# Logic to test that 3 of 4 are True

I want to return True if and only if 3 out of 4 boolean values are true.

The closest I've gotten is (x ^ y) ^ (a ^ b):

What should I do?

• Hmm, the only way I can think of with out mathematical formula is to use count. Good question! :) Commented Mar 7, 2014 at 2:42
• You idea is not bad, but you must take the negations: not a ^ not b ^ not c ^ not d is true when exactly one of the negated values is true. This means, from the original values, exactly one was false.
– Ingo
Commented Mar 7, 2014 at 13:19
• What is your actual problem behind this details?
– Wolf
Commented Mar 7, 2014 at 14:15
• @Ingo not a ^ not b ^ not c ^ not d return true where only one is false AND where 3 are false. Commented Mar 7, 2014 at 14:55
• The obvious non-count solution is (!a&&b&&c&&d) || (a&&!b&&c&&d) || (a&&b&&!c&&d) || (a&&b&&c&&!d). Commented Mar 10, 2014 at 6:37

I suggest writing the code in a manner that indicates what you mean. If you want 3 values to be true, it seems natural to me that the value 3 appears somewhere.

For instance, in C++:

if ((int)a + (int)b + (int)c + (int)d == 3)
...


This is well defined in C++: the standard (§4.7/4) indicates that converting bool to int gives the expected values 0 or 1.

In Java and C#, you can use the following construct:

if ((a?1:0) + (b?1:0) + (c?1:0) + (d?1:0) == 3)
...

• This is a good answer. This looks like a case of that X/Y thing. "He wants to do X using Y, but does not know how to do Y. Instead of asking X, he asks Y." Unless he is designing a logic circuit or something like that (and then he would be in the wrong site), the best way to do this is in a way that is readable. Commented Mar 7, 2014 at 21:37
• @NothingsImpossible There is nothing XY about the question. It's a clear and straight-forward question about solving a reasonably common problem in programming. The Y is irrelevant. Commented Mar 9, 2014 at 16:19
• Thanks! This is really what I meant to do, but my idea was so clumsy that I reached for boolean logic. Commented Mar 9, 2014 at 20:33
• if (!!a + !!b + !!c + !!d == 3) is easier to write, although I don't know whether compilers optimize this or not Commented Mar 10, 2014 at 5:08
• Note that in c++ the cast from bool to int is not necessary. Commented Mar 11, 2014 at 12:54

#1: Using a branching ?: 3 or 4 operations

A ^ B ? C & D : ( C ^ D ) & A


#2 Non-Branching, 7 operations

(A ^ B ^ C ^ D) & ((A & B) | (C & D))


Back when I use to profile everything, I found non-branching solutions were quite a bit quicker operation-for-operation as the CPU could predict the code path better, and execute more operations in tandem. There is about 50% less work in the branching statement here though.

• +1 - while the other answers are better for most programming languages, your #2 is the best answer in pure boolean logic. Commented Mar 7, 2014 at 17:07
• Wolframalpha truth table for #2 Commented Mar 9, 2014 at 13:32

If this had been Python, I would have written

if [a, b, c, d].count(True) == 3:


Or

if [a, b, c, d].count(False) == 1:


Or

if [a, b, c, d].count(False) == True:
# In Python True == 1 and False == 0


Or

print [a, b, c, d].count(0) == 1


Or

print [a, b, c, d].count(1) == 3


Or

if a + b + c + d == 3:


Or

if sum([a, b, c, d]) == 3:


All these work, since Booleans are subclasses of integers in Python.

if len(filter(bool, [a, b, c, d])) == 3:


Or, inspired by this neat trick,

data = iter([a, b, c, d])
if not all(data) and all(data):

• +1 This solves the problem by correctly translating it into Python.
– Wolf
Commented Mar 7, 2014 at 14:37
• This is slightly dangerous because people may return any non-zero integer in a boolean context in python. The old C trick works in python too: a=5;not not a == 1. The disadvantage of not having a real boolean type.
– Voo
Commented Mar 8, 2014 at 13:32
• @Voo We also have bool :) Commented Mar 8, 2014 at 13:36
• @thefourtheye Ah yes true, much nicer than the double negation trick/hack.
– Voo
Commented Mar 8, 2014 at 13:58
• Or...or....or....There should be one-- and preferably only one --obvious way to do it. :-/ :-)
– rz.
Commented Mar 12, 2014 at 20:27

Long but very simple, (disjuntive) normal form:

