Ответ:
Объяснение:
[tex]x^{2} +5x-14\geq 0\\x^{2} -2x+7x-14\geq 0\\x(x-2)+7(x-2)\geq 0\\(x+7)(x-2)\geq 0\\x+7\geq 0\\x\geq -7\\x-2\geq 0\\x\geq 2[/tex]
+ + + (-7) - - - (2) + + +
x ∈ (-∞; -7] ∪ [2; +∞)
[tex]\displaystyle x^2+5x-14\geq 0\\x^2+7x-2x-14\geq 0\\x(x+7)-2(x+7)\geq 0\\(x+7)(x-2)\geq 0\\\\\left \{ {{x+7\geq 0} \atop {x-2\geq 0}} \right. \rightarrow \left \{ {{x\geq -7} \atop {x\geq 2}} \right. \rightarrow x \in [2,+ \infty)\\ \\\left \{ {{x+7\leq 0} \atop {x-2\leq 0}} \right. \rightarrow \left \{ {{x\leq -7} \atop {x\leq 2}} \right. \rightarrow x\in (- \infty,-7]\\\\x \in (- \infty,-7] \cup[2,+ \infty)[/tex]
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Answers & Comments
Ответ:
Объяснение:
[tex]x^{2} +5x-14\geq 0\\x^{2} -2x+7x-14\geq 0\\x(x-2)+7(x-2)\geq 0\\(x+7)(x-2)\geq 0\\x+7\geq 0\\x\geq -7\\x-2\geq 0\\x\geq 2[/tex]
+ + + (-7) - - - (2) + + +
x ∈ (-∞; -7] ∪ [2; +∞)
[tex]\displaystyle x^2+5x-14\geq 0\\x^2+7x-2x-14\geq 0\\x(x+7)-2(x+7)\geq 0\\(x+7)(x-2)\geq 0\\\\\left \{ {{x+7\geq 0} \atop {x-2\geq 0}} \right. \rightarrow \left \{ {{x\geq -7} \atop {x\geq 2}} \right. \rightarrow x \in [2,+ \infty)\\ \\\left \{ {{x+7\leq 0} \atop {x-2\leq 0}} \right. \rightarrow \left \{ {{x\leq -7} \atop {x\leq 2}} \right. \rightarrow x\in (- \infty,-7]\\\\x \in (- \infty,-7] \cup[2,+ \infty)[/tex]