Problem Description The local pie shop is offering a promotion - all-you-can-eat pies! Obviously, you can't pass up this offer. The shop lines up N pies from left to right - the ith pie contains A, grams of sugar. Additionally, another M pies are provided - the ith of these contains B, grams of sugar. You are first allowed to insert each of the M pies from the second group anywhere into the first list of N pies, such as at its start or end, or in between any two pies already in the list. The result will be a list of N + M pies with the constraint that the initial N pies are still in their original relative order. Following this, you are allowed to take one walk along the new line of pies from left to right, to pick up your selection of all-you-can-eat pies! When you arrive at a pie, you may choose to add it to your pile, or skip it. However, because you're required to keep moving, if you pick up a certain pie, you will not be able to also pick up the pie immediately after it (if any). In other words, you cannot eat consecutive pies in this combined list. Being a pie connoisseur, your goal is to maximize the total amount of sugar in the pies you pick up from the line. How many grams can you get? Input Specification The first line of input contains the integer N (1SN < 300). The next N lines contain one integer A; (1 < A, < 10*), describing the integer number of grams of sugar in pie i in the group of N pies. The next line contains M (0 < M < 100), the number of pies in the second list. The next M lines contain one integer B, (1< B, < 10°), describing the integer number of grams of sugar in pie i in the group of M pies. Output Specification Output the maximum number of grams of sugar in all the pies that you are able to pick up. Sample Input 5. 10 12 6. 14

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3 1 Output for Sample Input 44 Explanation of Output for Sample Input Place the pies in the order 10, 1, 12, 2, 8, 6, 14, 7 (that is, insert the pie with 1 gram of sugar between 10 and 12, and insert pies with 2 and 8 grams of sugar, in that order, between pies 12 and 6). Then, we can grab 10 + 12 + 8+ 14 = 44 grams of sugar, which is maximal.

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Problem Description The local pie shop is offering a promotion - all-you-can-eat pies! Obviously, you can't pass up this offer. The shop lines up N pies from left to right - the ith pie contains A, grams of sugar. Additionally, another M pies are provided - the ith of these contains B grams of sugar. You are first allowed to insert each of the M pies from the second group anywhere into the first list N pies, such as at its start or end, or in between any two pies already in the list. The result will be a list of N + M pies with the constraint that the initial N pies are still in their original relative order. Following this, you are allowed to take one walk along the new line of pies from left to right, to pick up your selection of all-you-can-eat pies! When you arrive at a pie, you may choose to add it to your pile, or skip it. However, because you're required to keep moving, if you pick up a certain pie, you will not be able to also pick up the pie immediately after it (if any). In other words, you cannot eat consecutive pies in this combined list. Being a pie connoisseur, your goal is to maximize the total amount of sugar in the pies you pick up from the line. How many grams can you get? Input Specification The first line of input contains the integer N (1 <N< 3000). The next N lines contain one integer A; (1 < A < 10°), describing the integer number of grams of sugar in pie i in the group of N pies. The next line contains M (0 < M < 100), the number of pies in the second list. The next M lines contain one integer B, (1< B, < 10*), describing the integer number of grams of sugar in pie i in the group of M pies. Output Specification Output the maximum number grams of sugar in all the pies that you are able to pick up. Sample Input 5 10 12 6 14 7