Well your first and second example is same (in terms of time complexity). For them, time complexity is O(N). Why is it. Let us compute. For the first example, your inner loop runs for N times, then N/2 times, then N/4 and goes upto 1. So, the time complexity is O(N+N/2+N/4+..+1) and sum of this GP is (2n-1). So, the time complexity for first case is O(N).
For the second example, your inner loop runs for 1 time, then 2 times, 4 times, and goes upto N. So, the time complexity is O(1+2+4+...+N) and sum of this GP is 2log(N+1)-1 which is equal to N. So, the time complexity for the second case is also O(N).
For the third example, first loop runs for log(N) time and inner loop runs for N time and since each of them is independent, required time complexity is O(NlogN). (All calculations are approximate and all log bases are 2)
Well, to know about time complexity of a for loop, you have to see how many times "i" is assigned a value (can be same or different).
To learn about time complexity, check out hackerearth material and every time you write an algorithm, try to calculate its time complexity. Its the best method to learn it and check out Masters theorem for recurrence relation but know its basic too.