How Do You Solve Vector Problems in Triangle Geometry?

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The discussion focuses on solving vector problems related to triangle geometry, specifically in triangle OAB with given vectors OA and OB. Participants seek clarification on how to express segments BP and OP in terms of vectors a and b, with the answers being BP = (1/3)(a - b) and OP = (1/3)(a + 2b). Additionally, they aim to prove that AQ = -0.5a + b and determine the value of k in BQ = kOA, which is found to be k = 0.5. Visualizing the triangle and the points P and Q helps in understanding the relationships between the vectors. Overall, the discussion emphasizes the importance of vector representation and geometric interpretation in solving these problems.
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Vector Gah!

Vector questions. Need help on these three.

In ∆OAB, OA = a and OB = b. P is a point on AB such that BP:PA 1:2.
Q is a point on the extension of OP such that OQ = 1.5OP

a) Express BP and OP in terms of ‘a’ and ‘b’.
these are the answers but how do they get it?
BP = (1/3)(a - b)
OP = (1/3)(a + 2b)

b) Show that AQ = -0.5a + b
i have no idea how to prove this


c) Given that BQ = kOA, find the value of k.
once again this is the answer but i don't know how to approach this can someone show me how to get this value thanks
k = 0.5
 
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Draw the vector that define the triangle. One side is made by the vector a, the other by b and the third by a-b. Then draw the points P and Q. From the drawing you can see that BP is one third the vector (a-b). The others are done similarly.
 

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