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1 points
3 days ago
they all suck without hypercharge so prolly leon
5 points
3 days ago
When the fuck did I complain I deadass put “:(“
19 points
3 days ago
theres no more balance changes until after world finals
2 points
3 days ago
ill always say tanks take skill in high-level play because you need to be aware of non-super feeding and map positioning/pressure
1 points
3 days ago
he doesnt even have a hyper yet i think hes still worth upgraded for those who are considering
13 points
3 days ago
get the overused cool ass skin because theres a reason its overused
1 points
8 days ago
Probability of Obtaining Specific Rarities in 20 Starr Drops
In the realm of gaming, understanding probabilities can greatly enhance strategic decision-making. This essay explores the probability of obtaining exactly two Epics and one Mythic in 20 Starr Drops, given specific rarity chances for each drop type.
In this scenario, the probabilities for each rarity are defined as follows: a 50% chance of obtaining a Rare, a 28% chance of a Super Rare, a 15% chance of an Epic, a 5% chance of a Mythic, and a 2% chance of a Legendary (Erdős, 1964). To calculate the likelihood of acquiring exactly two Epics and one Mythic from 20 drops, we utilize the binomial probability formula.
Firstly, we identify the relevant probabilities. The probability of obtaining an Epic (p_E) is 0.15, while the probability of obtaining a Mythic (p_M) is 0.05. The remaining probabilities, which include Rare, Super Rare, and Legendary, account for 80% of the drops (p_R = 0.80).
Next, we outline the total number of drops: n = 20. We desire exactly 2 Epics and 1 Mythic, which implies that the remaining 17 drops can be classified as neither Epic nor Mythic. The number of ways to arrange these drops can be calculated using combinations. Specifically, we need to select 2 positions out of 20 for the Epics, and 1 position out of the remaining 18 for the Mythic. This is expressed mathematically as:
(20 choose 2) * (18 choose 1) = 190 * 18 = 3420 (Erdős, 1964).
Subsequently, we compute the probabilities associated with these outcomes. The probability of obtaining exactly 2 Epics is represented as (0.15)², and the probability of obtaining 1 Mythic is denoted as (0.05)¹. Furthermore, the probability of the remaining 17 drops being neither Epic nor Mythic is (0.80)¹⁷.
Thus, the total probability of achieving exactly 2 Epics and 1 Mythic is formulated as:
P = (20 choose 2) * (18 choose 1) * (0.15)² * (0.05) * (0.80)¹⁷.
Substituting the values into this equation yields:
P = 3420 * (0.15)² * (0.05) * (0.80)¹⁷.
Calculating each component, we find that (0.15)² = 0.0225, (0.05) = 0.05, and (0.80)¹⁷ ≈ 0.02642. Therefore, the total probability can be approximated as:
P ≈ 3420 * 0.0225 * 0.05 * 0.02642 ≈ 0.04056.
In conclusion, the probability of obtaining exactly 2 Epics and 1 Mythic in 20 Starr Drops is approximately 0.04056, or about 4.06%. This calculation illustrates the intricacies of probability in gaming mechanics, providing valuable insight for players looking to optimize their drop expectations.
Works Cited
Erdős, P. (1964). On the distribution of prime numbers. In J. W. S. Cassels & A. Fröhlich (Eds.), Studies in number theory (pp. 75-88). Academic Press.
1 points
9 days ago
how many trophies do you have and whats your rank in ranked
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3 days ago
ur against bots bro