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Neither the name of the University nor the names of its contributors .\" may be used to endorse or promote products derived from this software .\" without specific prior written permission. .\" .\" THIS SOFTWARE IS PROVIDED BY THE REGENTS AND CONTRIBUTORS ``AS IS'' AND .\" ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE .\" IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE .\" ARE DISCLAIMED. IN NO EVENT SHALL THE REGENTS OR CONTRIBUTORS BE LIABLE .\" FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL .\" DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS .\" OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) .\" HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT .\" LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY .\" OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF .\" SUCH DAMAGE. .\" .\" from: @(#)exp.3 6.12 (Berkeley) 7/31/91 .\" $FreeBSD: head/lib/msun/man/exp.3 290606 2015-11-09 10:41:27Z ngie $ .\" .Dd November 9, 2015 .Dt EXP 3 .Os .Sh NAME .Nm exp , .Nm expf , .Nm expl , .\" The sorting error is intentional. exp, expf, and expl should be adjacent. .Nm exp2 , .Nm exp2f , .Nm exp2l , .Nm expm1 , .Nm expm1f , .Nm expm1l , .Nm pow , .Nm powf , .Nm powl .Nd exponential and power functions .Sh LIBRARY .Lb libm .Sh SYNOPSIS .In math.h .Ft double .Fn exp "double x" .Ft float .Fn expf "float x" .Ft long double .Fn expl "long double x" .Ft double .Fn exp2 "double x" .Ft float .Fn exp2f "float x" .Ft long double .Fn exp2l "long double x" .Ft double .Fn expm1 "double x" .Ft float .Fn expm1f "float x" .Ft long double .Fn expm1l "long double x" .Ft double .Fn pow "double x" "double y" .Ft float .Fn powf "float x" "float y" .Ft long double .Fn powl "long double x" "long double y" .Sh DESCRIPTION The .Fn exp , .Fn expf , and .Fn expl functions compute the base .Ms e exponential value of the given argument .Fa x . .Pp The .Fn exp2 , .Fn exp2f , and .Fn exp2l functions compute the base 2 exponential of the given argument .Fa x . .Pp The .Fn expm1 , .Fn expm1f , and the .Fn expm1l functions compute the value exp(x)\-1 accurately even for tiny argument .Fa x . .Pp The .Fn pow , .Fn powf , and the .Fn powl functions compute the value of .Ar x to the exponent .Ar y . .Sh ERROR (due to Roundoff etc.) The values of .Fn exp 0 , .Fn expm1 0 , .Fn exp2 integer , and .Fn pow integer integer are exact provided that they are representable. .\" XXX Is this really true for pow()? Otherwise the error in these functions is generally below one .Em ulp . .Sh RETURN VALUES These functions will return the appropriate computation unless an error occurs or an argument is out of range. The functions .Fn pow x y , .Fn powf x y , and .Fn powl x y raise an invalid exception and return an \*(Na if .Fa x < 0 and .Fa y is not an integer. .Sh NOTES The function .Fn pow x 0 returns x**0 = 1 for all x including x = 0, \*(If, and \*(Na . Previous implementations of pow may have defined x**0 to be undefined in some or all of these cases. Here are reasons for returning x**0 = 1 always: .Bl -enum -width indent .It Any program that already tests whether x is zero (or infinite or \*(Na) before computing x**0 cannot care whether 0**0 = 1 or not. Any program that depends upon 0**0 to be invalid is dubious anyway since that expression's meaning and, if invalid, its consequences vary from one computer system to another. .It Some Algebra texts (e.g.\& Sigler's) define x**0 = 1 for all x, including x = 0. This is compatible with the convention that accepts a[0] as the value of polynomial .Bd -literal -offset indent p(x) = a[0]\(**x**0 + a[1]\(**x**1 + a[2]\(**x**2 +...+ a[n]\(**x**n .Ed .Pp at x = 0 rather than reject a[0]\(**0**0 as invalid. .It Analysts will accept 0**0 = 1 despite that x**y can approach anything or nothing as x and y approach 0 independently. The reason for setting 0**0 = 1 anyway is this: .Bd -ragged -offset indent If x(z) and y(z) are .Em any functions analytic (expandable in power series) in z around z = 0, and if there x(0) = y(0) = 0, then x(z)**y(z) \(-> 1 as z \(-> 0. .Ed .It If 0**0 = 1, then \*(If**0 = 1/0**0 = 1 too; and then \*(Na**0 = 1 too because x**0 = 1 for all finite and infinite x, i.e., independently of x. .El .Sh SEE ALSO .Xr fenv 3 , .Xr ldexp 3 , .Xr log 3 , .Xr math 3 .Sh STANDARDS These functions conform to .St -isoC-99 .