SOLUTION: a rectangular field is to be divided up into 3 equal sections, enclosed by 160m of fencing. the field is beside a barn, and the fencing will attach to the wall of the barn. the wal

Wording is not perfect, so it requires to be re-worded.


160 m of fencing include one side along the barn (parallel to the barn wall),
and 4 fencing perpendicular to the barn wall.


So, let x be the total length of the fencing along the barn and y is the length of every of 4 
fencing perpendicular to the barn wall.


We have then  

    x + 4y = 160  meters  (total fencing).


The total area is  

    x*y = (160-4y)*y = 160y - 4y^2.


We want the maximum area.  

You have the quadratic function f(y) = -4y^2 + 160y.


It gets the maximum at  

    y = ,  where  " a "  is the coefficient at y^2 and  " b "  is the coefficient at y.


In your case, the dimensions are 

    y =  =  = 20 meters;  x = 160 - 4y = 160-4*20 = 80 m.


ANSWER.  80 meters along the barn wall and 20 meters perpendicular to it provide the maximum area.