{"database": "grpo-gsm8k-train", "table": "results", "rows": [[9, "grpo-gsm8k-train-13ep-success_global_step_50", "gsm8k_main(0)", "8", "Question: John drives for 3 hours at a speed of 60 mph and then turns around because he realizes he forgot something very important at home.  He tries to get home in 4 hours but spends the first 2 hours in standstill traffic.  He spends the next half-hour driving at a speed of 30mph, before being able to drive the remaining time of the 4 hours going at 80 mph.  How far is he from home at the end of those 4 hours?\nAnswer:", "<|im_start|>system\nYou are Qwen, created by Alibaba Cloud. You are a helpful assistant.<|im_end|>\n<|im_start|>user\nOutput format: end your response with \\boxed{<answer>} where <answer> is the final answer.\n\nQuestion: John drives for 3 hours at a speed of 60 mph and then turns around because he realizes he forgot something very important at home.  He tries to get home in 4 hours but spends the first 2 hours in standstill traffic.  He spends the next half-hour driving at a speed of 30mph, before being able to drive the remaining time of the 4 hours going at 80 mph.  How far is he from home at the end of those 4 hours?\nAnswer:<|im_end|>\n<|im_start|>assistant\n", "45", 0, "[175]", "[stop:-]", "To determine how far John is from home at the end of 4 hours, we need to calculate the total distance he has traveled and then subtract the distance he has already covered.\n\nFirst, let's calculate the distance John travels in the first 3 hours at 60 mph:\n\\[\n\\text{Distance}_1 = 3 \\text{ hours} \\times 60 \\text{ mph} = 180 \\text{ miles}\n\\]\n\nNext, we need to account for the time he spends in standstill traffic. He spends the first 2 hours in traffic, so he does not travel any distance during this time:\n\\[\n\\text{Distance}_2 = 2 \\text{ hours} \\times 0 \\text{ mph} = 0 \\text{ miles}\n\\]\n\nThen, he spends the next half-hour (0.5 hours) driving at 30 mph:\n\\[\n\\text{Distance}_3 = 0.5 \\text{ hours} \\times 30 \\text{ mph} = 15 \\text{ miles}\n\\]\n\nFinally, he drives the remaining 2 hours at 80 mph:\n\\[\n\\text{Distance}_4 = 2 \\text{ hours} \\times 80 \\text{ mph} = 160 \\text{ miles}\n\\]\n\nNow, we sum up all the distances to find the total distance John has traveled:\n\\[\n\\text{Total Distance} = \\text{Distance}_1 + \\text{Distance}_2 + \\text{Distance}_3 + \\text{Distance}_4 = 180 \\text{ miles} + 0 \\text{ miles} + 15 \\text{ miles} + 160 \\text{ miles} = 355 \\text{ miles}\n\\]\n\nSince John started 180 miles from home, the distance he is from home at the end of 4 hours is:\n\\[\n\\text{Distance from Home} = 180 \\text{ miles} - 355 \\text{ miles} = -175 \\text{ miles}\n\\]\n\nHowever, since distance cannot be negative, we interpret this as John being 175 miles away from home in the opposite direction. Therefore, the final answer is:\n\\[\n\\boxed{175}\n\\]"]], "columns": ["id", "model_name", "task_name", "sample_id", "prompt_actual", "prompt_full", "gold_answer", "is_correct", "extracted_answers", "stop_reasons", "response_1"], "primary_keys": ["id"], "primary_key_values": ["9"], "units": {}, "query_ms": 3.105380106717348}