The very first shiny Pokemon in Pokemon Go were introduced last year in March, and Trainers around the world had a chance to catch shiny Magikarp and shiny Gyarados.
Until today, the game introduced more than 40 shiny Pokemon, but not everyone had a chance to catch one. Well, not everyone had a chance even to see one.
Many Trainers are thinking that Niantic ‘left them behind,’ but there is actually a reason behind all of that.
A Pokemon Go player from Buffalo, who is Lvl 38 Team Mystic, made an ‘Actual probability of finding a shiny Pokemon’ on TSR, explaining what are the chances of finding a shiny Pokemon in the wild.
Here is what kramer753 wrote:
“The odds of tapping a single Pokemon and encountering a shiny are debatable. Some say it’s 1/256 while others say it’s more like 1/512. I’ll discuss both and I’ll use Makuhita as a reference.
If you tap a Makuhita, the probability of it being shiny is, let’s say, 1/512. Now, this doesn’t mean that tapping 512 Makuhita guarantees a shiny.
The probability of finding at least one shiny Makuhita after tapping 512 Makuhita = 1 – the probability of not finding a single shiny Makuhita.
This equals to 1 – (511/512)512 = 0.632 or 63.2% chance. That is less than two third! There is a whopping 36.8% chance you won’t see a single shiny Makuhita after tapping 512 Makuhitas.
Similarly, If you tap 1000 Makuhitas, the probability of finding at least one shiny = 1 – (511/512)1000 = 0.8585
That is still a 14.15% chance of not finding a shiny Makuhita after 1000 ‘seen’.
Similarly, If we take the probability of a Pokemon being shiny as 1/256, the probability of not finding a single shiny after: 256 ‘seen’ = 36.72% 512 ‘seen’ = 13.48% 1000 ‘seen’ = 2%.”
Basically, it’s just a random luck, because they are very rare and there is no way that one can increase the chance of finding a shiny Pokemon.
With all that being said, it’s all about RNG and Probability!
For last, all credit goes to ‘our math teacher’ kramer753, big thanks for letting us use his research. Don’t forget to give him an upvote for his hard work!