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Solve the following inequality for x: 2x2– 2 ≤ 3x

asked Apr 2, 2022 39.8k views

5 votes

Solve the following inequality for x:
2x2– 2 ≤ 3x

Mathematics
college

by Joaoal

4.5k points

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2 Answers

4 votes

Answer:

x ∈
[-(1)/(2),2]

Explanation:

Hayman answered Apr 3, 2022

by Hayman

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1 vote

let's solve for x :

$2 {x}^(2) - 2 \leqslant 3x$

$2 {x}^(2) - 3x - 2 \leqslant 0$

$2 {x}^(2) - 4x + x - 2 \leqslant 0$

$2x(x - 2) + 1(x - 2) \leqslant 0$

$(2x + 1)(x - 2) \leqslant 0$

Case 1 :

$(2x + 1) \leqslant 0$

$2x \leqslant - 1$

$x \leqslant - ( 1)/(2)$

Case 2 :

$x - 2 \leqslant 0$

$x \leqslant 2$

combining both inequalities we get :

$x \leqslant - (1)/(2)$

Jfeust answered Apr 7, 2022

by Jfeust

4.7k points

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