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Trigonometry question
Two cars A and B are parked back to back in the desert, one facing East, the other West.
Car A sets off and drives 5 Km in a straight line West, makes a 90° turn left and drives for a further 4 Km before making another 90° right turn and stops after driving a further 3 Km.
Meanwhile, car B drives 7Km East, makes a 90° right turn and drives 2 Km before making a 90° left turn and driving a further 1 Km.
As the crow flies, how far apart are cars A and B?
Car A sets off and drives 5 Km in a straight line West, makes a 90° turn left and drives for a further 4 Km before making another 90° right turn and stops after driving a further 3 Km.
Meanwhile, car B drives 7Km East, makes a 90° right turn and drives 2 Km before making a 90° left turn and driving a further 1 Km.
As the crow flies, how far apart are cars A and B?
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I've had another look at this and think that if you add the East West directions and both cars drive south you can draw a diagram that lets you draw a line between car A's 1st turn and car B's 2nd turn giving a hypotenuse that forms an isosceles (both being equal) to the distance between them.
So I think it's 16.12Km?
So I think it's 16.12Km?
Interesting how if you walked in the right direction along the hypotenuse you would only need to walk 120m more than the east - west distance of 16km to get there. But if you went due east or west for 16km you would then have 2 km more to go north or south.
I think this explains why it takes me so much longer to get back from the pub than to go there...
I think this explains why it takes me so much longer to get back from the pub than to go there...
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