We use Brute Force to solve this problem.

1. We iterate from 2 to N.
2. For each number num, we check if it is prime or not. We use the following approach to check if a given number is pr...read more

We will optimize the test to check if a given number is prime. Instead of looping to N-1, we check divisibility till (N)^½. This is because if the number is not prime, there mu...read more

We will use the Sieve of Eratosthenes to solve this problem.

1. First, we will make a boolean array/list isPrime of size N + 1. This will mark if a number is prime or not. Initially, all values will be true.
2. Then, we initialize a variable num equal to 2 which represents the current processing prime number.
3. We will loop as num from 2 to N^½:
   1. If num is not prime, we continue.
   2. Else, we will mark all multiples of num in isPrime as false.
4. In the end, we will iterate through isPrime and store all primes in the result vector/list.
5. Finally, we return the result vector/list.

O(N), where N is the given positive integer.

We create a boolean array/list isPrime to store all numbers from 2 to N. 

So, the space complexity is O(N).

O(N * log(log N)) where N is the given positive integer. 

The algorithm will perform N / p operations for every prime p ≤ N in the inner loop. So, the number of times the loop runs is equal to ΣN/p = N* Σ1/p where p ≤ N.

The value of  Σ1/p is log(log N). So, the overall time complexity is O(N *log(log N)).

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