A Utah man drives a wagon 30 feet across the flats. He yells "Gee ho!" and then drives the wagon 30 feet. He yells "Haw!" and then drives the wagon 10 feet. He yells "Whoa!" How far is the man from where he started?
He is back where he started (or at least could be) If he drove 30ft one way then turned back at a slight angle, forming an isoscoles triangle , then the remaining 10 ft could be the "base" part , returning him to the start. Sorry I'm no good at geometry or math or I'd be able to provide the angles.
Your all wrong. He drives out 30, turns right traveling another 30, and then left another 10. He's a Utah man, so american terms. Western horse breeding, Gee ho means right, not turn about. Now just do a few line movements to follow the Pythagorean theorum, you have 30 squared + 40 squared = "C" squared. Figure it out from there.
I've looked up "Gee ho" which means to turn right. "Haw" does not mean to turn left, but to turn back around (180 degrees), like turning a team of oxen around. "Whoa", we know means to stop. So you have 3 sides of the triangle. Side A is 30 feet, Side B is 20 feet (the distance of 30 feet and then "haw" turned back around for 10 feet). Side C is the missing side, so that should come out to be 36 feet away from the starting point.