Why is the product of two rational numbers always a rational number?

Why is the product of two rational numbers always a rational number?

Let pl=x,qm=y. ⇒plqm=xy, where y≠0 and x and y is the lowest term representation which is a rational number. Therefore the product of two rational numbers is always a rational number.

Is the product of two rational number always irrational?

The product of any rational number and any irrational number will always be an irrational number.

What is a product of two rational number?

Product of two rational number is always a rational number. Let a and b are two rational number then a×b will be a rational number.

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Why is the product of a rational and an irrational irrational?

The equation expresses p as a product of two rational numbers. This result contradicts the fact that p is an irrational number. So our assumption ( product of a rational number xy with an irrational number p is a rational number ) is false. Therefore the result of this product is an irrational number.

Why is the product of a rational and an irrational number irrational?

We prove this by contradiction. Let xy be a rational number and p an irrational number. So our assumption ( product of a rational number xy with an irrational number p is a rational number ) is false. Therefore the result of this product is an irrational number.

Is the product of two irrational numbers always irrational example?

A. is always an irrational number. The product of two irrational numbers can be rational or irrational depending on the two numbers. For example, √3×√3 is 3 which is a rational number whereas √2×√4​ is √8​ which is an irrational number. As √3,√2,√4 are irrational.

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Can two irrational numbers add up to a rational number?

The sum of two irrational numbers can be rational and it can be irrational.

Why is the product of a irrational and an irrational irrational?

“The product of a rational number and an irrational number is SOMETIMES irrational.” If you multiply any irrational number by the rational number zero, the result will be zero, which is rational. Any other situation, however, of a rational times an irrational will be irrational.

How do you find the difference between two rational numbers?

The difference between two rational numbers, a/b and c/d, is equal to the result of subtracting the smaller number from the larger number. To find the difference between rational numbers, or to subtract rational numbers, we use the following formula: a/b – c/d = (ad – bc) / bd.

Is the product of two integers always a rational number?

So, adding two rationals is the same as adding two such fractions, which will result in another fraction of this same form since integers are closed under addition and multiplication. Thus, adding two rational numbers produces another rational number. Proof: “The product of two rational numbers is rational.”.

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Is the product of two irrational numbers always an irrational?

The sum of two irrational numbers is not always an irrational number. The product of two irrational numbers is not always an irrational number. In division for all rationals of the form (q ≠ 0), p & q are integers, two things can happen either the remainder becomes zero or never becomes zero.

What about sum and product of two irrational numbers?

Irrational numbers do not obey closure property.

  • When two irrational numbers are added,the sum need not be irrational.
  • When two irrational numbers are subtracted,the difference may not be irrational.
  • When two irrational numbers are multiplied,the product need not be irrational.
  • Is the difference of two rational numbers always rational?

    The product of two integers is an integer; the difference of two integers is an integer; a rational is defined as one integer divided by another non-zero integer. the diference of two numbers is always rational.