Trignometry

Trigonometry is an important branch of mathematics that studies the relationship between the angles and sides of a triangle. It is widely used in geometry, heights and distances, navigation, construction, engineering & physics.

Elementary Mathematics Trigonometry Heights and Distances Competitive Exams

Trigonometry is an important branch of mathematics that studies the relationship between angles and sides of triangles. It covers angle measurement in degrees and radians, trigonometric ratios, standard angle values, identities, sum and difference formulae, multiple and sub-multiple angles, inverse trigonometric functions, use of trigonometric tables, properties of triangles, and applications such as heights and distances.

What is Trigonometry?

Trigonometry mainly deals with ratios of sides of a right-angled triangle. These ratios are called trigonometric ratios. The most commonly used ratios are sine, cosine, and tangent.

In a right-angled triangle, if one acute angle is represented by \(\theta\), then the sides are identified as perpendicular, base, and hypotenuse. Trigonometric ratios help us find unknown sides or angles when some information is given.

Quick idea: Trigonometry is useful whenever a problem involves an angle, a height, a distance, a triangle, or a relation between sides and angles.

Ratio	Meaning	Formula
Sine	Ratio of perpendicular to hypotenuse.	\(\sin \theta = \frac{\text{Perpendicular}}{\text{Hypotenuse}}\)
Cosine	Ratio of base to hypotenuse.	\(\cos \theta = \frac{\text{Base}}{\text{Hypotenuse}}\)
Tangent	Ratio of perpendicular to base.	\(\tan \theta = \frac{\text{Perpendicular}}{\text{Base}}\)
Cosecant	Reciprocal of sine.	\(\csc \theta = \frac{1}{\sin \theta}\)
Secant	Reciprocal of cosine.	\(\sec \theta = \frac{1}{\cos \theta}\)
Cotangent	Reciprocal of tangent.	\(\cot \theta = \frac{1}{\tan \theta}\)

“Trigonometry converts angles and sides into useful mathematical relationships.”

Mathematics Tip

Key points

Understand degree and radian measures.
Learn sine, cosine, and tangent clearly.
Memorize standard angle values.
Use \(\csc\) for cosecant in MathJax formulas.
Practice simple trigonometric identities.
Learn sum, difference, double and half-angle formulae.
Understand inverse trigonometric functions.
Use trigonometric tables where required.
Apply ratios in heights and distances.

degrees radians sine cosine tangent identities heights distances

Angles and Their Measures: Degrees and Radians

Angles can be measured in degrees or radians. Competitive exam questions commonly use degrees, while higher mathematics often uses radians.

Measure	Meaning	Important Conversion
Degree	A full circle is divided into \(360^\circ\).	\(180^\circ=\pi\) radians
Radian	Angle subtended at the centre by an arc equal to radius.	\(\pi\) radians \(=180^\circ\)
Degree to Radian	Multiply by \(\frac{\pi}{180}\).	\(60^\circ=60\times \frac{\pi}{180}=\frac{\pi}{3}\)
Radian to Degree	Multiply by \(\frac{180}{\pi}\).	\(\frac{\pi}{4}=\frac{\pi}{4}\times \frac{180}{\pi}=45^\circ\)

Standard conversions: \(0^\circ=0\), \(30^\circ=\frac{\pi}{6}\), \(45^\circ=\frac{\pi}{4}\), \(60^\circ=\frac{\pi}{3}\), \(90^\circ=\frac{\pi}{2}\), \(180^\circ=\pi\).

Basic Parts of a Right-Angled Triangle

Trigonometric ratios are defined with respect to an acute angle \(\theta\) in a right-angled triangle. Before using formulas, identify the three sides correctly.

Hypotenuse

The side opposite to the right angle. It is always the longest side of the right-angled triangle.

Perpendicular

The side opposite to the angle \(\theta\). It is also called the opposite side.

Base

The side adjacent to the angle \(\theta\), excluding the hypotenuse. It is also called the adjacent side.

Rule: Always identify the angle first. Perpendicular and base change depending on which acute angle is being considered.

