What is the probability of 53rd Sunday in a leap year?
Table of Contents
- 1 What is the probability of 53rd Sunday in a leap year?
- 2 What is the probability that a leap year selected at random will contain 53 Sundays and 53 Monday?
- 3 What is the probability that a leap year selected at random contains 53 Thursday or 53 Friday?
- 4 How do you find the probability of a leap year?
- 5 What is the probability that a year selected at random will contain 53 Fridays?
- 6 What is the probability of getting 53 Fridays in a non-leap year?
What is the probability of 53rd Sunday in a leap year?
The probability that a leap year selected at random contains 53 Sunday is (1)7/366 (2)28/183 (3) 1/7 (4) 2/7. We know that a leap year has 366 days. So, we have 52 weeks and 2 days. Hence, a leap year has 52 Sundays.
What is the probability that a leap year selected at random will contain 53 Sundays and 53 Monday?
Answer is (C) 3/7 A leap year consists of 366 days comprising of 52 weeks and 2 days.
What is the probability that a leap year selected at random will contain 53 Sundays 2 points?
52 Sundays in 52 weeks.. Let A be the event which includes Sunday. The probability that a leap year will have 53 Sundays or 53 Mondays is 2/7.
What is the probability that a leap year selected at random would contain 53 Saturdays?
A leap year has 366 days or 52 weeks and 2 odd days. The two odd days can be {Sunday,Monday},{Monday,Tuesday},{Tuesday,Wednesday},{Wednesday,Thursday},{Thursday,Friday},{Friday,Saturday},{Saturday,Sunday}. So there are 7 possibilities out of which 2 have a Sunday. So the probability of 53 Sundays is 2/7.
What is the probability that a leap year selected at random contains 53 Thursday or 53 Friday?
Three of these seven possibilities have either a Thursday or a Friday (or both). Therefore, the probability that a random leap year will have either 53 Thursdays or 53 Fridays is approximately 3/7.
How do you find the probability of a leap year?
We know, a week consists of seven days and 366 days form a leap year. When we divide 366 by 7 we get 52 as the quotient and 2 as the remainder. Therefore, we can state that a leap year has 52 complete weeks and 2 odd days. Now, for 53 Sundays, one of the 2 odd days needs to be a Sunday.
What is the probability that a leap year selected at random will contain either 53 Sundays or 53 Fridays?
= 3/7.
What is leap year Class 10?
A leap year is a calendar year containing one additional day added to keep the calendar year synchronized with the astronomical or seasonal year. During leap year, the February has 29 days instead of 28 days in normal year or non leap year. There are 366 days in a leap year.
What is the probability that a year selected at random will contain 53 Fridays?
The probability of getting 53 Fridays in a leap year = 2/7.
What is the probability of getting 53 Fridays in a non-leap year?
1/7 is the probability of getting 53 fridays in a non-leap year.
What is leap year for Class 5?
The year which has 366 days is called a leap year. That extra one day is added to the shortest month of the year, i.e. February. Thus when a year has 29th February in its calendar, it is termed as a leap year. This year occurs every four years.
What is leap year Class 4?
A leap year is a year in which an extra day is added to the Gregorian calendar, which is used by most of the world. A common year has 365 days, but a leap year has 366 days. The extra day, February 29, is added to the month of February.
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