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    Topics || Problems

    A jet fighter travels 2000 miles in 3.5 hours with the tail wind. The return trip, into the wind takes 4 hours. Find the wind speed and the jet speed.

    Solution:

    Let x be the velocity of the wind

    \( v= \frac{d}{t}\)

    \( v_{total} = v_{jet} + v_{wind}\) : With the wind

    \( v_{total} = v_{jet} - v_{ wind }\) : Against the wind

    \( \frac{2000}{3.5} = v_{jet} + v_{ wind }\) : With the wind (1)

    \( \frac{2000}{4} = v_{jet} - v_{ wind }\) : Against the wind (2)

    Add the two equations (1 and 2)

    \(\frac{7500}{7} = 2v_{jet}\)

    Thus, the velocity of the jet is 535.71 mph

    And the velocity of the wind is \(v_{wind} = \frac{2000}{4} - 535.71 = 35.71 mph\)