RATIONAL NUMBERS
These numbers can be written as fractions
rational number
True or False: Some real numbers can be classified as both Integers and Natural numbers
True
List three examples of real numbers
(any 3 numbers)
√49= ?
7
These rational numbers are referred to as "the counting numbers" and they include 1, 2, 3,
natural numbers?
True or False: Some real numbers can be classified as both Irrational and Imaginary numbers
False
List three examples of integers
(any 3 integers acceptable)
∛854 = ?
Round to the nearest hundredth if there is a decimal.
9.49
These type of rational numbers is all natural numbers including zero
whole numbers?
Given an example of a rational number
Any number that can be written as a fraction is acceptable
List three examples of natural numbers
(any 3 natural numbers are acceptable)
√3= ?
Round to the nearest hundredth if there is a decimal.
1.73
All rational numbers are...
real
An irrational number does not terminate or ________.
Repeat
True or False: The natural numbers are a subset of the integers.
True
Is {-1, 0, 1} a subset of the whole numbers?
If yes, explain why. If no, explain why not.
No.
Negative numbers cannot be whole numbers.
Evaluate: ∛ 2197 + √ 196 = ?
13 + 14 = 27
All rational numbers can be written as a _______________.
Fraction
A decimal that doesn't repeat and continues forever.
Cannot be written as a fraction.
Classify the number in as many ways as possible: -6
Real, rational and integer
What subsets does -4,675 belong?
Real, rational and integers
Which is larger:
√400 or ∛8000?
Trick question: They are the same answer!
Both equal 20.