Probability Questions Quiz 1

Explanation:

Here, n(S) = 52.

Let E = event of getting a queen of club or a king of heart.

Then, n(E) = 2.

P(E) = n(E)/n(S) = 2/52 = 1/26

Explanation:

Let S be the sample space.

Then, n(S)= number of ways of drawing 3 balls out of 15

= ¹⁵C₃

=(15 x 14 x 13)/(3 x 2 x 1)= 455.

Let E = event of getting all the 3 red balls.

n(E) = ⁵C₃ = ⁵C₂ =(5 x 4)/(2 x 1)= 10.

P(E) = n(E)/n(S)= 10/455= 2/91

Explanation:

Let S be the sample space.

Then, n(S) = ⁵²C₂ =(52 x 51) / (2 x 1)= 1326.

Let E = event of getting 1 spade and 1 heart.

n(E)= number of ways of choosing 1 spade out of 13 and 1 heart out of 13

= (¹³C₁ x ¹³C₁)

= (13 x 13)

= 169.

P(E) =n(E)/n(S)= 169/1326 = 13/102

Explanation:

Clearly, there are 52 cards, out of which there are 12 face cards.

P (getting a face card) = 12 / 52 = 3/13

Explanation:

Let number of balls = (6 + 8) = 14.

Number of white balls = 8.

P (drawing a white ball) = 8/14 = 4/7

Explanation :

|X| can take 7 values.
To get |X|<2 ( i.e., −2<X<+2) take X={−1,0,1}

= P(|X|<2)= Favourable CasesTotal Cases
= 3/7

Explanation :

Given, A be the event that X is selected and B is the event that Y is selected.

P(A)=17, P(B)=29.

Let C be the event that both are selected.

P(C)=P(A)×P(B) as A and B are independent events:

=(17)×(29)

= 2/63

Explanation : P(Both are red),

=6C213C2

=5/26

Explanation :

The total number of elementary events associated to the random experiments of throwing four dice simultaneously is:

=6×6×6×6=64

n(S)=64

Let X be the event that all dice show the same face.

X={(1,1,1,1,),(2,2,2,2),(3,3,3,3),(4,4,4,4),(5,5,5,5),(6,6,6,6)}

n(X)=6

Hence required probability,

=n(X)n(S)=664

=1/216

Explanation :

The probability that first ball is white:

=12C130C1

=1230

=25

Since, the ball is not replaced; hence the number of balls left in bag is 29.

Hence, the probability the second ball is black:

=18C  129C1

=1829

Required probability,

=(25)×(1829)

=36145