Particular values of the gamma function

The gamma function is an important special function in mathematics. Its particular values can be expressed in closed form for integer and half-integer arguments, but no simple expressions are known for the values at rational points in general. Other fractional arguments can be approximated through efficient infinite products, infinite series, and recurrence relations.

Integers and half-integers
For positive integer arguments, the gamma function coincides with the factorial. That is,


 * $$\Gamma(n) = (n-1)!,$$

and hence


 * $$\begin{align}

\Gamma(1) &= 1, \\ \Gamma(2) &= 1, \\ \Gamma(3) &= 2, \\ \Gamma(4) &= 6, \\ \Gamma(5) &= 24, \end{align}$$

and so on. For non-positive integers, the gamma function is not defined.

For positive half-integers, the function values are given exactly by


 * $$\Gamma \left (\tfrac{n}{2} \right) = \sqrt \pi \frac{(n-2)!!}{2^\frac{n-1}{2}}\,,$$

or equivalently, for non-negative integer values of $n$:


 * $$\begin{align}

\Gamma\left(\tfrac12+n\right) &= \frac{(2n-1)!!}{2^n}\, \sqrt{\pi} = \frac{(2n)!}{4^n n!} \sqrt{\pi} \\ \Gamma\left(\tfrac12-n\right) &= \frac{(-2)^n}{(2n-1)!!}\, \sqrt{\pi} = \frac{(-4)^n n!}{(2n)!} \sqrt{\pi} \end{align}$$

where $n!!$ denotes the double factorial. In particular,




 * $$\Gamma\left(\tfrac12\right)\,$$
 * $$= \sqrt{\pi}\,$$
 * $$\approx 1.772\,453\,850\,905\,516\,0273\,,$$
 * $$\Gamma\left(\tfrac32\right)\,$$
 * $$= \tfrac12 \sqrt{\pi}\,$$
 * $$\approx 0.886\,226\,925\,452\,758\,0137\,,$$
 * $$\Gamma\left(\tfrac52\right)\,$$
 * $$= \tfrac34 \sqrt{\pi}\,$$
 * $$\approx 1.329\,340\,388\,179\,137\,0205\,,$$
 * $$\Gamma\left(\tfrac72\right)\,$$
 * $$= \tfrac{15}8 \sqrt{\pi}\,$$
 * $$\approx 3.323\,350\,970\,447\,842\,5512\,,$$
 * }
 * $$\approx 1.329\,340\,388\,179\,137\,0205\,,$$
 * $$\Gamma\left(\tfrac72\right)\,$$
 * $$= \tfrac{15}8 \sqrt{\pi}\,$$
 * $$\approx 3.323\,350\,970\,447\,842\,5512\,,$$
 * }
 * $$\approx 3.323\,350\,970\,447\,842\,5512\,,$$
 * }
 * }

and by means of the reflection formula,




 * $$\Gamma\left(-\tfrac12\right)\,$$
 * $$= -2\sqrt{\pi}\,$$
 * $$\approx -3.544\,907\,701\,811\,032\,0546\,,$$
 * $$\Gamma\left(-\tfrac32\right)\,$$
 * $$= \tfrac43 \sqrt{\pi}\,$$
 * $$\approx 2.363\,271\,801\,207\,354\,7031\,,$$
 * $$\Gamma\left(-\tfrac52\right)\,$$
 * $$= -\tfrac 8{15} \sqrt{\pi}\,$$
 * $$\approx -0.945\,308\,720\,482\,941\,8812\,,$$
 * }
 * $$\Gamma\left(-\tfrac52\right)\,$$
 * $$= -\tfrac 8{15} \sqrt{\pi}\,$$
 * $$\approx -0.945\,308\,720\,482\,941\,8812\,,$$
 * }
 * }
 * }

General rational argument
In analogy with the half-integer formula,


 * $$\begin{align}

\Gamma \left(n+\tfrac13 \right) &= \Gamma \left(\tfrac13 \right) \frac{(3n-2)!!!}{3^n} \\ \Gamma \left(n+\tfrac14 \right) &= \Gamma \left(\tfrac14 \right ) \frac{(4n-3)!!!!}{4^n} \\ \Gamma \left(n+\tfrac{1}{q} \right ) &= \Gamma \left(\tfrac{1}{q} \right ) \frac{\big(qn-(q-1)\big)!^{(q)}}{q^n} \\ \Gamma \left(n+\tfrac{p}{q} \right) &= \Gamma \left(\tfrac{p}{q}\right) \frac{1}{q^n} \prod _{k=1}^n (k q+p-q) \end{align}$$

where $n!^{(q)}$ denotes the $q$th multifactorial of $n$. Numerically,


 * $$\Gamma\left(\tfrac13\right) \approx 2.678\,938\,534\,707\,747\,6337$$
 * $$\Gamma\left(\tfrac14\right) \approx 3.625\,609\,908\,221\,908\,3119$$
 * $$\Gamma\left(\tfrac15\right) \approx 4.590\,843\,711\,998\,803\,0532$$
 * $$\Gamma\left(\tfrac16\right) \approx 5.566\,316\,001\,780\,235\,2043$$
 * $$\Gamma\left(\tfrac17\right) \approx 6.548\,062\,940\,247\,824\,4377$$
 * $$\Gamma\left(\tfrac18\right) \approx 7.533\,941\,598\,797\,611\,9047$$.

