Math and Arithmetic
Numbers
Irrational Numbers

# Is 3.14 a rational or irrational number?

###### Wiki User

3.14 is a rational number pi is not. pi is not 3.14

๐
0
๐คจ
7
๐ฎ
2
๐
3

Rational

๐
3
๐คจ
0
๐ฎ
0
๐
0

## Related Questions

A rational number is a real number which can be expressed as a division of two integers. A real number which is not rational is called irrational. Since 3.14 = 314/100 and 314 &amp; 100 are integers it is a rational number.

3.14 is the ratio of 314 to 100 so it's rational.

No, 3.14 is not an irrational number.

No, they are complementary sets. No rational number is irrational and no irrational number is rational.Irrational means not rational.

it is a rational number but 4.121314..... is an irrational no

Such a product is always irrational - unless the rational number happens to be zero.

No number can be rational and irrational at the same time. 3.14 is the ratio of 314:100 and so is rational. HOWEVER, 3.14 is also a common approximation for pi, which is an irrational number. All irrational numbers have infinite, non-recurring decimals and so are often approximated by rationals.

The product of a rational and irrational number can be rational if the rational is 0. Otherwise it is always irrational.

No.A rational times an irrational is never rational. It is always irrational.

If an irrational number is added to, (or multiplied by) a rational number, the result will always be an irrational number.

Irrational. If you multiply a rational number by an irrational number, you will always get an irrational number (except if the rational number happens to be zero).

The sum of a rational and irrational number must be an irrational number.

When a rational numbers is divided by an irrational number, the answer is irrational for every non-zero rational number.

Can be irrational or rational.1 [rational] * sqrt(2) [irrational] = sqrt(2) [irrational]0 [rational] * sqrt(2) [irrational] = 0 [rational]

Is 12.05 a rational number or irrational number?

###### Math and ArithmeticNumbers Irrational Numbers

Copyright ยฉ 2021 Multiply Media, LLC. All Rights Reserved. The material on this site can not be reproduced, distributed, transmitted, cached or otherwise used, except with prior written permission of Multiply.