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06 Jun 2017, 10:25
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B
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In the figure above, triangle abc is similar to triangle ABC. X, Y, Z and x, y, z represent the sides of each similar triangle. If the area of triangle ABC is twice the area of triangle abc, which of the following expresses X in terms of x?
A. \(\frac{x}{\sqrt{2}}\)
B. \(x\sqrt{2}\)
C. x/2
D. 2x
E. 4x
Attachment:
SimilarABC.png [ 10.2 KiB | Viewed 9055 times ]
06 Jun 2017, 11:14
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Let area of Triangle abc = a
Let area of Triangle ABC = 2a
As triangles ABC and abc are similar, then
\(\frac{Area of Triangle ABC}{Area of Triangle ABC}\) = \(X^2\)/\(x^2\)
\(\frac{2a}{a}\) = \(X^2\)/\(x^2\)
Simplifying the above we get,
\(\frac{X}{x}\)=\(\sqrt{2}\)
X = x\(\sqrt{2}\)
Answer is B
Let area of Triangle ABC = 2a
As triangles ABC and abc are similar, then
\(\frac{Area of Triangle ABC}{Area of Triangle ABC}\) = \(X^2\)/\(x^2\)
\(\frac{2a}{a}\) = \(X^2\)/\(x^2\)
Simplifying the above we get,
\(\frac{X}{x}\)=\(\sqrt{2}\)
X = x\(\sqrt{2}\)
Answer is B
General Discussion
12 Jan 2019, 15:33
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Thank you for your explanation! I am a little bit confused about how we know the ratio for this triangle is 1:1:sqrt2. Could you explain in more detail how you got this answer? Thank you very much! 
quantumliner
Let area of Triangle abc = a
Let area of Triangle ABC = 2a
As triangles ABC and abc are similar, then
\(\frac{Area of Triangle ABC}{Area of Triangle ABC}\) = \(X^2\)/\(x^2\)
\(\frac{2a}{a}\) = \(X^2\)/\(x^2\)
Simplifying the above we get,
\(\frac{X}{x}\)=\(\sqrt{2}\)
X = x\(\sqrt{2}\)
Answer is B
Let area of Triangle ABC = 2a
As triangles ABC and abc are similar, then
\(\frac{Area of Triangle ABC}{Area of Triangle ABC}\) = \(X^2\)/\(x^2\)
\(\frac{2a}{a}\) = \(X^2\)/\(x^2\)
Simplifying the above we get,
\(\frac{X}{x}\)=\(\sqrt{2}\)
X = x\(\sqrt{2}\)
Answer is B
