Diffrential calculus; distance problem

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jnimagine
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Homework Statement


Two cars approach an intersection at the same time. The red car is 300m east of the intersection and traveling at a speed of 60km/h. The blue car is 450m north of the intersection and traveling at a speed of 75km/h. When are the two cars the closest?


Homework Equations


c^2 = a^2 + b^2


The Attempt at a Solution



I converted the speeds into m/s first then used it in a pythagorean theorem equation and found the derivative.
75km/h = 20.8m/s 60km/h = 16.7m/s
c^2 = (20.8t - 450)^2 + (16.7t - 300)^2
and when i do the derivative i get 20.2. But I was just wondering, does it make a difference whether i do 20.8t - 450 or 450 - 20.8t??
 
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Here it doesn't matter because of the squares. 20.8t- 450 is the negative of 450- 20.8t but squaring removes the difference.

But you get "20.2" for what? This problem asks when the two cars will be closest. That requires a time answer. If you mean "The two cars will be closest 20.2 seconds after the starting time (when they are at the given positions)", you must include the "seconds".