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gmattesttaker2
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Hello,
Can you please assist with this:
A square with area 16 is perfectly inscribed inside an equilateral triangle. What is the perimeter of the triangle?
OA: [spoiler]8 sq. root (3) + 12[/spoiler]
I came up with the following diagram.
We now have diagonal of the square i.e. 4 sq. root 2
In triangle ADC, by 30 60 90 rule we have:
30 : 60 : 90
1 : sq. root(3) : 2
x : x sq. root(3) : 2x
From the diagram, side opposite to 60 degrees is 4 sq. root (2)
=> x sq. root(3) = 4 sq. root (2)
=> x = 4 sq. root(2)/sq. root(3)
Side opposite to 30 degrees i.e. CD = x = 4 sq. root(2) / sq. root(3)
Hence, base of equilateral triangle BC = 2 x ( 4 sq. root(2) / sq. root(3) )
= 8 sq. root(2) / sq. root(3)
Since all sides are equal, perimeter = 3 x ( 8 sq. root(2) / sq. root(3) )
= 8 sq. root (6)
Can you please tell me where I am going wrong?
Thanks for your help.
Regards,
Sri
Can you please assist with this:
A square with area 16 is perfectly inscribed inside an equilateral triangle. What is the perimeter of the triangle?
OA: [spoiler]8 sq. root (3) + 12[/spoiler]
I came up with the following diagram.
We now have diagonal of the square i.e. 4 sq. root 2
In triangle ADC, by 30 60 90 rule we have:
30 : 60 : 90
1 : sq. root(3) : 2
x : x sq. root(3) : 2x
From the diagram, side opposite to 60 degrees is 4 sq. root (2)
=> x sq. root(3) = 4 sq. root (2)
=> x = 4 sq. root(2)/sq. root(3)
Side opposite to 30 degrees i.e. CD = x = 4 sq. root(2) / sq. root(3)
Hence, base of equilateral triangle BC = 2 x ( 4 sq. root(2) / sq. root(3) )
= 8 sq. root(2) / sq. root(3)
Since all sides are equal, perimeter = 3 x ( 8 sq. root(2) / sq. root(3) )
= 8 sq. root (6)
Can you please tell me where I am going wrong?
Thanks for your help.
Regards,
Sri
- Attachments
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- Inscribed square in triangle
