Anterolateral Algebra 2
Description
Code & $\frac{\mathrm{num1} \leftarrow \mathrm{input()}}{\Delta}$, $\frac{\mathrm{num2} \leftarrow \mathrm{input()}}{\Delta}$, $\frac{\mathrm{sum} \leftarrow \mathrm{num1} + \mathrm{num2}}{\Delta}$, $\frac{\mathrm{output}(\mathrm{sum})}{\Delta}$ \\ \hline
Anterolateral Algebra Forma & h=$\frac{(\sqrt{(l \alpha + x \gamma - r \theta) \sqrt{1-(v)^2/c^2}}\sqrt{(l \alpha - x \gamma + r \theta)/\sqrt{1-(v)^2/c^2}})}{\alpha}$ \\ \hline
Algebraic Relationships & $f (x) = g (x) \bullet h (x) = \nabla g (x) \bullet \nabla h (x)$ \\ \hline
Integro-differential Equations & $\frac{\partial \phi(\mathbf{x})}{\partial x_1} a_1 + \frac{\partial \phi(\mathbf{x})}{\partial x_2} a_2 + \cdots + \frac{\partial \phi(\mathbf{x})}{\partial x_n} a_n$ \\ \hline
Energy Number Transformation & $\frac{f_{PQ}(x) - f_{RS}(x)}{\Delta}$, $\frac{f_{TU}(x) - f_{RS}(x)}{\Delta}$, $\frac{f_{PQ}(x) - f_{TU}(x)}{\Delta}$ \\ \hline
Topology to Summation & Product & $\frac{\mathbb{V} \to \mathbb{U}}{\Delta}$, $\frac{\sum_{f \subset g} f(g)}{\Delta}$, $\frac{\sum_{h \to \infty} \tan t \cdot \prod_{\Lambda} h}{\Delta}$ \\ \hline
Existence & $\frac{\leftrightarrow \exists y \in \mathbb{U} : f(y) = x}{\Delta}$, $\frac{\leftrightarrow \exists s \in S : x = T(s)}{\Delta}$, $\frac{\leftrightarrow x \in f \circ g}{\Delta}$ \\ \hline
Symbolic Analogic & $\frac{\forall y \in \mathbb{N}, P(y) \to Q(y)}{\Delta}$, $\frac{\exists x \in \mathbb{N}, R(x) \wedge S(x)}{\Delta}$, $\frac{\forall z \in \mathbb{N}, T(z) \lor U(z)}{\Delta}$ \\ \hline
Differentiation & $\frac{D[v1\to v2, v]}{\Delta}$, $\frac{D[v2\to v3, v]}{\Delta}$ \\ \hline
Files
Anterolateral Algebra 2.zip
Files
(214.6 kB)
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