Trigonometry deals with relationships between sides and angles of triangles. It originated in ancient Greece and was used to calculate sundials. Key concepts include trigonometric functions like sine, cosine and tangent that relate a triangle's angles to its sides. Trigonometric identities and angle formulae allow for the conversion between functions. It has wide applications in fields like astronomy, engineering and navigation.

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TRIGONOMETRY
By : Rushikesh Reddy

2. TRIGONOMETRY
 Trigonometry is derived from Greek words trigonon (three
angles) and metron ( measure).
 Trigonometry is the branch of mathematics which deals with
triangles, particularly triangles in a plane where one angle of the
triangle is 90 degrees.
 Triangles on a sphere are also studied, in spherical trigonometry.
 Trigonometry specifically deals with the relationships between
the sides and the angles of triangles, that is, on the trigonometric
functions, and with calculations based on these functions.

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4.  The origins of trigonometry can be traced to the
civilizations of ancient Egypt, Mesopotamia and
the Indus Valley, more than 4000 years ago.
 Some experts believe that trigonometry was
originally invented to calculate sundials, a
traditional exercise in the oldest books.
 The first recorded use of trigonometry came from
the Hellenistic mathematician Hipparchus circa
150 BC, who compiled a trigonometric table using
the sine for solving triangles.
 Many ancient mathematicians like Aryabhata,
Brahmagupta, Ibn Yunus and Al-Kashi made
significant contributions in this field(trigonometry).
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History

5. Right Triangle
 A triangle in which one angle is
equal to 90 is called right triangle.
 The side opposite to the right
angle is known as hypotenuse.
AC is the hypotenuse
 The other two sides are known as
legs.
AB and BC are the legs
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Trigonometry deals with Right Triangles

6. In any right triangle, the area of the square
whose side is the hypotenuse is equal to the
sum of areas of the squares whose sides are
the two legs.
In the figure
AC2 = AB2 + BC2
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Pythagoras
Theorem

7.  Sine(sin) opposite side/hypotenuse
 Cosine(cos) adjacent side/hypotenuse
 Tangent(tan) opposite side/adjacent side
 Cosecant(cosec) hypotenuse/opposite side
 Secant(sec) hypotenuse/adjacent side
 Cotangent(cot) adjacent side/opposite side
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Trigonometric Ratios

8. Value of Trigonometric Functions for Angle C
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Sin  = AB/AC
Cos  = BC/AC
Tan  = AB/BC
Cosec  = AC/AB
Sec  = AC/BC
Cot  = AC/AB

9. 0 30 45 60 90
Sine 0 0.5 1/2 3/2 1
Cosine 1 3/2 1/2 1/2 0
Tangent 0 1/ 3 1 3 Not defined
Cosecant
Not
defined
2 2 2/ 3 1
Secant 1 2/ 3 2 2 Not defined
Cotangent
Not
defined
3 1 1/ 3 0
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Values of Trigonometric Functions

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Trigonometric Identities
 sin2  + cos2  = 1
 1 + tan2  = sec2 
 1 + cot2  = cosec2 
 sin(/2) = ±[(1-cos )/2]
 Cos(/2)= ±[(1+cos)/2]
 Tan(/2)= ±[(1-cos)/(1+cos)]

11.  There are two Systems of measurements
of angles ie., Degree and Radian.
 Conversion of degree to radian:
Radian= Degree×(л/180)
 Conversion of radian to degree:
Degree=Radian×(180/л)
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Conversion of Angles

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Angles in Standard Position

13.  sin (A+B) = sin A cos B + cos A sin B
 sin (A-B) = sin A cos B - cos A sin B
 cos (A+B) = cos A cos B - sin A sin B
 cos(A-B) = cos A cos B + sin A sin B
 tan (A+B) = [tan A + tan B] / [1 - tan A tan B]
 tan (A-B) = [tan A - tan B] / [1 + tan A tan B]
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A-B Formula

14.  sin C - sin D = 2 cos (C+D)/2 sin (C-D)/2
 sin C + sin D = 2 sin (C+D)/2 cos (C-D)/2
 cos C - cos D = 2 sin (C+D)/2 sin (C-D)/2
 cos C + cos D = 2 cos (C+D)/2 cos (C-D)/2
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C-D Formula

15.  sin 2θ = 2 sin θ cos θ
 cos 2 θ = cos2 θ - sin2 θ
 tan 2 θ = 2 tan θ / (1 - tan2 θ)
 tan (θ /2) = sin θ / (1 + cos θ)
 sin (- θ)=-sin θ
 cos(- θ)=cos θ
 tan(- θ)=-tan θ
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2θ Formula

16.  This field of mathematics can be applied in astronomy,
navigation, music theory, acoustics, optics, analysis of
financial markets, electronics, probability theory, statistics,
biology, medical imaging (CAT scans and ultrasound),
pharmacy, chemistry, number theory (and hence
cryptology), seismology, meteorology, oceanography,
many physical sciences, land surveying and geodesy,
architecture, phonetics, economics, electrical
engineering, mechanical engineering, civil engineering,
etc
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Applications of Trigonometry

17. Applications of Trigonometry (Astronomy)
 Since ancient times trigonometry was used in astronomy.
 The technique of triangulation is used to measure the distance to
nearby stars.
 In 240 B.C., a mathematician named Eratosthenes discovered the
radius of the Earth using trigonometry and geometry.
 In 2001, a group of European astronomers did an experiment that
started in 1997 about the distance of Venus from the Sun. Venus was
about 105,000,000 kilometers away from the Sun .
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