SOLUTION: An open-top box is to be constructed from a 6 by 8 foot rectangular cardboard by cutting out equal squares at each corner and the folding up the flaps. Let x denote the length of e
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Question 33298: An open-top box is to be constructed from a 6 by 8 foot rectangular cardboard by cutting out equal squares at each corner and the folding up the flaps. Let x denote the length of each side of the square to be cut out.
Find the function V that represents the volume of the box in terms of x.
Graph this function
Using the graph, what is the value of x that will produce the maximum volume? Answer by Earlsdon(6294) (Show Source):
You can put this solution on YOUR website! Starting with the formula for the volume of a rectangular prism (a box): The height of the box will be just x. The length, after cutting an x-square from each corner, will be 8-2x and the width will be 6-2x.
Now we can write the function (V) of the volume in terms of x. Simplify. This is the required function.
The graph is:
By inspection, the maximum volume occurs at approximately x = 1
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