If a car is climbing a hill, how many horizontal feet will the car travel every 500 feet of road if the car gains 71 feet of vertical feet? 275 485 495

When a car climbs a hill, we can think of the road and the height gained as forming a right triangle. The road length (500 feet) serves as the hypotenuse, the vertical height gained (71 feet) is one leg, and the horizontal distance traveled is the other leg. Using the Pythagorean theorem, we have: Horizontal distance² = Hypotenuse² - Vertical distance² So, horizontal distance² = 500² - 71² = 250000 - 5041 = 244959. Taking the square root gives us the horizontal distance of approximately 494.95 feet. Rounding this to the nearest whole number, the answer is 495 feet! The horizontal distance gives you insight into how much ground the car is covering in a straight line, making it crucial for understanding various driving scenarios. Whether you're a mountain driver or a delivery truck traversing hilly terrains, these numbers help plan routes effectively and estimate travel times!