Small-angle approximation

Approximately equal behavior of some (trigonometric) functions for $x \to 0$

The small-angle approximations can be used to approximate the values of the main trigonometric functions, provided that the angle in question is small and is measured in radians:

{\begin{aligned}\sin \theta &\approx \theta \\\cos \theta &\approx 1-{\frac {\theta ^{2}}{2}}\approx 1\\\tan \theta &\approx \theta \end{aligned}}

These approximations have a wide range of uses in branches of physics and engineering, including mechanics, electromagnetism, optics, cartography, astronomy, and computer science.^[1]^[2] One reason for this is that they can greatly simplify differential equations that do not need to be answered with absolute precision.

There are a number of ways to demonstrate the validity of the small-angle approximations. The most direct method is to truncate the Maclaurin series for each of the trigonometric functions. Depending on the order of the approximation, $\textstyle \cos \theta$ is approximated as either $1$ or as ${\textstyle 1-{\frac {\theta ^{2}}{2}}}$ .^[3]

^ Cite error: The named reference Holbrow2010 was invoked but never defined (see the help page).
^ Cite error: The named reference Plesha2012 was invoked but never defined (see the help page).
^ "Small-Angle Approximation | Brilliant Math & Science Wiki". brilliant.org. Retrieved 2020-07-22.

[Holbrow2010-1] Cite error: The named reference Holbrow2010 was invoked but never defined (see the help page).

[Plesha2012-2] Cite error: The named reference Plesha2012 was invoked but never defined (see the help page).

[3] "Small-Angle Approximation | Brilliant Math & Science Wiki". brilliant.org. Retrieved 2020-07-22.

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