Basic Trigonometry: Explaining the Rules

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The discussion centers on the definitions of trigonometric functions, specifically sine, cosine, and tangent, in the context of planar geometry. Participants clarify that these definitions are foundational and do not require proof, although they can be derived using the unit circle and properties of similar triangles. There is a debate about the necessity of proving that the ratios of sides remain consistent across triangles with the same angle. The conversation highlights the importance of understanding these definitions rather than viewing them as arbitrary. Overall, the definitions are established as essential components of trigonometry rooted in geometric principles.
iknownth
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We all know that
sin theta = opposite side / hypotenuse
cos theta = adjacent side / hypotenuse
tan theta = opposite side / adjacent side.
But why? Are there some explanations behind or are they just defined by scientists?
 
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iknownth said:
But why? Are there some explanations behind or are they just defined by scientists?

What do you mean by "explanations"?

To answer the question, they are the definitions used in planar geometry. There are other (equivalent) ways of defining them, but you'll get the same properties nonetheless.
 
How can one prove that sin theta = opposite side / hypotenuse ?
 
iknownth said:
How can one prove that sin theta = opposite side / hypotenuse ?

I'm assuming planar geometry here. There are two answers:
  1. It is the definition of sine. There is nothing to prove.
  2. The definition is using the unit circle. It which case the proof is immediate from similar triangles.

I guess it's worth asking: what is your definition of sine?
 
pwsnafu said:
It is the definition of sine. There is nothing to prove.

In this case, there is still something to prove. You want to prove also that if two triangles have the same angle, then the quantity opposite side/hypothenuse is the same.
 
micromass said:
In this case, there is still something to prove. You want to prove also that if two triangles have the same angle, then the quantity opposite side/hypothenuse is the same.

Arrgh yes of course.

Where's the brainfart smiley when you need one?
 

Thread 'Trigonometry problem of interest'

Seemingly by some mathematical coincidence, a hexagon of sides 2,2,7,7, 11, and 11 can be inscribed in a circle of radius 7. The other day I saw a math problem on line, which they said came from a Polish Olympiad, where you compute the length x of the 3rd side which is the same as the radius, so that the sides of length 2,x, and 11 are inscribed on the arc of a semi-circle. The law of cosines applied twice gives the answer for x of exactly 7, but the arithmetic is so complex that the...
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