What is the angle between ?
(i) `bar(AB) and bar(AC)`
(ii) `bar(AB ) and bar(BC)`

If theta is the angle between unit vectors bar(A) and bar(B) then (1-bar(A).bar(B))/(1+bar(A)*bar(B)) is equal to

If bar(a) is a perpendicular to bar(b) and bar(c), |bar(a)|=2, |bar(b)|=3, |bar(c)|=4 and the angle between bar(b) and bar(c) is (2pi)/(3) then |[bar(a) bar(b) bar(c)]| =

bar(a)=2bar(i)+bar(j)-2bar(k) and bar(b)=bar(i)+bar(j) if bar(c) is a vector such that bar(a)*bar(c)=|bar(c)|,|bar(c)-bar(a)|=2sqrt(2) and and the angle between bar(a)xxbar(b) and bar(c) is 30^(@), then |(bar(a)xxbar(b))xxbar(c)|=

The value of a for which the angle between bar(a)=2a^(2)bar(i)+4abar(j)+bar(k) and bar(b)=7bar(i)-2bar(j)+abar(k) is obtuse and the angle between bar(b) and z-axis is acute and less than (pi)/(6) is

In the figure 11.34, ABCD is a quadrilateral in which bar(AB) = bar(AD) and bar(BC) =bar(DC). Diagonals bar(AC) and BD intersect each other at O.Show that-

ABCDE is a regular hexagon. i) If bar(AB) + bar(AE)+ bar(BC) + bar(DC) + bar(ED) + bar(AC)=lambdabar(AC) then lambda=

If ABCDE is a pentagon, then bar(AB) + bar(AE) + bar(BC) + bar(DC) + bar(ED) =

If ABCDEF is a regular hexagon , then bar(AB) + bar(AC) + bar(AE) + bar(AF) =

ABC is an equilateral triangle. P and Q are two points on bar(AB) and bar(AC) respectively such that bar(PQ) || bar(BC) . If bar(PQ) = 5cm , then area of Delta APQ is :