what is the probability that a leap year has 53 Mondays
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Answered by
5
Answer:
1 year = 365 days
A leap year has 366 days
A year has 52 weeks. Hence there will be 52 Mondays for sure.
52 weeks = 52 x 7 = 364 days
366 – 364 =2 days
In a leap year there will be 52 Mondays and 2 days will be left.
These 2 days can be:
Sunday, Monday
Monday, Tuesday
Tuesday, Wednesday
Wednesday, Thursday
Thursday, Friday
Friday, Saturday
Saturday, Sunday
Of these total 7 outcomes, the favourable outcomes are 2.
Hence the probability of getting 53 Mondays in a leap year = 2/7.
Answered by
3
:
1 year = 365 days
A leap year has 366 days
A year has 52 weeks. Hence there will be 52 Mondays for sure.
52 weeks = 52 x 7 = 364 days
366 – 364 =2 days
In a leap year there will be 52 Mondays and 2 days will be left.
These 2 days can be:
(Sunday, Monday)
(Monday, Tuesday)
(Tuesday, Wednesday)
(Wednesday, Thursday)
(Thursday, Friday)
(Friday, Saturday)
(Saturday, Sunday)
Of these total 7 outcomes, the favourable outcomes are 2.
Hence the probability of getting 53 Mondays in a leap year = 2/7.
Pls mark it as the brainliest answer
1 year = 365 days
A leap year has 366 days
A year has 52 weeks. Hence there will be 52 Mondays for sure.
52 weeks = 52 x 7 = 364 days
366 – 364 =2 days
In a leap year there will be 52 Mondays and 2 days will be left.
These 2 days can be:
(Sunday, Monday)
(Monday, Tuesday)
(Tuesday, Wednesday)
(Wednesday, Thursday)
(Thursday, Friday)
(Friday, Saturday)
(Saturday, Sunday)
Of these total 7 outcomes, the favourable outcomes are 2.
Hence the probability of getting 53 Mondays in a leap year = 2/7.
Pls mark it as the brainliest answer
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