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Trigonometric identities are relationships between quantities (angles) that are likely for all values of the involved variables. Geometrically speaking, these identities are of one or more angles or perhaps even half or quarter of an angle.
There are several trigonometric identities. First and foremost is the Pythagorean theorem, which involves a circle of unit one.
x2+y2=1, whose trigonometric counterpart happens to be sin2+cos2=1.
From the Pythagorean theorem for the unit circle, it can be thus said that:
sin=√1-cos2
cos=√1-sin2, where the symbol + or – depends on the quadrant of the circle the angle theta is in.
There are addition and subtraction identities, followed by multiple angle formulae and power of angle formulae.
Simple calculations
Suppose you are asked to calculate the value of 7.5 degrees using a half-angle formula for sine, cosine, and tangent. You know that 7.5 is the half of 15 degrees and that 15 degrees fall under the half of 30 degrees. Now, you already know the value of 30 degrees.
The half-angle formula equations are as follows:
sin2(/2)=(1-cos)/2
cos2(/2)=(1+cos)/2
tan(/2)=(1-cos )sin =sin (1+cos )
The tangent’s half-angle formula does not require a plus or a minus sign, unlike those for the sine or the cosine.
The function for sine can be first calculated as 30/2 and then 15/2. The same goes for cosine and tangent.
The Area of a Right-Angled Triangle using Trigonometry
As we already know, 12baseheight gives the area of a right triangle.
However, there are other ways to calculate the area of a right triangle if you are aware of the angle formulae.
Let us consider a triangle ABC in which:
AC = b (the larger hypotenuse)
AB = c (the smaller hypotenuse)
AD = h (the height of the right-angled triangle)
BC = a (the base of the triangle).
Using the right triangle formula for angle C,
sin C=ADAC
sin C=hb
h=b sin C
Therefore, area=ab sin C2
This is the derivation for the right triangle formula.
Trigonometric Identities
Half-angle formulas are derived from multiple rather than double angle formulae. The double angles in trigonometry can be obtained using the sum and difference formulae. However, a different set of identities must be used to obtain the half-angle formula.
sin =2 sin (2) cos 2
cos =cos2(2)-sin2(2)
=1-2 sin2(2)
=2 cos2(2)-1
tan=2tan(/2)/(1-2tan2(/2))
Half Angle Formula using a Scalene triangle
We have a triangle ABC in which,
AB = c
BC = a
AC = b
These equations, as mentioned above, are the angle formulae for the three angles A, B, and C, the ones opposite the sides BC, AC, and AB.
Conclusion
Sometimes we replace sine and cosine functions with tangent half-angle formulas as a completely different variable designated as ‘t.’ The tangential function of the bisection of an angle is the projection of a unit circle on a straight line. This is evident once you consider the Pythagoras theorem.We also learned about how half angle formulas are useful in triangles and different formulas associated with.You can solve a tough problem by wisely using these formulas.
