Reciprocal of a Negative Fraction
Rules for the reciprocal of a positive fraction and the reciprocal of a negative fraction are the same, i.e.
Step 1: Exchange the numerator (top number) for the denominator (bottom number).
Step 2: Reciprocal fraction is created by this swapping.
For example:
- Reciprocal of -4/8 is -8/4
- Reciprocal of -3/6 is -6/3
When working with negative fractions, you can place the negative sign on the denominator or the numerator.
Reciprocal of a Fraction with Exponents
Similar to a normal fraction, the reciprocal of a fraction with exponents may be determined.
Step 1: Swap Numerator and Denominator.
Step 2: Sign of exponent changes when you determine the reciprocal of a fraction.
For example, if you have am/bn, its reciprocal is bn/am, where the exponents m and n change signs.
Example:
- Reciprocal of 32/43 is 43/32
- Reciprocal of x5/y4 is y4/x5
To get the reciprocal of a fraction using exponents, keep in mind that the most important is to flip the fraction and adjust the exponents’ signs.
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Reciprocal of Fractions
Fractions created by swapping the numerator and denominator of the given fraction are known as Reciprocal Fractions. For example, fraction b/a has the reciprocal fraction a/b. The characteristic of reciprocal fractions is that they always result in 1 when multiplied together.
In this article, we will learn about, Reciprocal Fraction Definition, What are Fractions? Reciprocal Function Graph, Reciprocal Mixed Fraction, Adding Reciprocal Fractions, Subtracting Reciprocal Fractions, Reciprocal Fractions Algebra, How to Find Reciprocal Fraction, etc and others.
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