Given point is (3, 0, 1) and the equation of planes are
x + 2y = 0 …. (i) and 3y – z = 0 …. (ii)
Equation of any line l passing through (3, 0, 1) is
l: (x – 3)/a = (y – 0)/b = (z – 1)/c
Now, the direction ratios of the normal to plane (i) and plane (ii) are (1, 2, 0) and (0, 3, 1).
As the line is parallel to both the planes, we have
1.a + 2.b + 0.c = 0 ⇒ a + 2b + 0c = 0 and
0.a + 3.b – 1.c = 0 ⇒ 0a + 3b – c = 0