What is the reciprocal of 52/35? Here we will define reciprocal of 52/35, and show you how to calculate the reciprocal of 52/35 in fraction form and decimal form.
The reciprocal of 52/35 is a fraction or a number that when multiplied by 52/35 is equal to 1. To get the reciprocal of 52/35 based on that definition, we can make the following equation where "R" is the reciprocal of 52/35.
(52/35) × R = 1
When we solve for R, we get the answer to the reciprocal of 52/35 as a fraction as follows:
(52/35) × R = 1
R = 35/52
Reciprocal of 52/35 = 35/52
You can check that the answer is correct by confirming that 52/35 times the reciprocal of 52/35 is equal to 1, like this:
52/35 × 35/52 = 1
To find the decimal answer to the reciprocal of 52/35, you divide the numerator of the reciprocal by the demoninator of the reciprocal, like this:
35 ÷ 52 ≈ 0.673076923077
Reciprocal of 52/35 ≈ 0.673076923077
Tip: As you may have inferred from our tutorial above, you can quickly get the reciprocal of any fraction, such as 52/35, by switching the numerator and the denominator.
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Reciprocal of 52/36
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