A person predicts the outcome of 20 cric...

A person predicts the outcome of 20 cricket matches of his home team. Each match can result in either a win, loss, or tie for the home team. Total number of ways in which he can make the predictions so that exactly 10 predictions are correct is equal to a. `^20 C_(10)xx2^(10)` b. `^20 C_(10)xx3^(20)` c. `^20 C_(10)xx3^(10)` d. `^20 C_(10)xx2^(20)`

Similar Questions

Explore conceptually related problems

Find the value of .^(20)C_(0) xx .^(13)C_(10) - .^(20)C_(1) xx .^(12)C_(9) + .^(20)C_(2) xx .^(11)C_(8) - "……" + .^(20)C_(10) .

A fair die is thrown 20 times. The probability that on the 10th throw, the fourth six appears is a. "^20 C_(10)xx5^6//6^(20) b. 120xx5^7//6^(10) c. 84xx5^6//6^(10) d. none of these

The sum of series ^(20)C_0-^(20)C1+^(20)C2-^(20)C3++^(20)C 10 is

Twelve balls are distribute among three boxes. The probability that the first box contains three balls is a. (110)/9(2/3)^(10) b. (9)/110(2/3)^(10) c. ((12)C_3)/(12^3)xx2^9 d. ((12)C_3)/(3^(12))

The value of sum_(r=0)^(10)(r)^(20)C_r is equal to: a. 20(2^(18)+^(19)C_(10)) b. 10(2^(18)+^(19)C_(10)) c. 20(2^(18)+^(19)C_(11)) d. 10(2^(18)+^(19)C_(11))

Prove that ""^(10)C_(2)+2xx^(10)C_(3)+^(10)C_(4)=^(12)C_(4)

The sum of 20 terms of a series of which every even term is 2 times the term before it, every odd term is 3 times the term before it, the a. (2/7)(6^(10)-1) b. (3/7)(6^(10)-1) c. (3/5)(6^(10)-1) d. none of these

Rajdhani Express going from Bombay to Delhi stops at five intermediate stations, 10 passengers enter the train during the journey with 10 different ticket of two class. The number of different sets of tickets they may have is a. ^15 C_(10) b. ^20 C_(10) c. ^30 C_(10) d. none of these

Fill in the blanks: (-10) xx __ = 20

The radius of our galaxy is about 3 xx 10 ^(20)m .With what speed should a person travel so that he can reach from the centre of the galaxy to its edge in 20 years of his lifetime ?

Similar Questions

Recommended Questions