(See Solution) At Noon ship A is at point P exactly 50 miles west of ship B. Ship A is moving south and its distance (in miles) from point P is given as
Question: At Noon ship A is at point P exactly 50 miles west of ship B. Ship A is moving south and its distance (in miles) from point P is given as a function of time (in hours since noon)
as:
\[A\left( t \right)=\frac{30}{\ln \left( 2 \right)}\left( 1-{{2}^{-t}} \right)\]Ship B is moving north at a constant 20 mph. At what time is the distance between the ships increasing at the greatest rate?
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