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INTRODUCTION
Trigonometry is the branch of Mathematics which deals with the measurement of angles and sides of a triangle.

The word Trigonometry is derived from three Greek roots : 'trio' meaning 'thrice or Three', 'gonia' meaning an angle and 'metron' meaning measure. Infact, Trigonometry is the study of relationship between the sides and the angles of a triangle.

Trigonometry has its application in astronomy, geography, surveying, engineering and navigation etc. In the past, astronomers used it to find out the distance of stars and plants from the earth. Even now, the advanced technology used in Engineering are based on trigonometrical concepts.

In this chapter, we will define trigonometric ratios of angles in terms of ratios of sides of a right triangle. We will also define trigonometric ratios of angles of 0°, 30°, 45°, 60° and 90°. We shall also establish some identities involving these ratios.

HISTORICAL FACTS

their innovation in the use of size instead the use of chord. The most outstanding astronomer has been Aryabhatta. Aryabhatta was born in 476 A.D. in Kerala. He studied in the university of Nalanda. In mathematics, Aryabhatta's contribution are very valuable. He was the first mathematician to prepare tables of sines. His book 'Aryabhatiya' deals with Geometry, Mensuration, Progressions, Square root, Cube root and Celestial sphere (spherical Trigonometry). This work, has won him recognition all over the world because of its logical and unambiguous presentation of astronomical observations.

Aryabhatta was the pioneer to find the correct value of the constant π with respect to a circle

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions upto four decimals as 3.1416. He found the approximate value of π and indirectly suggested that π is an irrational number. His observations and conclusions are very useful and relevant today.
Greek Mathematician Ptolemy, Father of Trigonometry proved the equation sin2A + cos2A = 1 using geometry involving a relationship between the chords of a circle. But ancient Indian used simple algebra to calculate sin A and cos A and proved this relation. Brahmagupta was the first to use algebra in trigonometry. Bhaskarcharaya II (1114 A.D.) was very brilliant and most popular Mathematician. His work known as Siddhantasiron mani is divided into four parts, one of which is Goladhyaya's spherical trigonometry.

BASE, PERPENDICULAR AND HYPOTENUSE OF A RIGHT TRIANGLE

In ΔABC, if trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions B = 90°, then :

For trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsA, we have;

Base = AB, Perpendicular = BC and Hypotenuse = AC.

For trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsC, we have;

Base = BC, Perpendicular = AB and Hypotenuse = AC.

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

So, in a right angled triangle, for a given angle,
(i) The side opposite to the right angle is called hypotenuse.
(ii) The side opposite to the given angle is called perpendicular.
(iii) The third side (i.e., the side forming the given angle with the hypotenuse), is called base.

TRIGONOMETRICAL RATIOS (T-RATIOS) OF AN ANGLE

In ΔABC, let trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsB = 90° and let trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsA be acute.
For trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsA, we have;
Base = AB, Perpendicular = BC and Hypotenuse = AC.
The T-ratios for trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsA are defined as :

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

Thus, there are six trigonometrical ratios based on the three sides of a right angled triangle.

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

Aid to Memory : The sine, cosine, and tangent ratios in a right triangle can be remembered by representing
them as strings of letters, as in SOH-CAH-TOA.

Sine = Opposite / Hypotenuse
Cosine = Adjacent / Hypotenuse
Tangent = Opposite / Adjacent
The memorization of this mnemonic can be aided by expanding it into a phrase, such as "Some Officers Have
Curly Auburn Hair Till Old Age".

RECIPROCAL RELATIONS

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

QUOTIENT RELATIONS
Consider a right angled triangle in which for an acute angle θ, we have :

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions


POWER OF T-RATIOS

We denote :
(i) (sinθ)2 by sin2θ; (ii) (cosθ)2 by cos2θ; (iii) (sinθ)3 by sin3θ; (iv) (cosθ)3 by cos3θ and so on

REMARK : (i) The symbol sin A is used as an abbreviation for 'the sine of the angle A'. Sin A is not the product of 'sin' and A. 'sin' separated from A has no meaning. Similarly, cos A is not the product of 'cos' and A. Similar interpretations follow for other trigonometric ratios also.
(ii) We may write sin2 A, cos2 A, etc., in place of (sin A)2, (cos A)2, etc., respectively. But  cosecA = (sin A)–1 ≠ sin–1A (it is called sine inverse A). sin–1A has a different meaning, which will be discussed in higher classes. Similar conventions hold for the other trigonometric ratios as well.
(iii) Since the hypotenuse is the longest side in a right triangle, the value of sin A or cos A is always less than 1 (or, in particular, equal to 1).

Ex.1 Using the information given in fig. write the values of all trigonometric ratios of angle C

Sol. Using the definition of t-ratios,

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

Trigonometric Ratios - Introduction to Trigonometry, CBSE, Class 10, Mathematics

Trigonometric Ratios - Introduction to Trigonometry, CBSE, Class 10, Mathematics

Ex.2 In a right ΔABC, if trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsA is acute and tan A = 3/4 , find the remaining trigonometric ratios of trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsA.
Sol. Consider a ΔABC in which trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsB = 90°.

For trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutionsA, we have :

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

Ex.3 In a DABC, right angled at B, if tan A  = 1/√3, find the value of

(i) sinA cosC + cosA sinC

(ii) cosA cosC – sinA sinC.

Solution:  Introduction to Trigonometry,Class 10 Maths,CBSE Class 10,Maths,Class 10

tan = BC/AB = 1/√3

∴ AB : BC = 1:√3

Let BC = k and AB = √3k

  trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

Introduction to Trigonometry,Class 10 Maths,CBSE Class 10,Maths,Class 10
trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

Sol. We know that

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions  

trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

Ex.5 In ΔPQR, right angled at Q, PR + QR = 25 cm and PQ = 5 cm. Find the value of sinP, cosP and tanP.
Sol. We are given
           PR + QR = 25 cm
        ∴ PR = (25 – QR) cm
By Pythagoras theorem,
PR2 = QR2 + PQ2
or (25 – QR)2 = QR2 + 52
or 625 + QR2 – 50 QR = QR2 + 25
or 50 QR = 625 – 25 = 600
trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions QR = 12 cm.
and PR = (25 – 12) cm = 13 cm
trigonomerty, Mathematics, class X, NCERT, CBSE, Question and Answers, Q and A, Important, with solutions

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FAQs on Trigonometric Ratios - Introduction to Trigonometry, CBSE, Class 10, Mathematics

1. What are trigonometric ratios?
Ans. Trigonometric ratios are mathematical functions that relate the angles of a right triangle to the ratios of the lengths of its sides. The three main trigonometric ratios are sine (sin), cosine (cos), and tangent (tan).
2. How do we calculate the sine of an angle?
Ans. To calculate the sine of an angle, divide the length of the side opposite to the angle by the length of the hypotenuse of the right triangle. The formula for sine is sin(angle) = opposite/hypotenuse.
3. What is the range of values for the cosine of an angle?
Ans. The cosine of an angle can have values between -1 and 1. It represents the ratio of the length of the adjacent side to the length of the hypotenuse in a right triangle.
4. How is the tangent of an angle calculated?
Ans. The tangent of an angle can be calculated by dividing the length of the side opposite to the angle by the length of the side adjacent to the angle. The formula for tangent is tan(angle) = opposite/adjacent.
5. How are trigonometric ratios used in real-life applications?
Ans. Trigonometric ratios have various real-life applications. They are used in fields such as engineering, physics, architecture, navigation, and astronomy. For example, they help in measuring distances, calculating angles for construction, predicting tides and ocean currents, and even determining the height of objects using shadows.
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