# Is 1.101001000100001 a rational?

The number,1.101001000100001…, is non-terminating non-repeating (non-recurring), it is an irrational number.

## Is 1.101100110001 a rational number?

As we know for a rational number the number should be in \[\dfrac{p}{q}\] form and \[q \ne 0\] , hence we can say \[1.101100110001\] is a rational number but if we see the question we can say that \[1.101100110001\] lay in the range \[ - 3\] and \[3\] , hence \[1.101100110001\] is a rational number between \[ - 3\] and ...

## Is 7.478478478 a rational number?

so its an irrational number.

## Is 1.01001000100001 a rational number?

1.01001000100001 is a irrational number.

## Is 0.3796 rational or irrational?

Ex1. 3, 9 Classify the following numbers as rational or irrational: (iii) 0.3796 0.3796 it is a terminating decimal therefore, it is a rational number.

## Is 7.484848 a rational number?

so 7.484848…. is a rational number.

## Is 0.6796 rational or irrational?

# It is a rational number because it is terminating.

## Is 1.010010001 rational or irrational?

Therefore, the given number is an irrational number.

## Is 0.05918 a rational number?

(i) 0.05918 is a rational number as decimal expansion is terminating.

## Is 0.853853853 a rational number?

0.853853853.... have non terminating but repeating decimal expansion , So it is a rational number .

## Is 0.010110111 a rational number?

This decimal has 1 one, zero, 2 ones, zero, 3 ones, zero, 4 ones, zero, etc. This decimal does not terminate or start repeating itself so it cannot be a rational. Therefore there are more decimals than rational numbers because 0.010110111… is a decimal and not a rational.

## Is 0.475 a rational number?

Rational numbers are those which can be represented as a ratio where the numerator and denominator both are integers. Thus, 0.475 can be represented as a ratio of 19/40 where both are integers. Hence, 0.475 is a rational number.

## Is 3.141141114 a rational number?

3.141141114 is an irrational number because it is a non-repeating and non-terminating decimal.

## Is 7.478 bar is rational or irrational?

Since 7.478 is a non-terminating and recurring (repeating) decimal. So, it is a rational number.

## Which type of 1.0100100001 number is?

The given number is irrational number. Justification: Since 1.010010001 is non - terminating non - recurring decimal number, therefore it cannot be written in the form p/q; q≠0, p, q both are integers. Thus, 1.010010001 is irrational.

## Is 10.124124 a rational number?

<br> (ix) 10.124124.... , is a number with non- terminating recurring decimal expansion. <br> Hence, it is a rational number .

## Is 6.412341234 a rational or irrational number justify?

6.41234123 is rational as the digits repeat.

## Is 0.5918 a rational or irrational number?

(vii) 0.5918 is a terminating decimal . Hence, it is a rational number.

## Is 65.4349224 rational or irrational?

Hence, 65.4349224 is a rational number.

## How do you check if a number is rational or irrational?

Rational numbers are the numbers that can be expressed in the form of a ratio (i.e., P/Q and Q≠0) and irrational numbers cannot be expressed as a fraction. But both the numbers are real numbers and can be represented in a number line.

## Is 0.4131313 rational or irrational?

irrational :-

(i) it will be rational as its nonterminating repeating.

## Which of the following is an irrational number ??

The most common irrational numbers are: Pi (π) = 22/7 = 3.14159265358979… Golden ratio, φ = 1.61803398874989…. Root, √ = √2, √3, √5, √7, √8, any number under root which cannot be simplified further.

## Is .23 a rational number?

Answer. 23 is a rational number because it can be expressed as the quotient of two integers: 23 ÷ 1.