Subcontests
(5)Maximum for m when 3 conditions are satisfied
Let n be a fixed positive odd integer. Take m+2 distinct points P0,P1,…,Pm+1 (where m is a non-negative integer) on the coordinate plane in such a way that the following three conditions are satisfied:
1) P0=(0,1),Pm+1=(n+1,n), and for each integer i,1≤i≤m, both x- and y- coordinates of Pi are integers lying in between 1 and n (1 and n inclusive).
2) For each integer i,0≤i≤m, PiPi+1 is parallel to the x-axis if i is even, and is parallel to the y-axis if i is odd.
3) For each pair i,j with 0≤i<j≤m, line segments PiPi+1 and PjPj+1 share at most 1 point.
Determine the maximum possible value that m can take. The max min of angles A_iA_jA_k for 5 points in a plane
Five points A1,A2,A3,A4,A5 lie on a plane in such a way that no three among them lie on a same straight line. Determine the maximum possible value that the minimum value for the angles ∠AiAjAk can take where i,j,k are distinct integers between 1 and 5. Three numbers cannot be squares simultaneously
Let a,b,c be positive integers. Prove that it is impossible to have all of the three numbers a2+b+c,b2+c+a,c2+a+b to be perfect squares.