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How do you find a rational number between two given rational numbers?
Add them together and divide by 2 will give one of the rational numbers between two given rational numbers.
Insert 2 rational numbers between 3 and 4?
Exploration task: Inserting rational numbers between two given rational numbers 1. Take any two rational numbers. 2. Add them. 3. Divide the result obtained by 2. 4. Observe the number obtained. Is the answer a rational number? Is it between two given numbers? Brainstorming: How many rational numbers can be inserted between two rational numbers?
-155.23333333. rational or irrational?
This number is rational: If the number is exact as given, without the final period/decimal point, it is rational because it can be written with a finite number of digits. If the number is intended to be indicated as the repeating decimal -155.23333333..., then it is rational because numbers that can be written as repeating decimals are rational; this particular one is the sum of -155.2 - (3/100), which can be written as -15523/100.
How many digits between 1 and 1128?
There are 6484 digits BETWEEN the two given numbers.
Given set A equals Whole numbers between and including 0 and 10 and B equals Odd numbers between 4 and 16?
You just state what is given, you need to include the rest of the question for it to be answerable.
How do you find a rational number between two given rational numbers?
Add them together and divide by 2 will give one of the rational numbers between two given rational numbers.
Insert 2 rational numbers between 3 and 4?
Exploration task: Inserting rational numbers between two given rational numbers 1. Take any two rational numbers. 2. Add them. 3. Divide the result obtained by 2. 4. Observe the number obtained. Is the answer a rational number? Is it between two given numbers? Brainstorming: How many rational numbers can be inserted between two rational numbers?
How many rational numbers are between 1 and 1000?
There are an infinite number of rational numbers between any two given numbers.
Name two rational numbers that are close to but smaller than each of the rational numbers given below?
There weren't any numbers given below.
Rational numbers between 3 and 5?
There are infinitely many of them.Some of them are given by:All numbers of the form 3n+1/n for n ∈ the prime numbers are rational numbers between 3 & 4, and as there are an infinite number of prime numbers, there are an infinite number of these.All numbers of the form 4n+1/n for n ∈ the prime numbers are rational numbers between 4 & 5, and as there are an infinite number of prime numbers, there are an infinite number of these.There are still more than the infinitely many given above.
What number matches the number that follows 984339.78?
There is no such number. The given number is rational and rational numbers are infinitely dense. Between any two rational numbers - no matter how close together - there are an infinite number of rational numbers. That means, whatever number you propose as the "next" number, there are infinitely many numbers between 984339.78 and your proposed number. So it cannot be the "next".
Can you get definitely an integer and rational number between any two given numbers?
No. You cannot get an integer between 1.2 and 1.3
Is 0.95832758941. rational or irrational?
0.95832758941 is rational. Rational numbers are numbers that can be written as a fraction. Irrational numbers cannot be expressed as a fraction.
Which is greater the rational numbers or set of integers?
Within a given range, the set of rational numbers is greater. Without a given range, both sets are infinite and a comparison is not very helpful.
Which number is a irrational 317 25 0.6 33?
The given four numbers are all rational numbers
What is the irrational number closets to 13?
There is no such number. Irrational numbers are infinitely dense. Given any number near 13, there are more irrational numbers between that number and 13 than there are rational numbers in all.
What is the rational number between 4over9 and 11over12?
There is not "the" rational number since there are infinitely many. A rational number between the two given numbers is the mean [average] of the two: 0.5*(4/9 + 11/12) = 0.5*(16/36 + 33/36) = 0.5*49/36 = 49/72
