Question 1144801
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Let x be Fred's normal walking speed, in feet per second (the value under the question.


Then   Fred' speed moving with walkway is  (x+ 4.4) ft/s, 

while  Fred' speed moving with against walkway is  (x- 4.4) ft/s.


The time moving 110 ft with walkway is {{{110/(x+4.4)}}} seconds,

while the time moving 110 ft against walkway is {{{110/(x-4.4)}}} seconds.


The total two-ways time moving forward and back is 


    {{{110/(x+4.4)}}} + {{{110/(x-4.4)}}} = 50  seconds.


It is your time equation.  All its terms are time periods.


To solve it, multiply both sides by  (x-4.4)*(x+4.4) = {{{x^2 - 4.4^2}}} = {{{x^2 - 19.36}}}.  You will get then


    110*(x + 4.4) + 110*(x - 4.4) = 50*(x^2 - 19.36).

    220x                = 50x^2 - 968

    50x^2 - 220x - 968 = 0

     {{{x[1,2]}}} = {{{(220 +- sqrt(220^2 - 4*50*(-968)))/(2*50)}}} = {{{(220 +- 492)/100}}}.


Only positive root  x = {{{(220 + 492)/100}}} is meaningful, which gives you the


<U>ANSWER</U>.  Fred's normal walking speed is about 7.12 ft/s, according to the given data.


<U>CHECK</U>.  {{{110/(7.12 + 4.4)}}} + {{{110/(7.12-4.4)}}} = 50 seconds (approximately).


<U>My comment</U>.  My solution and my answer are correct - it was CHECKED.

             But the answer of 7.12 ft/s does not seem to be likelihood,

             which means that the input data in the post are not realistic.
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