{"id":250,"date":"2022-01-13T21:18:02","date_gmt":"2022-01-13T21:18:02","guid":{"rendered":"https:\/\/opentextbc.ca\/mathfortrades3\/chapter\/introduction-to-trigonometry\/"},"modified":"2022-09-29T15:49:38","modified_gmt":"2022-09-29T15:49:38","slug":"introduction-to-trigonometry","status":"publish","type":"chapter","link":"https:\/\/opentextbc.ca\/mathfortrades3\/chapter\/introduction-to-trigonometry\/","title":{"raw":"Introduction to Trigonometry","rendered":"Introduction to Trigonometry"},"content":{"raw":"

Click play on the following audio player to listen along as you read this section.<\/p>\r\nhttps:\/\/media.bccampus.ca\/id\/0_1p3akf5r?width=608&height=50&playerId=23449753\r\n\r\n \r\n\r\nIn the last section we took a look at the basics of triangles. We used the Pythagorean theorem to solve for any side of a right triangle. The only requirement was that we know what the length of the other two sides were.\r\n\r\nWhen using the Pythagorean theorem we didn\u2019t need to know any of the angles within the triangle. The only thing we needed to make sure was that one of the angles was a right angle.\r\n\r\nTake a look at the drawing below. It shows a right triangle with the other two angles both being forty five degrees.\"A<\/a>\r\n\r\nThis is a special triangle when dealing with the construction trades. When piping is offset it\u2019s quite often done using forty five degree fittings. What we end up making is this special version of a triangle.\r\n\r\nSome of you may already have run across this in either your studies or even in the field. What you might remember is that side \u201cC\u201d is 1.414 times larger than either side \u201cA\u201d or side \u201cB\u201d.\r\n\r\nSo how did we determine that? Well that number comes from trigonometry.\u00a0It is also the case that side A and B are equal.\r\n\r\nTrigonometry is a system which allows us to calculate the values of any angle or side in a right triangle. It deals with more than what Pythagoras figured out when dealing with triangles.\r\n\r\nGiven enough information we can find any of the angles or any of the sides. Trigonometry allows us to work with triangles to a much greater extent than we have being doing up to this point.\r\n

The Relationship between the Sides and Angles in a Right Triangle<\/h1>\r\n\"A<\/a>\r\n\r\nWe noted in the last chapter that there are six pieces of information in a right triangle. There are the three sides and the three angles. The only thing we know for sure is that one of the angles is 90 degrees. So in this case number 5 is a given at 90 degrees.\r\n\r\nWhen working with trigonometry it is required that you have 3 of those 6 pieces of information given in order to figure out the other three. As just stated one of the three is the 90 degree angle. Essentially you need the 90 degree plus two other pieces of information.\r\n\r\nRemember we also named the three sides of the triangle depending on the angle of reference. The names become very important when dealing with trigonometry. They end up defining how we go about finding the unknown variable.\r\n\r\n\"A<\/a>\r\n\r\nThis is an important point when dealing with trigonometry. Naming the sides of a triangle properly allows us to use the formulas in trigonometry properly. This leads us into the next part part\u2026\u2026the angles.\r\n

The Angles<\/h1>\r\nThis topic might get a little tricky so pay attention.\r\n\r\n\"Attention\"\r\n\r\nAngles within a right triangle can be referred to by the relationship between two of the sides within that triangle. We\u2019ll start by stating the three names that we will be working with.\r\n

Sine\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Cosine \u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0 Tangent<\/strong><\/p>\r\nIt would be fair to say that these names refer more to the relationship between sides than to the actual names of the angles.\r\n\r\nFor example, sine is the relationship between the opposite side and the hypotenuse. The relationship between the two will give you a number and this number will generate an angle using a calculator.\r\n\r\nLet\u2019s go back to our triangle with a reference angle \u201cA\u201d to see how this works.\r\n\r\n\"A<\/a>\r\n\r\nOur reference angle is \"A\u201d. From this we can derive which side is the opposite, adjacent and hypotenuse.\r\n\r\nThe idea is the value of angle \u201cA\u201d defines the relationship between the sides.\r\n\r\nThis is where trigonometry steps in and states how everything goes together. What you end up with is the following.\r\n

SOH CAH TOA<\/strong><\/p>\r\nWhat SOH CAH TOA defines is actually the three formulas we work with in trigonometry. We\u2019ll break it down even further.\r\n\r\n\r\n\r\n\r\n
SOH<\/strong><\/td>\r\nCAH<\/strong><\/td>\r\nTOA<\/strong><\/td>\r\n<\/tr>\r\n
[latex]\\text{Sine } \\theta = \\dfrac{\\text{opposite}}{\\text{hypotenuse}}[\/latex]<\/td>\r\n[latex]\\text{Cosine } \\theta = \\dfrac{\\text{adjacent}}{\\text{hypotenuse}}[\/latex]<\/td>\r\n[latex]\\text{Tangent } \\theta = \\dfrac{\\text{opposite}}{\\text{adjacent}}[\/latex]<\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\nNote: the symbol \u201c\u03b8\u201d is the Greek letter theta and is used to refer to the measured angle.\r\n\r\nIf you find the relationship between the opposite side and the hypotenuse what you end up finding is the angle referred to as sine.\r\n\r\nStated another way the angle of sine can be found by dividing the opposite side of the triangle by the hypotenuse.\r\n\r\nTrigonometry is not all that complicated in the end of the day but because there are a few words (including trigonometry) that might be unfamiliar to students it sometimes seems to be just a little out of reach.\r\n\r\nWhat we\u2019ll do in the next parts of the chapter is break each of three formulas down into their basic parts and go through some examples. In the end of the day if you can just remember two things about trigonometry then you are almost there.\r\n
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    \r\n \t
  1. Trigonometry is simply the relationship between sides and the relationship between those sides will end up telling you the angle you're dealing with.<\/li>\r\n \t
  2. SOH CAH TOA is pronounced \u201cso\u2026\u2026ca\u2026\u2026toe\u2026\u2026ah\u201d<\/li>\r\n<\/ol>\r\n<\/div>\r\nYou\u2019re already halfway there.","rendered":"

    Click play on the following audio player to listen along as you read this section.<\/p>\n