Are numbers that can be expressed as a qoutients a/b of two integers?
A. Real nos.
B. Rational nos.
C. Irrational nos.
D. Number line
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Are numbers that can be expressed as a qoutients a/b of two integers?
A. Real nos.
B. Rational nos.
C. Irrational nos.
D. Number line
[tex]pahelp \: po[/tex]
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B.
Step-by-step explanation:
A rational number is any number which can be expressed as a fraction. More specifically, it can be rewritten as a quotient between two integers a and b.
Why not a real number?
A rational number is a real number. The key difference is that, the set of real numbers R contains both rational and irrational numbers. Recall that irrational numbers cannot be expressed as a quotient between two integers, e.g. π, e, √2, etc.
Why not a number line?
A number line is used for plotting real numbers on one axis only. The number line is not a number nor a set of numbers.