Over the last 40 years or so, geometry has not received as much attention as they used to. Many questions on complex numbers are better approached by geometry (easier, shorter, visually-clearer, neater solutions). So if you want to do well in complex numbers, make sure you have a good foundation in elementary high school geometry: properties of parallel lines, parallelograms, rhombuses, squares, isosceles triangles, congruent triangles, similar triangles, circle geometry(learn this yourself if necessary), etc, etc.
Geometry is where we first learn about logical deduction: how to prove a proposition, each step with supporting reasons. Elementary geometry is deceptively simple; but I suspect more than half of the students in Yr 6, 7 . . . 10 often miss the deeper and/or subtler implications.
I notice many students have difficulty with proofs in complex numbers, because they are not strong in their geometry.
Geometry is where we first learn about logical deduction: how to prove a proposition, each step with supporting reasons. Elementary geometry is deceptively simple; but I suspect more than half of the students in Yr 6, 7 . . . 10 often miss the deeper and/or subtler implications.
I notice many students have difficulty with proofs in complex numbers, because they are not strong in their geometry.
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