Level:
Project ID:
1003188907
Source Problem:
Accepted:
1
Clonable:
1
Easy:
0
We are given two intersecting planes \( x-6y+9z-4=0 \) and \( x-2y+3z-4=0 \). Find the parametric equations of their line of intersection \( p \).
\( \begin{aligned}
p\colon x&=4, \\
y&=\phantom{4+}\ 3t, \\
z&=\phantom{4+}\ 2t;\ t\in\mathbb{R}
\end{aligned} \)
\( \begin{aligned}
p\colon x&=4+t , \\
y&=\phantom{4+}\ 3t , \\
z&=\phantom{4+}\ 2t;\ t\in\mathbb{R}
\end{aligned} \)
\( \begin{aligned}
p\colon x&=4, \\
y&=\frac32+3t, \\
z&=1+2t;\ t\in\mathbb{R}
\end{aligned} \)
\( \begin{aligned}
p\colon x&=4+t, \\
y&=\frac32+3t, \\
z&=1+2t;\ t\in\mathbb{R}
\end{aligned} \)