Let,
L1:3x−1=2y−2=−2z+1=λ
⇒M(3λ+1,2λ+2,−2λ−1)≡M(α,β,γ)
⇒α+β+γ=3λ+2
Also, L2:−3x+2=−2y−2=4z−1=μ
⇒N(−3μ−2,−2μ+2,4μ+1)≡N(a,b,c)
⇒a+b+c=−μ+1

Now, from the above diagram, we can see MN lie on the same line,
So, −3μ−13λ+2=−2μ2λ=4μ−2−2λ−4
Now, solving −3μ−13λ+2=−2μ2λ
⇒3λμ+2μ=3λμ+λ
⇒2μ=λ......(i)
Now, solving −2μ2λ=4μ−2−2λ−4 we get,
⇒2λμ−λ=λμ+2μ
⇒λμ=λ+2μ
⇒λμ=2λ as2μ=λ
⇒μ=2(λ=0)
⇒λ=4 from equation(i)
Hence, α+β+γ=14 and a+b+c=−1
So, (a+b+c)2(α+β+γ)2=196