Question

Write the probability that a leap year should have exactly 52 Tuesday.​

Answer 1

The probability that a leap year should have exactly 52 Tuesdays are 5/7

Answer 2

The probability that a leap year should have exactly 52 Tuesday is 0.71

Step-by-step explanation:

the probability that a leap year should have exactly 52 Tuesday.​

Possible outcomes for 2 odd days

The 2 odd days may be the combination of Sunday & Monday, Monday & Tuesday, Tuesday & Wednesday, Wednesday & Thursday, Thursday & Friday, Friday & Saturday or Saturday & Sunday.

Therefore, the total number of possible outcomes or elements of a sample space is 7.

probability of 2 Odd days not to be Monday & Tuesday, Tuesday & Wednesday, Wednesday & Thursday, Thursday & Friday or Friday & Saturday

Expected events of A = {Sun & Mon}, {Wed & Thu}, {Thu & Fri}, {Fri & Sat}, {Sat & Sun}  = 5

then

$probability = \frac{expected outcomes}{total outcomes }$

probability (exactly 52 Tuesday in leap year) = $\frac{5}{7}$

= 0.71

hence ,

The probability that a leap year should have exactly 52 Tuesday is 0.71

#Learn more:

Find the probability that a leap year should have 53 Tuesdays

https://brainly.in/question/7410538