Find the largest value of x for which 2x-1 - 9-x and x - W

The correct option is B 3Given that: 2(x 1) ≤ 9 x ⇒ 2x nbsp; 2 ≤ 9 x Rule: If a term of an inequation is transferred from one side to the other side of ...

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Standard X

Mathematics

Reversing the Terms

Find the larg...

Question

Find the largest value of x for which $2 (x - 1) \leq 9 - x$ and $x \in W$ .

3.66

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Solution

The correct option is D 3
Given that: $2 (x - 1) \leq 9 - x$

$\Rightarrow 2 x - 2 \leq 9 - x$

Rule: If a term of an inequation is transferred from one side to the other side of the inequation, the sign of the term gets changed. Let's apply this rule in the above inequation.

$\Rightarrow 2 x + x \leq 9 + 2$

$\Rightarrow 3 x \leq 11$

$\Rightarrow x \leq \frac{11}{3}$

$\Rightarrow x \leq 3.67$

Since, replacement set is the set of all whole numbers, hence solution set is: {0, 1, 2, 3}

$∴$ the largest value of $x$ is 3.

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Find the largest value of x for which 2(x−1) ≤ 9−x and x ∈ W.

Find the largest value of x for which $2 (x - 1) \leq 9 - x$ and $x \in W$ .