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Reciprocal Trigonometric Ratios

Introduction to Trigonometry I - Concepts

Identifying Hypotenuses In A Right Triangle

Identifying Adjacent Side To An Angle

Identifying Opposite Side To An Angle

Trigonometric Ratios

Reciprocal Trigonometric Ratios

Trigonometric ratios for 30 degrees

Trigonometric ratios for 45 degrees

Trigonometric ratios for 60 degrees

Trigonometric ratios for 90 degrees

Simplifying Trigonometric Expressions

Class - 10th CBSE Subjects

Concept Explanation

Reciprocal Trigonometric Ratios

Reciprocal Trignometric Ratios: These are the trigonometric ratios which are the reciprocal of the three ratios sin A, cos A and tan A. The ratios are cosec A, sec A and cot A are respectively, the reciprocals of the ratios sin A,cos A and tan A. For a right triangle ABC right angled at B we observe that

$cosecant ;of;angle A=cosec; A=frac{1}{sine;of;angle A}=frac{hypotenuse}{side;opposite;to;angle;A}=frac{AC}{BC}$

$secant ;of ;angle A=sec;A=frac{1}{cosine;of;angle A}=frac{hypotenuse}{side;adjacent;to;angle;A}=frac{AC}{AB}$

$cotangent; of ;angle A=cot;A=frac{1}{tan;A}=frac{side;adjacent;to;angle;A}{side;opposite;to;angle;A}=frac{AB}{BC}$

$cot;A =frac{AB}{BC}=frac{frac{AB}{AC}}{frac{BC}{AC}}=frac{cos;A}{sin;A}$

Illustration: ABC is a right angled triangle. If AB = 21 cm, BC = 20 cm and CA = 29 cm and $large angle;A= theta. ;Find; cot;theta.$ .

Solution: As per definition we know that

$large cot;theta= frac{Adjacent; Side}{Opposite ;Side}$ $=frac{AB}{BC} = frac{21}{20}$

Illustration: Simplify the expression

$cot; Aleft ( frac{1}{cosec A} right )+ sec;A- left ( frac{1}{sec; A} right )$

Solution: To simplify the expression we will convert the ratios in terms of sin and cos.

$cot; Aleft ( frac{1}{cosec A} right )+ sec;A- left ( frac{1}{sec; A} right )$

$=frac{cos; A}{sin;A}left (sin ;A right )+ frac{1}{cos;A}- cos;A$

$=cos; A+ frac{1}{cos;A}- cos;A=frac{1}{cos;A}= sec;A$

Illustration: If $cosTheta =frac {p}{q},$ find the value of $cosecTheta .$

Solution:

We know $cosTheta =frac {base}{hypotenuse}$

We draw a right triangle, with right angle at C and having base BC = pk and hypotenuse BA = qk.

By the pythagorean theorem

$AB^2=BC^2+AC^2$

$Rightarrow$ $(qk)^2=(pk)^2+AC^2$

$Rightarrow$ $AC^2=(qk)^2-(pk)^2 =k^2(q^2-p^2)$

$Rightarrow$ $AC=k sqrt {q^2-p^2}: : : : : : [therefore AC>0]$

Thus, $cosecTheta =frac {hypotenuse}{perpendicular }=frac {qk}{ksqrt {q^2-p^2}}=frac {q}{sqrt {q^2-p^2}}$

Sample Questions

(More Questions for each concept available in Login)

Question : 1

In figure, $Delta ABC$ is right angled at C. If BC = 3cm, AC = 4cm, find the values of 3 cot A + 2 tan A
A. $frac {2}{3}$	B. $frac{11}{2}$	C. $frac{7}{3}$	D. $frac{5}{3}$
Right Option : B
View Explanation

Question : 2

Express the trigonometric ratio tan A in terms of cot A.
A. $frac {1}{sqrt {1+2cot^2A}}$	B. $frac {1}{sqrt {1-cot^2A}}$	C. $frac {1}{cotA}$	D. None of these
Right Option : C
View Explanation

Question : 3

Find the value of when it is given that $cos;theta =frac {p}{q}$
A. $frac {q}{sqrt {q^2-p^2}}$	B. $frac {sqrt {q^2-p^2}}{p}$	C. Both A and B	D. None of these
Right Option : A
View Explanation

Chapters

Polynomial I

Polynomials II

Pair of Linear Equations I

Pair of Linear Equations II

Real Numbers I

Real Numbers II

Coordinate Geometry I

Coordinate Geometry II

Quadratic Equations I

Quadratic Equations II

Arithmetic Progression I

Arithmetic Progression II

Introduction to Trigonometry I

Introduction to Trigonometry II

Surface Area and Volume I

Surface Area and Volume II

Areas Related to Circles

Some Applications of Trigonometry

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State Government Services

Banking And Insurance

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English Proficiency

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Navodaya Entrance 6th & 9th

Sainik School Entrance

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Attention !!!!!

Reciprocal Trigonometric Ratios

Reciprocal Trigonometric Ratios

Students / Parents Reviews [20]

Upmanyu Sharma

Cheshta

Barkha Arora

Hiya Gupta

Prisha Gupta

Aman Kumar Shrivastava

Barkha Arora

Hridey Preet

Manya

Aman Kumar Shrivastava

Shivam Rana

Shreya Shrivastava

Manish Kumar

Om Umang

Ayan Ghosh

Anika Saxena

Sharandeep Singh

Aman Kumar Shrivastava

Aman Kumar Shrivastava

Manish Kumar