- #1
jakncoke1
- 48
- 1
Lets take a crack at em.
Prob A1: Let $d_1,...,d_{12}$ be 12 real numbers in the interval (1,12), show that there exists indicides $i,j,k$, such that $d_i,d_j,d_k$ are side lengths of an acute triangle.
Prob A1: Let $d_1,...,d_{12}$ be 12 real numbers in the interval (1,12), show that there exists indicides $i,j,k$, such that $d_i,d_j,d_k$ are side lengths of an acute triangle.