Maths Olympiad Exam

Let ABC be an acute-angled triangle, and let D, E, F be points on BC, CA, AB respectively such that AD is the median, BE is the internal angle bisector and CF is the altitude. Suppose FDE = C, DEF = A and EFD = B. Prove that ABC is equilateral.

Read Solution (Total 0)

Maths Olympiad Other Question
Let f : Z ! Z be a function satisfying f(0) = 0, f(1) = 0 and
(i) f(xy) + f(x)f(y) = f(x) + f(y);
(ii)f(x y) − f(0)

f(x)f(y) = 0,
for all x, y 2 Z, simultaneously.
(a) Find the set of all possible values of the function f.
(b) If f(10) 6= 0 and f(2) = 0, find the set of all integers n such that
f(n) 6= 0 Let ABC be a triangle. An interior point P of ABC is said to be good if we can find exactly 27 rays emanating from P intersecting the sides of the triangle ABC such that the triangle is divided by these rays into 27 smaller triangles of equal area. Determine the number of good points for a given triangle ABC.