If `veca, vecb` and `vecc` are position vectors of A,B, and C respectively of `DeltaABC` and `if|veca-vecb|,|vecb-vec(c)|=2, |vecc-veca|=3`, then the distance between the centroid and incenter of `triangleABC` is

If veca, vecb and vecc are unit coplanar vectors, then the scalar triple product : [2veca-vecb, vec2b-vecc,vec2c-veca]=

If 2veca*vecb = |veca| * |vecb| then the angle between veca & vecb is

If |veca+ vecb| lt | veca- vecb| , then the angle between veca and vecb can lie in the interval

A, B, C and D have position vectors veca, vecb, vecc and vecd , repectively, such that veca-vecb = 2(vecd-vecc) . Then

[veca+2vecb-vecc,veca-vecb,veca-vecb-vecc]=

[veca+2vecb-vecc,veca-vecb,veca-vecb-vecc] =

If veca and vecb are position vectors of A and B respectively, then the position vector of a point C in AB produced such ahat vec(AC) = vec(3AB) is :

If veca,vecb and vecc are unit vectors such that veca+vecb+vecc=vec0 then angle between veca and vecb is

Let veca, vecb, and vecc be three non-zero vectors such that no two of them are colinear and (veca xx vecb) xx vecc=1/3 |vecb||vecc|veca. If theta is the angle between the vectors vecb and vecc, then a value of sin theta is :