5.4.3 Small Angle Approximations

Small angle approximations are useful techniques in trigonometry and calculus for simplifying the values of trigonometric functions when the angle $\theta$ is small (typically measured in radians). These approximations are particularly helpful when dealing with limits, series expansions, or problems where the angle is close to zero.

1. Key Small Angle Approximations:

For very small angles $\theta$ (in radians), the following approximations hold:

Sine:

$\sin \theta \approx \theta$

Cosine:

$\cos \theta \approx 1 - \frac{\theta^2}{2}$

Tangent:

$\tan \theta \approx \theta$

2. Understanding the Approximations:

Sine Approximation: $\sin \theta \approx \theta$ As $\theta$ approaches 0, the sine of the angle becomes nearly equal to the angle itself when $\theta$ is in radians. This is because the graph of $\sin \theta$ is very close to the line y = $\theta$ for small values of $\theta$ .
Cosine Approximation: $\cos \theta \approx 1 - \frac{\theta^2}{2}$ For small angles, $\cos \theta$ remains close to 1, with the first correction term being $-\frac{\theta^2}{2}$ . The cosine graph is nearly flat near $\theta = 0,$ which is why the approximation starts with 1.
Tangent Approximation: $\tan \theta \approx \theta$ Since $\tan \theta = \frac{\sin \theta}{\cos \theta}$ , and both $\sin \theta \approx \theta$ and $\cos \theta \approx 1$ for small $\theta$ , the tangent function also approximates to the angle itself.

3. Derivation Using Taylor Series:

These approximations can be derived from the Taylor series expansions of the trigonometric functions around $\theta = 0:$

Sine:

$\sin \theta = \theta - \frac{\theta^3}{3!} + \frac{\theta^5}{5!} - \cdots$

For small $\theta$ , higher-order terms like $\frac{\theta^3}{6}$ become negligible, so:

$\sin \theta \approx \theta$

Cosine:

$\cos \theta = 1 - \frac{\theta^2}{2!} + \frac{\theta^4}{4!} - \cdots$

For small $\theta$ , higher-order terms like $\frac{\theta^4}{24}$ become negligible, so:

$\cos \theta \approx 1 - \frac{\theta^2}{2}$

Tangent:

$\tan \theta = \frac{\sin \theta}{\cos \theta} \approx \frac{\theta}{1} = \theta$

4. Applications of Small Angle Approximations:

Physics: Small angle approximations are frequently used in physics, particularly in pendulum motion, where the sine of the angle of displacement is approximated as the angle itself for small oscillations.
Engineering: In engineering, small angle approximations simplify the analysis of structures and mechanisms where small angular displacements occur.
Astronomy: The approximation is also used in astronomy for calculating the angular diameter of celestial objects when viewed from Earth.

5. Example Problems Using Small Angle Approximations:

infoNote

Example 1: Approximate $\sin(0.1)$ radians.

Using the small angle approximation:

$\sin(0.1) \approx 0.1$

The exact value $\sin(0.1) \approx 0.09983$ , showing that the approximation is quite close.

infoNote

Example 2: Approximate $\cos(0.05)$ radians.

Using the small angle approximation:

$\cos(0.05) \approx 1 - \frac{(0.05)^2}{2} = 1 - \frac{0.0025}{2} = 1 - 0.00125 = 0.99875$

The exact value $\cos(0.05) \approx 0.99875,$ which matches the approximation closely.

infoNote

Example 3: Simplify $\frac{\sin \theta}{\theta}$ for small \theta.

Using the small angle approximation:

$\frac{\sin \theta}{\theta} \approx \frac{\theta}{\theta} = 1$

This approximation is useful in limits, particularly in calculus when evaluating $\lim_{\theta \to 0} \frac{\sin \theta}{\theta}.$

Summary:

infoNote

Small angle approximations provide a powerful tool for simplifying trigonometric expressions when dealing with angles close to zero.
They are derived from the Taylor series expansions of the trigonometric functions and are especially useful in physics, engineering, and calculus.
Understanding these approximations allows for quicker and more intuitive problem-solving in scenarios where small angles are involved.

Small Angle Approximations

When dealing with small angles measured in radians, there are certain useful approximations we can use if the context of the problem allows approximations.

Graph: A graph is shown with two lines:

The blue line represents $y = x$ .
The red curve represents $y = \sin(\theta)$ .

The above graph suggests that for small $\theta, \sin(\theta) \approx \theta$ .