Formula and Identity Bank

Basic Ratios

\(\sin \theta = \frac{P}{H}\)
\(\cos \theta = \frac{B}{H}\)
\(\tan \theta = \frac{P}{B}\)

Reciprocal Ratios

\(\csc \theta = \frac{H}{P}\)
\(\sec \theta = \frac{H}{B}\)
\(\cot \theta = \frac{B}{P}\)

Ratio Relations

\(\tan \theta = \frac{\sin \theta}{\cos \theta}\)
\(\cot \theta = \frac{\cos \theta}{\sin \theta}\)

Pythagorean Identities

\(\sin^2 \theta + \cos^2 \theta = 1\)
\(1+\tan^2 \theta = \sec^2 \theta\)
\(1+\cot^2 \theta = \csc^2 \theta\)

Complementary Angles

\(\sin(90^\circ-\theta)=\cos \theta\)
\(\cos(90^\circ-\theta)=\sin \theta\)
\(\tan(90^\circ-\theta)=\cot \theta\)

Heights and Distances

\(\tan \theta = \frac{\text{Height}}{\text{Distance}}\)
Height = Distance \(\times \tan \theta\)
Distance = \(\frac{\text{Height}}{\tan \theta}\)

Tip: In most height and distance problems, tangent is used because height and horizontal distance are involved.

Trigonometry Coverage Map

This section replaces the illustrative image and gives a quick guide for selecting the correct trigonometric tool in exam problems.

Question Type	What to Use	Typical Clue
Angle conversion	Degree-radian conversion	\(180^\circ=\pi\) radians
Right triangle side finding	\(\sin\), \(\cos\), \(\tan\)	Perpendicular, base, hypotenuse
Identity simplification	Basic identities	\(\sin^2\theta+\cos^2\theta=1\)
Compound angle	Sum and difference formulae	\(\sin(A+B)\), \(\cos(A-B)\)
Double or half angle	Multiple/sub-multiple formulae	\(\sin 2A\), \(\cos 2A\), \(\sin \frac{A}{2}\)
Heights and distances	Usually tangent	Height, shadow, tower, distance
Triangle properties	Sine rule, cosine rule, area formula	Any general triangle, not necessarily right-angled

MathJax note: This code uses \(\csc\) for cosecant because it renders more reliably than writing the longer command inside formulas.

Trigonometric Values of Standard Angles

Values of \(\sin \theta\), \(\cos \theta\), and \(\tan \theta\) for standard angles are very important for exams. These values should be memorized clearly.

Angle \(\theta\)	\(0^\circ\)	\(30^\circ\)	\(45^\circ\)	\(60^\circ\)	\(90^\circ\)
\(\sin \theta\)	0	\(\frac{1}{2}\)	\(\frac{1}{\sqrt{2}}\)	\(\frac{\sqrt{3}}{2}\)	1
\(\cos \theta\)	1	\(\frac{\sqrt{3}}{2}\)	\(\frac{1}{\sqrt{2}}\)	\(\frac{1}{2}\)	0
\(\tan \theta\)	0	\(\frac{1}{\sqrt{3}}\)	1	\(\sqrt{3}\)	Not defined
\(\cot \theta\)	Not defined	\(\sqrt{3}\)	1	\(\frac{1}{\sqrt{3}}\)	0
\(\sec \theta\)	1	\(\frac{2}{\sqrt{3}}\)	\(\sqrt{2}\)	2	Not defined
\(\csc \theta\)	Not defined	2	\(\sqrt{2}\)	\(\frac{2}{\sqrt{3}}\)	1

Memory tip: For \(\sin \theta\), use the pattern \(\frac{\sqrt{0}}{2}, \frac{\sqrt{1}}{2}, \frac{\sqrt{2}}{2}, \frac{\sqrt{3}}{2}, \frac{\sqrt{4}}{2}\) for \(0^\circ, 30^\circ, 45^\circ, 60^\circ, 90^\circ\). For cosine, use the reverse order.

Important Trigonometric Functions

Apart from sine, cosine, and tangent, three reciprocal functions are also important: cosecant, secant, and cotangent.