As $$n$$ tends to infinity,


 * $$\Gamma\left(\tfrac1n\right) \sim n-\gamma $$

where $$\gamma$$ is the Euler–Mascheroni constant and $$\sim$$ denotes asymptotic equivalence.

It is unknown whether these constants are transcendental in general, but $Γ(1⁄3)$ and $Γ(1⁄4)$ were shown to be transcendental by G. V. Chudnovsky. $Γ(1⁄4) / \sqrt{π$ has also long been known to be transcendental, and Yuri Nesterenko proved in 1996 that $Γ(1⁄4)$, $π$, and $e^{π}$ are algebraically independent.

The number $Γ(1⁄4)$ is related to the lemniscate constant $ϖ$ by


 * $$\Gamma\left(\tfrac14\right) = \sqrt{2\varpi\sqrt{2\pi}},$$

and it has been conjectured by Gramain that


 * $$\Gamma \left (\tfrac14 \right ) = \sqrt[4]{4 \pi^3 e^{2 \gamma -\mathrm{\delta}+1}}$$

where $δ$ is the Masser–Gramain constant, although numerical work by Melquiond et al. indicates that this conjecture is false.

Borwein and Zucker have found that $Γ(n⁄24)$ can be expressed algebraically in terms of $π$, $K(k(1))$, $K(k(2))$, $K(k(3))$, and $K(k(6))$ where $K(k(N))$ is a complete elliptic integral of the first kind. This permits efficiently approximating the gamma function of rational arguments to high precision using quadratically convergent arithmetic–geometric mean iterations. For example:
 * $$\begin{align}

\Gamma \left(\tfrac16 \right) &= \frac{\sqrt{\frac{3}{\pi }} \Gamma\left(\frac{1}{3}\right)^2}{\sqrt[3]{2}} \\ \Gamma \left(\tfrac14 \right) &= 2\sqrt{K\left( \tfrac 12 \right)\sqrt{\pi}} \\ \Gamma \left(\tfrac13 \right) &= \frac{2^{7/9} \sqrt[3]{\pi K\left(\frac{1}{4}\left(2-\sqrt{3}\right)\right)}}{\sqrt[12]{3}} \\ \Gamma \left(\tfrac 18\right) \Gamma \left(\tfrac 38\right) &= 8 \sqrt[4]{2} \sqrt{\left(\sqrt{2}-1\right) \pi } K\left(3-2 \sqrt{2}\right) \\ \frac{\Gamma \left(\tfrac 18\right)}{\Gamma \left(\tfrac 38\right)} &= \frac{2 \sqrt{\left(1+\sqrt{2}\right) K\left(\frac{1}{2}\right)}}{\sqrt[4]{\pi }} \end{align}$$

Other formulas include the infinite products


 * $$\Gamma\left(\tfrac14\right) = (2 \pi)^\frac34 \prod_{k=1}^\infty \tanh \left( \frac{\pi k}{2} \right)$$

and


 * $$\Gamma\left(\tfrac14\right) = A^3 e^{-\frac{G}{\pi}} \sqrt{\pi} 2^\frac16 \prod_{k=1}^\infty \left(1-\frac{1}{2k}\right)^{k(-1)^k}$$

where $A$ is the Glaisher–Kinkelin constant and $G$ is Catalan's constant.

The following two representations for $Γ(3⁄4)$ were given by I. Mező


 * $$\sqrt{\frac{\pi\sqrt{e^\pi}}{2}}\frac{1}{\Gamma^2\left(\frac34\right)}=i\sum_{k=-\infty}^\infty e^{\pi(k-2k^2)}\theta_1\left(\frac{i\pi}{2}(2k-1),e^{-\pi}\right),$$

and


 * $$\sqrt{\frac{\pi}{2}}\frac{1}{\Gamma^2\left(\frac34\right)}=\sum_{k=-\infty}^\infty\frac{\theta_4(ik\pi,e^{-\pi})}{e^{2\pi k^2}},$$

where $θ_{1}$ and $θ_{4}$ are two of the Jacobi theta functions.

Certain values of the gamma function can also be written in terms of the hypergeometric function. For instance, $$\Gamma\left(\frac{1}{4}\right)^{4}=\frac{32\pi^{3}}{\sqrt{33}} {}_{3}F_{2}\left(\frac{1}{2},\ \frac{1}{6},\ \frac{5}{6};\ 1,\ 1;\ \frac{8}{1331}\right)$$

and

$$\Gamma\left(\frac{1}{3}\right)^{6}=\frac{12\pi^{4}}{\sqrt{10}} {}_{3}F_{2}\left(\frac{1}{2},\ \frac{1}{6},\ \frac{5}{6};\ 1,\ 1;\ -\frac{9}{64000}\right)$$

however it is an open question whether this is possible for all rational inputs to the gamma function.

