| 1234567891011121314151617181920212223242526272829303132333435363738394041424344454647484950515253545556 |
- The power of an integer x is defined as the number of steps needed to transform x into 1 using the following steps:
-
- if x is even then x = x / 2
- if x is odd then x = 3 * x + 1
-
- For example, the power of x = 3 is 7 because 3 needs 7 steps to become 1 (3 --> 10 --> 5 --> 16 --> 8 --> 4 --> 2 --> 1).
-
- Given three integers lo, hi and k. The task is to sort all integers in the interval [lo, hi] by the power value in ascending order, if two or more integers have the same power value sort them by ascending order.
-
- Return the k-th integer in the range [lo, hi] sorted by the power value.
-
- Notice that for any integer x (lo <= x <= hi) it is guaranteed that x will transform into 1 using these steps and that the power of x is will fit in 32 bit signed integer.
-
-
-
- Example 1:
-
- Input: lo = 12, hi = 15, k = 2
- Output: 13
- Explanation: The power of 12 is 9 (12 --> 6 --> 3 --> 10 --> 5 --> 16 --> 8 --> 4 --> 2 --> 1)
- The power of 13 is 9
- The power of 14 is 17
- The power of 15 is 17
- The interval sorted by the power value [12,13,14,15]. For k = 2 answer is the second element which is 13.
- Notice that 12 and 13 have the same power value and we sorted them in ascending order. Same for 14 and 15.
-
- Example 2:
-
- Input: lo = 1, hi = 1, k = 1
- Output: 1
-
- Example 3:
-
- Input: lo = 7, hi = 11, k = 4
- Output: 7
- Explanation: The power array corresponding to the interval [7, 8, 9, 10, 11] is [16, 3, 19, 6, 14].
- The interval sorted by power is [8, 10, 11, 7, 9].
- The fourth number in the sorted array is 7.
-
- Example 4:
-
- Input: lo = 10, hi = 20, k = 5
- Output: 13
-
- Example 5:
-
- Input: lo = 1, hi = 1000, k = 777
- Output: 570
-
-
-
- Constraints:
-
- 1 <= lo <= hi <= 1000
- 1 <= k <= hi - lo + 1
|
