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The Sine Rule, also known as the law of sines, is exceptionally helpful when it comes to investigating the properties of a triangle. While the three trigonometric ratios, sine, cosine and tangent, can help you a lot with right angled triangles, the Sine Rule will even work for scalene triangles. Regardless of the shape of the triangle, if you know some limited information about its angles and sides, you can use the Sine Rule to calculate the rest.

Part 1
Part 1 of 3:

Labelling the Triangle

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  1. The sides of a triangle are traditionally marked with three consecutive letters, usually A, B and C. The order that you choose to mark the sides generally does not matter, unless something in the problem you are working on specifies it. [1]
  2. Mark the three angles of the triangle with letters that correspond to the side lengths. For example, if you use capital letters A, B and C for the sides, then mark the angles with lower case letters a, b and c. You can also use lower case Greek letters . Place these so they correspond with the labeled sides, so angle is opposite side A, angle is opposite side B, and angle is opposite side C. [2]
    • One way to determine that a side is “opposite” a chosen angle is to make sure that it does not form one of the rays of the angle. If labeled correctly, angle wll be formed by the two sides B and C. It will therefore be “opposite” side A.
    • Similarly, angle is formed by sides A and C and is opposite side B.
    • Angle is formed by sides A and B and is opposite side C.
    • Some math texts will use capital letters for the sides and lower case for the angles. Others do the opposite. It does not matter, as long as you are consistent.
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  3. In your problem, you must be given some side and angle measurements. You should mark these on your sketch of the triangle. [3]
    • You may be able to calculate one or more measurements using some rules of geometry.
      • For example, if you are told that the triangle is isosceles, then you are able to mark that two of the angles are equal, as well as the two corresponding sides.
      • As another example, if you are told that two angles are 40 and 75 degrees, you can then calculate the third angle to be 65 degrees, since all three angles must add up to 180 degrees.
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Part 2
Part 2 of 3:

Calculating with the Sine Rule

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  1. The Sine Rule, also called the law of sines, is a rule of trigonometry that relates the sides of a triangle and its angle measurements. While most of trigonometry is based on the relationships of right triangles, the law of sines can apply to any triangle, whether or not it has a right angle. [4]
    • The law of sines is stated as follows:
    • The same rule can be rearranged to yield the following equivalent statements:
  2. For the law of sines to be useful, you must know the measurements of at least two angles and one side, or two sides and one angle. In either case, you must have at least one pair that consists of a side and its opposite angle. [5]
    • For example, the following combinations would be sufficient for the law of sines to apply:
      • Side A, Side B and angle
      • Side A, Side C, and angle
      • Side B, angle and angle
    • The following combinations are examples that would NOT be sufficient to apply the law of sines:
      • Side A, Side B and Side C. (This does not work because you have no angle measurement.)
      • Side A, Side B and angle . (This does not work because the known angle is not opposite either of the known sides.
      • Side B, angle and angle . (This does not work because the known side is not opposite either of the known angles.)
  3. The law of sines works to help you find one piece of information about a triangle -- a side or an angle measurement -- if you know three others. While the full law of sines is written as a three-part equation, you only need to equate two for the rule to work. [6]
    • For example, if you know sides A and B and angle , then you need the portion of the law of sines that says:
    • Notice the similarity of the law. It really doesn’t matter which label you use for any sides or angles. The important thing to remember is that you are comparing ratios. The ratio of any side to its opposing angle is equal to the ratio of any other side to its opposing angle.
  4. Suppose you are given that side A is 12, angle is 80 degrees, and angle is 40 degrees. Find the length of side B. You can mark these numbers on the triangle and set up the problem as follows: [7]
  5. Use basic algebra to maneuver the unknown information to stand alone on either side of the equation. You can then reduce the problem to find the answer. [8]
    • To find the value of the sine of an angle, such as in the problem above, you can use most handheld calculators with trigonometric functions. Different calculators operate differently. With some calculators, you will enter your angle measurement first and then the "sin" button. With others, you will enter the "sin" button first and then the angle measurement. You will have to experiment with your calculator.
    • Alternatively, there are some tables available either in math books or online. With a trigonometry table, you can find your desired angle measure in one column and the corresponding value of sine, cosine or tangent in another column.
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Part 3
Part 3 of 3:

Practicing with Other Problems

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  1. Suppose, as a different problem, that you know two sides and need to solve an unknown angle. You are given that side A is 10 inches long, side B is 7 inches long, and angle is 50 degrees. You can use this information to find the measurement of angle . Set up the problem as follows: [9]
  2. In the above example, the law of sines provides the sine of the selected angle as its solution. To find the measure of the angle itself, you must use the inverse sine function. This is also called the arcsine. On a calculator, this is generally marked as . Use this to find the measure of the angle. [10]
    • For the example above, the final step is as follows:
      • .
  3. Suppose you are told that angle , angle , and side C, which connects them, is 10 inches long. Find the measurement of all sides and angles for the triangle.
    • First, you should recognize that you do not yet have enough information for the sine rule to apply. The sine rule requires that you have at least one pair with an angle that opposes a known side. However, you can calculate the third angle of this triangle using simple subtraction. All three angles add up to 180 degrees, so you can find angle by subtracting:
    • Now that you know all three angles, you can use the sine rule to find the two remaining sides. Solve them one at a time:
    • Thus, side B is 7.78 inches long. Now solve for the final remaining side.
    • Side A, therefore, is 5.08 inches long. You now have all three angles, 30, 50 and 100 degrees, and all three sides, 5.08, 7.78, and 10 inches.
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Community Q&A

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  • Question
    How do I use the table to find the value of sin(-219)?
    Community Answer
    Sine tables usually only go from 0 to 90 degrees, so before you use it you will have to relate sin(-219) to an angle in that range. First, you can add a full circle (360 degrees) to any angle without changing any of its trig values, so sin(-219) = sin(141). Still not in in table range, so use another property of sine: sin(x) = sin(180-x), so sin(141) = sin(39). Look up sin 39 in the table and report that as the answer to sin (-219).
  • Question
    How did you calculate 7.8?
    Top Answerer
    The sine of 40° (0.642) multiplied by 12 and divided by the sine of 80° (0.984) equals 7.8.
  • Question
    If two sides are given with an angle between them, what rule should be applied?
    Orangejews
    Community Answer
    Start with cosine rule to find the third side. After that, sine rule can determine the other two angles.
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      Tips

      • Notice that if you have the two sides and an angle, or two angles and a side, that you need to use the law of sines, you can then use the law of sines repeatedly to find all the remaining angle and side measurements of the triangle. Once you know two angles, you can find the third by subtracting from 180 degrees. Then, with the third angle, you can repeat the law of sines to find the third side length.
      • In addition to the law of sines, you should also learn the law of cosines. The law of cosines is a different arrangement of sides and angles that can also help you learn information about a triangle.
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