NationMaster - Encyclopedia: Law of sines

In trigonometry, the law of sines (or sine law, sine formula) 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: Wikibooks has a book on the topic of Trigonometry Trigonometry (from Greek trigÅnon triangle + metron measure[1]) is a branch of mathematics that deals with triangles, particularly triangles in a plane where one angle of the triangle is 90 degrees (right angled triangles). ... A triangle is one of the basic shapes of geometry: a polygon with three vertices and three sides which are straight line segments. ... An angle is the figure formed by two rays sharing a common endpoint, called the vertex of the angle. ... In mathematics, the trigonometric functions are functions of an angle, important when studying triangles and modeling periodic phenomena. ...

${a over sin A}={b over sin B}={c over sin C}=2R,$

where R is the radius of the triangle's circumcircle. This law is useful when computing the remaining sides of a triangle if two angles and a side are known, a common problem in the technique of triangulation. It can also be used when two sides and one of the non-enclosed angles are known; in this case, the formula may give two possible values for the enclosed angle. When this happens, often only one result will cause all angles to be less than 180°; in other cases, there are two valid solutions to the triangle (see the ambiguous case section of this article for further information). In geometry, a circumcircle of a given two-dimensional geometric shape is the smallest circle which contains the shape completely within it. ... Triangulation can be used to find the distance from the shore to the ship. ...

It can be shown that

$begin{align} 2R = frac{abc} {2A} & {} = frac{abc} {2sqrt{s(s-a)(s-b)(s-c)}} & {} = frac {2abc} {sqrt{(a^2+b^2+c^2)^2-2(a^4+b^4+c^4) }}. end{align}$

where A is the area of the triangle and s is the semiperimeter The semiperimeter of a mathematical shape is defined as half of the shapes perimeter. ...

$s = frac{(a+b+c)} {2}.$

Media:Example.oggMedia:Example.oggMedia:Example.oggInsert non-formatted text hereInsert non-formatted text hereInsert non-formatted text here== 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).

Image:Sine_Law_-_Ambiguous_Case.png Image File history File links Sine_Law_-_Ambiguous_Case. ...

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, the altitude of a right triangle with angle A. (i.e., a < b).
The angle B is not a right angle (i.e., a > b sin A).

Given all of the above premises are true, the angle B may be acute or obtuse; meaning, one of the following is true:

$B = arcsin {b sin A over a}$

$B= 180^circ - arcsin {b sin A over a}$

1 Derivation
2 Examples
3 A law of sines for tetrahedra
4 See also
5 External links

Derivation

Make a triangle with the sides a, b, and c, and angles A, B, and C. Draw the altitude from angle C to the side across c, by definition it divides the original triangle into two right angle triangles. Mark the length of this line h. yeah. ...

It can be observed that:

$sin A = frac{h}{b}$ and $; sin B = frac{h}{a}.$

Therefore:

$h = b,(sin A) = a,(sin B)$

and

$frac{a}{sin A} = frac{b}{sin B}.$

Doing the same thing with the line drawn between angle A and side a will yield:

$frac{b}{sin B} = frac{c}{sin C}.$

Full proof:

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. Image File history File links No higher resolution available. ... In geometry, a circumcircle of a given two-dimensional geometric shape is the smallest circle which contains the shape completely within it. ...

Thus, it can be observed that:

$sin gamma = frac{frac{c}{2}}{r}$ , or $sin gamma = frac{c}{2r}$

and then

$frac{c}{sin gamma} = {2r}$

Applying cyclic permutation:

${frac{a}{sin alpha}}={frac{b}{sin beta}}={frac{c}{sin gamma}}={2r}$

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 : $frac{a}{sin A} = frac{c}{sin C}.$

Inserting the given values into the formula, we find that : $frac{10}{sin A} = frac{7}{sin 30}.$

Simplifying, the sine of angle A is equal to 5/7, or approximately 0.714. Thus, angle A is equal to 45.58 degrees by taking the arcsine.

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 = : ${(180-C) over 2}$ and Look up chord in Wiktionary, the free dictionary. ...

${R over sin A}={mbox{chord} over sin C},$ or ${R over sin B}={mbox{chord} over sin C},$

${mbox{chord} ,sin A over sin C} = R$ or ${mbox{chord} ,sin B over sin C} = R$

This is North American railroad surveying practice. This is the top-level page of WikiProject trains Rail tracks Rail transport refers to the land transport of passengers and goods along railways or railroads. ... Surveyor at work with a leveling instrument. ...

A law of sines for tetrahedra

Image File history File links No higher resolution available. ...

A corollary of the law of sines as stated above is that in a tetrahedron with vertices O, A, B, C, we have A tetrahedron (plural: tetrahedra) is a polyhedron composed of four triangular faces, three of which meet at each vertex. ...

$angle OABcdotangle OBCcdotangle OCA = angle OACcdotangle OCBcdotangle OBA.,$

One may view the two sides of this identity as corresponding to clockwise and counterclockwise orientations of the surface.

Putting any of the four vertices in the role of O yields four such identities, but in a sense at most three of them are independent: If the "clockwise" sides of three of them are multiplied and the product is inferred to be equal to the product of the "counterclockwise" sides of the same three identities, and then common factors are cancelled from both sides, the result is the fourth identity. One reason to be interested in this "independence" relation is this: It is widely known that three angles are the angles of some triangle if and only if their sum is a half-circle. What condition on 12 angles is neceesary and sufficient for them to be the 12 angles of some tetrahedron? Clearly the sum of the angles of any side of the tetrahedron must be a half-circle. Since there are four such triangles, there are four such constraints on sums of angles, and the number of degrees of freedom is thereby reduced from 12 to 8. The four relations given by this sine law further reduce the number of degrees of freedom, not from 8 down to 4, but only from 8 down to 5, since the fourth constraint is not independent of the first three. Thus the space of all shapes of tetrahedra is 5-dimensional. The phrase degrees of freedom is used in three different branches of science: in physics and physical chemistry, in mechanical and aerospace engineering, and in statistics. ...

External links

Excellent tutorial on the law of sines
The Law of Sines at cut-the-knot
Degree of Curvature
PlainMath.Net- The Law of Sines Review of The Law of Sines

Categories: Trigonometry | Angle | Triangles cut-the-knot is an educational website maintained by Alexander Bogomolny and devoted to popular exposition of a great variety of topics in mathematics. ...

Results from FactBites:

Illuminations: Law of Sines and Law of Cosines (1592 words)
	Illuminations: Law of Sines and Law of Cosines
	Therefore, the law of sines cannot be used to determine the measures of the missing angles in the triangle with only three sides given.
	Therefore, the law of sines cannot be used to determine the measures of the missing angles and side in the triangle with the given sides and included angle, because the side opposite the given angle is unknown.]

More results at FactBites »

COMMENTARY

krishna
21st November 2005

trignometry is interesting concept

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Contents

Derivation GA_googleFillSlot("encyclopedia_square");

Examples

A law of sines for tetrahedra

See also

External links

Derivation