Using $\sin(\theta) \approx \theta$ , we can derive another approximation for $\cos(\theta)$ :

\cos(\theta) = \cos\left(\frac{\theta}{2} + \frac{\theta}{2}\right) = 1 - 2\sin^2\left(\frac{\theta}{2}\right)

(Using double angle formula)

For small $\theta, \sin(\theta) \approx \theta \Rightarrow \cos(\theta) \approx 1 - 2\left(\frac{\theta}{2}\right)^2 = 1 - \frac{2\theta^2}{4}$

= 1 - \frac{\theta^2}{2}

\therefore \text{ For small } \theta, \cos(\theta) \approx 1 - \frac{\theta^2}{2}

For small $\theta \quad \\\tan\theta \approx \theta$

infoNote

Example Problem

When $\theta$ is small, find the approximate values of: a) $\dfrac{\sin 4\theta - \tan 2\theta}{3\theta} \quad b) \dfrac{1 - \cos 2\theta}{\tan 2\theta \sin \theta} \quad c) \dfrac{3 \tan \theta - \theta}{\sin 2\theta}$

Solution:

a) As $\theta \rightarrow 0, \sin(4\theta) \rightarrow 4\theta, \tan(2\theta) \rightarrow 2\theta$

\therefore \frac{\sin 4\theta - \tan 2\theta}{3\theta} \approx \frac{4\theta - 2\theta}{3\theta} = \frac{2\theta}{3\theta} = \frac{2}{3}

b) As $\theta \rightarrow 0, \cos(2\theta) \rightarrow 1 - \frac{(2\theta)^2}{2} =1- \frac{4\theta^2}{2} = 1 - 2\theta^2$

\tan(2\theta) \rightarrow 20, \sin\theta \rightarrow \theta

\therefore \quad \frac{1 - \cos 2\theta}{\tan 2\theta \sin \theta} \approx \frac{1 - (1 - 2\theta^2)}{(2\theta)(\theta)} = \frac{2\theta^2}{2\theta^2} = 1

c) For small $\theta, \tan \theta \approx \theta, \sin(2\theta) \approx 2\theta$

\therefore \quad \frac{3 \tan \theta - \theta}{\sin 2\theta} \approx \frac{3\theta - \theta}{2\theta} = \frac{2\theta}{2\theta} = 1

2. When $\theta$ is small, show that:

a) \frac{\sin 3\theta}{\sin 4\theta} \approx \frac{3}{4\theta} \quad b) \frac{\cos \theta - 1}{\tan 2\theta} \approx -\frac{\theta}{4} \quad c) \frac{\tan 4\theta + \theta^2}{3\theta - \sin 2\theta} \approx 4 + \theta

a) For small $\theta$ ,

\sin(3\theta) \approx 3\theta, \sin(4\theta) \approx 4\theta

\Rightarrow \frac{\sin 3\theta}{\theta\sin 4\theta} \approx \frac{3\theta}{\theta(4\theta)} = \frac{3\theta}{4\theta^2}=\frac{3}{4\theta}

b) For small $\theta$ ,

\cos \theta \approx 1 - \frac{\theta^2}{2}, \tan 2\theta \approx 2\theta

\Rightarrow \frac{\cos \theta - 1}{\tan 2\theta} \approx \frac{1 - (1 - \frac{\theta^2}{2})}{2\theta} = \frac{\frac{\theta^2}{2}}{2\theta} = \frac{\theta^2}{40}=\frac{\theta}{4}

c) For small $\theta$ ,

\tan 4\theta \approx 4\theta, \sin 2\theta \approx 2\theta

\Rightarrow \frac{\tan 4\theta + \theta^2}{3\theta - \sin 2\theta} \approx \frac{4\theta + \theta^2}{3\theta - 2\theta} = \frac{4\theta + \theta^2}{\theta} = 4 + \theta

infoNote

Q1 (OCR H240/03, Sample Question Paper, Q4) Show that, for a small angle $\theta$ , where $\theta$ is in radians,

1 + \cos \theta - 3\cos^2 \theta \approx -1 + \frac{5}{2}\theta^2

Solution:

When $\theta$ is small, $\cos \theta \approx 1 - \frac{\theta^2}{2}$

\Rightarrow 1 + \cos \theta - 3\cos^2 \theta = 1 + \left(1 - \frac{\theta^2}{2}\right) - 3\left(1 - \frac{\theta^2}{2}\right)^2

= 2 - \frac{\theta^2}{2} - 3\left(1 - \frac {\theta^2}{2}-\frac {\theta^2}{2} + \frac{\theta^4}{4}\right)

= 2 - \frac{\theta^2}{2} - 3\left(1 - \theta^2 + \frac{\theta^4}{4}\right)

= 2 - \frac{\theta^2}{2} - 3 + 3\theta^2 - \frac{3\theta^4}{4}

= -1 + \frac{5\theta^2}{2} - \xcancel{\frac{3\theta^4}{4}}

= -1 + \frac{5\theta^2}{2}

As $\theta$ is small, $\theta^4$ is insignificantly small.

infoNote

Q3, (OCR H240/02, Practice Paper Set 3, Q3) Use small angle approximations to estimate the solution of the equation:

\frac{\cos \frac{1}{2}\theta}{1 + \sin \theta} = 0.825

if $\theta$ is small enough to neglect terms in $\theta^3$ or above.

