GX07 - Ecouteur Hecate - Notice d'utilisation et mode d'emploi gratuit

MODE D'EMPLOI GX07 Hecate

A. -1, A. 4, -2, -3, -4, -5, -6, -7, -8, -9

+·-

F. 10.2.3.4.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.

(\begin{array}{rl} & {\mathrm{~\textit{A}\sim \textit{a}\sim \textit{b}\sim \textit{c}\sim \textit{d}\sim \textit{e}\sim \textit{f}\sim \textit{g}\sim \textit{h}\sim \textit{i}\sim \textit{k}\sim \textit{l}}\ & {\mathrm{~\textit{a}\sim \textit{a}\sim \textit{b}\sim \textit{c}\sim \textit{d}\sim \textit{e}\sim \textit{f}\sim \textit{g}\sim \textit{h}\sim \textit{i}\sim \textit{k}\sim \textit{l}}}\ & {\mathrm{~\textit{a}\sim \textit{a}\sim \textit{b}\sim \textit{c}\sim \textit{d}\sim \textit{e}\sim \textit{f}\sim \textit{g}\sim \textit{h}\sim \textit{i}\sim \textit{k}\sim \textit{l}}}\ & {\mathrm{~\textit{a}\sim 0.5\mathrm{~\textit{a}}\sim 0.5\mathrm{~\textit{b}}\sim 0.5\mathrm{~\textit{c}}\sim 0.5\mathrm{~\textit{d}}\sim 0.5\mathrm{~\textit{e}}\sim 0.5\mathrm{~\textit{f}}\sim 0.5\mathrm{~\textit{g}}\sim 0.5\mathrm{~\textit{h}}\sim 0.5\mathrm{~\textit{i}}\sim 0.5\mathrm{~\textit{k}}\sim 0.5\mathrm{~\textit{l}}}}\ & {\mathrm{~\textit{a}\sim 0.5\mathrm{~\textit{a}}\sim 0.5\mathrm{~\textit{b}}\sim 0.5\mathrm{~\textit{c}}\sim 0.5\mathrm{~\textit{d}}\sim 0.5\mathrm{~\textit{e}}\sim 0.5\mathrm{\Delta}}}\ & {\mathrm{~\textit{a}\sim 0.5\mathrm{~\textit{a}}\sim 0.5\mathrm{~\textit{b}}\sim 0.5\mathrm{~\textit{c}}\sim 0.5\mathrm{~\textit{d}}\sim 0.5\mathrm{~\textit{e}}\sim 0.5\mathtt{i}}}\ & {\mathrm{~\textit{a}\sim 0.5\mathrm{~\textit{a}}\sim 0.5\mathrm{~\textit{b}}\sim 0.5\mathrm{~\textit{c}}\sim 0.5\mathrm{~\textit{d}}\sim 0.5\mathtt{i}}}\ & {\mathrm{~\textit{a}\sim 0.5\mathrm{~\textit{a}}\sim 0.5\mathrm{~\textit{b}}\sim 0.5\mathrm{~\textit{c}}\sim 0.5\mathtt{i}}}\ & {\mathrm{~\textit{a}\sim 0.5\mathrm{~\textit{a}}\sim 0.5\mathrm{~\textit{b}}\sim 0.5\mathtt{i}}}\ & {\mathrm{~\textit{a}\sim 0.5\mathrm{~\textit{a}}\sim 0.5\mathtt{i}}}\ & {\mathrm{~\textit{a}\sim 0.5\mathtt{i}}}\ & {\mathrm{\Delta = 1 / (2 + \sum_{i = 1}^{n}x_i^2 + x_i^2 + x_i^3 + x_i^4 + x_i^5 + x_i^6 + x_i^7 + x_i^8 + x_i^9 + x_i^10 + x_i^11 + x_i^12 + x_i^13 + x_i^14 + x_i^15 + x_i^16 + x_i^17 + x_i^18 + x_i^19 + x_i^20 + x_i^21 + x_i^22 + x_i^23 + x_i^24 + x_i^25 + x_i^26 + x_i^27 + x_i^28 + x_i^29 + x_i^30 + x_i^31 + x_i^32 + x_i^33 + x_i^34 + x_i^35 + x_i^36 + x_i^37 + x_i^38 + x_i^39 + x_i^40 + x_i^41 + x_i^42 + x_i^43 + x_i^44 + x_i^45 + x_i^46 + x_i^47 + x_i^48 + x_i^49 + x_i^50 + x_i^51 + x_i^52 + x_i^53 + x_i^54 + x_i^55 + x_i^56 + x_i^57 + x_i^58 + x_i^59 + x_i^60 + x_i^61 + x_i^62 + x_i^63 + x_i^64 + x_i^65 + x_i^66 + x_i^67 + x_i^68 + x_i^69 + x_i^70 + x_i^71 + x_i^72 + x_i^73 + x_i^74 + x_i^75 + x_i^76 + x_i^77 + x_i^78 + x_i^79 + x_i^80 + x_i^81 + x_i^82 + x_i^83 + x_i^84 + x_i^85 + x_i^86 + x_i^87 + x_i^88 + x_i^89 + x_i^90 + x_i^91 + x_i^92 + x_i^93 + x_i^94 + x_i^95 + x_i^96 + x_i^97 + x_i^98 + x_i^99 + x_i^{100} - }}\ & {\mathrm{\Delta = 1 / (n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - n - m i s t e r m a l {p h a s e} ^ {2} / p h a s e}.} \end{array}