Best answer: The second question is the easier one to answer. If the probability that you get outcome Y is p_Y, then:

• the probability that you do not get outcome Y in one event is 1 - p_Y;
• the probability that you never get outcome Y in any of N events is (1 - p_Y)^N; and
• the probability that you don't never get outcome Y (i.e., that you get it at least once) in N events is 1 - (1 - p_Y)^N.

In particular, if you want there to be a probability p_fail that you don't get outcome Y, then N must satisfy p_fail = (1 - p_Y)^N; which implies that N = log(p_fail)/log(1 - p_Y).

I'll have to think about how to address the first question.
posted by Johnny Assay at 11:12 AM on August 21, 2016

Best answer: It's easier just to simulate the first question, although I'm sure there's a formula.

I did 10^5 trials for each sample size from 1-50 and plotted the results.

Raw data.
posted by dilaudid at 11:17 AM on August 21, 2016 [2 favorites]

Best answer: I'm going to take for granted that you know the probability of occurrence of each type of seedling, though this is a pretty tenuous assumption.

As Johnny Assay said, if each seedling is type Y with probability p_Y (independently of the other seedlings), then the probability of getting at least one type Y seedling in N tries is 1 - (1 - p_Y)^N.

The average number of distinct types you'll get in N seedlings is simply the sum of 1 - (1 - p_Y)^N over all types Y. As an example, if you had three types which occur with probability 1/2, 1/3, and 1/6, and you planted 4 seedlings, then the average number of different types among those 4 seedlings would be [1 - (1/2)⁴] + [1 - (2/3)⁴] + [1 - (5/6)⁴], which is 2.26. This summing trick works because of linearity of expected value (I can expand on this if you want to know more).

You can also calculate the average number of seedlings you'll need to plant to obtain the full set of types. This gets pretty gnarly, though. If the probabilities of all the types are p₁, p₂, ..., p_r, then the average number of seedlings needed to obtain a full set is S₁ - S₂ + S₃ - ..., where the signs alternate between + and -, and:

S₁ = 1/p₁ + 1/p₂ + ... + 1/p_r
S₂ = 1/(p₁+p₂) + 1/(p₁+p₃) + ... + 1/(p_r-1+p_r), with a term for every combination of two types
S₃ = 1/(p₁+p₂+p₃) + 1/(p₁+p₂+p₄) + ... + 1/(p_r-2+p_r-1+p_r), with a term for every combination of three types
etc.

This formula is derived from the geometric distribution (mentioned by Valancy Rachel above) and the maximum-minimums identity. Continuing the illustration above with three types of seedlings that occur at rates 1/2, 1/3, and 1/6, the average number of seedlings you'd need to "catch them all" would be
1/(1/2) + 1/(1/3) + 1/(1/6) - 1/(1/2 + 1/3) - 1/(1/2 + 1/6) - 1/(1/3 + 1/6) + 1/(1/2 + 1/3 + 1/6) = 7.3.

Neat as it is, this formula is insanely unwieldy for 13 types and you will need a computer to evaluate it. At that point, you might just want to run a random simulation instead. (Edited to add: I think this formula is doing the same thing as the integral Johnny Assay also mentioned above. It looks about equally taxing to calculate.)
posted by aws17576 at 6:22 PM on August 21, 2016 [1 favorite]