$\begin{aligned}
& \mathrm{P}(1,0,3) \
& \mathrm{A}(4,7,1), \mathrm{B}(3,5,3) \
& \text { Line } \mathrm{AB} \Rightarrow \frac{\mathrm{x}-3}{1}=\frac{\mathrm{y}-5}{2}=\frac{\mathrm{z}-3}{-2}=\lambda
\end{aligned}$
Let foot of perpendicular of P on AB be
R≡(λ+3,2λ+5,−2λ+3)⇒(λ+3−1)(1)+(2λ+5−0)(2)+(−2λ+3−3)(−2)=0⇒λ+2+4λ+10+4λ=0⇒λ=−34⇒R≡(35,37,317)Q≡(310−1,314−0,334−3)≡(37,314,325)⇒α+β+γ=37+14+25=346