Function	Symbol	Related Function	Useful Relation
Sine	\(\sin \theta\)	Cosecant	\(\sin \theta \times \csc \theta = 1\)
Cosine	\(\cos \theta\)	Secant	\(\cos \theta \times \sec \theta = 1\)
Tangent	\(\tan \theta\)	Cotangent	\(\tan \theta \times \cot \theta = 1\)
Cosecant	\(\csc \theta\)	Sine	\(\csc \theta = \frac{1}{\sin \theta}\)
Secant	\(\sec \theta\)	Cosine	\(\sec \theta = \frac{1}{\cos \theta}\)
Cotangent	\(\cot \theta\)	Tangent	\(\cot \theta = \frac{1}{\tan \theta}\)

Important: For \(0^\circ < \theta < 90^\circ\), all six trigonometric ratios are positive.

Simple Trigonometric Identities

Trigonometric identities are equations that are true for all allowed values of the angle. They are useful for simplification and proof-based questions.

Pythagorean Identities

\(\sin^2 \theta + \cos^2 \theta = 1\)
\(1+\tan^2 \theta = \sec^2 \theta\)
\(1+\cot^2 \theta = \csc^2 \theta\)

Ratio and Reciprocal Identities

\(\tan \theta = \frac{\sin \theta}{\cos \theta}\)
\(\cot \theta = \frac{\cos \theta}{\sin \theta}\)
\(\sec \theta = \frac{1}{\cos \theta}\)
\(\csc \theta = \frac{1}{\sin \theta}\)

Complementary Angle Identities

\(\sin(90^\circ-\theta)=\cos \theta\)
\(\cos(90^\circ-\theta)=\sin \theta\)
\(\tan(90^\circ-\theta)=\cot \theta\)
\(\sec(90^\circ-\theta)=\csc \theta\)
\(\csc(90^\circ-\theta)=\sec \theta\)
\(\cot(90^\circ-\theta)=\tan \theta\)

Useful Product Relations

\(\sin \theta \times \csc \theta = 1\)
\(\cos \theta \times \sec \theta = 1\)
\(\tan \theta \times \cot \theta = 1\)
\(\frac{\sin \theta}{\cos \theta} = \tan \theta\)
\(\frac{\cos \theta}{\sin \theta} = \cot \theta\)

Exam tip: When simplifying trigonometric expressions, convert everything into sine and cosine if you are unsure which identity to use.

Sum and Difference Formulae

Sum and difference formulae are used to find trigonometric values of compound angles such as \(A+B\) and \(A-B\).

Function	Sum Formula	Difference Formula
Sine	\(\sin(A+B)=\sin A\cos B+\cos A\sin B\)	\(\sin(A-B)=\sin A\cos B-\cos A\sin B\)
Cosine	\(\cos(A+B)=\cos A\cos B-\sin A\sin B\)	\(\cos(A-B)=\cos A\cos B+\sin A\sin B\)
Tangent	\(\tan(A+B)=\frac{\tan A+\tan B}{1-\tan A\tan B}\)	\(\tan(A-B)=\frac{\tan A-\tan B}{1+\tan A\tan B}\)

Example: \(\sin 75^\circ=\sin(45^\circ+30^\circ)\) can be evaluated using the sine sum formula.

Multiple and Sub-Multiple Angle Formulae

Multiple angle formulae are used for angles like \(2A\), while sub-multiple angle formulae are used for angles like \(\frac{A}{2}\).

Formula Type	Formula	Use
Double Angle: Sine	\(\sin 2A=2\sin A\cos A\)	Used when product of sine and cosine appears.
Double Angle: Cosine	\(\cos 2A=\cos^2 A-\sin^2 A\)	Also written as \(1-2\sin^2 A\) or \(2\cos^2 A-1\).
Double Angle: Tangent	\(\tan 2A=\frac{2\tan A}{1-\tan^2 A}\)	Used in tangent double-angle problems.
Half Angle: Sine	\(\sin^2 \frac{A}{2}=\frac{1-\cos A}{2}\)	Used to find half-angle sine values.
Half Angle: Cosine	\(\cos^2 \frac{A}{2}=\frac{1+\cos A}{2}\)	Used to find half-angle cosine values.
Half Angle: Tangent	\(\tan \frac{A}{2}=\frac{\sin A}{1+\cos A}\)	Also \(\tan \frac{A}{2}=\frac{1-\cos A}{\sin A}\).

