coin is flipped 400 times. Let X be the number of heads resulting, find...

A fair coin is flipped 400 times. Let X be the number of heads resulting, find P[190<= X <= 200] a) About 34% b) About 95% c) About 68% d) About 25% e) About 50%

a fair coin is flipped 44 times. let X be the number if heads. what normal...

a fair coin is flipped 44 times. let X be the number if heads. what normal distribution best approximates X?

Consider the following three random variables: a) a coin is repeatedly flipped Let X= number of...

Consider the following three random variables: a) a coin is repeatedly flipped Let X= number of tails before the first head b) a box contains 10 red and 6 white chips. 5 chips are drawn at rabdom from the box. Let Y= the number of red chips drawn. c) A weighted die is rolled 12 times. Let W= the number of times a "4" is rolled in each case, decide whether the random variable is binomial.

The unfair coin (p=Prob(head)=0.3, q=Prob(tail)=1-p=0.7) is tossed 100 times. Find the probability that number of heads...

The unfair coin (p=Prob(head)=0.3, q=Prob(tail)=1-p=0.7) is tossed 100 times. Find the probability that number of heads is between 45 to 50 (both inclusive) a) Use direct calculation (binomial) b) Use normal approximation Using Ti-34 calculator Equations/answer written out using binomcdf(x,x,x) Binompdf(x,x,x) Invnorm InvT tcdf If possible/needed to solve the equation