Python 2, 50 49 bytes

-1 byte thanks to @Jonathan Allan

f=lambda n,A:n>=0and(n<1)+sum(f(n-x,A)for x in A) 

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JavaScript (ES6),  48  40 bytes

Takes input as (a)(n).

a=>g=n=>n>0?a.map(x=>t+=g(n-x),t=0)|t:!n 

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J, ²⁴ 17 bytes

1#.[=1#.[:>@,{\@# 

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Recursive version was too verbose in J, so I went brute force.

Take the integers in the right arg as a boxed list and the target number n in the left arg.

• {\@# - We create a series of cartesian products of the list with itself, starting with 1 (the list unchanged) and up to n (the list crossed with itself n times).
• [:>@, We flatten all of those, open them, and sum them.
• [= Check which sums equal n. This returns a boolean list.
• 1#. Sum it.

APL (Dyalog), 18 bytes

Accepts n as the right argument and A as the left argument.

{⍵>0:+/⍺∘∇¨⍵-⍺⋄⍵=0} 

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Jelly,  6  5 bytes

ṗⱮẎ§ċ 

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How?

Builds all lists of lengths \$1\$ to \$n\$ made from the integers in \$A\$ and then counts how many sum to \$n\$.

ṗⱮẎ§ċ - Link: list of positive integers, A; positive integer, n Ɱ - map across x in (implicit range [1..n]) applying: ṗ - Cartesian power -> all length x lists made from values in A Ẏ - tighten (to a list of lists) § - sum each list ċ - count occurrences of (n) 

K (ngn/k), 23 bytes

{$[x>0;+/(x-y)o\:y;~x]} 

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recursive

Io, 57 bytes

Port of the Python answer.

f :=method(n,A,if(n>0,A map(x,f(n-x,A))sum,if(n==0,1,0))) 

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Husk, 10 8 bytes

#o=¹ΣuṖ* 

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This is so ridiculously inefficient that it struggles on TIO to even run any of the given test cases: link is to a super-easy test case of n=2, a=[1,2,3] (for which output is 4).

Repeats and concatenates (*) the input list n times, and then generates all possible subsets (uṖ - this is the slow step!). Then counts the number (#) of subsets for which the total equals n (o=¹Σ).

Wolfram Language (Mathematica), 56 49 46 43 41 bytes

2 bytes golfed thanks to J42161217

n_~f~a_=If[n<1,1+Sign@n,Tr[f[n-#,a]&/@a]] 

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Initial solution:

Length[Join@@Permutations/@IntegerPartitions[#,∞,#2]]& 

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C (gcc), 89 bytes

Port of the Python answer.

Edit: Outgolfed by Noodle9 :/

int n;f(int x,int*a){if(x<=0)return!x;int y=0,i=0;while(i++<n)y+=f(x-a[i-1],a);return y;} 

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C (gcc), ⁶⁵ 63 bytes

Saved 2 bytes thanks to my pronoun is monicareinstate!!!

f(n,a,l,s,i)int*a;{for(s=i=!n;i<l&n>0;)s+=f(n-a[i++],a,l);n=s;} 

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Ruby, 40 36 bytes

Python answer port but Ruby strict typing means I can't coerce booleans into integers.

-4 bytes from dingledooper.

f=->n,a{n>0?a.sum{|e|f[n-e,a]}:1<<n} 

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Perl, 52 bytes

$r.=1x$_."|"}{(1x$^I)=~/^($r@){1,$^I}$(?{$\++})(*F)/ 

Usage

printf "2\n3\n4" | perl -p -i10 glovebox.pl 

Explanation

Attempts to turn the problem into a string matching one, then uses regex backtracking to do the hard work! In the example given above it ends up constructing a regex match similar to 1111111111 =~ /^(1{2}|1{3}|1{4}){1,10}$(?{$count++})(*F)/

This will cause the regex engine to attempt each combination of the regex, using (?{$count++}) to increase $count each time the engine matches the input and reaches that point in the pattern, but forcing a fail (*F) before the match returns to cause the engine to backtrack and start again with the next combination. $count ends up being the answer.

Slightly different approach, was hoping it'd end up a bit shorter though...

Haskell, 37 bytes

n!a|n<0=0|n<1=1|n>0=sum$(!a).(n-)<$>a 

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Quick port of the Python answer, call as n ! a.

Charcoal, 21 20 bytes

⊞υ¹Ｆθ⊞υ↨Φυ№η⁻⊕ιλ¹Ｉ⊟υ 

Try it online! Link is to verbose version of code. Edit: Saved 1 byte by using base conversion from 1 instead of summing a potentially empty list. Explanation:

⊞υ¹ 

Start our result list with the number of solutions for n=0 which is always 1 (the empty list).

Ｆθ⊞υ 

Loop n times, so that we calculate the results for 1..n, appending them to the result list.

↨Φυ№η⁻⊕ιλ¹ 

Sum those results so far that contribute to the next total. For example, if A is [2, 3, 4], then to calculate the result for n=10, we already know the results for n=0..9, but we only add the results for n=6, n=7 and n=8. The sum is calculated by converting from base 1 in case the list is empty.

Ｉ⊟υ 

Print the result for n.

05AB1E, 11 7 bytes

L€ãO˜¹¢ 

-4 bytes thanks to @ovs.

Very slow approach!

Try it online or verify the first two test cases at once (third one times out..).

Explanation:

L # Push a list in the range [1, first (implicit) input-integer] € # Map over each integer in this list ã # Take the cartesian product of the second (implicit) input-list that many times O # Sum each inner-most list ˜ # Flatten the list of lists ¹¢ # And count how many times the first input occurs in this list # (after which the result is output implicitly) 

05AB1E, 12 bytes

ÅœʒåP}€œ€`Ùg 

Here a faster (but now way longer) approach using the Åœ builtin.

Try it online or verify all test cases.

Explanation:

Åœ # Get all lists of positive integer that sum to the (implicit) input-integer ʒ # Filter this list of lists by: å # Check for each value whether it's in the second (implicit) input-list P # And check if this is truthy for all of them }€œ # After the filter: get the permutations of each remaining list €` # Flatten one level down Ù # Uniquify the list of lists g # Pop and push the length for the amount of remaining lists # (after which the result is output implicitly) 

Julia 1.0, 35 bytes

port of this Python answer

f(n,A)=n>=0&&+(n<1,f.(n.-A,[A])...) 

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R, 59 55 bytes

Edit: -4 bytes thanks to Giuseppe

g=function(t,l,u=t-l)sum(!u,unlist(sapply(u[u>0],g,l))) 

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Recursively removes each element from the glove box, and calls itself with the new total if there's anything left.

Wolfram Language (Mathematica), 54 bytes

Tr[Length/@Permutations/@IntegerPartitions[#,All,#2]]& 

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Red, 81 80 bytes

f: func[x y][case[x = 0[1]x < 0[0]on[sum collect[foreach a y[keep f x - a y]]]]] 

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The same recursive approach almost everyone is using, much longer though.

Racket, 74 64 bytes

(λ(x y)(if(< x 1)(+(sgn x)1)(apply +(map(λ(a)(f(- x a)y))y)))) 

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Wolfram Language (Mathematica), 36 bytes

Tr[Multinomial@@@FrobeniusSolve@##]& 

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