What is the probability that an ordinary year that 53 Sundays?

What is the probability that a non-leap year has 53 Sundays? 6/7 (b) 1/7 (c) 5/7 (d) None of these

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

What is the probability that a leap year has 52 Mondays?

What is the probability that a leap year has 53 Tuesdays and 53 Mondays?

The probability that a non-leap year has 53 sundays, is (a) 2/7 (b) 5/7 (c) 6/7 (d) 1/7

A number is chosen randomly from one of the two sets X={2001, 2002, 2003,…., 2100}, Y={1901, 1902, 1903,……, 2000}. If the number chosen represents a calander year and p is the probability that selected year has 53 Sunday, then 2800p is equal to

The probability that an year chosen at random has 53 Sundays is :

What is the probability that a leap year selected at random contains 53 Sunday?

Find the probability that the month of January may have 5 Mondays in (i) a leap year (ii) a non-leap year.