Which of the following is not a linear inequation? 1. 3x - 8 > 5 + 2x 2. 5/2 x -3 ≤ 9/4 x + 12 3. 4x -7/3 ≤ 13x + 8 4. 6x + 13 < 4/x -3

Solving, option 4 : Case 1 : If x is positive, Case 2 : If x is negative, Since, the highest power of x is 2. is not linear. Hence, Option 4 is the correct option.

Mathematics

Which of the following is not a linear inequation?
3x - 8 > 5 + 2x
$\dfrac{5}{2}x - 3 \le \dfrac{9}{4}x + 12$
$4x - \dfrac{7}{3} \ge 13x + 8$
$6x + 13 \lt \dfrac{4}{x} - 3$

Linear Inequations

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Answer

Solving, option 4 :

$\Rightarrow 6x + 13 \lt \dfrac{4}{x} - 3 \\[1em] \Rightarrow 6x + 13 \lt \dfrac{4 - 3x}{x} \\[1em]$

Case 1 : If x is positive,

$\Rightarrow x (6x + 13) \lt 4 - 3x \\[1em] \Rightarrow 6x^2+ 13x \lt 4 - 3x \\[1em] \Rightarrow 6x^2+ 13x + 3x \lt 4 \\[1em] \Rightarrow 6x^2+ 16x \lt 4 \\[1em]$

Case 2 : If x is negative,

$\Rightarrow x(6x + 13) \gt 4 - 3x \\[1em] \Rightarrow 6x^2 + 13x \gt 4 - 3x \\[1em] \Rightarrow 6x^2 + 13x + 3x \gt 4 \\[1em] \Rightarrow 6x^2 + 16x \gt 4 \\[1em]$

Since, the highest power of x is 2.

$\therefore 6x + 13 \lt \dfrac{4}{x} - 3$ is not linear.

Hence, Option 4 is the correct option.

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Mathematics

Which of the following is not a linear inequation?
3x - 8 > 5 + 2x
$\dfrac{5}{2}x - 3 \le \dfrac{9}{4}x + 12$
$4x - \dfrac{7}{3} \ge 13x + 8$
$6x + 13 \lt \dfrac{4}{x} - 3$

Linear Inequations

Answer

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