Answer:
Therefore,
The length of the sides of the squares is
[tex]x=7\ cm[/tex]
Step-by-step explanation:
Let "x" be the length of Cut Square,
As the tin size(Dimension) is
20 cm × 50 cm
So the size(Dimension) of box will be
(20 - 2x) × (50 - 2x)
Length = 50 - 2x
Width = 20 - 2x
Area of base of box = 216 cm²
To Find:
x = ?
Solution:
Area of Rectangular field is given by
[tex](Area\ of\ Rectangle(Box)) = Length\times Width[/tex]
Substituting the values we get
[tex]216=(50-2x)(20-2x)[/tex]
Applying Distributive property we get
[tex]216=1000-100x-40x+4x^{2}[/tex]
[tex]4x^{2}-140x+784=0[/tex]
Dividing throughout by 4 we get
[tex]x^{2}-35x+196=0[/tex]
On Factorizing we get
[tex]x^{2}-28x-7x+196=0\\\\(x-7)(x-28)=0\\\\x-7=0\ or\ x-28=0\\\\x=7\ or\ x = 28[/tex]
As x cannot be 28 because tin size is 20 cm × 50 cm i.e longer than 20
Therefore,
[tex]x=7\ cm[/tex]
Therefore,
The length of the sides of the squares is
[tex]x=7\ cm[/tex]
Answer:
7 cm
Step-by-step explanation:
(20-2x)(50-2x) = 216
4x² - 40x - 100x + 1000 - 216 = 0
4x² - 140x + 784 = 0
x² - 35x + 196 = 0
x² - 28x - 7x + 196 = 0
x(x - 28) - 7(x - 28) = 0
(x - 7)(x - 28) = 0
x = 7, 28
x can not be more than 10 because the dimensions are 20×50
So x = 7 cm
