Consider `Delta ABC and Delta A_(1)B_(1)C_(1)` in such a way that `vec(AB) = vec(A_(1)B_(1)) and M, N,M_(1),N_(1)` be the mid-points of AB, BC, `A_(1)B_(1) and B_(1)C_(1)` respectively. Then,

Consider triangleABC and triangleA_1B_1C_1 in such a way that bar(AB)=bar(A_1B_1) and M, N, M_1 ,N_1 be the midpoints of AB, BC, A_1B_1 and B_1C_1 respectively, then

Given a cube ABCD A_(1)B_(1)C_(1)D_(1) which lower base ABCD, upper base A_(1)B_(1)C_(1)D_(1) and the lateral edges "AA"_(1), "BB"_(1),"CC"_(1) and "DD"_(1) M and M_(1) are the centres of the forces ABCD and A_(1)B_(1)C_(1)D_(1) respectively. O is a point on the line MM_(2) such that bar(OA) + bar(OB), bar(OC) + bar(OD) = bar(OM) , then bar(OM)=lambda(OM_(1)) is equal to

Let the incircle of DeltaABC touches the sides BC, CA, AB at A_(1), B_(1),C_(1) respectively. The incircle of DeltaA_(1)B_(1)C_(1) touches its sides of B_(1)C_(1), C_(1)A_(1) and A_(1)B_(1)" at " A_(2), B_(2), C_(2) respectively and so on. Q. lim_(n to oo) angleA_(n)=

Let the incircle of DeltaABC touches the sides BC, CA, AB at A_(1), B_(1),C_(1) respectively. The incircle of DeltaA_(1)B_(1)C_(1) touches its sides of B_(1)C_(1), C_(1)A_(1) and A_(1)B_(1)" at " A_(2), B_(2), C_(2) respectively and so on. Q. In DeltaA_(4)B_(4)C_(4) , the value of angleA_(4) is:

The circle inscribed in the triangle ABC touches the side BC, CA and AB in the point A_(1)B_(1) and C_(1) respectively. Similarly the circle inscribed in the Delta A_(1) B_(1) C_(1) touches the sieds in A_(2), B_(2), C_(2) respectively and so on. If A_(n) B_(n) C_(n) be the nth Delta so formed, prove that its angle are pi/3-(2)^-n(A-(pi)/(3)), pi/3-(2)^-n(B-(pi)/(3)),pi/3-(2)^-n(C-(pi)/(3)). Hence prove that the triangle so formed is ultimately equilateral.

Let A = {a_(1), b_(1), c_(1)} and B = {a_(2), b_(2)} (i) A xx B (ii) B xx B

Consider A=[(a_(11),a_(12)),(a_(21),a_(22))] and B=[(1,1),(2,1)] such that AB=BA. then the value of (a_(12))/(a_(21))+(a_(11))/(a_(22)) is

Let the area of a given triangle ABC be Delta . Points A_1, B_1, and C_1 , are the mid points of the sides BC,CA and AB respectively. Point A_2 is the mid point of CA_1 . Lines C_1A_1 and A A_2 meet the median BB_1 points E and D respectively. If Delta_1 be the area of the quadrilateral A_1A_2DE , using vectors or otherwise find the value of Delta_1/Delta

Let A = {a_(1), b_(1), c_(1)} , B = {r, t}. Find the number of relations from A to B.

Let A (a,b) be a fixed point and O be the origin of coordionates. If A_(1) is the mid-point of OA, A_(2) is the mid- poind of A A_(1),A_(3) is the mid-point of A A_(2) and so on. Then the coordinates of A_(n) are