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Choose the two values that are solutions of the inequality [tex]\(-b \leq -2(3+b)\)[/tex].

A. 0
B. -6
C. 6
D. -12
E. -1

Sagot :

GinnyAnswer
Let's solve the inequality [tex]\( -b \leq -2(3 + b) \)[/tex] step by step.

1. Distribute the [tex]\(-2\)[/tex] inside the parentheses on the right side:
[tex]\[ -b \leq -2 \cdot 3 + (-2) \cdot b \implies -b \leq -6 - 2b \][/tex]

2. Isolate [tex]\(b\)[/tex] on one side. To do this, add [tex]\(2b\)[/tex] to both sides of the inequality:
[tex]\[ -b + 2b \leq -6 - 2b + 2b \implies b \leq -6 \][/tex]

So far we have determined:
[tex]\[ b \leq -6 \][/tex]

Since there are no further terms to isolate or simplify, this is our solution expressed in interval notation.

Therefore, [tex]\( -\infty < b \leq -6 \)[/tex]. Looking for specific values that satisfy this inequality from the given choices:

Given choices:
1. [tex]\(0\)[/tex]
2. [tex]\(-6\)[/tex]
3. [tex]\(6\)[/tex]
4. [tex]\(-12\)[/tex]
5. [tex]\(-1\)[/tex]

The values that satisfy [tex]\(b \leq -6\)[/tex] from the given options are:
- [tex]\( -6 \)[/tex] (since [tex]\(-6 = -6\)[/tex])
- [tex]\( -12 \)[/tex] (since [tex]\(-12 < -6\)[/tex])

Thus, the values that satisfy the inequality are:
[tex]\[ -6 \quad \text{and} \quad -12 \][/tex]
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