Every rational number is an integer ਹਰੇਕ ਪਰਿਮੇਯ ਸੰਖਿਆ ਇੱਕ ਸੰਪੂਰਨ ਸੰਖਿਆ ਹੈ । प्रत्येक परिमेय संख्या एक सम्पूर्ण संख्या होती है 0 ਸਹੀ/True//False/
Answers
Concept:
Integers do not have decimal or fractional values and only include sets of counting numbers, whereas rational numbers do. As a result, no rational numbers are integers.
To find:
Every rational number is an integer.
Solution:
False.
Because rational numbers are of the type p/q, where p and q are integers and q ≠ 0, all rational numbers are not integers. Most people have trouble distinguishing between fractions and rational numbers because of the underlying structure of numbers, the p/q form.
Integers do not have decimal or fractional values and only include sets of counting numbers, whereas rational numbers do. As a result, no rational numbers are integers.
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Answer:
The correct answer of this question is false.
Step-by-step explanation:
Given - Rational number is an integer.
To Find - Every rational number is an integer is true or false.
Every rational number is an integer is false.
All rational numbers are not integers since they are of the form p/q, where p and q are integers and q 0. Because of the underlying structure of numbers, the p/q form, most people have problems discriminating between fractions and rational numbers.
Integers, unlike rational numbers, do not have decimal or fractional values and only include sets of counting numbers. As a result, there are no integers among rational numbers.
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