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_(1) and L_(2) is 2x^(2)+6xy+y^(2)=0 and that lines L_(3) and L_(4) is 4x^(2)+18xy+y^(2)=0 . If the angle between L_(1) and L_(4) be alpha , then the angle between L_(2) and L_(3) will be

Statement I . The combined equation of l_1,l_2 is 3x^2+6xy+2y^2=0 and that of m_1,m_2 is 5x^2+18xy+2y^2=0 . If angle between l_1,m_2 is theta , then angle between l_2,m_1 is theta . Statement II . If the pairs of lines l_1l_2=0,m_1 m_2=0 are equally inclinded that angle between l_1 and m_2 = angle between l_2 and m_1 .

Let cos^-1(x/a)+cos^-1(y/b)=alpha Given equation represents and ellipse if (A) alpha=0 (B) alpha=pi/4 (C) alpha=pi/2 (D) alpha=pi

If the lines L_1a n dL_2 are tangents to 4x^2-4x-24 y+49=0 and are normals for x^2+y^2=72 , then find the slopes of L_1 and L_2dot

If the lines L_1 and L_2 are tangents to 4x^2-4x-24 y+49=0 and are normals for x^2+y^2=72 , then find the slopes of L_1 and L_2dot

The direction cosines of the lines bisecting the angle between the line whose direction cosines are l_1, m_1, n_1 and l_2, m_2, n_2 and the angle between these lines is theta , are

The condition that the line x cos alpha + y sin alpha =p to be a tangent to the hyperbola x^(2)//a^(2) -y^(2)//b^(2) =1 is

If the line |y| = x -alpha , such that alpha > 0 does not meet the circle x^2 + y^2 - 10x + 21 = 0 , then alpha belongs to

Let the equation of a line through (3, 6, -2) and parallel to the planes x-y+2z=5 and 3x+y+2z=6 is L=0 . If point (alpha,beta, 2) satisfy L=0 , then alpha+2beta is equal to

Find the equation of the straight line through the point (alpha,beta) and perpendiculasr to the line l x+m y+n=0.