For each inputs, you will need to generate the Truth Table for states (true,false). So if you have 5 inputs = total combinations = 2^5.

You did not specify what language you need this. So, I will give you a flowmatic `Java`

approach.

I assume you already have all specific functions defined for the different gates such as `XNOR`

, `AND`

, `OR`

etc. For example you can have a function for `XNOR`

gate as : `boolean XNOR(boolean ip1, boolean ip2)`

Now the process reduces to the generation of all combinations (2^5) for the inputs. This reduces to a simple permutation problem - You can do it this way: (The idea is to change the values from the end of array to the beginning. Since it takes only two values it is quite easy to implement)

```
//inputs - all initialized to FALSE; - ready for 1st case of (2^5)
//Let the inputs a,b,c,d,e correspond to values of this array
boolean inp[]=new boolean[5];
//need a pointer variable for the array
//first pointing to the last-1 element of the array
int main_col=inp.length-2;
//Generate the combinations for input from all FALSE to until you reach all inputs to TRUE values
boolean looptf=true;
while(looptf){
call_Appropriate_gates_from_inputs(inp);
inp[inp.length-1]=!inp[inp.length-1]; //last array element value changed
call_Appropriate_gates_from_inputs(inp);
inp[inp.length-1]=!inp[inp.length-1]; //reset
for(int i=inp.length-2;i>=0;i--){
if (inp[i]){
inp[i]=false;
if (main_col==i){
main_col--;
if (main_col<0){
looptf=false;
break;
}
}
}else{
inp[i]=true;
break;
}
}//for
}//while
```

Now you can define the method `call_Appropriate_gates_from_inputs(boolean[])`

and execute the gate logic and get the result.