MNPQ is a parallelogram and
R
is the intersection point of the diagonals MP and NQ. Let
vec(u)=vec(MQ)
and
vec(v)=vec(MN)
. Match the following expressions to their equivalents in terms of
vec(u)
and
vec(v)
. i.
,vec(PN)+vec(PQ)
vec(MR)+vec(RN)+vec(QP)
ii.
,vec(MR)+vec(RN)+vec(QP)
Match the vector coordinates to each Cartesian vector Match the vector coordinates to each Cartecian vector a.
-vec(u)
b.
2vec(∼)
c.
vec(v)
d.
vec(u)
e.
vec(u)-vec(v)
f.
vec(u)+vec(v)
g.
-vec(v)
h.
-vec(u)-vec(v)
i.
vec(0)
j.
2vec(v)