# Time complexity of following code [duplicate]

I want to find the time complexity of the following code but I'm not sure if I am doing it right. Printf is the basic process.Is time complexity of printf changing due to `i*j or i*k`?

``````i=0;              //c1
while (i<n){      //c2*(n+1)
for(j=i; j<n; j++)  // c3*n*(n+1)
printf("The product of %d and %d is %d\n",i,j,i*j);   //c4*n*n
for(k=n; k>i; k--)    //c5*n*(n-1)
printf("The product of %d and %d is %d\n",i,k,i*k);   //c6*n*n
i++;  //c7*n
}
``````

so the time complexity= c1+c2*(n+1)+c3*(n^2 +n)+c4*n^2 + c5*(n^2 -n)+c6*n^2 +c7*n=c8*n^2 +c9*n +c10

To find the time complexity of your code,

``````    i=0;
while (i<n){      // a loop will run n times
for(j=i; j<n; j++)  // a loop will run n - i times
printf("The product of %d and %d is %d\n",i,j,i*j);
for(k=n; k>i; k--)    //a loop will run n -i times
printf("The product of %d and %d is %d\n",i,k,i*k);
i++;
}
``````

So the total is about n * ((n-i) + (n -i)). But we only need to care about the term increases fastest when n goes to infinity. So it is `O(n^2)`.