[Function]
floor
number {&optional divisor} => quotient, remainder
ffloor
number {&optional divisor} => quotient, remainder
ceiling
number {&optional divisor} => quotient, remainder
fceiling
number {&optional divisor} => quotient, remainder
truncate
number {&optional divisor} => quotient, remainder
ftruncate
number {&optional divisor} => quotient, remainder
round
number {&optional divisor} => quotient, remainder
fround
number {&optional divisor} => quotient, remainder
number---a real.
divisor---a non-zero real. The default is the integer 1.
quotient---for floor, ceiling, truncate, and round: an integer; for ffloor, fceiling, ftruncate, and fround: a float.
remainder---a real.
These functions divide number by divisor, returning a quotient and remainder, such that
quotient{\cdot} divisor+remainder=number
The quotient always represents a mathematical integer. When more than one mathematical integer might be possible (i.e., when the remainder is not zero), the kind of rounding or truncation depends on the operator:
All of these functions perform type conversion operations on numbers.
The remainder is an integer if both x and y are integers, is a rational if both x and y are rationals, and is a float if either x or y is a float.
ffloor, fceiling, ftruncate, and fround handle arguments of different types in the following way: If number is a float, and divisor is not a float of longer format, then the first result is a float of the same type as number. Otherwise, the first result is of the type determined by contagion rules; see section Contagion in Numeric Operations.
(floor 3/2) => 1, 1/2 (ceiling 3 2) => 2, -1 (ffloor 3 2) => 1.0, 1 (ffloor -4.7) => -5.0, 0.3 (ffloor 3.5d0) => 3.0d0, 0.5d0 (fceiling 3/2) => 2.0, -1/2 (truncate 1) => 1, 0 (truncate .5) => 0, 0.5 (round .5) => 0, 0.5 (ftruncate -7 2) => -3.0, -1 (fround -7 2) => -4.0, 1 (dolist (n '(2.6 2.5 2.4 0.7 0.3 -0.3 -0.7 -2.4 -2.5 -2.6)) (format t "~&~4,1@F ~2,' D ~2,' D ~2,' D ~2,' D" n (floor n) (ceiling n) (truncate n) (round n))) |> +2.6 2 3 2 3 |> +2.5 2 3 2 2 |> +2.4 2 3 2 2 |> +0.7 0 1 0 1 |> +0.3 0 1 0 0 |> -0.3 -1 0 0 0 |> -0.7 -1 0 0 -1 |> -2.4 -3 -2 -2 -2 |> -2.5 -3 -2 -2 -2 |> -2.6 -3 -2 -2 -3 => NIL
When only number is given, the two results are exact; the mathematical sum of the two results is always equal to the mathematical value of number.
(function number divisor) and (function (/ number divisor)) (where function is any of one of floor, ceiling, ffloor, fceiling, truncate, round, ftruncate, and fround) return the same first value, but they return different remainders as the second value. For example:
(floor 5 2) => 2, 1 (floor (/ 5 2)) => 2, 1/2
If an effect is desired that is similar to round, but that always rounds up or down (rather than toward the nearest even integer) if the mathematical quotient is exactly halfway between two integers, the programmer should consider a construction such as (floor (+ x 1/2)) or (ceiling (- x 1/2)).
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