{"problem":{"name":"Frog 1","description":{"content":"There are $N$ stones, numbered $1, 2, \\ldots, N$. For each $i$ ($1 \\leq i \\leq N$), the height of Stone $i$ is $h_i$. There is a frog who is initially on Stone $1$. He will repeat the following action","description_type":"Markdown"},"platform":"AtCoder","limit":{"time_limit":2000,"memory_limit":262144},"difficulty":"None","is_remote":true,"is_sync":true,"sync_url":null,"sign":"dp_a"},"statements":[{"statement_type":"Markdown","content":"There are $N$ stones, numbered $1, 2, \\ldots, N$. For each $i$ ($1 \\leq i \\leq N$), the height of Stone $i$ is $h_i$.\nThere is a frog who is initially on Stone $1$. He will repeat the following action some number of times to reach Stone $N$:\n\n*   If the frog is currently on Stone $i$, jump to Stone $i + 1$ or Stone $i + 2$. Here, a cost of $|h_i - h_j|$ is incurred, where $j$ is the stone to land on.\n\nFind the minimum possible total cost incurred before the frog reaches Stone $N$.\n\n## Constraints\n\n*   All values in input are integers.\n*   $2 \\leq N \\leq 10^5$\n*   $1 \\leq h_i \\leq 10^4$\n\n## Input\n\nInput is given from Standard Input in the following format:\n\n$N$\n$h_1$ $h_2$ $\\ldots$ $h_N$\n\n[samples]","is_translate":false,"language":"English"}],"meta":{"iden":"dp_a","tags":[],"sample_group":[["4\n10 30 40 20","30\n\nIf we follow the path $1$ → $2$ → $4$, the total cost incurred would be $|10 - 30| + |30 - 20| = 30$."],["2\n10 10","0\n\nIf we follow the path $1$ → $2$, the total cost incurred would be $|10 - 10| = 0$."],["6\n30 10 60 10 60 50","40\n\nIf we follow the path $1$ → $3$ → $5$ → $6$, the total cost incurred would be $|30 - 60| + |60 - 60| + |60 - 50| = 40$."]],"created_at":"2026-03-03 11:01:14"}}