Description: Gianni, SWERC's chief judge, received a huge amount of high quality problems from the judges and now he has to choose a problem set for SWERC. He received $$$n$$$ problems and he assigned a beauty score and a difficulty to each of them. The $$$i$$$-th problem has beauty score equal to $$$b_i$$$ and difficulty equal to $$$d_i$$$. The beauty and the difficulty are integers between $$$1$$$ and $$$10$$$. If there are no problems with a certain difficulty (the possible difficulties are $$$1,2,\dots,10$$$) then Gianni will ask for more problems to the judges. Otherwise, for each difficulty between $$$1$$$ and $$$10$$$, he will put in the problem set one of the most beautiful problems with such difficulty (so the problem set will contain exactly $$$10$$$ problems with distinct difficulties). You shall compute the total beauty of the problem set, that is the sum of the beauty scores of the problems chosen by Gianni. Input Format: Each test contains multiple test cases. The first line contains an integer $$$t$$$ ($$$1\le t\le 100$$$) — the number of test cases. The descriptions of the $$$t$$$ test cases follow. The first line of each test case contains the integer $$$n$$$ ($$$1\le n\le 100$$$) — how many problems Gianni received from the judges. The next $$$n$$$ lines contain two integers each. The $$$i$$$-th of such lines contains $$$b_i$$$ and $$$d_i$$$ ($$$1\le b_i, d_i\le 10$$$) — the beauty score and the difficulty of the $$$i$$$-th problem. Output Format: For each test case, print the total beauty of the problem set chosen by Gianni. If Gianni cannot create a problem set (because there are no problems with a certain difficulty) print the string MOREPROBLEMS (all letters are uppercase, there are no spaces). Note: In the first test case, Gianni has received only $$$3$$$ problems, with difficulties $$$3, 4, 7$$$ which are not sufficient to create a problem set (for example because there is not a problem with difficulty $$$1$$$). In the second test case, Gianni will create a problem set by taking the problems $$$2$$$, $$$3$$$, $$$4$$$, $$$5$$$, $$$7$$$, $$$8$$$, $$$9$$$, $$$10$$$, $$$11$$$ (which have beauty equal to $$$10$$$ and all difficulties from $$$1$$$ to $$$9$$$) and one of the problems $$$1$$$ and $$$6$$$ (which have both beauty $$$3$$$ and difficulty $$$10$$$). The total beauty of the resulting problem set is $$$10\cdot 9 + 3 = 93$$$.