This shows the probabilities of drawing two specific cards (labeled A and B) in a hand of five cards, from decks of various sizes.

All numbers are percentages.

When the deck contains no 'draw' cards:

Deck sizeA & BA & !BA ^ BA | B
666.716.733.3100.0
747.623.847.695.2
835.726.853.689.3
927.827.855.683.3
1022.227.855.677.8
1118.227.354.572.7
1215.226.553.068.2
1312.825.651.364.1

When the 'A' card causes Draw 1:

Deck sizeA & BA & !BA ^ BA | B
650.00.050.0100.0
741.78.350.091.7
835.714.350.085.7
931.218.850.081.2
1027.822.250.077.8
1125.025.050.075.0
1222.727.350.072.7

The probabilities of other combinations can be derived from those given in this table:

Replies are listed 'Best First'.
Re: Probabilities of drawing certain cards
by LanX (Saint) on Jan 06, 2023 at 18:41 UTC
    just for fun and cool uses for Perl, here the math for the first column

      DB<29> $h = 5

  DB<30> sub A_and_B { bk($n-2,$h-2) / bk($n,$h) }

  DB<31> sub bk { my ($n,$k) = @_; fac($n)/(fac($k)*fac($n-$k)) }

  DB<32> sub fac { my ($n) =@_; my $f=1; $f*=$_ for 2..$n; $f}

  DB<33> printf ( "%i %0.3f\n", $n=$_, A_and_B ) for 6..15
6 0.667
7 0.476
8 0.357
9 0.278
10 0.222
11 0.182
12 0.152
13 0.128
14 0.110
15 0.095

    [download]

    remaining cols left for the interested reader. :) °

    Further reading:

    Cheers Rolf
    (addicted to the 𐍀𐌴𐍂𐌻 Programming Language :)
    Wikisyntax for the Monastery

    update

    °) spoiler

    <Reveal this spoiler or all in this thread>
[reply]
[d/l]
[select]
Re: Probabilities of drawing certain cards
by LanX (Saint) on Jan 06, 2023 at 19:42 UTC
[reply]
[d/l]
[select]
Re: Probabilities of drawing certain cards
by GrandFather (Saint) on Jan 06, 2023 at 21:55 UTC

    And the Perl content is ...?

    Optimising for fewest key strokes only makes sense transmitting to Pluto or beyond
[reply]

      This is a Meditation. It's just me meditating.

[reply]

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