Exam tip: For basic competitive questions, double-angle identities are more frequently used than half-angle identities.

Inverse Trigonometric Functions

Inverse trigonometric functions are used to find an angle when the value of a trigonometric ratio is known. They are written as \(\sin^{-1}x\), \(\cos^{-1}x\), \(\tan^{-1}x\), etc.

Inverse Function	Meaning	Example
\(\sin^{-1}x\)	Angle whose sine is \(x\).	If \(\sin \theta=\frac{1}{2}\), then \(\theta=\sin^{-1}\left(\frac{1}{2}\right)=30^\circ\).
\(\cos^{-1}x\)	Angle whose cosine is \(x\).	If \(\cos \theta=\frac{1}{2}\), then \(\theta=60^\circ\).
\(\tan^{-1}x\)	Angle whose tangent is \(x\).	If \(\tan \theta=1\), then \(\theta=45^\circ\).

Important: \(\sin^{-1}x\) means inverse sine, not \(\frac{1}{\sin x}\). The reciprocal of sine is \(\csc x\).

Properties of Triangles

Trigonometry is also used in general triangles, not only right-angled triangles. The sine rule, cosine rule, and area formula are useful for solving triangle problems.

Property	Formula	Use
Angle Sum Property	\(A+B+C=180^\circ\)	Used in every triangle.
Sine Rule	\(\frac{a}{\sin A}=\frac{b}{\sin B}=\frac{c}{\sin C}\)	Used when sides and opposite angles are involved.
Cosine Rule	\(a^2=b^2+c^2-2bc\cos A\)	Used when two sides and included angle are known.
Area of Triangle	\(\Delta=\frac{1}{2}bc\sin A\)	Used when two sides and included angle are known.
Right Triangle Property	\(H^2=P^2+B^2\)	Pythagoras theorem for right-angled triangles.

Exam tip: Use basic ratios for right triangles. Use sine rule or cosine rule for non-right triangles.

Use of Trigonometric Tables

Trigonometric tables are used to find approximate values of trigonometric ratios for angles that are not standard angles such as \(0^\circ\), \(30^\circ\), \(45^\circ\), \(60^\circ\), and \(90^\circ\).

Step	Action	Example Focus
Step 1	Identify the trigonometric ratio required.	\(\sin\), \(\cos\), \(\tan\), etc.
Step 2	Identify the given angle.	Example: \(37^\circ\), \(52^\circ\), \(75^\circ\).
Step 3	Locate the degree row in the table.	Find the row for the given degree.
Step 4	Use minutes column and mean difference if required.	Useful for angles like \(37^\circ 20'\).
Step 5	Write the approximate value carefully.	Round off as required in the question.

Important: In most basic competitive exam questions, standard angle values are enough. Trigonometric tables are mainly useful when non-standard angle values are asked.

Heights and Distances

Heights and distances problems apply trigonometry to real-life situations. These questions usually involve towers, buildings, trees, poles, hills, shadows, observers, and angles of elevation or depression.

Angle of Elevation

When an observer looks upward at an object, the angle made by the line of sight with the horizontal line is called the angle of elevation.

Angle of Depression

When an observer looks downward at an object, the angle made by the line of sight with the horizontal line is called the angle of depression.

Situation	Common Formula	Use
Height and horizontal distance are involved.	\(\tan \theta = \frac{\text{Height}}{\text{Distance}}\)	Most common height-distance problems.
Hypotenuse and height are involved.	\(\sin \theta = \frac{\text{Height}}{\text{Hypotenuse}}\)	Line of sight or slant distance problems.
Hypotenuse and horizontal distance are involved.	\(\cos \theta = \frac{\text{Distance}}{\text{Hypotenuse}}\)	Slant distance and ground distance problems.

