The two lines `x=ay+b, z=cy+d and x=a'y+b', z=c'y+d'` are perpendicular to each other, if

If the lines x=ay +b, z=cy+d and x=a'y + b', z=c'y + d' are perpendicular, then

Two lines in 3-D are x=ay+b,z=cy+d and x=a^'z+b',y=c'x+d' are perpendicular to each other then which of the following condition is true? (a) aa'+c+c'=0 (b) c c'+a+a'=0 (c) aa'+c c'=0 (d) a a'+c c'+1=0

The two lines x=ay+b,z=cy+d and x=a'y+b',z=c'y+d' will be perpendicularm if and only if

If lines x=ay+b, z= cy +d " and " x=a' z+b y+c' z+ d' are perpendicular then

Fid the condition if lines x=ay+b,z=cy+d and x=a'y+b',z=c'y+d are perpendicular.

Prove that the lines x=ay +b,z =cy +d and x=a'y +b' z =c'y +a' are perpendicular if aa'+cc' +1=0

If the two lines represented by x+ay=b,z+cy=d and x=a'y+b', z=c'y+d' be perpendicular to each other, then the value of a a'+c c' is :

the two lines x=ay+b,z=cy+d and x=a\'y+b,z=c\'y+d\' will be perpendicular, if and only if: (A) aa\'+cc\'=1=0 (B) aa\'+bb\'+cc\'=1=0 (C) aa\'+bb\'+cc\'=0 (D) (a+a\')+(b+b\')+(c+c\')=0

Show that the lines x=-y =2z " and " x+2 =2y -1 =-z +1 are perpendicular to each other .

If the lines x-2 = ay-3 =(2-z)/3 and bx +1 = y+4=z are perpendicular to each other, then 1/a + 1/b=