Any plane perpendicular to a line has a normal vector equal to the direction vector of the line.
Thus the normal vector of the plane is the director vector of the line
L: (3,0,1)+t(1,4,-3)
or <1,4,-3>
Given that the plane passes through (-2,6,10), we conclude that the plane has the following equation:
1(x-(-2))+4(y-6)-3(z-10)=0
=>
Π : x+4y-3z+8=0
