The set of all values of λ for which the system of linear equations 2x1−2x2+x3=λx1,2x1−3x2+2x3=λx2 and −x1+2x2=λx3 has a non - tirvial solution.
A
is an empty set
No worries! We‘ve got your back. Try BYJU‘S free classes today!
B
is a singleton set
No worries! We‘ve got your back. Try BYJU‘S free classes today!
C
contains two elements
Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses
D
contains more than two elements
No worries! We‘ve got your back. Try BYJU‘S free classes today!
Open in App
Solution
The correct option is C
contains two elements
Given system of linear equations 2x1−2x2+x3=λx1 ⇒(2−λ)x1−2x2+x3=0 …(i) 2x1−3x2+2x3=λx2 ⇒2x1−(3+λ)x2+2x3=0 …(ii) −x1+2x2=λx3 ⇒−x1+2x2−λx3=0 …(iii)
Since, the system has non - trival solution. ∴∣∣
∣∣2−λ−212−(3+λ)2−12−λ∣∣
∣∣=0 ⇒(2−λ)(3λ+λ2−4)+2(−2λ+2)+1(4−3)−λ=0 ⇒(2−λ)(λ2+3λ−4)+4(1−λ)+(1−λ)=0 ⇒(2−λ)(λ+4)(λ−1)+5(1−λ)=0 ⇒(λ−1)[(2−λ)(λ+4)−5]=0 ⇒(λ−1)(λ2+2λ−3)=0 ⇒(λ−1)[(λ−1)(λ+3)]=0 ⇒(λ−1)2(λ+3)=0 ⇒λ=1,1,−3
Hence, λ contains two elements.