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Mathematical Functions and Operators

Mathematical operators are provided for many PostgreSQL types. For types without standard mathematical conventions (e.g., date/time types) we describe the actual behavior in subsequent sections.

Mathematical Operators shows the mathematical operators that are available for the standard numeric types. Unless otherwise noted, operators shown as accepting numeric_type are available for all the types smallint, integer, bigint, numeric, real, and double precision. Operators shown as accepting integral_type are available for the types smallint, integer, and bigint. Except where noted, each form of an operator returns the same data type as its argument(s). Calls involving multiple argument data types, such as integer + numeric, are resolved by using the type appearing later in these lists.

Table: Mathematical Operators

Operator	Description	Example(s)
numeric_type `+` numeric_type numeric_type	Addition	`2 + 3` `5`
`+` numeric_type numeric_type	Unary plus (no operation)	`+ 3.5` `3.5`
numeric_type `-` numeric_type numeric_type	Subtraction	`2 - 3` `-1`
`-` numeric_type numeric_type	Negation	`- (-4)` `4`
numeric_type numeric_type* numeric_type	Multiplication	`2 * 3` `6`
numeric_type `/` numeric_type numeric_type	Division (for integral types, division truncates the result towards zero)	`5.0 / 2` `2.5000000000000000` `5 / 2` `2` `(-5) / 2` `-2`
numeric_type `%` numeric_type numeric_type	Modulo (remainder); available for `smallint`, `integer`, `bigint`, and `numeric`	`5 % 4` `1`
`numeric` `^` `numeric` `numeric`	`double precision` `^` `double precision` `double precision`	Exponentiation `2 ^ 3` `8` Unlike typical mathematical practice, multiple uses of `^` will associate left to right by default: `2 ^ 3 ^ 3` `512` `2 ^ (3 ^ 3)` `134217728`
`\|/` `double precision` `double precision`	Square root	`\|/ 25.0` `5`
`\|\|/` `double precision` `double precision`	Cube root	`\|\|/ 64.0` `4`
`@` numeric_type numeric_type	Absolute value	`@ -5.0` `5.0`
integral_type `&` integral_type integral_type	Bitwise AND	`91 & 15` `11`
integral_type `\|` integral_type integral_type	Bitwise OR	`32 \| 3` `35`
integral_type `#` integral_type integral_type	Bitwise exclusive OR	`17 # 5` `20`
`~` integral_type integral_type	Bitwise NOT	`~1` `-2`
integral_type `<<` `integer` integral_type	Bitwise shift left	`1 << 4` `16`
integral_type `>>` `integer` integral_type	Bitwise shift right	`8 >> 2` `2`

Mathematical Functions shows the available mathematical functions. Many of these functions are provided in multiple forms with different argument types. Except where noted, any given form of a function returns the same data type as its argument(s); cross-type cases are resolved in the same way as explained above for operators. The functions working with double precision data are mostly implemented on top of the host system's C library; accuracy and behavior in boundary cases can therefore vary depending on the host system.

