Solve Polynomial Problems: Problem 5 & 24

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Homework Help Overview

The discussion revolves around two polynomial problems, specifically focusing on the construction of an open box from a square piece of tin and the evaluation of a cubic function. The first problem involves determining the size of a square cut from the corners of the tin, while the second problem appears to require solving a cubic equation.

Discussion Character

  • Exploratory, Problem interpretation, Assumption checking

Approaches and Questions Raised

  • Participants discuss the relationship between the volume of the box and the dimensions of the tin, questioning how to express the variables involved. There is a consideration of whether the problem can be solved with the given equations and variables.

Discussion Status

Some participants have identified a potential misunderstanding regarding the height of the box and its relationship to the cut dimensions. Clarifications have been made, but there is no explicit consensus on the approach to take for solving the problems.

Contextual Notes

There is a mention of having two variables and only one equation in the first problem, which raises questions about the solvability of the problem as posed. The second problem remains less defined in terms of discussion.

mustang
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Problem 5.
An open box with a volume of 144cm^3 can be made by cutting a square of the same size from each corner of a square piece of tin 14cm on a side and folding up the edges of the tin. What is the length of a side of the square that is cut from each corner?

Problem 24. Slove.
f(x)=2x^3+9x^2+x-12
 
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V = lwh
square piece of tin implies that length = width
l = (14-z) where z is the amount cut
V = h(14-z)^2
144 = h(14-z)^2

unless I am missing something, you have 2 variables and one equation.. i don't think you can solve it..
 
The height of the box IS z: when you fold the cut part up to form the sides, their height is the same as the length cut out:

144= z(14-z)2.
 
ah right, my mistake.
 

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