The condition for lhe lines x=az+b, y=cz+d and `x=a_(1) z+b_(1), y=c_(1)z+d_(1)` to be parallel is

The two lines x= ay+b, z=cy+d and x=a^(1)y+b^(1), y=c^(1) y+d^(1) are at right angles if

If the equation of the plane passing through the line of intersection of the panes ax + by + cz +d=0, a _(1) x + b _(1) y + c _(1) z + d _(1) =0 and perpendicular to the XY-plane is px + py + rz + s =0 then S =

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

Assertion (A): A(x_(1),y_(1),z_(1)), B(x_(2),y_(2),z_(2)) . The projection of AB on the line with D.C's (l,m,n) is l(x_(2)-x_(1)) +m(y_(2)-y_(1))+n(z_(2)-z_(1)) Reason (R ) : The projection of the join of A (x_(1),y_(1),z_(1)), B(x_(2),y_(2),z_(2)) on yz plane is sqrt((y_(2)-y_(1))^(2)+(z_(2)-z_(1))^(2))

The equation of the plane through the line of intersection of planes ax + by + cz + d=0 , a 'x + b'y + c'z + d' =0 and parallel to the lines y =0 and z=0 is

If a , b , c in R such that a + b + c= 0 and az_(1) + bz_(2) + cz_(3) = 0 then z_(1) , z_(2) , z_(3) are

Show that two lines a_(1)x + b_(1) y+ c_(1) = 0 " and " a_(2)x + b_(2) y + c_(2) = 0 " where " b_(1) , b_(2) ne 0 are : (i) Parallel if a_(1)/b_(1) = a_(2)/b_(2) , and (ii) Perpendicular if a_(1) a_(2) + b_(1) b_(2) = 0 .

If a, b, c are in G.P. and a^(1/x) =b^(1/y)=c^(1/z) , prove that x, y , z are in A.P