When $\theta$ is small,

\cos \left(\frac{1}{2}\theta\right) \approx 1 - \frac{\left(\frac{1}{2}\theta\right)^2}{2} = 1 - \frac{\left(\frac{\theta^2}{4}\right)}{2} = 1 - \frac{\theta^2}{8}

\sin \theta \approx \theta

\frac{1 - \frac{\theta^2}{8}}{1 + \theta} = 0.825

\Rightarrow 1 - \frac{\theta^2}{8} = 0.825(1 + \theta)

\Rightarrow 1 - \frac{\theta^2}{8} = 0.825 + 0.825\theta

0 = \frac{\theta^2}{8} + 0.825\theta - 0.175

\theta \approx 0.2057, \quad \xcancel{- 6.806} \quad \text {(:highlight[not valid] as } \theta \text{ must be small)}

5. a) When $\theta$ is small, show that the expression $\dfrac{4 \cos 3\theta - 2 + 5 \sin \theta}{1 - \sin 2\theta}$

can be written as $9\theta + 2$ .

b) Hence write down the value of $\dfrac{4 \cos 3\theta - 2 + 5 \sin \theta}{1 - \sin 2\theta}$ when $\theta$ is small.

When $\theta$ is small,

\cos 3\theta \approx 1 - \frac{(3\theta)^2}{2} = 1 - \frac{9\theta^2}{2}

\sin \theta \approx \theta, \quad \sin 2\theta \approx 2\theta

\frac{4(1 - \frac{9\theta^2}{2}) - 2 + 5\theta}{1 - 2\theta}

= \frac{4 - 18\theta^2 - 2 + 5\theta}{1 - 2\theta}

\Rightarrow -\frac{18\theta^2 - 5\theta - 2}{1 - 2\theta} = \frac {\cancel-(9\theta+2)\cancel{(2\theta-1)}}{\cancel-\cancel{(2\theta-1)}}

\Rightarrow 9\theta +2

Assuming $\theta$ is small, we can approximate the expression as $9\theta + 2$ .

Hence $\dfrac{4\cos 3\theta - 2 + 5\sin \theta}{1 - \sin 2\theta} \approx 9\theta + 2$ when $\theta$ is small.

Small Angle Approximations Simplified Revision Notes for A-Level OCR Maths Pure

5.4.3 Small Angle Approximations

1. Key Small Angle Approximations:

2. Understanding the Approximations:

3. Derivation Using Taylor Series:

4. Applications of Small Angle Approximations:

5. Example Problems Using Small Angle Approximations:

Example 1: Approximate $\sin(0.1)$ radians.

Example 2: Approximate $\cos(0.05)$ radians.

Example 3: Simplify $\frac{\sin \theta}{\theta}$ for small \theta.

Summary:

Small Angle Approximations

500K+ Students Use These Powerful Tools to Master Small Angle Approximations For their A-Level Exams.

Other Revision Notes related to Small Angle Approximations you should explore

Small Angle Approximations Simplified Revision Notes for A-Level OCR Maths Pure

5.4.3 Small Angle Approximations

1. Key Small Angle Approximations:

2. Understanding the Approximations:

3. Derivation Using Taylor Series:

4. Applications of Small Angle Approximations:

5. Example Problems Using Small Angle Approximations:

Example 1: Approximate sin⁡(0.1)\sin(0.1)sin(0.1) radians.

Example 2: Approximate cos⁡(0.05) \cos(0.05)cos(0.05) radians.

Example 3: Simplify sin⁡θθ\frac{\sin \theta}{\theta}θsinθ​ for small \theta.

Summary:

Small Angle Approximations

500K+ Students Use These Powerful Tools to Master Small Angle Approximations For their A-Level Exams.

Other Revision Notes related to Small Angle Approximations you should explore

Example 1: Approximate $\sin(0.1)$ radians.

Example 2: Approximate $\cos(0.05)$ radians.

Example 3: Simplify $\frac{\sin \theta}{\theta}$ for small \theta.