 (~a & b & c & d) | (a & ~b & c & d) | (a & b & ~c & d) | (a & b & c & ~d)


It may be simplified but that requires more thinking :P

• @Ben that just gives you various normal forms of it, which this already is in (DNF). Commented Mar 7, 2014 at 8:37
• How about (a & b & (c ^ d)) | ((a ^ b) & c & d)? Commented Mar 8, 2014 at 10:51
• Yes, @immibis, according to Wolfram Alpha its DNF is the formula I've written so it's the same boolean function. Commented Mar 8, 2014 at 12:46
• +1 because I think someone reading the code will understand what is being attempted quicker than with other answers. Commented Mar 10, 2014 at 14:00

Not sure it is simpler, but maybe.

((x xor y) and (a and b)) or ((x and y) and (a xor b))

• damn! They should've given option multi up-vote an answer! Especially using wolfram alpha to prove your answer right is very good thing! Commented Mar 20, 2014 at 16:22

If you want to use this logic in a programming language, my suggestion is

bool test(bool a, bool b, bool c, bool d){
int n1 = a ? 1 : 0;
int n2 = b ? 1 : 0;
int n3 = c ? 1 : 0;
int n4 = d ? 1 : 0;

return n1 + n2 + n3 + n4 == 3;
}


Or if you want, you can put all of these in a single line:

return (a ? 1 : 0) + (b ? 1 : 0) + (C ? 1 : 0) + (d ? 1 : 0) == 3;


Also you can generalize this problem to n of m :

bool test(bool *values, int n, int m){
int sum = 0;
for(int i = 0; i < m; i += 1){
sum += values[i] ? 1 : 0;
}
return sum == n;
}

• Beat me to it. Readability trumps cleverness, every time. +1 Commented Mar 7, 2014 at 13:40

This answer depends on the system of representation, but if 0 is the only value interpreted as false, and not(false) always returns the same numeric value, then not(a) + not(b) + not(c) + not(d) = not(0) should do the trick.

Keeping in mind that SO if for programming questions, rather than mere logical problems, the answer obviously depends on the choice of a programming language. Some languages support features that are uncommon to others.

For example, in C++ you could test your conditions with:

(a + b + c + d) == 3


This should be the fastest way to do the check in languages that support automatic (low-level) conversion from boolean to integer types. But again, there is no general answer for that problem.

• This is the answer I was going to post. One thing to add though, depending on the programming language used, the answer you want would be -3. In VB, True = -1. Commented Mar 11, 2014 at 22:05

The best I can do is ((x ^ y) ^ (a ^ b)) && ((a || x) && (b || y))

• What means best to you?
– Wolf
Commented Mar 7, 2014 at 14:18
• Interesting. Took the op's solution and just shaved off the bad cases Commented Mar 7, 2014 at 15:04
((a xor b) xor (c xor d)) and ((a or b) and (c or d))


The fist expression searchs for 1 or 3 true's out of 4. The second one eliminates 0 or 1 (and sometimes 2) true's out of 4.

Java 8, filter out the false values, and count the remaining true values:

public static long count(Boolean... values) {
return Arrays.stream(values).filter(t -> t).count();
}


Then you can use it as follows:

if (3 == count(a, b, c, d)) {
System.out.println("There... are... THREE... lights!");
}


Easily generalizes to checking for n of m items being true.

To check at least n out of all Boolean are true, ( n must be less than or equal to total number of Boolean :p)

if (((a ? 1:0) + (b ? 1:0 ) + (c ? 1:0) + (d ? 1:0 )) >= n) {
// do the rest
}


Edit : After @Cruncher's comment

To check 3 boolean out of 4

if (((a ? 1:0) + (b ? 1:0 ) + (c ? 1:0) + (d ? 1:0 )) == 3) {
// do the rest
}


Another one :

• OP wants exactly n, not at least n. But that's an easy change from this solution Commented Mar 7, 2014 at 15:03
• @Wolf that question belongs to StackUnderflow.com :p Commented Mar 10, 2014 at 9:24

Here's a way you could solve it in C# with LINQ:

bool threeTrue = new[] { a, b, x, y }.Count(x => x) == 3;


That is the symmetric Boolean function S₃(4). A symmetric Boolean function is a boolean function which only depends on the quantity of inputs set, but doesn't depend on which inputs they are. Knuth mentions functions of this type in section 7.1.2 in Volume 4 of The Art of Computer Programming.

