The meaning of Trigonometry
In all the
situations given above, the distance or height can be
found by using some mathematical techniques, which come under a
branch of mathematics called 'trigonometry’. The word
'trigonometry' is derived from the Greek words 'tri' (meaning three),
'gon' (meaning sides) and 'metron' (meaning measure).In fact,
trigonometry is the study of relationship between the sides and
angles of a triangle.
Trigonometry
was invented because its need arose in astronomy. Since then the
astronomers have used it, for instance , to calculate distance from
the earth to the planets and stars. Trigonometry is also used in
geography and in navigation also.
For
determining height and distance of objects we make use of
trigonometric ratios of an angle.
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What are
trigonometric ratios of an Angle?
Ratios of the sides of a
right triangle w.r.t. its acute angles, are called trigonometry
ratios of the angle.
Let ABC be a
right angled triangle. Here,
CAB
is an acute angle(Fig 4). Let its measure be
A.
The trigonometric ratios of the angle A in right triangle ABC are
defined as follows:
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The
trigonometric ratios of the angle A in right triangle ABC are defined
as follows:
The ratios defined above
are abbreviated as sin A, cos A, cosec A, sec A ,tan A and cot A
respectively. Also, observe that tan A is the quotient
sin A/ cos A. So, the
trigonometric ratios of an acute angle in a right triangle express
the relationship between the angle and the length of its sides.
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Trigonometric
Ratios of Some specific Angles
We shall now give the
values of the trigonometric ratios for some specific angles, namely
00, 300, 450 ,600, and
900degrees.
Since our
course is restricted to these angles, we are not giving values of
trigonometric values for anther angles. However, we can get the
values from the trigonometric tables.
Here is a ready reference
for these values.
Here is an example which
illustrates the use of the values given in the table above.
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Problem I
In ∆ABC,
right_angled at B, AB=5 cm and < ABC=300 .
Find the lenghths of BC
and CA.
Solution
Verification
You have the three sides
of the right-angled triangle ABC as
AB=5 cm ; AC=10 cm ;
BC=5√3 cm
Now
AB2
+ BC 2 =52+(5√
3)2
=52+52×3
=52
(1+3) = 52×4=100
Also,AC2 =
102 =100 cm.
Hence, ∆ABC is a
right –angled triangle
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Angle of Elevation
In the figure, the line AB
drawn from the eye of the student top of the Minar is called the line
of sight . The student is looking at the top of minar . The angle BAC
,so formed by the line of sight of the horizontal, is called the
angle of elevation of the top of the minar from eye of the
Student.
Now, consider the
situation given in the beginning. The girl sitting on the balcony is
looking down at a flowerpot placed on a stair of the temple. In this
case, the line of sight is below the horizontal is called the angle
of depression.
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Problem II
Finding the Height of
Qutub minar
Let us refer to Fig. 6
(Fig 8) again. If you want to find the height BD of the minar without
actually measuring it, what information do you need? You would need
to know the following:
Fig
8
The distance DE at
which the student is standing from the foot of the minar. Let it be
40 meters
The angle of
elevation,
BAC,
of the top of the minar. Let it be 600
The
height AE of the student. (Let it be 105cm)
Qutb-Minar in red and buff
standstone is the highest tower in India. It has a diameter of 14.32
m at the base and about 2.75 m on the top with a height of 72.5 m.
- Archaeological
Survey of India, Government of India
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