If`(x-1)/l=(y-2)/m=(z+1)/n` is the equation of the line through `(1,2,-1)`and`(-1,0,1)`, then`(l,m,n)`

If the lines L_(1):(x-1)/(3)=(y-lambda)/(1)=(z-3)/(2) and L_(2):(x-3)/(1)=(y-1)/(2)=(z-2)/(3) are coplanar, then the equation of the plane passing through the point of intersection of L_(1)&L_(2) which is at a maximum distance from the origin is

Show that if the axes are rectangular,the equation of the line through the point (x_(1),y_(1),z_(1)) at right angle to the lines (x)/(l_(1))=(y)/(m_(1))=(z)/(n_(1));(x)/(l_(2))=(y)/(m_(2))=(z)/(n_(2)) is (x-x_(1))/(m_(1)n_(2)-m_(2)n_(1))=(y-y_(1))/(n_(1)l_(2)-n_(2)l_(1))=(z-z_(1))/(l_(1)m_(2)-l_(2)m_(1))

Show that if the axes are rectangular the equation of line through point (x_1,y_1,z_1) at right angle to the lines x/l_1=y/m_1=z/n_1,x/l_2=y/m_2=z/n_2 is (x-x_1)/(m_1n_2-m_2n_1)=(y-y_1)/(n_1l_2-n_2l_1)=(z-z_1)/(l_1m_2-l_2m_1)

Find the condition that the two lines whose equations are (x-x_(1))/(l_(1))=(y-y_(1))/(m_(1))=(z-z_(1))/(n_(1)) and (x-x_(2))/(l_(2))=(y-y_(2))/(m_(2))=(z-z_(2))/(n_(2)) may intersect and also find the equation of the plane in which they lie.

If (x)/(l)+(y)/(m)=1 is any line passing through the intersection point of the lines (x)/(a)+(y)/(b)=1 and (x)/(b)+(y)/(a)=1 then prove that (1)/(l)+(1)/(m)=(1)/(a)+(1)/(b)

Find the equation of the plane through the line (x-x_1)/l_1=(y-y_1)/m_1=(z-z_1)/n_1 and parallel to the line (x-alpha)/l_2=(y-beta)/m_2=(z-gamma)/n_2

Find the equation of the plane through the line (x)/(l)=(y)/(m)=(z)/(n) and perpendicular to the plane containing the line (x)/(m)=(y)/(n)=(z)/(l) and (x)/(n)=(y)/(l)=(z)/(m)

Distance of the point P(x_(2),y_(2),z_(2)) from the line (x-x_(1))/(l)=(y-y_(1))/(m)=(z-z_(1))/(n), where l,m,n are the direction cosines of the line,is

Three sided of a triangle have equations L_(1)-=y-m_(i)x=o;i=1,2 and 3. Then L_(1)L_(2)+lambda L_(2)L_(3)+mu L_(3)L_(1)=0 where lambda!=0,mu!=0, is the equation of the circumcircle of the triangle if 1+lambda+mu=m_(1)m_(2)+lambda m_(2)m_(3)+lambda m_(3)m_(1)m_(1)(1+mu)+m_(2)(1+lambda)+m_(3)(mu+lambda)=0(1)/(m_(3))+(1)/(m_(1))+(1)/(m_(1))=1+lambda+mu none of these

Assertion: The lines x/1=y/2=z/3 and (x-1)/(-2)=(y-2)/(-4)=(z-3)/(-6) are parallel., Reason: two lines having direction ratios l_1,m_1,n_1 and l_2,m_2,n_2 are parallel if l_1/l_2=m_1/m_2=n_1/n_2 . (A) Both A and R are true and R is the correct explanation of A (B) Both A and R are true R is not te correct explanation of A (C) A is true but R is false. (D) A is false but R is true.