Important: Draw a simple right-angled triangle for every height and distance problem. Label height, distance, angle, and line of sight before calculation.

Step-by-Step Solving Method

Step	Action	Example Focus
Step 1	Check whether the problem is about value, identity, angle, triangle, or application.	Standard values, identities, heights and distances.
Step 2	Check angle unit.	Degrees or radians.
Step 3	For triangle questions, identify sides and angle.	Perpendicular, base, hypotenuse, opposite side.
Step 4	Select the correct formula.	Basic ratio, identity, sum formula, double-angle formula, inverse function.
Step 5	Substitute standard values and simplify.	Use \(30^\circ\), \(45^\circ\), \(60^\circ\) values carefully.

Important: Most simple height and distance questions can be solved using \(\tan \theta = \frac{\text{Height}}{\text{Distance}}\).

Solved Examples

Question	Method	Answer
Convert \(60^\circ\) into radians.	\[ 60^\circ=60\times \frac{\pi}{180}=\frac{\pi}{3} \]	\(\frac{\pi}{3}\)
Find \(\sin 30^\circ\), \(\cos 60^\circ\), and \(\tan 45^\circ\).	From standard values: \(\sin 30^\circ=\frac{1}{2}\), \(\cos 60^\circ=\frac{1}{2}\), \(\tan 45^\circ=1\).	\(\frac{1}{2},\frac{1}{2},1\)
If \(\sin \theta = \frac{3}{5}\), find \(\csc \theta\).	\[ \csc \theta = \frac{1}{\sin \theta} = \frac{1}{3/5} = \frac{5}{3} \]	\(\frac{5}{3}\)
Simplify \(1-\sin^2 \theta\).	Using identity: \[ \sin^2 \theta+\cos^2 \theta=1 \] Therefore: \[ 1-\sin^2 \theta=\cos^2 \theta \]	\(\cos^2 \theta\)
Find \(\sin(45^\circ+30^\circ)\).	\[ \sin(A+B)=\sin A\cos B+\cos A\sin B \] \[ \sin 75^\circ= \frac{1}{\sqrt{2}}\cdot \frac{\sqrt{3}}{2} + \frac{1}{\sqrt{2}}\cdot \frac{1}{2} \]	\(\frac{\sqrt{3}+1}{2\sqrt{2}}\)
Find \(\cos 2A\) if \(\cos A=\frac{3}{5}\) and \(A\) is acute.	Since \(A\) is acute: \[ \sin A=\frac{4}{5} \] \[ \cos 2A=\cos^2 A-\sin^2 A = \frac{9}{25}-\frac{16}{25} = -\frac{7}{25} \]	\(-\frac{7}{25}\)
If \(\tan \theta=1\), find \(\theta\) for \(0^\circ<\theta<90^\circ\).	\[ \theta=\tan^{-1}(1) \] Since \(\tan 45^\circ=1\), \(\theta=45^\circ\).	\(45^\circ\)
A pole casts a shadow of 10 m when the angle of elevation of the sun is \(45^\circ\). Find the height of the pole.	\[ \tan 45^\circ=\frac{\text{Height}}{\text{Shadow}} \] \[ 1=\frac{h}{10} \] \[ h=10 \]	10 m
A tower is observed from a point 20 m away. If the angle of elevation is \(60^\circ\), find the height of the tower.	\[ \tan 60^\circ=\frac{h}{20} \] \[ \sqrt{3}=\frac{h}{20} \] \[ h=20\sqrt{3} \]	\(20\sqrt{3}\) m
In triangle \(ABC\), if \(A=60^\circ\), \(b=8\), \(c=10\), find area.	\[ \Delta=\frac{1}{2}bc\sin A \] \[ \Delta=\frac{1}{2}\times 8\times 10\times \frac{\sqrt{3}}{2} = 20\sqrt{3} \]	\(20\sqrt{3}\) square units

Note: Always check whether the question asks for a value, an identity, a side of a triangle, a height, a distance, an inverse angle, or a reciprocal ratio.

