Among the methods to measure angles, the two most commonly used are degrees and radians. Students typically learn about degree while learning about radian becomes a later concern. But there are certain cases where radian is the preferred unit of measurement such as:
PHP
Output:
- While working with the derivatives of trigonometric functions, it is preferable to use the radian measure for angles, because then derivative are easier as the pi is avoided.
- In order to derive the relation between linear velocity and angular velocity for any motion in a circle, while using the radian measurement it produces the velocity in natural units i.e. m/s but if we use degrees then we get the velocity in the unit of m.degree/s which has to undergone through another conversion to be in natural form.
float deg2rad ($value)Parameters: The function takes a single parameters which is a float that represents the angle in degrees. Return Type: This function returns a float value that represents the radian equivalent of the angle. Examples:
Input : $deg = 45;
Output : 0.78539816339745
Input : $deg = 90;
Output : 1.5707963267949
Input : $deg = 180;
Output : 3.1415926535898
Below program illustrates the working of deg2rad() in PHP:
<?php
// PHP code to illustrate the working of deg2rad()
$deg = 22.5;
$k = 8;
for(;$k>=1;$k/=2, $deg*=2)
{
if($k!=1)
echo 'pi/'.$k.' = '.deg2rad($deg).'<br>';
else
echo 'pi = '.deg2rad($deg).'<br>';
}
?>
pi/8 = 0.39269908169872 pi/4 = 0.78539816339745 pi/2 = 1.5707963267949 pi = 3.1415926535898
Important points to note:
- It calculates the Radian equivalent of the angle given in degrees.
- The counterpart of the method is deg2rad().
- This method produces highly accurate results but is not much time efficient.