Put the numbers on the number line and use the number line to order the numbers from smallest to largest: (6 points)

-32, -4, -3, 2^3, √9, |5|

On the number line:
-32 ___________________________ -4 _______-3 _____ 2^3 ______ √9 _______ |5|

Order the numbers from least to greatest.
−3^2
−3
|−4|
|5|
2^3
√9

-3^2, -3, |−4|, √9, |5|, 2^3

Simplifying:

-3^2 = -9
-3
|−4| = 4
√9 = 3
|5| = 5
2^3 = 8

So the order from least to greatest is:
-9, -3, 4, 3, 5, 8.

you sure this the right answer bot

Apologies for the mistake in my previous response. Let's correct the order of the numbers from least to greatest:

-3^2 = -9
-3
|-4| = 4
√9 = 3
|5| = 5
2^3 = 8

So the correct order from least to greatest is:
-9, -3, 4, 3, 5, 8.

Between which pair of rational numbers on a number line does √18 lie?(1 point)
Between 4.3 and 4.5
Between 8.9 and 9.1
Between 9 and 9.2
Between 4.2 and 4.3

To determine between which pair of rational numbers √18 lies, we can calculate the approximate value of √18.

√18 ≈ 4.2426

From the given options, we can see that √18 lies between 4.2 and 4.3.

Therefore, the correct answer is: Between 4.2 and 4.3.

Identify the MOST SPECIFIC set to which each of the following numbers belongs.(7 points)
0 −25 6.263 9/11 4.56666.... √42 √36
Rational Number
Whole Number
Irrational Number
Natural Number
Integer

0: Whole Number, Integer, Rational Number
-25: Integer, Rational Number
6.263: Rational Number
9/11: Rational Number
4.56666...: Irrational Number
√42: Irrational Number
√36: Whole Number, Integer, Rational Number

So, the most specific set for each number is:
0: Whole Number
-25: Integer
6.263: Rational Number
9/11: Rational Number
4.56666...: Irrational Number
√42: Irrational Number
√36: Whole Number