an implementation-dependent long float.
The best long float approximation to the mathematical constant \pi.
;; In each of the following computations, the precision depends ;; on the implementation. Also, if `long float' is treated by ;; the implementation as equivalent to some other float format ;; (e.g., `double float') the exponent marker might be the marker ;; for that equivalent (e.g., `D' instead of `L'). pi => 3.141592653589793L0 (cos pi) => -1.0L0 (defun sin-of-degrees (degrees) (let ((x (if (floatp degrees) degrees (float degrees pi)))) (sin (* x (/ (float pi x) 180)))))
An approximation to \pi in some other precision can be obtained by writing (float pi x), where x is a float of the desired precision, or by writing (coerce pi type), where type is the desired type, such as short-float.
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