if the two line l1 x + m1 y + n1 =0 and l2 x + m2 y + n2 =0 cut axes at con-cyclic points, then :-

The line l_1 x+ m_1 y+n=0 and l_2 x + m_2 y+n=0 will cut the coordinate axes at concyclic points if (A) l_1 m_1 = l_2 m_2 (B) l_1 m_2 = l_2 m_1 (C) l_1 l_2 = m_1 m_2 (D) l_1 l_2 m_1 m_2 = n^2

If the lines lx+y+1=0,x+"my"+1=0" and "x+y+n=0 intersect at one point then the value of (1)/(1-l)+(1)/(1-m)+(1)/(1-n) is (l,m, n are unequal).

The condition for which the striaght lines l_(1)x+m_(1)y+n_(1)=0andl_(2)x+m_(2)y+n_(2)=0 are perpendicular to each other is -

The condition for the lines lx+my+n=0 and l_(1)x+m_(1)y+n_(1)=0 to be conjugate with respect to the circle x^(2)+y^(2)=r^(2) is

The condition for the lines lxk+my+n=0 and l_(1)x+m_(1)y+n_(1)=0 to be conjugate with respect to the circle x^(2)+y^(2)=r^(2) is

Let L be the line x-4 =y-2 =(z-7)/(2) and P be the plane 2x - 4y +z =7 Statement 1: The line L lies in the plane P Statement 2: The direction ratios of the line L are l_1 =1, m_1 =1, n_1= 2 and that of the normal to the plane P are l_2 =2, m_2 =-4, n_2 =1 and l_1l_2 +m_1 m_2 +n_1 n_2 =0 holds

The combined equation of the lines l_1a n dl_2 is 2x^2+6x y+y^2=0 and that of the lines m_1a n dm_2 is 4x^2+18 x y+y^2=0 . If the angle between l_1 and m_2 is alpha then the angle between l_2a n dm_1 will be pi/2-alpha (b) 2alpha pi/4+alpha (d) alpha

The combined equation of the lines l_1a n dl_2 is 2x^2+6x y+y^2=0 and that of the lines m_1a n dm_2 is 4x^2+18 x y+y^2=0 . If the angle between l_1 and m_2 is alpha then the angle between l_2a n dm_1 will be

The combined equation of the lines l_1a n dl_2 is 2x^2+6x y+y^2=0 and that of the lines m_1a n dm_2 is 4x^2+18 x y+y^2=0 . If the angle between l_1 and m_2 is alpha then the angle between l_2a n dm_1 will be