Create the page "Arg" on this wiki! See also the search results found.
- <center><math> \arg\max_{\omega_{i} \in \big\{\omega_{1}, \cdots ,\omega_{c}\big\} } Prob \b \arg\max_{\omega_{i} \in \big\{\omega_{1}, \cdots ,\omega_{c}\big\} } \rho \17 KB (2,590 words) - 10:45, 22 January 2015
- ...\ d u = \ln \operatorname{th}\,\frac{2}{2}+C \qquad or \ - \operatorname{Arg coth} \ e^u+C</math>5 KB (942 words) - 18:13, 26 February 2015
- In other words,<math>\hat{\theta}</math> = arg max<sub>θ</sub> L(θ), where <math>\hat{\theta}</math> is the best estimat12 KB (1,986 words) - 10:49, 22 January 2015
- arg \max \limits_{i} p({\mathbf{x}}|\omega_i)P(\omega_i).9 KB (1,382 words) - 10:47, 22 January 2015
- <center><math>arg \min \limits_{c,b} \quad\quad \frac{1}{2}||c||^2</math>,</center><center><b <center><math>arg \min \limits_{c,b} \quad\quad \frac{1}{2}||c||^2 +C\sum_{i=1}^{n} \xi_i</ma14 KB (2,241 words) - 10:56, 22 January 2015
- <center><math>\hat{\theta}_{\mathrm{ML}}(x)= \underset{\theta}{\operatorname{arg\,max}} \ f(x | \theta) </math></center>10 KB (1,600 words) - 10:52, 22 January 2015
- <center><math>\hat{\theta} = \arg\max_{\theta \in \Omega} p_{\theta}(Y)</math></center> <center><math> = \arg\max_{\theta \in \Omega} \log p_{\theta}(Y)</math></center>19 KB (3,418 words) - 10:50, 22 January 2015
- 1, & \text{if } k = \arg \min_j ||\boldsymbol{x}_n-\boldsymbol{\mu}_k||^2\\8 KB (1,350 words) - 10:57, 22 January 2015
- <math> \alpha_{k} = arg\min_{\alpha \ge 0}f(x^{(k)} + \alpha d^{(k)}) .</math>4 KB (642 words) - 12:23, 25 March 2015
- ...-moz-initial; font-size: 110%;" colspan="2" | Inverse Hyperbolic Cosine ( arg ch x) | <math> \int\arg ch\dfrac{x}{a}dx=\begin{cases}8 KB (1,479 words) - 17:44, 26 February 2015
- ...-moz-initial; font-size: 110%;" colspan="2" | Inverse Hyperbolic Tangent ( arg th x) | <math> \int\arg th\dfrac{x}{a}dx=x\arg th\dfrac{x}{a}+\dfrac{a}{2}\ln(a^{2}-x^{2}) +C</math>3 KB (453 words) - 17:46, 26 February 2015
- ...oz-initial; font-size: 110%;" colspan="2" | Inverse Hyperbolic Cotangent ( arg coth x) | <math> \int\arg coth\dfrac{x}{a}dx=x\arg coth x+\dfrac{a}{2}\ln(x^{2}-a^{2}) +C</math>3 KB (477 words) - 17:48, 26 February 2015
- | <math> \int\arg ch\dfrac{a}{x}dx=\begin{cases} \dfrac{x\arg ch\dfrac{a}{x}+\arcsin\dfrac{x}{a}}{x\arg ch\dfrac{a}{x}-\arcsin\dfrac{x}{a}} & .\end{cases} +C</math>3 KB (624 words) - 17:52, 26 February 2015
- ...: -moz-initial; font-size: 110%;" colspan="2" | Inverse Hyperbolic Sine ( arg sh x) | <math> \int\arg sh\dfrac{x}{a}dx=x\arg sh\dfrac{x}{a}-\sqrt{x^{2}+a^{2}} +C</math>7 KB (1,378 words) - 17:42, 26 February 2015
- ...\sqrt{x^2+a^2}} = \ln\left(x+\sqrt{x^2+a^2}\right) \qquad o\grave{u}\qquad Arg sh \dfrac{x}{a}+C</math>14 KB (2,540 words) - 18:03, 26 February 2015
- z_k =|p_0|^{\frac{1}{N}} e^{j \frac{(\text{arg }p_0+2\pi k)}{N}}4 KB (625 words) - 13:17, 16 November 2015
- z_k =|p_0|^{\frac{1}{N}} e^{j \frac{(\text{arg }p_0+2\pi k)}{N}}3 KB (503 words) - 15:44, 8 November 2016
- int8NDArray arg = args(0).vector_value(); ...int8_t in[8] = {arg(0), arg(1), arg(2), arg(3), arg(4), arg(5), arg(6), arg(7)};11 KB (1,666 words) - 02:18, 30 November 2016
