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Which inequality is true?

A. [tex]-1.5 \ \textgreater \ -0.5[/tex]
B. [tex]-\frac{1}{2} \ \textgreater \ 0[/tex]
C. [tex]-2.5 \ \textless \ -2[/tex]
D. [tex]-1 \frac{1}{2} \ \textgreater \ 1.5[/tex]

Sagot :

GinnyAnsweridn
To determine which inequality is true, let’s analyze each one carefully.

1. Inequality: [tex]\( -1.5 > -0.5 \)[/tex]

To compare these numbers, note that on the number line, [tex]\( -1.5 \)[/tex] is to the left of [tex]\( -0.5 \)[/tex], since [tex]\( -1.5 \)[/tex] is more negative. Therefore:
[tex]\[ -1.5 > -0.5 \quad \text{is false}. \][/tex]

2. Inequality: [tex]\( -\frac{1}{2} > 0 \)[/tex]

Here, we are comparing [tex]\( -0.5 \)[/tex] and 0. Since [tex]\( -0.5 \)[/tex] is a negative number and 0 is neither positive nor negative:
[tex]\[ -0.5 > 0 \quad \text{is false}. \][/tex]

3. Inequality: [tex]\( -2.5 < -2 \)[/tex]

For this inequality, observe that [tex]\( -2.5 \)[/tex] is further to the left of [tex]\( -2 \)[/tex] on the number line, as it is more negative:
[tex]\[ -2.5 < -2 \quad \text{is true}. \][/tex]

4. Inequality: [tex]\( -1 \frac{1}{2} > 1.5 \)[/tex]

Convert the mixed number to an improper fraction or decimal to compare:
[tex]\[ -1 \frac{1}{2} = -1.5 \][/tex]
Comparing [tex]\( -1.5 \)[/tex] and 1.5, note that [tex]\( -1.5 \)[/tex] is a negative number and is always less than any positive number:
[tex]\[ -1.5 > 1.5 \quad \text{is false}. \][/tex]

After this analysis, we conclude that the true inequality is:
[tex]\[ -2.5 < -2 \][/tex]

Therefore, the correct inequality is:
[tex]\[ -2.5 < -2 \][/tex]

This inequality is true.
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