Probability Question 1

Question 1 - 24 January - Shift 1

Let N denote the number that turns up when a fair die is rolled. If the probability that the system of equations

$x+y+z=1$

$2 x+Ny+2 z=2$

$3 x+3 y+Nz=3$

has unique solution is $\frac{k}{6}$, then the sum of value of k and all possible values of N is

(1) 18

(2) 19

(3) 20

(4) 21

Show Answer

Answer: (3)

Solution:

Formula: Consistency of a system of equations, Probability of occurrence of an event

$x+y+z=1$

$2 x+Ny+2 z=2$

$3 x+3 y+Nz=3$

$\Delta= \begin{vmatrix} 1 & 1 & 1 \\ 2 & N & 2 \\ 3 & 3 & N\end{vmatrix} $

$=(N-2)(N-3)$

For unique solution $\Delta \neq 0$

So $N \neq 2,3$

$\Rightarrow P($ system has unique solution $)=\frac{4}{6}$

So $k=4$

Therefore sum $=4+1+4+5+6=20$