S₃(4) can be computed with 7 operations as follows:

(x && y && (a || b)) ^ ((x || y) && a && b)


Knuth shows that this is optimal, meaning that you cannot do this in less than 7 operations using the normal operators: &&, || , ^, <, and >.

However if you want to use this in a language which uses 1 for true and 0 for false, you can also use addition easily:

x + y + a + b == 3


which makes your intention quite clear.

(a && b && (c xor d)) || (c && d && (a xor b))


From a pure logic point of view this is what I came up with.

By the pigeon hole principle, if exactly 3 are true, then either a and b is true, or c and d is true. Then its just a matter of anding each of those cases with exactly one of the other 2.

Wolfram truth table

• This is equivalent to NameSpace's second solution. Commented Mar 7, 2014 at 17:05
• @Brilliand Seems different to me. His xors all together to get all 3's or 1's, then excludes the ones with 1 by requiring at least one from 2 distinct groups. (summarized as 1 or 3 and at least 2). Mine requires both from one of the distinct groups, and then exactly one from the other group. Commented Mar 7, 2014 at 17:14
• If you meant equivalent in the sense that mine <=> his then I don't know what to say as this would be expected. Commented Mar 7, 2014 at 17:16
• I guess I meant that this answer is good in exactly the same way that NameSpace's second solution is good, without adding anything new that NameSpace's (earlier) answer didn't cover. Well, I'll upvote anyway. Commented Mar 7, 2014 at 17:23

If you use a logic visualization tool like Karnaugh Maps, you see that this is a problem where you can't avoid a full blown logic term if you want to write it in one if (...) line. Lopina showed it already, it's not possible to write it simpler. You can factor out a bit, but it will stay hard to read for you AND for the machine.

Counting solutions are not bad and they show what you are really after. How you do the counting efficiently depends on your programming language. The array solutions with Python oder LinQ are nice to look at, but beware, this is SLOW. Wolf's (a+b+x+y)==3 will work nicely and fast, but only if your language equates "true" with 1. If "true" is represented by -1, you will have to test for -3 :)

If your language uses true booleans, you could try to program it explicitly (I use != as XOR test):

if (a)
{
if (b)
return (x != y);    // a,b=true, so either x or y must be true
else
return (x && y);     // a=true, b=false, so x AND y must be true
}
else
{
if (b)
return (x && y);    // a=false, b=true, so x and y must be true
else
return false;       // a,b false, can't get 3 of 4
}


"x != y" works only if x,y are of a boolean type. If they are some other type where 0 is false and everything else is true, this can fail. Then use a boolean XOR, or ( (bool)x != (bool)y ), or write "if (x) return (y==false) else return (y==true);", which is a bit more work for the computer.

If your programming language provides the ternary ?: operator, you can shorten it to

if (a)
return b ? (x != y) : (x && y);
else
return b ? (x && y) : false;


which keeps a bit of readability, or cut it aggressively to

return a ? (b ? (x != y) : (x && y)) : (b ? (x && y) : false);


This code does exactly three logic tests (state of a, state of b, comparison of x and y) and should be faster than most of the other answers here. But you need to comment it, or you won't understand it after 3 months :)

There are a lot of good answers here; here is an alternate formulation which no one else has posted yet:

 a ? (b ? (c ^ d) : (c && d)) : (b && c && d)

• Thank you for your answer, but can you please add some commentary as to how it works? Thanks. Commented Mar 14, 2014 at 9:23
• (Sorry to pick on you, I was given it as a review audit. At least I passed.. :)) Commented Mar 14, 2014 at 9:28

Similar to the first answer, but pure Java:

int t(boolean b) {
return (b) ? 1 : 0;
}

if (t(x) + t(y) + t(a) + t(b) == 3) return true;
return false;


I prefer counting them as integers because it makes for more readable code.

In Python, to see how many of an iterable of elements are True, use sum (it's quite straightforward):

Setup

import itertools

arrays = list(itertools.product(*[[True, False]]*4))


Actual Test

for array in arrays:
print(array, sum(array)==3)


Output

(True, True, True, True) False
(True, True, True, False) True
(True, True, False, True) True
(True, True, False, False) False
(True, False, True, True) True
(True, False, True, False) False
(True, False, False, True) False
(True, False, False, False) False
(False, True, True, True) True
(False, True, True, False) False
(False, True, False, True) False
(False, True, False, False) False
(False, False, True, True) False
(False, False, True, False) False
(False, False, False, True) False
(False, False, False, False) False


If you're after the on-the-paper (non-programming) solution, then K-maps and Quine-McCluskey algorithms are what you're after, they help you minify your boolean function.

