Solve Polynomial Problems: Problem 5 & 24

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To solve Problem 5, the volume of the open box, 144 cm³, is achieved by cutting a square of side length z from each corner of a 14 cm square tin. The relationship between the height (z) and the dimensions of the base leads to the equation 144 = z(14-z)². In Problem 24, the polynomial function f(x) = 2x³ + 9x² + x - 12 is presented, but the discussion highlights the challenge of solving it due to having two variables and one equation. The realization that the height of the box is equal to the cut length simplifies the problem. Ultimately, the correct approach clarifies the relationship between the variables and allows for a potential solution.
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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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