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SociometricStar

Answer:

Transitive property of inequality.

Step-by-step explanation:

Transitive property of inequality states that if

[tex]a\leq b\text{ and }b\leq c\text{ then }a\leq c[/tex]

[tex]a\geq b\text{ and }b\geq c\text{ then }a\geq c[/tex]

Now, the given conditions are x ≤ 5 and 5 ≤ y, then x ≤ y

It is same as the transitive property stated above. When we compare, we get

a = x, b = 5, c = y

Therefore, the given inequalities is transitive property of inequality.

mixter17

Hello!

The answer is: The transitive property.

Why?

Inequalities express the relative size between two values/numbers.

The transitive property of inequalities states that there's a way to relate two or more inequalities when they have at least a common value, and we can use it to create a relationship with a third or more values/variables.

For your statement, we have

A common value which is 5

Two inequalities expressing a relative size between two variables and a common value which is 5:

[tex]x\leq 5\\5\leq y[/tex]

So, the inequalities are telling us that the common value (5) is higher or equal than x

and, the variable y is higher or equal than  5

So, using the transitive property we can safely assume that, y is higher or equal, than x

[tex]x\leq y[/tex]

Have a nice day!