Table of Contents

- 1 Is this rational or irrational number?
- 2 Is 0.1875 rational or irrational?
- 3 Is 8.33865 rational or irrational?
- 4 Is 2.010010001 Rational or irrational?
- 5 Is 3.275 a rational number?
- 6 Is 4.567 an irrational number?
- 7 What are numbers which are not rational numbers?
- 8 Which is an irrational number that cannot be written as a ratio?

## Is this rational or irrational number?

An irrational number is a number that cannot be written as the ratio of two integers. Its decimal form does not stop and does not repeat. Let’s summarize a method we can use to determine whether a number is rational or irrational. stops or repeats, the number is rational.

## Is 0.1875 rational or irrational?

Is 0.1875 a rational number? 1875 is a rational number because it can be expressed as the quotient of two integers: 1875 ÷ 1.

**Is 0.013378966667772845 a rational or irrational number?**

Is 0.013378966667772845 a rational number? Answer: it is an irrational number.

**Is 5.636336333 rational or irrational?**

A perfect square is a number that is the square of an integer. The first three integer perfect squares are 1, 4, and 9. -81,572 is an integer and can be written as the fraction =3,572 so it is rational Rational -81,572 116 Irrational V11 5.636336333… 11 is not a perfect square, so V11 is irrational.

### Is 8.33865 rational or irrational?

Number | Rational or Irrational (circle) |
---|---|

8.33865 . . . | rational or irrational |

12 – 2 | rational or irrational |

3.14141414 . . . | rational or irrational |

0 | rational or irrational |

### Is 2.010010001 Rational or irrational?

It is a rational number, not irrational as it can be written in the form of p/q where and q are integers and q is not equal to 0…… The decimal expansion of 2.010010001 is Terminating and Non-Repeating.

**Is 0.12121212 a rational number?**

Therefore, 0.12121212…. = 12/99, which is a ratio of two nonzero integers and thus is a rational number.

**Is 0.5454454445 a rational number?**

The first rational number we should know what is irrational number. It is non-terminating number So the answer is 0.5454454445……….

## Is 3.275 a rational number?

Yes, as it is a terminating decimal number.

## Is 4.567 an irrational number?

An irrational number is a number that cannot be written in the form where a and bare integers and b 0. The number 0.24758326… is irrational because the decimal expansion is nonrepeating and nonterminating. 4.567 as irrational because it does not repeat.

**Is 3.142 a irrational number?**

Examples of irrational numbers are π (the ratio of a circle’s circumference to its diameter) and the square roots of most positive integers, such as 2 . 7 22 = 3.142857… , one rational number between the two is 3.142.

**Is the number 36 a rational or irrational number?**

Square roots of perfect squares are always whole numbers, so they are rational. But the decimal forms of square roots of numbers that are not perfect squares never stop and never repeat, so these square roots are irrational. 1. The number 36 36 is a perfect square, since 6 2 = 36 6 2 = 36. So √ 36 = 6 36 = 6. Therefore √ 36 36 is rational.

### What are numbers which are not rational numbers?

What is Irrational Number? The numbers which are not a rational number are called irrational numbers. Now, let us elaborate, irrational numbers could be written in decimals but not in the form of fractions, which means it cannot be written as the ratio of two integers.

### Which is an irrational number that cannot be written as a ratio?

An irrational number is a number that cannot be written as a ratio (or fraction). In decimal form, it never ends or repeats. The ancient Greeks discovered that not all numbers are rational; there are equations that cannot be solved using ratios of integers. The first such equation to be studied was 2 = x 2.

**Can a rational number be written in latex?**

A rational number is a number that can be written in the form [latex]frac{p}{q}latex],&] where [latex]p[/latex] and [latex]q[/latex] are integers and [latex]qne o[/latex]. All fractions, both positive and negative, are rational numbers.