1) x²-(2x-1)/3≥2x+4|·3; 3x²-(2x-1) ≥ 6x+12; 3x²-2x+1 ≥ 6x+12; 3x²-8x - 11 ≥ 0; 3x²-8x - 11 = 0; D = 64 + 132 = 196; √D=14; x₁ = (8+14)/6 = 11/3; x₂ = (8-14)/6 = -1;
Ответ: x∈(-∞; -1]U[11/3; ∞).
2) (x² + 10x)/10 - (2x + 5)/2 ≤ 20|·10; x² + 10x - 5·(2x + 5) ≤ 200; x² + 10x - 10x - 25 ≤ 200; x² ≤ 225; |x| ≤ 15; -15 ≤ x ≤ 15/
Ответ: x∈[-15; 15].
3) 6x² + 1 > 5x - x²/4|·4; 24x² + 4 > 20x - x²; 25x² - 20x + 4 > 0; 25x² - 20x + 4 = 0; (5x - 2)² > 0; x ≠ 0,4.
Ответ: x∈(-∞; 0,4)U(0,4; ∞).
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1) x²-(2x-1)/3≥2x+4|·3; 3x²-(2x-1) ≥ 6x+12; 3x²-2x+1 ≥ 6x+12; 3x²-8x - 11 ≥ 0; 3x²-8x - 11 = 0; D = 64 + 132 = 196; √D=14; x₁ = (8+14)/6 = 11/3; x₂ = (8-14)/6 = -1;
Ответ: x∈(-∞; -1]U[11/3; ∞).
2) (x² + 10x)/10 - (2x + 5)/2 ≤ 20|·10; x² + 10x - 5·(2x + 5) ≤ 200; x² + 10x - 10x - 25 ≤ 200; x² ≤ 225; |x| ≤ 15; -15 ≤ x ≤ 15/
Ответ: x∈[-15; 15].
3) 6x² + 1 > 5x - x²/4|·4; 24x² + 4 > 20x - x²; 25x² - 20x + 4 > 0; 25x² - 20x + 4 = 0; (5x - 2)² > 0; x ≠ 0,4.
Ответ: x∈(-∞; 0,4)U(0,4; ∞).