Answer:
Length of the final sides: 6 cm and 16 cm
Step-by-step explanation:
The lengths of the sides of the original box are
[tex]L=20 cm\\W=10 cm[/tex]
Later, a piece of tin is cut out from each corner; the piece cut out has the shape of the square: we can call the length of its generic side x. Therefore, the dimensions of the box will now be:
[tex]L'=L-2x\\W'=W-2x[/tex]
We also know that the area is
[tex]A=96 cm^2[/tex]
And the area can be written as product of length and width, therefore:
[tex]A=L'W'[/tex]
So we find:
[tex]A=(L-2x)(W-2x)\\96=(20-2x)(10-2x)[/tex]
Solving for x,
[tex]96=200-20x-40x+4x^2\\4x^2-60x+104=0\\\\x^2-15x-26=0[/tex]
Which has two solutions:
x = 13 cm (this is larger than the initial length of the width, therefore we discard it)
x = 2 cm
So, the length of the new sides are
[tex]L=20-2x=20-2(2)=16 cm\\W=10-2x=10-2(2)=6 cm[/tex]
