What are the 3 basic identities of trigonometric systems
Answer it fast I'll mark u BRAINLIEST
Answers
Step-by-step explanation:
For example, one of the most useful trigonometric identities is the following:
tanθ = sinθcosθwhen cosθ≠0.
cotθ = cosθsinθwhen sinθ≠0.
cos2θ + sin2θ = 1.
sin2θ = 1 − cos2θ cos2θ = 1 − sin2θ
sinθ = ±√1 − cos2θ cosθ = ±√1 − sin2θ
−1 ≤ sinθ ≤ 1. −1 ≤ cosθ ≤ 1.
1 + tan2θ = sec2θ
cot2θ + 1 = csc2θ
Answer:
Trigonometric Identities are equations that are true for Right Angled Triangles. (If it is not a Right Angled Triangle go to the Triangle Identities page.)
Each side of a right triangle has a name:


Adjacent is always next to the angle
And Opposite is opposite the angle
We are soon going to be playing with all sorts of functions, but remember it all comes back to that simple triangle with:
Angle θ
Hypotenuse
Adjacent
Opposite
Sine, Cosine and Tangent
The three main functions in trigonometry are Sine, Cosine and Tangent.
They are just the length of one side divided by another
For a right triangle with an angle θ :

Sine Function:
sin(θ) = Opposite / Hypotenuse
Cosine Function:
cos(θ) = Adjacent / Hypotenuse
Tangent Function:
tan(θ) = Opposite / Adjacent
For a given angle θ each ratio stays the same
no matter how big or small the triangle is
When we divide Sine by Cosine we get:
sin(θ)cos(θ) = Opposite/HypotenuseAdjacent/Hypotenuse = OppositeAdjacent = tan(θ)
So we can say:
tan(θ) = sin(θ)cos(θ)
That is our first Trigonometric Identity.
Cosecant, Secant and Cotangent
We can also divide "the other way around" (such as Adjacent/Opposite instead of Opposite/Adjacent):

Cosecant Function:
csc(θ) = Hypotenuse / Opposite
Secant Function:
sec(θ) = Hypotenuse / Adjacent
Cotangent Function:
cot(θ) = Adjacent / Opposite
Example: when Opposite = 2 and Hypotenuse = 4 then
sin(θ) = 2/4, and csc(θ) = 4/2
Step-by-step explanation:
hope it will help you