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Chapter 9: Problem 32

Order each set of numbers from greatest to least. $$-10,-10 \frac{1}{2},-1.05,-\sqrt{105}$$

Short Answer

Expert verified
-1.05, -√105, -10, -10.5

Step by step solution

01

Understand each number

To compare these numbers, we need to understand each one. We have:- \(-10\)- \(-10 \frac{1}{2}\), which is the same as \(-10.5\)- \(-1.05\)- \(-\sqrt{105}\), which is approximately \(-10.247\) since \(\sqrt{105} \approx 10.247\).
02

Compare numerical values

Now we'll order the numbers by comparing each:- **\(-1.05\)** (smallest negative value, closest to zero)- **\(-\sqrt{105}\) or \(-10.247\)**- **\(-10\)**- **\(-10.5\)** (largest negative value, farthest from zero)
03

Arrange from greatest to least

Based on our comparisons, arrange the numbers from greatest (closest to zero) to least:1. \(-1.05\)2. \(-\sqrt{105}\) or \(-10.247\)3. \(-10\)4. \(-10.5\)

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Comparing Numbers
When we compare numbers, especially those with different formats such as fractions, decimals, and square roots, the goal is to establish their relative sizes on a number line. Each number represents a point in space relative to zero. For negative numbers, being 'greater' means being closer to zero, as these numbers fall on the left side of the number line.
  • First, we need to convert all forms into a comparable format, such as decimals. This simplifies the process of comparison.
  • A trick is to think of negative numbers in terms of distance from zero. The closer a negative number is to zero, the "larger" it is, since it represents a smaller negative value.
By using these strategies, you can easily place numbers in order from greatest to least without confusion. Converting all numbers to decimals ensures consistency across comparisons.
Negative Numbers
Negative numbers can sometimes be tricky. They represent values less than zero and are located on the left side of a number line. Comparing negative numbers involves some simple but important rules:
  • A negative number with a smaller absolute value is larger. For example, between (-2 and -5, -2 is greater than -5).
  • The further you move left on the number line, the smaller the value.
  • Negative numbers can appear in various forms: fractions, decimals, or square roots. Parsing these into the same format helps with their comparison.
Understanding these concepts ensures that you'll approach problems with a logical strategy based on the placement on the number line. The number closest to zero is always greater in the realm of negative numbers.
Approximating Square Roots
Square roots often deliver non-integer results, especially when dealing with numbers that aren't perfect squares. Approximating these values helps in accurate comparisons:
  • For a non-perfect square such as 105, try to identify the two nearest perfect squares (e.g., 100 and 121) to narrow down the estimate.
  • Since 105 falls between 100 ( or 10) and 121 ( or 11), we know \( \sqrt{105} \) is between 10 and 11.
  • Utilizing calculators or more advanced techniques like averaging can tighten this estimate; here \( \sqrt{105} \approx 10.247\)
Approximating square roots is a valuable skill, making it easier to compare them alongside other numerical forms such as decimals and fractions. Always aim for the closest approximation to ensure precise ordering of numbers.

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Most popular questions from this chapter

Order each set of numbers from least to greatest. $$4 . \overline{23}, 4 \frac{2}{3}, \sqrt{18}, \sqrt{16}$$

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