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To deal with this item, let us summarize the details of the problem:
(a) Syllabus area: Vectors
(b) Specific topic: Addition/Subtraction of Vectors, Position Vectors, Naming a Vector in Terms of other Two Vectors
(c) Concepts Needed: Triangle Law for Addition/Subtraction of Vectors
To answer (ii), let us recall the concept of position vectors. Position vectors will always start with a reference point, usually point O (or origin), and end at a specific point other than O.
In this item, we are looking for the position vector of E. We will then connect O to E to form vector OE. Therefore, position vector of point E is the vector OE.
The first way of writing it in terms of a and b is to start with vector a. From O, go up to A until it reaches a point that it is horizontally aligned with E. It must be horizontally aligned so that the connecting vector will be parallel to vector b (vector OB). After that, go horizontal and parallel to vector b until you reach point E. This is shown in the figure below.
The second way is to start with vector b. From O, go to B until it reaches a point that is diagonally aligned with point E. It must be diagonally aligned so that the connecting vector later will be parallel to vector a (vector OA). This is shown in the figure below.
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Thank you and God bless!
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