# Category:Examples of Reciprocals

Jump to navigation
Jump to search

This category contains examples of Reciprocal.

Let $x \in \R$ be a real number such that $x \ne 0$.

Then $\dfrac 1 x$ is called the **reciprocal of $x$**.

## Pages in category "Examples of Reciprocals"

The following 72 pages are in this category, out of 72 total.

### 1

### 3

### N

### P

### R

- Reciprocal of 101
- Reciprocal of 103
- Reciprocal of 1089
- Reciprocal of 11
- Reciprocal of 121
- Reciprocal of 13
- Reciprocal of 131
- Reciprocal of 142,857
- Reciprocal of 17
- Reciprocal of 19
- Reciprocal of 19 from Sum of Powers of 2 Backwards
- Reciprocal of 2
- Reciprocal of 21
- Reciprocal of 23
- Reciprocal of 239
- Reciprocal of 27
- Reciprocal of 29
- Reciprocal of 3
- Reciprocal of 31
- Reciprocal of 37
- Reciprocal of 41
- Reciprocal of 43
- Reciprocal of 451
- Reciprocal of 47
- Reciprocal of 49
- Reciprocal of 49 shows Powers of 2 in Decimal Expansion
- Reciprocal of 5
- Reciprocal of 53
- Reciprocal of 59
- Reciprocal of 61
- Reciprocal of 67
- Reciprocal of 7
- Reciprocal of 71
- Reciprocal of 73
- Reciprocal of 79
- Reciprocal of 81
- Reciprocal of 83
- Reciprocal of 83 has Prime Period
- Reciprocal of 89
- Reciprocal of 909,091
- Reciprocal of 9091
- Reciprocal of 97
- Reciprocal of 98
- Reciprocal of 9801
- Reciprocal of 99
- Reciprocal of 99,990,001
- Reciprocal of 9901
- Reciprocal of Euler's Number
- Reciprocal of i
- Reciprocal of Pi
- Reciprocal/Examples
- Reciprocal/Examples/Euler's Number
- Reciprocal/Examples/Pi
- Reciprocals of Prime Numbers
- Recurring Parts of Multiples of One Thirteenth
- Repunit 19 is Unique Period Prime with Period 19