[{"id":1769,"subject":"数学","grade":"七年级","stage":"初中","type":"填空题","content":"在平面直角坐标系中，点A(2, 3)和点B(6, 7)是某矩形的两个对角顶点，且该矩形的边分别与坐标轴平行。若该矩形的另外两个顶点中有一个位于第二象限，则这个顶点的坐标是___。","answer":"(-2, 3)","explanation":"矩形边与坐标轴平行，说明另外两个顶点横纵坐标分别取自A和B的坐标组合。第二象限要求横坐标为负，纵坐标为正，唯一符合条件的点是(-2, 3)。","solution_steps":null,"common_mistakes":null,"learning_suggestions":null,"difficulty":"困难","points":1,"is_active":1,"created_at":"2026-01-06 15:12:25","updated_at":"2026-01-06 15:12:25","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[]},{"id":1842,"subject":"数学","grade":"八年级","stage":"初中","type":"选择题","content":"如图，在平面直角坐标系中，点 A(0, 0)、B(4, 0)、C(2, 2√3) 构成一个三角形。若将该三角形沿某条直线折叠后，点 A 恰好与点 C 重合，则这条折痕所在的直线方程是：","answer":"D","explanation":"本题考查轴对称与一次函数的综合应用。折痕是点 A 与点 C 的对称轴，即线段 AC 的垂直平分线。首先计算 AC 的中点坐标：A(0,0)，C(2, 2√3)，中点 M 为 ((0+2)\/2, (0+2√3)\/2) = (1, √3)。再求 AC 的斜率：k_AC = (2√3 - 0)\/(2 - 0) = √3。因此，折痕（垂直平分线）的斜率为其负倒数，即 -1\/√3 = -√3\/3。利用点斜式方程，过点 M(1, √3)，斜率为 -√3\/3，得：y - √3 = (-√3\/3)(x - 1)。化简得：y = (-√3\/3)x + √3\/3 + √3 = (-√3\/3)x + (4√3\/3)。因此正确选项为 D。","solution_steps":null,"common_mistakes":null,"learning_suggestions":null,"difficulty":"中等","points":1,"is_active":1,"created_at":"2026-01-06 16:52:54","updated_at":"2026-01-06 16:52:54","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[{"id":"A","content":"y = √3 x","is_correct":0},{"id":"B","content":"y = -√3 x + 2√3","is_correct":0},{"id":"C","content":"y = (√3 \/ 3)x + (4√3 \/ 3)","is_correct":0},{"id":"D","content":"y = - (√3 \/ 3)x + (4√3 \/ 3)","is_correct":1}]},{"id":294,"subject":"数学","grade":"初一","stage":"小学","type":"选择题","content":"在平面直角坐标系中，点A的坐标是(3, -2)，点B的坐标是(-1, 4)。若点C是线段AB的中点，则点C的坐标是","answer":"A","explanation":"根据平面直角坐标系中两点间中点坐标公式：若点A的坐标为(x₁, y₁)，点B的坐标为(x₂, y₂)，则中点C的坐标为((x₁ + x₂)\/2, (y₁ + y₂)\/2)。将点A(3, -2)和点B(-1, 4)代入公式，得：横坐标为(3 + (-1))\/2 = 2\/2 = 1，纵坐标为(-2 + 4)\/2 = 2\/2 = 1。因此，点C的坐标为(1, 1)。选项A正确。","solution_steps":null,"common_mistakes":null,"learning_suggestions":null,"difficulty":"简单","points":1,"is_active":1,"created_at":"2025-12-29 15:33:05","updated_at":"2025-12-30 11:11:27","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[{"id":"A","content":"(1, 1)","is_correct":1},{"id":"B","content":"(2, 2)","is_correct":0},{"id":"C","content":"(1, 2)","is_correct":0},{"id":"D","content":"(2, 1)","is_correct":0}]},{"id":233,"subject":"数学","grade":"初一","stage":"小学","type":"填空题","content":"某学生计算一个多边形的内角和时，使用了公式 (n - 2) × 180°，其中 n 表示边数。如果这个多边形是五边形，那么它的内角和是_空白处_度。","answer":"540","explanation":"根据多边形内角和公式 (n - 2) × 180°，五边形的边数 n = 5。代入公式得：(5 - 2) × 180° = 3 × 180° = 540°。因此，五边形的内角和是540度。","solution_steps":null,"common_mistakes":null,"learning_suggestions":null,"difficulty":"简单","points":1,"is_active":1,"created_at":"2025-12-29 14:41:09","updated_at":"2025-12-30 11:11:27","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[]},{"id":2397,"subject":"数学","grade":"八年级","stage":"初中","type":"选择题","content":"某公园设计一个轴对称的菱形花坛ABCD，其对角线AC与BD相交于点O，且AC = 8米，BD = 6米。