For `A=[{:(4,2i),(i,1):}],(A-2l)(A-3l)` is a

Let l_(i),m_(i),n_(i);i=1,2,3 be the direction cosines of three mutually perpendicular vectors in space.Show that AA=I_(3) where A=[[l_(2),m_(2),n_(2)l_(3),m_(3),n_(3)]]

Statement I: If a=2hati+hatk,b=3hatj+4hatk and c=lamda a+mub are coplanar, then c=4a-b . Statement II: A set vector a_(1),a_(2),a_(3), . . ,a_(n) is said to be linearly independent, if every relation of the form l_(1)a_(1)+l_(2)a_(2)+l_(3)a_(3)+ . . .+l_(n)a_(n)=0 implies that l_(1)=l_(2)=l_(3)= . . .=l_(n)=0 (scalar).

Let L be the set of all straight lines in plane. l_(1) and l_(2) are two lines in the set. R_(1), R_(2) and R_(3) are defined relations. (i) l_(1)R_(1)l_(2) : l_(1) is parallel to l_(2) (ii) l_(1)R_(2)l_(2) : l_(1) is perpendicular to l_(2) (iii) l_(1) R_(3)l_(2) : l_(1) intersects l_(2) Then which of the following is true ?

A=[{:(l_(1),m_(1),n_(1)),(l_(2),m_(2),n_(2)),(l_(3),m_(3),n_(3)):}] and B=[{:(p_(1),q_(1),r_(1)),(p_(2),q_(2),r_(2)),(p_(3),q_(3),r_(3)):}] Where p_(i), q_(i),r_(i) are the co-factors of the elements l_(i), m_(i), n_(i) for i=1,2,3 . If (l_(1),m_(1),n_(1)),(l_(2),m_(2),n_(2)) and (l_(3),m_(3),n_(3)) are the direction cosines of three mutually perpendicular lines then (p_(1),q_(1), r_(1)),(p_(2),q_(2),r_(2)) and (p_(3),q_(),r_(3)) are

Graph of a function y=f(x) is shown in the adjacent figure.Four limits l_(1),l_(2),l_(3) and I_(4), are given as:

Consider the lines given by L_(1):x+3y-5=0," "L_(2):3x-ky-1=0" "L_(3):5x+2y-12=0 {:(,"Column-I",,"Column-II"),((A),","L_(1)","L_(2)","L_(3)" are concurrent, if",(p),k=-9),((B)," One of "L_(1)","L_(2)","L_(3)" is parallel to at least one of the other two, if",(q),k=-6/5),((C),L_(1)","L_(2)","L_(3)" from a triangle, if",(r),k=5/6),((D),L_(1)","L_(2)","L_(3)" do not from a triangle, if",(s),k=5):}

If points (h,k) (1,2) and (-3, 4) lie on line L_(1) and points (h,k) and (4,3) lie on L_(2). If L_(2) is perpendicular to L_(1), then value of (h)/(k) is

Show that the matris [[l_(1),m_(1),n_(1)],[l_(2),m_(2),n_(2)],[l_(3),m_(3),n_(3)]] is orthogonal, if l_(1)^(2) + m_(1)^(2) + n_(1)^(2) = Sigmal_(1)^(2) = 1 = Sigma l_(2)^(2) = Sigma_(3) ^(2) and l_(1) l_(2) + m_(1)m_(2) + n_(1) n_(2) = Sigma l_(1)l_(2) =0 = Sigma l_(2)l_(3) = Sigma l_(3) l_(1).

Given P_n and Q_n, are the square matrices of order 3 such that, P_n=[a_(ij)],Q_n=[b_(ij)] where a_(ij)=(3i+j)/(4^2n),b_(ij)=(3i-j)/2^(2n) for all 'i' and 'j' 1 leq i.j leq 3 .If L_1=lim_(x->oo) T_r(4P_i+4^2P_2+4^3P_3+...........+4^nP_n) and L_2=lim_9n->oo) T_r (2Q_1+2^2Q_2+2^3Q_3+..........+2^nQ_n, then the value of (L_1 + L_2) is ( where T_r (A) denotes the trace of matrix A.)