Given equations of direction cosies
2ℓ+2m−n=0...............(i)
mn+nℓ+ℓm=0..............(ii)
ℓm+n(ℓ+m)=0
From equation (i)
n=2(ℓ+m)
ℓm+2(ℓ+m)2=0
2ℓ2+2m2+5ℓm=0
Dividing by m2 on both sides
2(mℓ)2+2+5(mℓ)=0
Let mℓ=t
2t2+5t+2=0
2t2+4t+t+2=0
(t+2)(2t+1)=0
t=−2,−21
Case 1
mℓ=−21
m=−2ℓ, n=−2ℓ
(ℓ,−2ℓ,−2ℓ)⇒(1,−2,−2)
Case 2
mℓ=−2
ℓ=−2m,n=−2m
(−2m,m,−2m)⇒(−2,1,−2)
cosθ=12+(−2)2+(−2)2(−2)2+12+(−2)21×(−2)+(−2)×1+(−2)×(−2)
cosθ=9−2−2+4=0
θ=2π