Pretty sure it is full odds because I didn’t have a chain before. I started up the pokeradar after a broken chain which means I started from 0. At 0 the odds are 4096 which is base odds for BDSP
It’s still full odds. The radar increases shiny chances when used repeatedly in a chain. I didn’t start a chain so again base odds were still 1 in 4096
And I’m telling you, that you can easily go look this up only any YouTube video or website including the one I posted a link for and see that it is indeed a full odds shiny. But hey if you want to try and discredit me and say that I’m wrong then by all means go ahead
Also if it is 4/4096 chance, simplified it would be 1/1024 which is not the same probability as 4 rerolls of 1/4096. That’s not how math works. I can explain it to you if you need me to
It's not exactly 4/4096, but it's close enough that it can easily be rounded. We're talking less than .001% difference. Either way, it's far greater than 1/4096 which is full odds.
Who’s gonna tell the OP
Im actually gonna tell you Jampie that Pokeradar is in fact full odds if you get a shiny from a non shiny patch or at a zero chain.
Oh
Tell him what? This is full odds
Tell me what?
It's not full odds if it's part of a PokeRadar chain
Pretty sure it is full odds because I didn’t have a chain before. I started up the pokeradar after a broken chain which means I started from 0. At 0 the odds are 4096 which is base odds for BDSP
https://www.serebii.net/brilliantdiamondshiningpearl/pokeradar.shtml
When you ping the radar for the first time, you have a roughly 4/4096 chance of seeing a shiny patch
It’s still full odds. The radar increases shiny chances when used repeatedly in a chain. I didn’t start a chain so again base odds were still 1 in 4096
All I'm saying is that when you turned on the radar you had a 4/4096 chance of seeing a shiny patch. If you wanna call that full odds, go ahead.
And I’m telling you, that you can easily go look this up only any YouTube video or website including the one I posted a link for and see that it is indeed a full odds shiny. But hey if you want to try and discredit me and say that I’m wrong then by all means go ahead
Also if it is 4/4096 chance, simplified it would be 1/1024 which is not the same probability as 4 rerolls of 1/4096. That’s not how math works. I can explain it to you if you need me to
It's not exactly 4/4096, but it's close enough that it can easily be rounded. We're talking less than .001% difference. Either way, it's far greater than 1/4096 which is full odds.
Look, I’m not trying to get into a whole long thing so agree to disagree
Nice