Let O be the origin and let PQR be an ar...

Let O be the origin and let PQR be an arbitrary triangle. The point S is such that `bar(OP)bar(OQ)+bar(OR)bar(OS)=bar(OR)bar(OP)+bar(OQ)bar(OS)=bar(OQ)bar(OR)+bar(OP)bar(OS)` Then the triangle PQR has S as its

Similar Questions

Explore conceptually related problems

If bar(OP)=2bar(i)+3bar(j)-bar(k), bar(OQ)=3bar(i)-4bar(j)+2bar(k) then d.c's of bar(PQ) are

The point of intersection of the lines bar(r)=bar(a)+t(bar(b)+bar(c)), bar(r)=bar(b)+s(bar(c)+bar(a)) is

The reciprocal of bar(a) where bar(a)=-bar(i)+bar(j)+bar(k),bar(b)=bar(i)-bar(j)+bar(k),bar(c)=bar(i)+bar(j)+bar(k) is

If bar(a) = bar(i) + 2bar(j) + 3bar(k), bar(b) = 3bar(i) +5bar(j) -bar(k) are 2 sides of a triangle, find its area.

DeltaABC be an equilateral triangle whose orthocentre is the origin 'O'. If bar(OA)=bar(a), bar(OB)=bar(b)" then "bar(OC) is

ABC is an equilateral triangle of side ‘a'. Then bar(AB).bar(BC) +bar(BC).bar(CA)+ bar(CA).bar(AB) =

Let G be the centroid of a triangle ABC and O be any other point, then bar(OA)+bar(OB)+bar(OC) is equal to

If bar(a) = bar(i) + 2bar(j)-3bar(k), bar(b) = 3bar(i)-bar(j)+2bar(k) then S.T bar(a)+bar(b), bar(a)-bar(b) are perpendicular.