$\begin{aligned}
& \left(\mathrm{x}^2+2 \mathrm{x}\right)(12-\mathrm{k})=2 \
& \lambda \mathrm{x}^2+2 \lambda \mathrm{x}-2=0 \quad \mathrm{k} \neq 12 \text { Let } 12-\mathrm{k}=\lambda \
& \mathrm{D}=0 \
& 4 \lambda^2+8 \lambda=0 \
& \lambda=0 \text { or } \lambda=-2 \
& \Rightarrow 12-\mathrm{k}=-2 \
& \mathrm{k}=14
\end{aligned}$
So P(k,2k)=(14,7)
d=53×14+4×7+5=15
option (1)