这题为什么选乙?
本帖最后由 dora_clx 于 2024-2-24 11:09 编辑如图所示,在两支相同的试管中加入水,使甲试管内灌满水,乙试管内灌入一半水,然后各插入一根相同的细长玻璃管并用橡皮塞塞紧。若把甲、乙两试管同时浸入冰水混合物中,则细玻璃管内的水面变化情况是()
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**YHFP8sZNm0QrYO4iONlZhHfffZee+v736blnn6UFTY102/oVdNv2HdTeuZjOnzpK3QfepqGBXtYcl6eM5EkjGf/ahDrU4YPxDBhRLx/CXu4dp4s9IzQyMkpf/epX5dHa9oULRW8u49SpU7Iz+4/vfY/mVxFtXL+Gtm3bTstWraVLZ7qp++C7dOPKObYlnuyqEluLqeeZrQGzt+7MrvWN0+mrQ1Rb3yTvNHjs8cfCE18BVP2XDBcPuMk4d+4cHTp4kE6eOEGLOjrozq1raNeuXbRh0xZqrRuhptELtLS1mlZ21NOqRU20elEjrepq5LCBVnU20GqOr+xCvJFWMDU1NtAI1VLfcDUNDg7R7t27afWaNeEmeQbePXD40CE6xNTWwju0zRto186ddNsdd1Ibm6dp7BJ1NQ7Tio46trHa2miV2FjtjfgKjne0NNB4VR1dG8TtcrgneTlt2LBBXhQTMLcRLnzNMmCGhFlTXV091dc38GH+AmptbabOtgW0rAPOkwc4HKs410Zas5iJHe6axSDElQc5Bn5dbb1c6Q63bmXAHQ3Uzq+j+oZGeUqrpbWFFrY109KFvMPiHRV2WGbvHBsj7tJL2hv0ti22dbhVLsBHcLKzETJAx/lwf5wGhnBICir+roB+zntjAC+OcYyATOBpr8GRcRrCPVhyDrZ44EGEyz1sa44H9xrgIzjZ2QZ2sHKrFY/W3sExGhjmgcsJGfsYwQU6TKjJ26I4DLOqiYE7A4bEycLOOJ+t57SLwQjn6xsak3aDvYPFAwzByc5CYJDi8Vce8+wAeDWFqSiygQCUh4thV69do97ePmUGKOAQYR+OYqcEW0/lWjCyjI5XUW1**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**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**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**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**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**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**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**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
A. 甲试管中细玻璃管的水面降低得快
B. 乙试管中细玻璃管的水面降低得快
C. 甲、乙细玻璃管内水面降低得一样快
D. 无法确定
考的是空气遇冷收缩体积更大吧。 本帖最后由 zufall 于 2024-2-24 12:57 编辑
是不是因为甲管没有完全插入水中 管内发生热循环 乙管则完全在水中没有热循环 问了一下家里的小青年 https://app.qianfanedu.cn/public/emotion/face_022.png 水的比热容比空气大,所以。。。。 本帖最后由 Winnie09 于 2024-2-24 15:39 编辑
浸入冰水混合物,试管中的水放热,甲试管水的比热容大,质量多,甲试管的温度变化小。乙中有空气,温度变化大 ,空气受冷收缩快,压强变小,细玻璃管中的水面下降 感觉选B
瓶内和瓶外通过玻璃细管连通。根据PV=NRT,瓶内温度变低则瓶内P变小(不考虑瓶内水变冰),所以瓶外气压相对瓶内变大,所以玻璃细管水面下降。但是A瓶装满水所以下降的应该没有B瓶明显。不知道分析的对不对? 学霸贴,留名。。。 化学小世界 发表于 2024-3-1 14:13
学霸贴,留名。。。
这只是中考题……
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