Please show a step-by-step solution. Do not skip steps, and explain your steps. Write it on paper, preferably. Make sure the work is clear. Problem #7: Each day, John performs the following experiment. He flips a fair coin repeatedly until he gets a 'T' and countsthe number of coin flips needed.Problem #7(a):Problem #7(b):(a) Approximate the probability that in a (non-leap) year there are at least 4 days when he needed strictly morethan 9 coin flips.(b) Approximate the probability that in a year there are strictly more than 33 days when he needed exactly 4 coinflips.answer correct to 4 decimalsanswer correct to 4 decimals

John flips a coin until he gets a T and counts the number of coin flips needed.

#7: Each day, John performs the following experiment. He flips a fair coin repeatedly until he gets a "T" and counts the number of coin flips needed. Problem #7(a): Problem #7(h): (a) Approximate the probability that in a (non-leap) year there are at least 4 days when he needed strictly more than 9 coin flips. (b) Approximate the probability that in a year there are strictly more than 33 days when he needed exactly 4 coin flips. answer correct to 4 decimals answer correct to 4 decimals ect to

#7: Each day, John performs the following experiment. He flips a fair coin repeatedly until he gets a "T" and counts the number of coin flips needed. Problem #7(a): Problem #7(h): (a) Approximate the probability that in a (non-leap) year there are at least 4 days when he needed strictly more than 9 coin flips. (b) Approximate the probability that in a year there are strictly more than 33 days when he needed exactly 4 coin flips. answer correct to 4 decimals answer correct to 4 decimals ect to

A First Course in Probability (10th Edition)

10th Edition

ISBN:9780134753119

Author:Sheldon Ross

Publisher:Sheldon Ross

Chapter1: Combinatorial Analysis

Section: Chapter Questions

Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...

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Question

Please show a step-by-step solution. Do not skip steps, and explain your steps. Write it on paper, preferably. Make sure the work is clear.

Problem #7: Each day, John performs the following experiment. He flips a fair coin repeatedly until he gets a 'T' and counts
the number of coin flips needed.
Problem #7(a):
Problem #7(b):
(a) Approximate the probability that in a (non-leap) year there are at least 4 days when he needed strictly more
than 9 coin flips.
(b) Approximate the probability that in a year there are strictly more than 33 days when he needed exactly 4 coin
flips.
answer correct to 4 decimals
answer correct to 4 decimals

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