Given, A=[[x+1][x][x][x+2][x+3][x+2][x+3][x+3][x+4]]
A=[[x]+1[x][x][x]+2[x]+3[x]+2[x]+3[x]+3[x]+4]
R1→R1−R3,R2→R2−R3
A=[10[x]01[x]+2−1−1[x]+4]
det(A)=1([x]+4+[x]+2)−1(−[x])
=3[x]+6
Given, det(A)=192
192=3[x]+6
3[x]=186
[x]=62
x∈[62,63)