r×a=b×r⇒r×(a+b)=0
r=λ(a+b)⇒r=λ(i^+2j^−3k^+2i^−3j^+5k^)
r=λ(3i^−j^+2k^)...(1)
r⋅(αi^+2j^+k^)=3
Put r from (1)
αλ=1...(2)
r⋅(2i^+5j^−αk^)=−1
Put r from (1)
2λα−λ=1...(3)
Solve (2) and (3)
α=1,λ=1
⇒r=3i^−j^+2k^
|\vec{r}{|}^{2}=14&\alpha =1
α+∣r∣2=15