Common Traps and Shortcuts

Common Traps

Confusing degrees and radians.
Confusing \(\sin \theta\), \(\cos \theta\), and \(\tan \theta\).
Using wrong standard angle values.
Forgetting that \(\tan 90^\circ\) is not defined.
Confusing inverse sine \(\sin^{-1}x\) with reciprocal sine.
Confusing angle of elevation with angle of depression.
Not drawing a diagram in height and distance problems.
Using hypotenuse as base or perpendicular incorrectly.
Applying identities without checking the expression carefully.

Useful Shortcuts

For heights and distances, first try \(\tan \theta\).
Remember \(\sin\) values increase from \(0^\circ\) to \(90^\circ\).
Remember \(\cos\) values decrease from \(0^\circ\) to \(90^\circ\).
\(\tan 45^\circ = 1\) is useful in quick problems.
Convert all ratios into sine and cosine for simplification.
Use complementary identities for \(90^\circ-\theta\) questions.
Use \(\sin(A+B)\) when a value like \(\sin 75^\circ\) appears.
Use \(180^\circ=\pi\) radians for angle conversion.

Exam approach: Identify whether the problem is based on angle conversion, standard values, basic ratios, reciprocal functions, simple identities, sum and difference formulae, multiple angles, inverse trigonometric functions, trigonometric tables, properties of triangles, or heights and distances.

Practice

A) Multiple Choice Questions

What is the value of \(\sin 30^\circ\)?
0 \(\frac{1}{2}\) \(\frac{1}{\sqrt{2}}\) 1
What is the radian measure of \(90^\circ\)?
\(\frac{\pi}{6}\) \(\frac{\pi}{4}\) \(\frac{\pi}{2}\) \(\pi\)
Which identity is correct?
\(\sin^2 \theta - \cos^2 \theta = 1\) \(\sin^2 \theta + \cos^2 \theta = 1\) \(\tan^2 \theta + \sec^2 \theta = 1\) \(\cot^2 \theta - 1 = \csc^2 \theta\)
What is the reciprocal of \(\cos \theta\)?
\(\sin \theta\) \(\tan \theta\) \(\sec \theta\) \(\cot \theta\)
If the height of a tower is 30 m and the distance from its base is 30 m, then the angle of elevation is:
30° 45° 60° 90°

B) Solve the Higher-Order Problems

Convert \(45^\circ\) into radians. (Hint: Multiply by \(\frac{\pi}{180}\).)
If \(\sin \theta = \frac{4}{5}\), find \(\csc \theta\). (Hint: \(\csc \theta = \frac{1}{\sin \theta}\).)
Simplify \(1-\cos^2 \theta\). (Hint: Use \(\sin^2 \theta + \cos^2 \theta = 1\).)
A tree casts a shadow of 15 m when the angle of elevation of the sun is \(45^\circ\). Find the height of the tree. (Hint: Use \(\tan 45^\circ = \frac{\text{Height}}{\text{Shadow}}\).)
Find the value of \(\sin 60^\circ \cos 30^\circ + \cos 60^\circ \sin 30^\circ\). (Hint: Substitute standard values or use \(\sin(A+B)\).)

C) Match the Concept with the Correct Rule

Concept	Correct Rule / Meaning
Sine	Perpendicular divided by hypotenuse
Cosine	Base divided by hypotenuse
Tangent	Perpendicular divided by base
Secant	Reciprocal of cosine
Cosecant	Reciprocal of sine
Angle of Elevation	Angle made while looking upward from the horizontal line
Sine Rule	\(\frac{a}{\sin A}=\frac{b}{\sin B}=\frac{c}{\sin C}\)
Inverse Trigonometric Function	Gives the angle when the trigonometric ratio is known

Trigonometry Reminder

Trigonometry is mainly about understanding the relationship between sides and angles. Students should master degree-radian conversion, standard angle values, basic ratios, reciprocal ratios, simple identities, sum and difference formulae, double-angle and half-angle formulae, inverse trigonometric functions, properties of triangles, trigonometric tables, and simple heights and distances applications.

Task: Create five trigonometry questions using one question each from angle conversion, standard values, identities, inverse trigonometric functions, triangle properties, and heights and distances.

