Concept: If
a,b,c are the direction ration ratios of a line passing through the point
(x1,y1,z1), then the equation of line is given by:
== If
a,b,c are the direction ration ratiosof a line then the direction cosine of the line is given by:
1=m=,n= Calculation Given:
1,m,n are the direction cosinesof the line
x−1=2(y+3)=1−z The given equation of lines can be re-written as
== So, by comparing the equation
== with
==we get
⇒a=1,b=1∕2 and c=−1 As we know that, if
a,b,c are the direction ration ratios of a line then the direction cosine of the line is given by:
1=m=,n= The direction cosine of the given line is:
⇒1=,m=,n= ⇒14+m4+n4=16∕81+1∕81+16∕81=33∕81=11∕27 Hence, the correct option is 2 .