In your case, the result is

y = (x̄3 ^ x2 ^ x1 ^ x0) ∨ (x3 ^ x̄2 ^ x1 ^ x0) ∨ (x3 ^ x2 ^ x̄1 ^ x0) ∨ (x3 ^ x2 ^ x1 ^ x̄0)


If you want to do this programmatically, non-fixed amount of variables and a custom "threshold", then simply iterating thru a list of boolean values and counting occurrences of "true" is pretty simple and straightforward.

• What does the bar overhead mean? I notice its moving down the list. Commented Mar 7, 2014 at 7:45
• @NameSpace It is one of the IMO too many notations people use to express "not".
– user743382
Commented Mar 7, 2014 at 7:50

I want to return true if and only if 3 out of 4 boolean values are true.

Given the 4 boolean values, a, b, x, y, this task translates into the following C statement:

return (a+b+x+y) == 3;

((a^b)^(x^y))&((a|b)&(x|y))


is what you want. Basically I took your code and added checking if actually 3 are true and not 3 are false.

A programming question without an answer involving recursion? Inconceivable!

There are enough "exactly 3 out of 4 trues" answers, but here's a generalised (Java) version for "exactly m out of n trues" (otherwise recursion isn't really worth it) just because you can:

public static boolean containsTrues(boolean[] someBooleans,
int anIndex, int truesExpected, int truesFoundSoFar) {
if (anIndex >= someBooleans.length) {
return truesExpected == truesFoundSoFar; // reached end
}
int falsesExpected = someBooleans.length - truesExpected;
boolean currentBoolean = someBooleans[anIndex];
int truesFound = truesFoundSoFar + (currentBoolean ? 1 : 0);
if (truesFound > truesExpected) {
return false;
}
if (anIndex - truesFound > falsesExpected) {
return false; // too many falses
}
return containsTrues(someBooleans, anIndex + 1, truesExpected,
truesFound);
}


This could be called with something like:

 boolean[] booleans = { true, false, true, true, false, true, true, false };
containsTrues(booleans, 0, 5, 0);


which should return true (because 5 of 8 values were true, as expected). Not quite happy with the words "trues" and "falses", but can't think of a better name right now.... Note that the recursion stops when too many true or too many false values have been found.

• @FélixSaparelli: Not sure "truth" applies here... it would sound like you're happy with just one true. Maybe something like containsNumberOfTrueValues(). As an aside: Smalltalk's naming would be much more suitable for this, though: doesArray: someBooleans startingAt: anIndex containNumberOfTrueValues: anExpectedNumber foundSofar: aNumberFoundSoFar. Probably too long for some Java devs' tastes, but Smalltalkers are never afraid of proper naming ;-) Commented Mar 13, 2014 at 4:46
• That was mostly humorous. And containsTruth means "contains some undisclosed amount of truth", literally, so I believe it's quite okay. Commented Mar 16, 2014 at 2:17

Since readability is a big concern, you could use a descriptive function call (wrapping any of the suggested implementations). If this calculation needs to be done in multiple places, a function call is the best way to achieve reuse, and makes it clear exactly what you are doing.

bool exactly_three_true_from(bool cond1, bool cond2, bool cond3, bool cond4)
{
//...
}


In PHP, making it more dynamic (just in case you change number of conditions, etc.):

$min = 6;$total = 10;

// create our boolean array values
$arr = array_map(function($a){return mt_rand(0,1)>0;},range(1,$total)); // the 'check'$arrbools = array_map(function($a){return (int)$a;},$arr);$conditionMet = array_sum($arrbools)>=$min;

echo \$conditionMet ? "Passed" : "Failed";

(((a AND b) OR (x AND y)) AND ((a XOR b) OR (x XOR y)))


While I could show that this is a good solution, Sam Hocevar's answer is easy both to write and understand later. In my book that makes it better.

Here is some c# code I just wrote because you have inspired me:

It takes any amount of arguments and will tell you if n of them are true.

    static bool boolTester(int n, params bool[] values)
{
int sum = 0;

for (int i = 0; i < values.Length; i++)
{
if (values[i] == true)
{
sum += 1;
}
}
if( sum == n)
{
return true;
}
return false;
}


and you call it like so:

        bool a = true;
bool b = true;
bool c = true;
bool d = false;

bool test = false;
test = boolTester(3, a, b, c, d);


So you can now test 7/9 or 15/100 as you will.