In a special triangle formed by connecting points (A), (B), and (C) on a circle, each side is an integer length. The triangle has a perimeter of 25 units. If a red bead is placed at each vertex and a blue bead is placed at the midpoint of each side, find the probability that a randomly chosIn a special triangle formed by connecting points (A), (B), and (C) on a circle, each side is an integer length. The triangle has a perimeter of 25 units. If a red bead is placed at each vertex and a blue bead is placed at the midpoint of each side, find the probability that a randomly chosen set of three beads forms a triangle, assuming the triangle formed by the beads must have positive area.en set of three beads forms a triangle, assuming the triangle formed by the beads must have positive area.