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Maxwell edited untitled.tex
almost 8 years ago
Commit id: 6dce2292f5e3603963a8e4fc0cde27afb8693b35
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Пусть: $E(e^{2}_{t})=a; \delta^{2}_{E}=b; \delta^{2}_{N}=c;$ Тогда:
$$
E(e^{2}_{t+1})=(1-\frac{E(e^{2}_{t})+\delta^{2}_{E}}{E(e^{2}_{t})+\delta^{2}_{E}+\delta^{2}_{N}})^{2}\cdot (E(e^{2}_{t})+\delta^{2}_{E})+(\frac{E(e^{2}_{t})+\delta^{2}_{E}}{E(e^{2}_{t})+\delta^{2}_{E}+\delta^{2}_{N}})^{2}\cdot
c=\frac{c^{2}\cdot \delta^{2}_{N}=\frac{c^{2}\cdot (a+b)}{(a+b+c)^{2}}+\frac{c\cdot (a+b)^{2}}{(a+b+c)^{2}}=\\=\frac{c\cdot (a+b)\cdot (c+a+b)}{(a+b+c)^{2}}=\frac{c\cdot (a+b)}{a+b+c}=\frac{\delta^{2}_{N}\cdot (E(e^{2}_{t})+\delta^{2}_{E})}{E(e^{2}_{t})+\delta^{2}_{E}+\delta^{2}_{N}}
$$
Таким образом, получаем:
$$