Imagine you are in a city that has a grid of streets with perfectly square blocks and that the only way to get from one intersection to another is to follow the block system. How many blocks will you have to walk (or pay the cabdriver for) if you want to get from the intersection of 10th Ave and 25th Street to the intersection of 6th Ave and 28th Street? If you had a jet pack and could fly over the buildings, how many blocks in length would the shortest path be? How does this compare to #1? (Hint: Pythagorean Theorem)
Imagine you are in a city that has a grid of streets with perfectly square blocks and that the only way to get from one intersection to another is to follow the block system. How many blocks will you have to walk (or pay the cabdriver for) if you want to get from the intersection of 10th Ave and 25th Street to the intersection of 6th Ave and 28th Street? If you had a jet pack and could fly over the buildings, how many blocks in length would the shortest path be? How does this compare to #1? (Hint: Pythagorean Theorem)
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Imagine you are in a city that has a grid of streets with perfectly square blocks and that the only way to get from one intersection to another is to follow the block system.
How many blocks will you have to walk (or pay the cabdriver for) if you want to get from the intersection of 10th Ave and 25th Street to the intersection of 6th Ave and 28th Street? If you had a jet pack and could fly over the buildings, how many blocks in length would the shortest path be? How does this compare to #1? (Hint: Pythagorean Theorem)
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