Show Suggested Answers

Multiple Choice

\(\frac{1}{2}\)
From standard values, \(\sin 30^\circ = \frac{1}{2}\).
\(\frac{\pi}{2}\)
\(90^\circ=90\times\frac{\pi}{180}=\frac{\pi}{2}\).
\(\sin^2 \theta + \cos^2 \theta = 1\)
This is the basic Pythagorean trigonometric identity.
\(\sec \theta\)
Reciprocal of \(\cos \theta\) is \(\sec \theta\).
45°
\(\tan \theta = \frac{30}{30}=1\). Since \(\tan 45^\circ=1\), the angle is \(45^\circ\).

Higher-Order Problems

\[ 45^\circ=45\times\frac{\pi}{180}=\frac{\pi}{4} \] Answer = \(\frac{\pi}{4}\).
\[ \csc \theta=\frac{1}{\sin \theta}=\frac{1}{4/5}=\frac{5}{4} \] Answer = \(\frac{5}{4}\).
Using \(\sin^2 \theta+\cos^2 \theta=1\),
\(1-\cos^2 \theta=\sin^2 \theta\).
Answer = \(\sin^2 \theta\).
Shadow = 15 m and angle = \(45^\circ\).
\[ \tan 45^\circ=\frac{h}{15} \] \[ 1=\frac{h}{15} \] Therefore, \(h=15\).
Answer = 15 m.
\[ \sin 60^\circ \cos 30^\circ+\cos 60^\circ \sin 30^\circ \] \[ =\frac{\sqrt{3}}{2}\times\frac{\sqrt{3}}{2} + \frac{1}{2}\times\frac{1}{2} = \frac{3}{4}+\frac{1}{4}=1 \] Answer = 1.

Concept Matching

Sine → Perpendicular divided by hypotenuse
Cosine → Base divided by hypotenuse
Tangent → Perpendicular divided by base
Secant → Reciprocal of cosine
Cosecant → Reciprocal of sine
Angle of Elevation → Angle made while looking upward from the horizontal line
Sine Rule → \(\frac{a}{\sin A}=\frac{b}{\sin B}=\frac{c}{\sin C}\)
Inverse Trigonometric Function → Gives the angle when the trigonometric ratio is known

Clue Explanation

Trigonometry questions are solved by first identifying the angle unit, triangle type, known quantities and required result. In identities, convert expressions into sine and cosine where possible. In height and distance problems, draw a diagram before applying the formula.

Exam tips

Use \(180^\circ=\pi\) radians for conversion.
Memorize standard values from \(0^\circ\) to \(90^\circ\).
Remember that \(\tan 90^\circ\) is not defined.
Use \(\csc\) for cosecant in formulas.
Use \(\tan \theta\) for most height-distance problems.
Draw diagrams for angle of elevation and depression.
Use identities to simplify expressions.
Use sine rule and cosine rule for general triangles.
For \(0^\circ < \theta < 90^\circ\), all trigonometric ratios are positive.

Practice MCQs

Learning Modules

Trignometry

What is Trigonometry?

Key points

Angles and Their Measures: Degrees and Radians

Basic Parts of a Right-Angled Triangle

Hypotenuse

Perpendicular

Base

Formula and Identity Bank

Trigonometry Coverage Map

Trigonometric Values of Standard Angles

Important Trigonometric Functions

Simple Trigonometric Identities

Pythagorean Identities

Ratio and Reciprocal Identities

Complementary Angle Identities

Useful Product Relations

Sum and Difference Formulae

Multiple and Sub-Multiple Angle Formulae

Inverse Trigonometric Functions

Properties of Triangles

Use of Trigonometric Tables

Heights and Distances

Angle of Elevation

Angle of Depression

Step-by-Step Solving Method

Solved Examples

Common Traps and Shortcuts

Common Traps

Useful Shortcuts

Practice

A) Multiple Choice Questions

B) Solve the Higher-Order Problems

C) Match the Concept with the Correct Rule

Trigonometry Reminder

Multiple Choice

Higher-Order Problems

Concept Matching

Clue Explanation

Exam tips