- #1
ehjay01
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Hey I've got a vector proof question that i can't get. Sorry i can't provide a diagram but hopefully you can see where i went wrong.
For triange PQR with with X dividing vector PR in the ratio of 2:3, Y the midpoint of vector PQ and Z the pint of intersection of QX and RY prove that Z divides RY in the ratio 3:1
first i said that vector RZ was a scalar multiple of vector RY.
RZ=sRY
and my second equation was RZ=tRQ + (1-t)RX
first i got both equations in terms of sides of the triange.
RZ=s(RQ+1/2QP),
and RZ=tRQ +(1-t)3/5(RP)
RZ=tRQ+3/5(1-t)(RQ+QP)
then i set the two equations equal to each other and attempted to solve for s and t. I ended up getting s=6/5 and t=2/3. Any help?
Homework Statement
For triange PQR with with X dividing vector PR in the ratio of 2:3, Y the midpoint of vector PQ and Z the pint of intersection of QX and RY prove that Z divides RY in the ratio 3:1
Homework Equations
first i said that vector RZ was a scalar multiple of vector RY.
RZ=sRY
and my second equation was RZ=tRQ + (1-t)RX
The Attempt at a Solution
first i got both equations in terms of sides of the triange.
RZ=s(RQ+1/2QP),
and RZ=tRQ +(1-t)3/5(RP)
RZ=tRQ+3/5(1-t)(RQ+QP)
then i set the two equations equal to each other and attempted to solve for s and t. I ended up getting s=6/5 and t=2/3. Any help?