Table: Mathematical Functions

Function	Description	Example(s)
`abs` ( numeric_type ) numeric_type	Absolute value	`abs(-17.4)` `17.4`
`cbrt` ( `double precision` ) `double precision`	Cube root	`cbrt(64.0)` `4`
`ceil` ( `numeric` ) `numeric`	`ceil` ( `double precision` ) `double precision`	Nearest integer greater than or equal to argument `ceil(42.2)` `43` `ceil(-42.8)` `-42`
`ceiling` ( `numeric` ) `numeric`	`ceiling` ( `double precision` ) `double precision`	Nearest integer greater than or equal to argument (same as `ceil`) `ceiling(95.3)` `96`
`degrees` ( `double precision` ) `double precision`	Converts radians to degrees	`degrees(0.5)` `28.64788975654116`
`div` ( `y` `numeric`, `x` `numeric` ) `numeric`	Integer quotient of `y`/`x` (truncates towards zero)	`div(9, 4)` `2`
`erf` ( `double precision` ) `double precision`	Error function	`erf(1.0)` `0.8427007929497149`
`erfc` ( `double precision` ) `double precision`	Complementary error function (`1 - erf(x)`, without loss of precision for large inputs)	`erfc(1.0)` `0.15729920705028513`
`exp` ( `numeric` ) `numeric`	`exp` ( `double precision` ) `double precision`	Exponential (`e` raised to the given power) `exp(1.0)` `2.7182818284590452`
`factorial` ( `bigint` ) `numeric`	Factorial	`factorial(5)` `120`
`floor` ( `numeric` ) `numeric`	`floor` ( `double precision` ) `double precision`	Nearest integer less than or equal to argument `floor(42.8)` `42` `floor(-42.8)` `-43`
`gcd` ( numeric_type, numeric_type ) numeric_type	Greatest common divisor (the largest positive number that divides both inputs with no remainder); returns `0` if both inputs are zero; available for `integer`, `bigint`, and `numeric`	`gcd(1071, 462)` `21`
`lcm` ( numeric_type, numeric_type ) numeric_type	Least common multiple (the smallest strictly positive number that is an integral multiple of both inputs); returns `0` if either input is zero; available for `integer`, `bigint`, and `numeric`	`lcm(1071, 462)` `23562`
`ln` ( `numeric` ) `numeric`	`ln` ( `double precision` ) `double precision`	Natural logarithm `ln(2.0)` `0.6931471805599453`
`log` ( `numeric` ) `numeric`	`log` ( `double precision` ) `double precision`	Base 10 logarithm `log(100)` `2`
`log10` ( `numeric` ) `numeric`	`log10` ( `double precision` ) `double precision`	Base 10 logarithm (same as `log`) `log10(1000)` `3`
`log` ( `b` `numeric`, `x` `numeric` ) `numeric`	Logarithm of `x` to base `b`	`log(2.0, 64.0)` `6.0000000000000000`
`min_scale` ( `numeric` ) `integer`	Minimum scale (number of fractional decimal digits) needed to represent the supplied value precisely	`min_scale(8.4100)` `2`
`mod` ( `y` numeric_type, `x` numeric_type ) numeric_type	Remainder of `y`/`x`; available for `smallint`, `integer`, `bigint`, and `numeric`	`mod(9, 4)` `1`
`pi` ( ) `double precision`	Approximate value of π	`pi()` `3.141592653589793`
`power` ( `a` `numeric`, `b` `numeric` ) `numeric`	`power` ( `a` `double precision`, `b` `double precision` ) `double precision`	`a` raised to the power of `b` `power(9, 3)` `729`
`radians` ( `double precision` ) `double precision`	Converts degrees to radians	`radians(45.0)` `0.7853981633974483`
`round` ( `numeric` ) `numeric`	`round` ( `double precision` ) `double precision`	Rounds to nearest integer. For `numeric`, ties are broken by rounding away from zero. For `double precision`, the tie-breaking behavior is platform dependent, but “round to nearest even” is the most common rule. `round(42.4)` `42`
`round` ( `v` `numeric`, `s` `integer` ) `numeric`	Rounds `v` to `s` decimal places. Ties are broken by rounding away from zero.	`round(42.4382, 2)` `42.44` `round(1234.56, -1)` `1230`
`scale` ( `numeric` ) `integer`	Scale of the argument (the number of decimal digits in the fractional part)	`scale(8.4100)` `4`
`sign` ( `numeric` ) `numeric`	`sign` ( `double precision` ) `double precision`	Sign of the argument (-1, 0, or +1) `sign(-8.4)` `-1`
`sqrt` ( `numeric` ) `numeric`	`sqrt` ( `double precision` ) `double precision`	Square root `sqrt(2)` `1.4142135623730951`
`trim_scale` ( `numeric` ) `numeric`	Reduces the value's scale (number of fractional decimal digits) by removing trailing zeroes	`trim_scale(8.4100)` `8.41`
`trunc` ( `numeric` ) `numeric`	`trunc` ( `double precision` ) `double precision`	Truncates to integer (towards zero) `trunc(42.8)` `42` `trunc(-42.8)` `-42`
`trunc` ( `v` `numeric`, `s` `integer` ) `numeric`	Truncates `v` to `s` decimal places	`trunc(42.4382, 2)` `42.43`
`width_bucket` ( `operand` `numeric`, `low` `numeric`, `high` `numeric`, `count` `integer` ) `integer`	`width_bucket` ( `operand` `double precision`, `low` `double precision`, `high` `double precision`, `count` `integer` ) `integer`	Returns the number of the bucket in which `operand` falls in a histogram having `count` equal-width buckets spanning the range `low` to `high`. The buckets have inclusive lower bounds and exclusive upper bounds. Returns `0` for an input less than `low`, or ``count`+1 `for an input greater than or equal to` high`. If` low `>` high`, the behavior is mirror-reversed, with bucket` 1 `now being the one just below` low`, and the inclusive bounds now being on the upper side. `width_bucket(5.35, 0.024, 10.06, 5)` `3` `width_bucket(9, 10, 0, 10)` `2`
`width_bucket` ( `operand` `anycompatible`, `thresholds` `anycompatiblearray` ) `integer`	Returns the number of the bucket in which `operand` falls given an array listing the inclusive lower bounds of the buckets. Returns `0` for an input less than the first lower bound. `operand` and the array elements can be of any type having standard comparison operators. The `thresholds` array must be sorted, smallest first, or unexpected results will be obtained.	`width_bucket(now(), array['yesterday', 'today', 'tomorrow']::timestamptz[])` `2`

Random Functions shows functions for generating random numbers.

