N=5 k=3 решить все эти или хотя бы часть .

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Ответ:

tatyana171283t

29.10.2021 16:22

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Ответ:

Milka0102

17.04.2022 02:15

Решить систему:

$\dispaystyle \left \{ {{ \frac{567-9^{-x}}{81-3^{-x}} \geq 7 \atop {log_{0.25x^2} \frac{x+12}{4} \leq 1}} \right.$

решаем неравенства

1)
$\dispaystyle \frac{576-3^{-2x}}{81-3^{-x}} \geq 7$

$\dispaystyle (\frac{1}{3})^x=y$

$\dispaystyle \frac{567-y^2}{81-y} \geq 7\\ \frac{567-y^2-7*81+7y}{81-y} \geq 0\\ \frac{y(7-7y)}{81-y} \geq 0$

$\dispaystyle y \neq 0. y \neq 81; y=7$

+ - +
-----7----------81---

$\dispaystyle \frac{1}{3}^{x} \leq 7\\x \geq log_{1/3}7$

$\dispaystyle \frac{1}{3}^x\ \textgreater \ 81\\x\ \textless \ -4$

2)

$\dispaystyle log_{0.25x^2} \frac{x+12}{4} \leq 1$

1. 0.25x²>1; x∈(-oo;-2)∪(2;+oo)

$\dispaystyle \frac{x+12}{4} \leq 0.25x^2\\x+12-x^2 \leq 0\\x^2-x-12 \geq 0$
x∈(-oo;-3]∪[4;+oo)

2) 0<0.25x²<1; x∈(-2;2)

$\dispaystyle \frac{x+12}{4} \geq 0.25x^2\\x+12-x^2 \geq 0\\x^2-x-12 \leq 0$
x∈[-3;4] и с учетом условия x∈(-2;2)

объединяем все промежутки

---- (- 4) -------( - 3) ------( - 2) -------( - log₃7)-------(2 )----- (4 )----
///// ////////////////////////////////////////
\\\\\\\\\\\\\\\\\\\\\\\\\\\ \\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\ \\\\\\\\\\\\\\\\

ответ : (-oo;-4)∪(-log₃7;2)∪(4;+oo)

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