为铺设灌溉管道，需计算从顶点A到顶点C沿花坛边缘的最短路径长度。已知花坛边缘只能沿菱形的边行走，则该最短路径的长度为多少米？","answer":"A","explanation":"本题综合考查菱形的性质、轴对称、勾股定理及最短路径思想。菱形ABCD中，对角线AC = 8，BD = 6，且互相垂直平分，故AO = 4，BO = 3。在Rt△AOB中，由勾股定理得边长AB = √(4² + 3²) = √(16 + 9) = √25 = 5米。因此菱形每边长为5米。从A到C沿边缘行走的最短路径有两种可能：A→B→C 或 A→D→C，每条路径均为两条边之和，即5 + 5 = 10米。由于菱形是轴对称图形，两条路径长度相等，故最短路径为10米。选项A正确。","solution_steps":"","common_mistakes":"","learning_suggestions":"","difficulty":"中等","points":1,"is_active":1,"created_at":"2026-01-10 12:01:49","updated_at":"2026-01-10 12:01:49","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[{"id":"A","content":"10","is_correct":1},{"id":"B","content":"8","is_correct":0},{"id":"C","content":"2√13","is_correct":0},{"id":"D","content":"√73","is_correct":0}]},{"id":1412,"subject":"数学","grade":"七年级","stage":"初中","type":"解答题","content":"某城市计划在一条主干道上安装新型节能路灯，路灯的照明范围为一个以灯杆底部为圆心、半径为10米的圆形区域。为了确保整条道路被完全照亮且无重叠浪费，工程师决定采用交错排列的方式安装路灯：即相邻两盏路灯之间的水平距离为d米，且每盏路灯的照明区域恰好与前、后两盏路灯的照明区域相切。已知该主干道为一条直线，路灯沿道路中心线安装。现测得在一段长度为200米的道路上共安装了n盏路灯（包括起点和终点各一盏），且满足以下条件：\n\n1. 第一盏路灯安装在起点位置（坐标为0）；\n2. 最后一盏路灯安装在终点位置（坐标为200）；\n3. 所有路灯均匀分布，相邻间距均为d米；\n4. 每盏路灯的照明区域与前、后路灯的照明区域外切（即两圆外切，圆心距等于半径之和）；\n5. 整段道路被完全覆盖，无暗区。\n\n请根据以上信息，求出相邻两盏路灯之间的距离d，并确定该段道路上共安装了多少盏路灯（即求n的值）。","answer":"解：\n\n由题意可知，每盏路灯的照明区域是以灯杆为圆心、半径为10米的圆。\n\n由于相邻两盏路灯的照明区域外切，说明两圆心之间的距离等于两半径之和，即：\n\n  d = 10 + 10 = 20（米）\n\n因此，相邻两盏路灯之间的距离为20米。\n\n又已知第一盏路灯安装在起点（坐标为0），最后一盏安装在终点（坐标为200），且所有路灯均匀分布，间距为20米。\n\n设共安装了n盏路灯，则从第一盏到第n盏之间有(n - 1)个间隔，每个间隔为20米，总长度为：\n\n  (n - 1) × 20 = 200\n\n解这个方程：\n\n  (n - 1) × 20 = 200\n  n - 1 = 10\n  n = 11\n\n验证照明覆盖情况：\n- 每盏灯覆盖左右各10米，即覆盖区间为[位置 - 10, 位置 + 10]；\n- 第一盏灯在0米处，覆盖[-10, 10]，实际有效覆盖[0, 10]；\n- 第二盏在20米处，覆盖[10, 30]；\n- 第三盏在40米处，覆盖[30, 50]；\n- ……\n- 第十一盏在200米处，覆盖[190, 210]，有效覆盖[190, 200]。\n\n可见，相邻照明区域在边界处恰好相接（如第一盏覆盖到10米，第二盏从10米开始），无重叠也无间隙，满足“完全覆盖且无浪费”的要求。\n\n答：相邻两盏路灯之间的距离d为20米，该段道路上共安装了11盏路灯。","explanation":"本题综合考查了几何图形初步（圆的相切）、一元一次方程（建立并求解间距与数量关系）、有理数运算（乘除与方程求解）以及实际应用建模能力。解题关键在于理解“外切”意味着圆心距等于半径之和，从而得出间距d = 20米。接着利用总长200米和等距排列的特点，建立方程(n - 1)d = 200，代入d = 20后求解n。最后还需验证照明覆盖是否连续无遗漏，体现数学建模的完整性。题目情境新颖，将几何知识与代数方程结合，难度较高，适合学有余力的七年级学生挑战。","solution_steps":null,"common_mistakes":null,"learning_suggestions":null,"difficulty":"困难","points":1,"is_active":1,"created_at":"2026-01-06 11:29:06","updated_at":"2026-01-06 11:29:06","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[]},{"id":1368,"subject":"数学","grade":"七年级","stage":"初中","type":"解答题","content":"某城市地铁线路规划中，需确定两个站点A和B之间的最短运行时间。已知列车在平直轨道上的平均速度为每小时60千米，但在弯道处需减速至每小时40千米。线路设计图显示，从A站到B站的总轨道长度为12千米，其中包含一段弯道。若列车全程运行时间不超过15分钟，且弯道长度至少为2千米，试求弯道长度的可能取值范围。假设列车在直道和弯道上均以恒定速度行驶，且不考虑停站和加减速时间。","answer":"解：\n设弯道长度为x千米，则直道长度为(12 - x)千米。\n根据题意，弯道长度至少为2千米，即：\nx ≥ 2。\n列车在弯道上的速度为40千米\/小时，行驶时间为：\n弯道时间 = x \/ 40 小时。\n列车在直道上的速度为60千米\/小时，行驶时间为：\n直道时间 = (12 - x) \/ 60 小时。\n总运行时间为两者之和，且不超过15分钟，即15\/60 = 0.25小时。