Law of sines
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In trigonometry, the law of sines (or sine law) is a statement about arbitrary triangles in the plane. If the sides of the triangle are a, b and c and the angles opposite those sides are A, B and C, then the law of sines states:
- [===2R\,]
It can be shown that:
- [2R = \frac } = \frac }]
- [s = \frac .]
The ambiguous case
When using the law of sines to solve triangles, under special conditions there exists an ambiguous case where two separate triangles can be constructed (i.e., there are two different possible solutions to the triangle).
Given a general triangle ABC, the following conditions would need to be fulfilled for the case to be ambiguous:
- The only information known about the triangle is the angle A and the sides a and b, where the angle A is not the included angle of the two sides (in the above image it isn't, the angle C is the included angle).
- The angle A is acute (i.e., A < 90°).
- The side a is shorter than the side b (i.e., a < b).
- The angle B is not a right angle (i.e., a > b sin A).
- [\sin B = ]
- [\sin (180^\circ - B) = ]
Derivation
It can be observed that:
- [\sin A = \frac] and [\; \sin B = \frac.]
- [h = b\,(\sin A) = a\,(\sin B)]
- [\frac = \frac.]
- [\frac = \frac.]
Make a triangle ABC with sides a, b, c and the γ angle at C. Make an axis through the center of b and another through the c side. Mark the point of intersection of the axis S. Draw a circle k with its center in S with the radius r = |SA| = |SB| = |SC| (the Circumcircle). Through the medial angle law, the angle at S is 2*γ.
Thus, it can be observed that:
- [\sin \gamma = \frac}]
- [\sin \gamma = \frac]
- [\frac = ]
- [}=}=}=](č.b.t.d)
Examples
Here is an example of how to solve a problem using the law of sines:
Given: side a = 10, side c = 7, and angle C = 30 degrees
Using the law of sines, we know that :[\frac = \frac.]
Plugging in the given values, we find that :[\frac = \frac.]
Simplifying, the sine of angle A is equal to 5/7, or approximately 0.714. Thus, angle A is equal to 45.58 degrees.
Or another example of how to solve a problem using the law of sines:
If two sides of the triangle are equal to R and the length of the third side, the chord, is given as 100' (30.48 m) and the angle C opposite to the chord is given in degrees, then angle A = angle B = :[] and
- [= \over \sin C}\,] or [= \over \sin C}\,]
- [ \,\sin A \over \sin C} = R] or [ \,\sin B \over \sin C} = R]
See also
External links
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