Question

date: _____________ bell: ____ homework 3: quiz 1 review
directions: name all sets of numbers to which each real number belongs.

1. $-\frac{14}{2}$ 2. $\sqrt{64}$ 3. $0$
2. $\pi$ 5. $0.\overline{45}$ 6. $\frac{3}{8}$

directions: place the letter of each value in its location in the real number system below.
a. $-0.\overline{2}$ b. $18$ c. $-\sqrt{100}$ d. $\pi$ e. $0$ f. $2\frac{1}{6}$ g. $-5$ h. $4.03$ i. $-\sqrt{50}$ j. $\sqrt{\frac{4}{9}}$ k. $\frac{36}{9}$
venn diagram: irrational (circle), rational (circle with nested integers, whole, natural circles)

Explanation:

Problem 1: $-\frac{14}{2}$

Step 1: Simplify the fraction

Simplify $-\frac{14}{2}$: $-\frac{14}{2} = -7$.

Step 2: Identify number sets

• Integers: Integers include all whole numbers and their negatives (..., -3, -2, -1, 0, 1, 2, 3, ...). -7 is an integer.
• Rational Numbers: A rational number is any number that can be expressed as a fraction $\frac{a}{b}$ where $b

eq 0$. Since $-7 = \frac{-7}{1}$, it is rational.

• Real Numbers: All integers and rational numbers are real numbers. So -7 is a real number.

Step 1: Simplify the square root

Simplify $\sqrt{64}$: $\sqrt{64} = 8$.

Step 2: Identify number sets

• Natural Numbers: Natural numbers are positive integers (1, 2, 3, ...). 8 is a natural number.
• Whole Numbers: Whole numbers include 0 and all natural numbers (0, 1, 2, 3, ...). 8 is a whole number.
• Integers: Integers include all whole numbers and their negatives. 8 is an integer.
• Rational Numbers: 8 can be written as $\frac{8}{1}$, so it is rational.
• Real Numbers: 8 is a real number.

Step 1: Identify number sets

• Whole Numbers: Whole numbers include 0 and positive integers. 0 is a whole number.
• Integers: Integers include all whole numbers and their negatives. 0 is an integer.
• Rational Numbers: 0 can be written as $\frac{0}{1}$, so it is rational.
• Real Numbers: 0 is a real number.

Answer:

Integers, Rational Numbers, Real Numbers

Problem 2: $\sqrt{64}$