The resultant of `bar(u) and bar(v)` is perpendicular to `bar(u)` and has a magnitude equal to half of the magnitude of `bar(v)`. The angle between `bar(u) " & " bar(v)` is

The resultant of the three vectors bar(OA), bar(OB) and bar(OC) has magnitude (R = Radius of the circle)

If |bar(a)| = 2, |bar(b)| = 3, |bar(c )| = 4 and each of bar(a), bar(b) , bar(c ) is perpendicular to the sum of the other two vectors, then find the magnitude of bar(a) + bar(b) + bar(c ) .

Let bar(a)= bar(i) + 2bar(j) + 3bar(k), bar(b)= - bar(i) + 2bar(j) + 3bar(k), bar( c)= 3 bar(i) + bar(j) and bar(d) is a non-zero vector perpendicular to both bar(a) and bar(b) . If the angle between bar(c ) and bar(d) is theta , then find cos theta .

If bar(a) = 6bar(i) + 2bar(j) + 3bar(k) and bar(b) = 2bar(i) - 9bar(j) + 6bar(k) , then find bar(a).bar(b) amd the angle between bar(a) and bar(b) .

In /_\ABC, bar(AD) is a perpendicular to bar(BC) .S.T ii) bar(AC) gt bar(CD) ,

If bar(a) , bar(b) and bar(a)-sqrt2bar(b) are unit vectors, then what is the angle between bar(a), bar(b) ?

Find a vector in the direction of vector bar(a) = bar(i) - 2bar(j) has magnitude 7 units.

A non-zero vector bar(a) , is parallel to the line of intersection of the plane determined by the vectors bar(i), bar(i) + bar(j) and the plane determined by the vectors bar(i)- bar(j), bar(i) + bar(k) Find the angle between bar(a) and the vector bar(i)- 2bar(j) + 2bar(k)

In the given figure bar(PQ) is a line. Ray bar(OR) is perpendicular to line bar(PQ) . bar(OS) is another ray lying between rays bar(OP) and bar(OR) . Prove that angleROS = (1)/(2) angleQOS − anglePOS