Table: Random Functions

Function	Description	Example(s)
`random` ( ) `double precision`	Returns a random value in the range 0.0 <= x < 1.0	`random()` `0.897124072839091`
`random_normal` ( [ `mean` `double precision` [, `stddev` `double precision` ]] ) `double precision`	Returns a random value from the normal distribution with the given parameters; `mean` defaults to 0.0 and `stddev` defaults to 1.0	`random_normal(0.0, 1.0)` `0.051285419`
`setseed` ( `double precision` ) `void`	Sets the seed for subsequent `random()` and `random_normal()` calls; argument must be between -1.0 and 1.0, inclusive	`setseed(0.12345)`

The random() function uses a deterministic pseudo-random number generator. It is fast but not suitable for cryptographic applications; see the pgcrypto module for a more secure alternative. If setseed() is called, the series of results of subsequent random() calls in the current session can be repeated by re-issuing setseed() with the same argument. Without any prior setseed() call in the same session, the first random() call obtains a seed from a platform-dependent source of random bits. These remarks hold equally for random_normal().

Trigonometric Functions shows the available trigonometric functions. Each of these functions comes in two variants, one that measures angles in radians and one that measures angles in degrees.

Table: Trigonometric Functions

Function	Description	Example(s)
`acos` ( `double precision` ) `double precision`	Inverse cosine, result in radians	`acos(1)` `0`
`acosd` ( `double precision` ) `double precision`	Inverse cosine, result in degrees	`acosd(0.5)` `60`
`asin` ( `double precision` ) `double precision`	Inverse sine, result in radians	`asin(1)` `1.5707963267948966`
`asind` ( `double precision` ) `double precision`	Inverse sine, result in degrees	`asind(0.5)` `30`
`atan` ( `double precision` ) `double precision`	Inverse tangent, result in radians	`atan(1)` `0.7853981633974483`
`atand` ( `double precision` ) `double precision`	Inverse tangent, result in degrees	`atand(1)` `45`
`atan2` ( `y` `double precision`, `x` `double precision` ) `double precision`	Inverse tangent of `y`/`x`, result in radians	`atan2(1, 0)` `1.5707963267948966`
`atan2d` ( `y` `double precision`, `x` `double precision` ) `double precision`	Inverse tangent of `y`/`x`, result in degrees	`atan2d(1, 0)` `90`
`cos` ( `double precision` ) `double precision`	Cosine, argument in radians	`cos(0)` `1`
`cosd` ( `double precision` ) `double precision`	Cosine, argument in degrees	`cosd(60)` `0.5`
`cot` ( `double precision` ) `double precision`	Cotangent, argument in radians	`cot(0.5)` `1.830487721712452`
`cotd` ( `double precision` ) `double precision`	Cotangent, argument in degrees	`cotd(45)` `1`
`sin` ( `double precision` ) `double precision`	Sine, argument in radians	`sin(1)` `0.8414709848078965`
`sind` ( `double precision` ) `double precision`	Sine, argument in degrees	`sind(30)` `0.5`
`tan` ( `double precision` ) `double precision`	Tangent, argument in radians	`tan(1)` `1.5574077246549023`
`tand` ( `double precision` ) `double precision`	Tangent, argument in degrees	`tand(45)` `1`

Note

Another way to work with angles measured in degrees is to use the unit transformation functions radians() and degrees() shown earlier. However, using the degree-based trigonometric functions is preferred, as that way avoids round-off error for special cases such as sind(30).

Hyperbolic Functions shows the available hyperbolic functions.

Table: Hyperbolic Functions

Function	Description	Example(s)
`sinh` ( `double precision` ) `double precision`	Hyperbolic sine	`sinh(1)` `1.1752011936438014`
`cosh` ( `double precision` ) `double precision`	Hyperbolic cosine	`cosh(0)` `1`
`tanh` ( `double precision` ) `double precision`	Hyperbolic tangent	`tanh(1)` `0.7615941559557649`
`asinh` ( `double precision` ) `double precision`	Inverse hyperbolic sine	`asinh(1)` `0.881373587019543`
`acosh` ( `double precision` ) `double precision`	Inverse hyperbolic cosine	`acosh(1)` `0`
`atanh` ( `double precision` ) `double precision`	Inverse hyperbolic tangent	`atanh(0.5)` `0.5493061443340548`