- What is the probability that a leap year selected at random will contain 53?
- What is the probability that leap year selected at random will contain 53 Sundays or 53 Fridays?
- What is the probability that a randomly taken leap year has 52 Sundays?
- What is the probability of 52 Saturdays in a leap year?
- What is the probability of getting 53 Sundays in a year?
- What is the probability that a leap year has 53 Sundays and 52 Mondays?
- What is the probability that an ordinary year has 53 Tuesday?
- What is the probability of getting 52 Mondays in a year?

## What is the probability that a leap year selected at random will contain 53?

Hence, the required probability is 2/7..

## What is the probability that leap year selected at random will contain 53 Sundays or 53 Fridays?

37Let E be the event that the leap year has 53 Fridays or 53 Saturdays. Now, we will find the required probability using the formula P(E)=n(E)n(S) . Hence, the required probability is 37.

## What is the probability that a randomly taken leap year has 52 Sundays?

In a leap year, we have 366 days. So, we have 52 weeks and 2 days. Out of these, 7 pairs of combinations, only 2 pairs have Sunday, and the other 5 pairs do not have Sundays. Therefore, the probability that a leap year will have only 52 Sundays is 5/7.

## What is the probability of 52 Saturdays in a leap year?

0.710.71 is probability for 52 Saturdays in a leap year.

## What is the probability of getting 53 Sundays in a year?

For 52 weeks, There will be 52 Sundays. The remaining 1 day can be either Sunday, Monday, Tuesday, Wednesday, Thursday, Friday, and Saturday. Out of these 7 total outcomes, the favorable outcomes are 1. Hence the probability of getting 53 Sundays = 1/7.

## What is the probability that a leap year has 53 Sundays and 52 Mondays?

There are 52 weeks & 2 days. 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 an ordinary year has 53 Tuesday?

Step by step solution by experts to help you in doubt clearance & scoring excellent marks in exams. An ordinary year has 365 years, i.e., 52 weeks and 1 day. Now, 52 weeks have 52 Tuesdays and the ramaining one day can be any of the 7 days. ∴ required probability = probability of this day being a Tuesday =17.

## What is the probability of getting 52 Mondays in a year?

6/7 or 0.86 is probability for 52 Mondays in a non-leap year. The odd day may be either Sunday, Monday, Tuesday, Wednesday, Thursday, Friday or Saturday. Therefore, the total number of possible outcomes or elements of a sample space is 7. 0.86 is probability for 52 Mondays in a non-leap year.