Let N be the sum of the numbers appeared when two fair dice are rolled and let the probability that N-2, √3 N, N+2 are in geometric progression be (k/48), Then the value of k is

Question

Let N be the sum of the numbers appeared when two fair dice are rolled and let the probability that N-2, √3 N, N+2 are in geometric progression be (k/48), Then the value of k is (A) 16 (B) 2 (C) 8 (D) 4

Tardigrade Admin · Accepted Answer

n(s)=36 Given: N -2, √3 N , N +2 are in G.P. 3 N =( N -2)( N +2) 3 N = N 2-4 ⇒ N 2-3 N -4=0 ( N -4)( N +1)=0 ⇒ N =4 text or N =-1 text rejected ( Sum =4) ≡ (1,3),(3,1),(2,2) n ( A )=3 P ( A )=(3/36)=(1/12)=(4/48) ⇒ k =4

Q. Let N be the sum of the numbers appeared when two fair dice are rolled and let the probability that N−2,3N​,N+2 are in geometric progression be 48k​, Then the value of k is

16

2

8

4

n(s)=36 Given : N−2,3N​,N+2 are in G.P. 3N=(N−2)(N+2) 3N=N2−4 ⇒N2−3N−4=0 (N−4)(N+1)=0⇒N=4 or N=−1 rejected (Sum=4)≡{(1,3),(3,1),(2,2)} n(A)=3 P(A)=363​=121​=484​⇒k=4

Q. Let $N$ be the sum of the numbers appeared when two fair dice are rolled and let the probability that $N - 2, 3 N, N + 2$ are in geometric progression be $\frac{k}{48}$ , Then the value of $k$ is