Special Right Triangles
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Transcript of Special Right Triangles
![Page 1: Special Right Triangles](https://reader033.fdocument.pub/reader033/viewer/2022052909/55984e5e1a28ab506d8b4857/html5/thumbnails/1.jpg)
Geometric Wonder Children
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A triangle is any polygon with 3 sides and 3 angles.
Angles must add up to 180º
65 65
50
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What if one angle was perpendicular, aka, 90º?
But something happens…
90 α
β
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Then that means the others have to measure to 90º as well.
30+60=90
90 60
30
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Hypotenuse is always opposite the R. Angle.
HypotenuseSide/Height
Side/Base
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There are different kinds of right triangles:
Scalene/30-60-90 Right isosceles/45-45-90 Scalene
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One really smart dude, Pythagoras, studied really hard.
Found this pretty fundamental theorem:◦ Adding the squares of each side-length of a right triangle
will equal the square of the hypotenuse.
◦ Or: a2+b2=c2
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a
b
ca2
b2
c2
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There is some consistency with angles and sides
Once you know two sides, you can figure out the third
32+42=x2
9+16=x2
25=x2
5=x
x
3
4
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30-60-90
Ratios are the same for all lengths
45-45-90 Ratios are the same for
all lengths
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Note when the angle is the same…
… The lengths of the sides have the same ratios!
60
302
1
√3
30
60
4
2
2√3
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45
45
1.5
1.51.5√2 2
2
45
452√2
Coincidence..? I think not…
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For any triangle whose angles are 30-60-90:◦ The shortest side will be half of the length of the
hypotenuse and the second longest side will equal to the length of the shortest side times the square root of 3.
THIS IS ALWAYS TRUE FOR A 30-60-90 Δs!!
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For any triangle with 45-45-90 angles:◦ The length of the hypotenuse will be equal to the
length of either side times the square root of 2.
THIS IS ALWAYS TRUE FOR 45-45-90 Δs!
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Right triangles have one fixed 90º angle; the other two angle have to equal 90-x and x, respectively.
Ratios of 30-60-90 and 45-45-90 R. triangles are constant.
In right triangles, Pythagoras’ theorem is always true:
a2+b2=c2
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Sine
Cosine
Tangent
SohCahToa
Pythagorean Triples
"Without geometry life is pointless.” -Anonymous
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Powerpoint Auto Shapes
Lang, S. & Murrow, G (1983). Geometry: a high school course. New York: Springer-Verlag.