Question

all rational numbers are integers true or false

Answer 1

$\textbf{Answer :}$

False. All rational numbers are not integers. Rational numbers are of the form p/q, where p and q are integers with non-zero q.

When, q = 1,

p/q = p/1 = p and then only p is an integer.

#$\textbf{MarkAsBrainliest}$

Answer 2

False , all rational numbers are not integers

Given : The statement : All rational numbers are integers

To find : True / False the statement

Solution :

Step 1 of 2 :

Write down the given statement

The given statement is

All rational numbers are integers

Step 2 of 2 :

Check the statement

NO all rational numbers are not integers

We know that Rational number is defined as a number of the form $\displaystyle \sf{ \frac{p}{q} \: }$ Where p & q are integers with q ≠ 0

For example 1/2 is a rational number but 1/2 is not an integer

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