I have an idea.
Each day or so, I'll post up a Number Theory problem (similar to seanieg89's question), a Geometry (including Analytic Geometry) problem, and an Algebra problem every day or so depending on if I have time.
This way you can answer which ever question you want to based on your strengths.
ie: My strength would be Series & Analysis-type questions whereas somebody else may have strengths in geometry.
Furthermore since many people here have little exposure to Elementary Number Theory (due to it not being in the HSC course), they may be more difficult to solve and I don't want this thread to die the moment a Number Theory question is added.
Whilst barbernator does seanieg89's question (I'm sure you'll get it, you are an intelligent student), here are my next set of problems, a little easier this time:
Number Theory:
Prove that the product of 4 consecutive integers is always one less than a perfect square.
Geometry:
The sides of a triangle (in the Euclidean Plane) are 6, 8 and x.
Find the range of
x such that the triangle is acute.
Algebra:
A Triangle Number is defined by the following expression (for more reading, go here
http://en.wikipedia.org/wiki/Triangular_number)
}{2})
Prove WITHOUT INDUCTION that:
^k (n-k)^2 )
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Also, I think it's best that we let the HSC students try the questions. After all, this is for their benefit in terms of developing problem solving skills!
But if you are an Undergrad/Postgrad and you have a truly marvelous proof (something a HSC student wouldn't know) that is otherwise too large to fit in the margin of your copy of
Arithmetica, then by all means post it here!
. This question is reasonably difficult.
