Get a Free 3-6 Star Baron Zemo this Week!
Log in to the Summoner's Market at https://store.playcontestofchampions.com/ and claim the Baron Zemo Selector between 10am PT November 24 and 10am PT on December 1st.
Proven and Below: 3-Star
Conqueror/Uncollected: 4-Star
Cavalier/Thronebreaker: 5-Star
Paragon/Valiant: 6-Star
You can only claim this Baron Zemo one time. The Baron Zemo is delivered as a selector, claiming it will require you to choose your rarity immediately. If you plan to change your Progression level during the Cyber Week event, we suggest you wait until you have made that change before claiming this selector.
Log in to the Summoner's Market at https://store.playcontestofchampions.com/ and claim the Baron Zemo Selector between 10am PT November 24 and 10am PT on December 1st.
Proven and Below: 3-Star
Conqueror/Uncollected: 4-Star
Cavalier/Thronebreaker: 5-Star
Paragon/Valiant: 6-Star
You can only claim this Baron Zemo one time. The Baron Zemo is delivered as a selector, claiming it will require you to choose your rarity immediately. If you plan to change your Progression level during the Cyber Week event, we suggest you wait until you have made that change before claiming this selector.
Due to issue with the "Not Another Anime Reference" Solo Event, we will be disabling the event for the time being. We will return the event at a future date when the issues have been resolved. We apologize for the inconvenience.
Can someone calculate the probability of this??

π€·π»ββοΈ



13
Comments
That means to get 1 is a 3/100 chance.
To get 2 is 3/100 x 3/100.
To get 3 is 3/100 x 3/100 x 3/100 which is 27/1000000 chance or 0.000027
Or am i wrong? ππ I am dumb ... I don't know π€¦π»ββοΈ
If you open a crystal and get a 4 star. you have a 3% chance to get a 4 star the crystal after. If you pulled 2, and want to pull another, you have a 3% change to get a 4 star.
It does not matter how many 4 stars you have pulled, the chances of pulling the next 4 star is still 3%.
But I must admid, from a pure probability standpoint, (3%)^3 is correct. Even if it is completely irrelivant.
This reply answers a question that was not asked.
This is what the op was asking
Or 0.0027%
It's very rare.
Phew!
Youβre all invited to my home casino.
I'm not sure though.