#### Answer

$(x,y,z) = (4-n, 1+2n, -3+5n)$

#### Work Step by Step

In general we can write an equation for a line in this form:
$(x,y,z) = (a,b,c)+n(a',b',c') = (a+a'n, b+b'n,c+c'n)$
where $(a,b,c)$ is a point on the line and $(a',b',c')$ is a direction vector
$(4,1,-3)$ is a point on the line
$(-1,2,5)$ is a direction vector
Note that parallel lines have the same direction vector.
We can write an equation for this line:
$(x,y,z) = (4,1,-3)+n(-1,2,5) = (4-n, 1+2n, -3+5n)$