If `M_1` and `M_2` are complementary subspaces of a linear space L the the mapping f which assigns to each vector y in `M_2` the coset `M_1+y` is between `M_2` and `L/M_1`

One end of a thin uniform rod of length L and mass M_(1) is rivetted to the center of a uniform circular disc of radius r and mass M_(2) so that both are coplanar. The center of mass of the combination from the center of the disc is (Assume that the point of attachment is at the origin) 1) L ( M_(1) + M_(2) ) // 2 M_(1) 2) L M_(1) // 2 ( M_(1) + M_(2) ) 3) 2 ( M_(1) + M_(2) ) // L M_(1) 4) 2 L M_(1) // ( M_(1) + M_(2) )

The straight lines L=x+y+1=0 and L_(1)=x+2y+3=0 are intersecting 'm 'me slope of the straight line L_(2) such that L is the bisector of the angle between L_(1) and L_(2). The value of m^(2) is

An object O is placed in front of a small plane mirror M_(1) and a large convex mirror M_(2) of focal length f . The distance between O and M_(1) is x, and the distance between M_(1) and M_(2) is y. The images of O forned by M_(1) and M_(2) coincide. The magnitude of f is

If l_(1),m_(1),n_(1) and l_(2),m_(2),n_(2) are the directional cosines of two vectors and theta is the angle between them, then their value of cos theta is

the acute angle between two lines such that the direction cosines 1,m,n of each of them satisfy the equations l+m+n=0 and l^(2)+m^(2)-n^(2)=0 is

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 .

If matrix A=[[1,2,3], [4,1,2], [1,-1,2]] B= [[2,1,3], [4,1,-1], [2,2,3]] C= [[14], [12], [2]] D= [[13], [11], [14]]. When X= [[x], [y],[z]] is such that solutions of equations AX=C and BX=D represents two points L and M in three dimensional space. If l' and M' are the reflection of points L and M in the plane x+y+z=9 then find values of L,M,L' and M'

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

A B C is a right-angled triangle in which /_B=90^0 and B C=adot If n points L_1, L_2, ,L_nonA B is divided in n+1 equal parts and L_1M_1, L_2M_2, ,L_n M_n are line segments parallel to B Ca n dM_1, M_2, ,M_n are on A C , then the sum of the lengths of L_1M_1, L_2M_2, ,L_n M_n is (a(n+1))/2 b. (a(n-1))/2 c. (a n)/2 d. none of these