Math, asked by jseuoa10, 1 year ago

find the probablity of getting 52 sundays in a leap year

no silly answers

fast pls

Answers

Answered by Anonymous
6

There are 365 days in a year but we have 366 days in a leap year.

There are 365 days in a year but we have 366 days in a leap year.There are 7 days in a week.

There are 365 days in a year but we have 366 days in a leap year.There are 7 days in a week.If we multiply the weeks by the days we have 52x7 which equals to 364. This means that there are 2 extra days in a leap year which will make it 366.

There are 365 days in a year but we have 366 days in a leap year.There are 7 days in a week.If we multiply the weeks by the days we have 52x7 which equals to 364. This means that there are 2 extra days in a leap year which will make it 366.The probability of having 52 Sundays in a leap year is thus: the remaining two days can be any of this formation:

There are 365 days in a year but we have 366 days in a leap year.There are 7 days in a week.If we multiply the weeks by the days we have 52x7 which equals to 364. This means that there are 2 extra days in a leap year which will make it 366.The probability of having 52 Sundays in a leap year is thus: the remaining two days can be any of this formation:Sunday-Monday, Monday-Tuesday, Tuesday-Wednesday, Wednesday-Thursday, Thursday-Friday, Friday-Saturday, Saturday-Sunday.

There are 365 days in a year but we have 366 days in a leap year.There are 7 days in a week.If we multiply the weeks by the days we have 52x7 which equals to 364. This means that there are 2 extra days in a leap year which will make it 366.The probability of having 52 Sundays in a leap year is thus: the remaining two days can be any of this formation:Sunday-Monday, Monday-Tuesday, Tuesday-Wednesday, Wednesday-Thursday, Thursday-Friday, Friday-Saturday, Saturday-Sunday.However, to get 52 Sundays in a leap year, none of the remaining two days must be a Sunday. Therefore, out of the 7 combinations above, that can be only realized 5 out of 7 times. The connection "Sunday-Monday and Saturday-Sunday" most be scraped off.

There are 365 days in a year but we have 366 days in a leap year.There are 7 days in a week.If we multiply the weeks by the days we have 52x7 which equals to 364. This means that there are 2 extra days in a leap year which will make it 366.The probability of having 52 Sundays in a leap year is thus: the remaining two days can be any of this formation:Sunday-Monday, Monday-Tuesday, Tuesday-Wednesday, Wednesday-Thursday, Thursday-Friday, Friday-Saturday, Saturday-Sunday.However, to get 52 Sundays in a leap year, none of the remaining two days must be a Sunday. Therefore, out of the 7 combinations above, that can be only realized 5 out of 7 times. The connection "Sunday-Monday and Saturday-Sunday" most be scraped off.The probability of having 52 Sundays in a leap year is therefore 5/7

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