Boardroom Meeting
Recently, you have been hired by an investment fund. You quickly developed a feeling, though, that something here was amiss, especially when a client's money has been invested in two companies carefully selected by their best astrologist.
Unfortunately, for the last n days the stock prices were (mostly) falling. The boss called an urgent meeting.
"Ladies and gentlemen, you all know the situation. Any ideas?" - the boss had a nice habit of gettingstraight to the point (even when this point apparently lied in another dimension of reality).
"We can choose a good subset of days, so that the prices are only increasing, then show the client onlythat company's prices for these days!" - volunteered Billy, the last Employee of the Month.
"We can do better! Select the days such that both companies' prices form an increasing sequence!" -Anna, the senior manager, wouldn't allow herself to stay behind.
"How about ditching the astrologist and doing some serious research?" - the words came from youalmost involuntarily, as if your brain and vocal cords had red without your consent.
The boss looked at you. It wasn't exactly a look of earnest approval...
Now you have some bruises, a lot of stairs to climb, and much work to do. Given the stock prices of the two companies for n consecutive days, find the maximum subset of days so that both price subsequences are (strictly) increasing. It is enough to output the maximum number of days.
Input
The first line contains the number of test cases z. The first line of every test case contains the number of days n (1 ≤ n ≤ 200 000). Then two lines follow. The first one contains n positive integers not exceeding 10^9
- the stock prices of the first company for all n days. The second line contains the second company's prices, in the same format. The total number of days in all test cases does not exceed 2 000 000.
Output
For each test case output in a separate line a single integer - the maximum possible number of days.