\n因此，建立不等式：\nx \/ 40 + (12 - x) \/ 60 ≤ 0.25。\n为消去分母，两边同乘以120（40和60的最小公倍数）：\n120 × (x \/ 40) + 120 × ((12 - x) \/ 60) ≤ 120 × 0.25\n3x + 2(12 - x) ≤ 30\n3x + 24 - 2x ≤ 30\nx + 24 ≤ 30\nx ≤ 6\n结合弯道长度至少为2千米的条件，得：\n2 ≤ x ≤ 6\n因此，弯道长度的可能取值范围是大于等于2千米且小于等于6千米。\n答：弯道长度的取值范围是2千米到6千米（含端点）。","explanation":"本题综合考查了一元一次不等式的建立与求解，以及实际问题的数学建模能力。首先根据题意设定未知数x表示弯道长度，利用速度、时间与路程的关系分别表示直道和弯道的行驶时间，再根据总时间不超过15分钟（即0.25小时）建立不等式。通过通分消去分母，化简不等式得到x ≤ 6，再结合题设中弯道长度至少为2千米的条件，最终确定x的取值范围为2 ≤ x ≤ 6。解题过程中需注意单位统一（时间换算为小时），并合理运用不等式的性质进行变形。本题背景新颖，贴近现实，考查学生将实际问题转化为数学表达式的能力，属于困难难度的综合性应用题。","solution_steps":null,"common_mistakes":null,"learning_suggestions":null,"difficulty":"困难","points":1,"is_active":1,"created_at":"2026-01-06 11:11:20","updated_at":"2026-01-06 11:11:20","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[]},{"id":687,"subject":"数学","grade":"初一","stage":"小学","type":"填空题","content":"某学生在整理班级同学的身高数据时，将数据分为四组：140～150 cm，150～160 cm，160～170 cm，170～180 cm。已知第二组的频数是12，频率是0.3，则这次调查的总人数是____。","answer":"40","explanation":"频率等于频数除以总人数，即 频率 = 频数 ÷ 总人数。已知第二组的频数是12，频率是0.3，因此总人数 = 12 ÷ 0.3 = 40。","solution_steps":null,"common_mistakes":null,"learning_suggestions":null,"difficulty":"简单","points":1,"is_active":1,"created_at":"2025-12-29 22:33:56","updated_at":"2025-12-30 11:11:27","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[]},{"id":1804,"subject":"数学","grade":"八年级","stage":"初中","type":"选择题","content":"某学生在研究一个等腰三角形时，发现其底边长为6，两腰的长度满足方程 x² - 8x + 15 = 0。若该三角形存在，则其周长为多少？","answer":"A","explanation":"首先解方程 x² - 8x + 15 = 0。通过因式分解可得：(x - 3)(x - 5) = 0，解得 x = 3 或 x = 5。由于是等腰三角形，两腰长度相等，因此腰长可能为3或5。若腰长为3，底边为6，则 3 + 3 = 6，不满足三角形两边之和大于第三边的条件，不能构成三角形。因此腰长只能为5。此时三角形三边为5、5、6，满足三角形三边关系。周长为 5 + 5 + 6 = 16。故正确答案为A。","solution_steps":null,"common_mistakes":null,"learning_suggestions":null,"difficulty":"简单","points":1,"is_active":1,"created_at":"2026-01-06 16:17:19","updated_at":"2026-01-06 16:17:19","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[{"id":"A","content":"16","is_correct":1},{"id":"B","content":"18","is_correct":0},{"id":"C","content":"20","is_correct":0},{"id":"D","content":"22","is_correct":0}]},{"id":2233,"subject":"数学","grade":"七年级","stage":"初中","type":"填空题","content":"某学生在数轴上从原点出发，先向右移动5个单位长度，再向左移动8个单位长度，接着向右移动3个单位长度，最后向左移动6个单位长度。此时该学生所在位置的数是___。","answer":"-6","explanation":"向右移动表示加上正数，向左移动表示加上负数。因此整个过程可表示为：0 + 5 + (-8) + 3 + (-6) = (5 + 3) + (-8 - 6) = 8 - 14 = -6。该题综合考查正负数在数轴上的实际应用与有理数加减运算，需学生理解方向与正负号的对应关系并进行多步计算。","solution_steps":"","common_mistakes":"","learning_suggestions":"","difficulty":"困难","points":1,"is_active":1,"created_at":"2026-01-09 14:39:22","updated_at":"2026-01-09 14:39:22","sort_order":0,"source":null,"tags":null,"analysis":null,"knowledge_point":null,"difficulty_coefficient":null,"suggested_time":null,"accuracy_rate":null,"usage_count":0,"last_used":null,"view_count":0,"favorite_count":0,"options":[]}]