Question

(A) Discuss the probability of landing on heads if you flipped a coin 10 times?

(B) What is the probability the coin will land on heads on each of the 10 coin flips?

(C) Apply this same binomial experiment to a different real-world situation. Describe a situation involving probability?

please explain each and show work. showing the steps to the answer would be great..

Answer 1

answer:

(A)

• give 4 a chance to be occasion or head and T be the occasion of tail. since both have square with/likelihood of event.
• P (H) = P(T)=1/2 = 0.5
• Additionally each toss of the coin is free of the each other. thus required likelihood is:
• P( watching a head on the tenth toss)
• = p(H)
• =1/2
• =0.5

(B)

• AS coin is reasonable and un baised - P watching head or each toss
• =P(HH.......10 times)
• =(1/2)^10
• =(0.5)^10
• =0.000976562

(C)

• A binomial experment can be connected anyplace on the off chance that it fulfill following condistions:
• The states of the binomial circulation are as per the following:
• 1.The likelihood of progress is settled for each trail.
• 2.The number of trails is free.
• 3.The example measure is countable.(1,2,3..)

Model:

• Financial experts utilized binomial hypothesis to tally probabilities that rely upon various and extremely appropriated factors to anticipate the manner in which the economy will carry on in the following couple of years.
• To have the capacity to think of sensible forecasts, binomial hypothesis is utilized in this field.
• Binomial Theorem has additionally been an incredible use in the engineering business in plan of framework.
• It permits engineers, to ascertain the extents of the ventures and in this manner conveying exact assessments of the expenses as well as time required to develop them
• If it's not too much trouble remark underneath in the event that you have question.