Find the maximum value of $x$ that satisfies the following inequation:
$- 3 (x - 7) \geq 15 - 7 x > \frac{x + 1}{3}; x \in W .$
1

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Solution

The correct option is A 1
Given: $- 3 (x - 7) \geq 15 - 7 x > \frac{x + 1}{3}$

let's separate the given inequation in two inequations as shown below:

$\begin{matrix} - 3 (x - 7) \geq 15 - 7 x - 3 x + 21 \geq 15 - 7 x 4 x \geq - 6 x \geq \frac{- 6}{4} x \geq - 1.5 \end{matrix} ∣ ∣ ∣ ∣ ∣ ∣ ∣ ∣ \begin{matrix} 15 - 7 x > \frac{x + 1}{3} 15 - \frac{1}{3} > \frac{x}{3} + 7 x \frac{45 - 1}{3} > \frac{x + 21 x}{3} 44 > 22 x 2 > x \end{matrix}$

$∴$ $- 1.5 \leq x < 2$

The same solution set can be represented on the number line as shown below:

The whole numbers lying between -1.5 and 2 are: 0 and 1. Hence, the maximum value of $x$ that satisfies the inequation is 1.

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Find the maximum value of $x$ that satisfies the following inequation:
$- 3 (x - 7) \geq 15 - 7 x > \frac{x + 1}{3}; x \in W .$
1