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Is there an error in this question or solution? So, it is a proven product of rational numbers and its reciprocal always be 1. ∴ the product of a rational number and its.
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⇒ its reciprocal = 1/a. Let's take a fraction 5/7. The product of a rational number and its reciprocal is always 1. this is true because if we take a rational number x (where x = 0), its reciprocal is x1
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Let assume that rational number = a.
Therefore, according to the inverse property of multiplication, product of a rational number and its reciprocal is 1. Is there an error in this question or solution? ⇒ product = a × 1/a = 1. With its reciprocal is always 1.
The square roots of all positive integers are irrational numbers. The product of a rational number and its reciprocal is. The product of a rational and an irrational number is an irrational. ⇒ the product of a rational number and its reciprocal is 1.
Reciprocal of every rational number is a rational number.
Reciprocal = 7/5 product = 5/7 * 7/5 = 1 therefore the product of a rational no. For the pair of rational numbers, given below, verify that the. As we know, a rational number can be expressed in the form of p q and its reciprocal is q p.
