`ABCDEF` is a regular hexagon, with centre `O`.
`vec(OA) = ul(a)` and `vec(OB) = ul(b)`.
The point `P` is such that `vec(AP) = ul(b) − 2ul(a)`.
State a geometrical relationship between `AB` and `OP`.
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`ABCDEF` is a regular hexagon, with centre `O`.
`vec(OA) = ul(a)` and `vec(OB) = ul(b)`.
The point `P` is such that `vec(AP) = ul(b) − 2ul(a)`.
State a geometrical relationship between `AB` and `OP`.
You did not answer this question.