Why is the product of two rational numbers always rational? Select from the drop-down menus to correctly complete the proof.

Why is the product of two rational numbers always rational? Select from the drop-down menus to correctly complete the proof.

asked Apr 2, 2020 170k views

1 Answer

Answer:

The product of two rational numbers is always rational

Explanation:

DEFINITION: a number is said to be rational if and only if it is expressed in p/q form i.e, as a fraction(p/q) where, p,q are integers and
$q\\eq 0.$

now, let a/b and c/d be two rational numbers.

the product of them : ac/bd.

FACT : if we multiply 2 integers, then the product will be an integer.

so, ac and bd are both integers for sure and bd is not zero because none of b or d is zero.

therefore, as ac/bd satisfy the definition of a rational number, it is a rational number.

hence, we can now generalize that, The product of two rational numbers is always rational.

Donnie answered Apr 8, 2020

by Donnie

7.6k points

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