Two pillars are placed vertically 8 feet apart. The height difference of the two pillars is 6 feet. The two ends of a rope of length 15 feet are tied to the tips of the two pillars. The portion of the length of the taller pillar that can be brought in contact with the rope without detaching the rope from the pillars is
Answers
Answer:
5 ft
Step-by-step explanation:
Two pillars are placed vertically 8 feet apart. The height difference of the two pillars is 6 feet. The two ends of a rope of length 15 feet are tied to the tips of the two pillars. The portion of the length of the taller pillar that can be brought in contact with the rope without detaching the rope from the pillars is
Horizontal Distance between Pillars = 8 feet
Vertical Distance between tip of Towers = 6 feet
Distance between Pillar = √8² + 6² = √64 + 36 = √100 = 10 feet
Rope Length = 15 ft
Extra Rope = 15 - 10 = 5 feet
The portion of the length of the taller pillar that can be brought in contact with the rope without detaching the rope from the pillars is 5 ft
Answer:
hey your answer is 5
hope it helps you
