45-45-90 right triangles consider the following 45-45-90 right triangle. since the triangle is...
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![Page 1: 45-45-90 Right Triangles Consider the following 45-45-90 right triangle. Since the triangle is isosceles, the sides opposite the 45 ° angles are equal](https://reader038.vdocuments.mx/reader038/viewer/2022103007/5697bfc41a28abf838ca6236/html5/thumbnails/1.jpg)
45-45-90 Right Triangles• Consider the following 45-45-90 right triangle.
• Since the triangle is isosceles, the sides opposite the 45° angles are equal in measure. Assign a value of 1 to each side.
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• Use the Pythagorean Theorem to determine the length of the hypotenuse.
2 2 2 a b c
2 2 21 1 c
22 c
2 c
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• This 45-45-90 right triangle can give us the trigonometric function values of 45°.
oppsin45
hyp
adjcos45
hyp
opptan45
adj
1
2
1
2
11
1
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• This leads us to some important values on the unit circle.
• Recall that on the unit circle we have …
( , )a b (cos ,sin )x x
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• Consider the point (a,b) on the 45° ray of a unit circle.
• Since (a,b) = (cos 45°, sin 45°) , we have
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• In radian form it would be …
1cos
4 2
1sin
4 2
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• Moving around the unit circle with reference angles of π/4 we have …
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Example 1:Find cos 3π/4
3 1cos
4 2
• Since cos x is equal to the first coordinate of the point we have …
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Example 2:Find sin 5π/4
5 1sin
4 2
• Since sin x is equal to the second coordinate of the point we have …
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Example 3:Find tan (-3π/4)
13 2tan
142
• Since tan x is equal to b/a we have …
1