User:Pmattos~enwiki

FogBugz
$$F(k, x) = \ldots$$

$$F_k(x) = \ldots$$

$$F^k(x) = \ldots$$

$$\int_{x=a}^{x=b} F(k, x)\mathbf{d}x \rightarrow F(k)$$

$$x_i = [x_i^{min},x_i^{max}]$$

$$X = (x_1^{H},\ldots,x_j^{H},x_1^{A},\ldots,x_k^{A})$$

$$X^{'} = (x_1^{S},\ldots,x_j^{S},x_1^{A},\ldots,x_k^{A})$$

X = expected n-dimensional interval

$$\sum_{k=1}^m f(P_k)\,\operatorname{m}(C_k)$$

Actions
Action parameter vector (i.e., action inputs):
 * $$\overrightarrow{p} = (p_1,\ldots,p_k)$$
 * $$\overrightarrow{p} = (\overbrace{ p_1^{h},\ldots,p_i^{h} }^{human}, \overbrace{ p_1^{a},\ldots,p_j^{a} }^{action}),\quad k = i + j$$
 * $$k = i + j$$

Action random vector (i.e., action outputs), random variable, and a specific instance:
 * $$\overrightarrow{X} = (X_1,\ldots,X_n)$$
 * $$\overrightarrow{x} = (x_1,\ldots,x_n)$$

Human guessing action parameters:
 * $$p_i^* = G^h_i(p_1,\ldots,p_k)$$

Human prediction function:
 * $$P^h(\overrightarrow{X} \in T) = \iint\ldots\int_\mathbf{T}\, P^a(p_1^*,\ldots,p_k^*,x_1,\ldots,x_n)\; \mathbf{d}x_1\ldots\mathbf{d}x_n$$


 * Math LaTex

Testing
$$x \over y$$

$$x \to y$$

$$x \subset y$$