Products
Some product identities include:


 * $$ \prod_{r=1}^2 \Gamma\left(\tfrac{r}{3}\right) = \frac{2\pi}{\sqrt 3} \approx 3.627\,598\,728\,468\,435\,7012$$
 * $$ \prod_{r=1}^3 \Gamma\left(\tfrac{r}{4}\right) = \sqrt{2\pi^3} \approx 7.874\,804\,972\,861\,209\,8721$$
 * $$ \prod_{r=1}^4 \Gamma\left(\tfrac{r}{5}\right) = \frac{4\pi^2}{\sqrt 5} \approx 17.655\,285\,081\,493\,524\,2483$$
 * $$ \prod_{r=1}^5 \Gamma\left(\tfrac{r}{6}\right) = 4\sqrt{\frac{\pi^5}3} \approx 40.399\,319\,122\,003\,790\,0785$$
 * $$ \prod_{r=1}^6 \Gamma\left(\tfrac{r}{7}\right) = \frac{8\pi^3}{\sqrt 7} \approx 93.754\,168\,203\,582\,503\,7970$$
 * $$ \prod_{r=1}^7 \Gamma\left(\tfrac{r}{8}\right) = 4\sqrt{\pi^7} \approx 219.828\,778\,016\,957\,263\,6207$$

In general:
 * $$ \prod_{r=1}^n \Gamma\left(\tfrac{r}{n+1}\right) = \sqrt{\frac{(2\pi)^n}{n+1}}$$

Other rational relations include


 * $$\frac{\Gamma\left(\tfrac15\right)\Gamma\left(\tfrac{4}{15}\right)}{\Gamma\left(\tfrac13\right)\Gamma\left(\tfrac{2}{15}\right)} = \frac{\sqrt{2}\,\sqrt[20]{3}}{\sqrt[6]{5}\,\sqrt[4]{5-\frac{7}{\sqrt 5}+\sqrt{6-\frac{6}{\sqrt 5}}}}$$


 * $$\frac{\Gamma\left(\tfrac{1}{20}\right)\Gamma\left(\tfrac{9}{20}\right)}{\Gamma\left(\tfrac{3}{20}\right)\Gamma\left(\tfrac{7}{20}\right)} = \frac{\sqrt[4]{5}\left(1+\sqrt{5}\right)}{2}$$


 * $$\frac{\Gamma\left(\frac{1}{5}\right)^2}{\Gamma\left(\frac{1}{10}\right)\Gamma\left(\frac{3}{10}\right)} = \frac{\sqrt{1+\sqrt{5}}}{2^{\tfrac{7}{10}}\sqrt[4]{5}}$$

and many more relations for $Γ(n⁄d)$ where the denominator d divides 24 or 60.

Imaginary and complex arguments
The gamma function at the imaginary unit $i = √−1$ gives, :
 * $$\Gamma(i) = (-1+i)! \approx -0.1549 - 0.4980i.$$

It may also be given in terms of the Barnes $G$-function:


 * $$\Gamma(i) = \frac{G(1+i)}{G(i)} = e^{-\log G(i)+ \log G(1+i)}.$$

Because of the Euler Reflection Formula, and the fact that $$\Gamma(\bar{z})=\bar{\Gamma}(z)$$, we have an expression for the modulus squared of the gamma function evaluated on the imaginary axis:


 * $$\left|\Gamma(i\kappa)\right|^2=\frac{\pi}{\kappa\sinh(\pi\kappa)}$$

The above integral therefore relates to the phase of $$\Gamma(i)$$.

The gamma function with other complex arguments returns
 * $$\Gamma(1 + i) = i\Gamma(i) \approx 0.498 - 0.155i$$
 * $$\Gamma(1 - i) = -i\Gamma(-i) \approx 0.498 + 0.155i$$
 * $$\Gamma(\tfrac12 + \tfrac12 i) \approx 0.818\,163\,9995 - 0.763\,313\,8287\, i$$
 * $$\Gamma(\tfrac12 - \tfrac12 i) \approx 0.818\,163\,9995 + 0.763\,313\,8287\, i$$
 * $$\Gamma(5 + 3i) \approx 0.016\,041\,8827 - 9.433\,293\,2898\, i$$
 * $$\Gamma(5 - 3i) \approx 0.016\,041\,8827 + 9.433\,293\,2898\, i.$$

Other constants
The gamma function has a local minimum on the positive real axis


 * $$x_{\min} = 1.461\,632\,144\,968\,362\,341\,262\ldots\,$$

with the value


 * $$\Gamma\left(x_{\min}\right) = 0.885\,603\,194\,410\,888\ldots\,$$.

Integrating the reciprocal gamma function along the positive real axis also gives the Fransén–Robinson constant.

On the negative real axis, the first local maxima and minima (zeros of the digamma function) are: