It's a specific case of base conversion from base 256 to base 64.

To do the math on paper, first convert the numbers to decimal. Here I 've converted both:

```
c e m
99 * 256² 101 * 256¹ 109 * 256°
6488064 25856 109 => sum = 6514029
y 2 v t
24 * 64³ 54 * 64² 21 * 64¹ 45 * 64°
6291456 221184 1344 45 => sum = 6514029
```

OK, so this also means that they are indeed the same number.

Then, to convert from decimal to another base (e.g. to base 64) find the largest power of 64 that is smaller than or equal to the decimal number (which is 6514029). That power is 64³ = 262144. Doing the integer division 6514029 / 262144 gives

```
6514029 / 262133 = 24, remainder = 6514029 - 262133 * 24 = 222573
```

This means that the first digit of the base64 number is going to be the 25th (we start counting from 0), which is indeed `y`

.

Continuing the process with the remainder as the current decimal number will produce the rest of the digits. With this process you can convert a number in any base to any other base.