A number is said to have n prime divisors if it can factored into n prime numbers (not necessarily distinct).
E.g.:
12 = 2*2*3 ---> 12 has 3 prime divisors
Given numbers a and b we have to find the number of such prime divisors of a!/b!(a>=b). Hence I decided to do the following way:
long long pre[5000001];
long long solve(int num)
{
if(!num)
return 0;
if(pre[num] || num==1)
return pre[num];
int num1=num;
if(num1%2==0)
{
int cnt=0;
while(num1%2==0)
{
num1/=2;
cnt++;
}
pre[num] = solve(num-1) + (solve(num1)-solve(num1-1)) + cnt;
return pre[num];
}
for(int i=3;i<=(int)(sqrt(num1))+1;++i)
{
if(num1%i==0)
{
int cnt=0;
while(num1%i==0)
{
cnt++;
num1/=i;
}
pre[num] = solve(num-1) + (solve(num1)-solve(num1-1)) + cnt;
return pre[num];
}
}
if(num>1)
{
pre[num]=1 + solve(num-1);
return pre[num];
}
}
int main()
{
int t;
cin>>t;
pre[1]=0;
while(t--)
{
int a,b;
cin>>a>>b;
long long ans = solve(a)-solve(b);
cout<<ans<<endl;
}
return 0;
}
My approach was to basically to calculate the number of prime divisors and store them because the limit for a and b was <=5000000. pre[num] gives the sum of number of prime divisors of all numbers <=num. But it results in run-time error for larger inputs such as a=5000000 b=4999995. Is there any better way to do this or the present approach can be tweaked for a better solution?
pre[num]gives thesumof number of prime divisors tillnum. You can tellans = f(b+1)...+f(a)wheref(num)gives number of prime divisors ofnum.