某学生在整理班级同学的课外阅读时间数据时,制作了如下频数分布表。已知阅读时间在30分钟以下(不含30分钟)的人数为8人,占总人数的20%;阅读时间在30~60分钟(含30分钟,不含60分钟)的人数是30分钟以下人数的2倍;其余学生阅读时间在60分钟及以上。若该学生想用扇形统计图表示这组数据,那么表示‘60分钟及以上’阅读时间所对应的扇形圆心角度数是多少?
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设收集较少的学生收集了x节电池,则另一名学生收集了(3x - 5)节。根据题意,两人共收集27节,列出方程:x + (3x - 5) = 27。化简得4x - 5 = 27,解得4x = 32,x = 8。因此,收集较少的学生收集了8节电池。本题考查一元一次方程的实际应用,符合七年级数学课程要求。
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[{"id":1877,"content":"某学生在研究一组数据的分布特征时,绘制了频数分布直方图,并记录了以下信息:数据最小值为12,最大值为48,组距为6。若该学生将数据分为若干组,且最后一组的上限恰好为48,则这组数据被分成了多少组?若该学生进一步发现,其中一个组的频数为0,但该组仍被保留在直方图中,这说明该统计图遵循了哪项基本原则?","type":"选择题","subject":"语文","grade":"七年级","stage":"初中","difficulty":"困难","answer":"D","explanation":"首先计算分组数:数据范围 = 最大值 - 最小值 = 48 - 12 = 36,组距为6,因此理论组数 = 36 ÷ 6 = 6。由于最后一组上限恰好为48,说明分组从12开始,依次为[12,18)、[18,24)、[24,30)、[30,36)、[36,42)、[42,48],共6组(注意最后一组包含48,为闭区间)。因此分组数为6。其次,频数为0的组仍被保留,说明统计图完整呈现了所有预设区间,即使某区间无数据也不删除,这体现了‘频数为零的组也应保留以反映真实分布’的原则,避免误导数据连续性。选项D正确。","options":[{"id":"A","content":"分了5组;遵循了组间不重叠原则"},{"id":"B","content":"分了6组;遵循了等距分组原则"},{"id":"C","content":"分了7组;遵循了组限明确且不遗漏数据原则"},{"id":"D","content":"分了6组;遵循了频数为零的组也应保留以反映真实分布的原则"}]},{"id":621,"content":"在一次校园环保活动中,某班级收集了可回收垃圾的重量记录如下:纸类占总重量的40%,塑料类比纸类少10千克,金属类是塑料类的一半,其余为玻璃类,重6千克。若设总重量为x千克,则根据题意列出的正确方程是","type":"选择题","subject":"数学","grade":"初一","stage":"初中","difficulty":"简单","answer":"A","explanation":"根据题意,纸类占总重量的40%,即0.4x千克;塑料类比纸类少10千克,即(0.4x - 10)千克;金属类是塑料类的一半,即0.5 × (0.4x - 10)千克;玻璃类已知为6千克。四类垃圾重量之和应等于总重量x千克,因此方程为:0.4x + (0.4x - 10) + 0.5(0.4x - 10) + 6 = x。选项A正确表达了这一关系。其他选项中,B错误地将塑料类表示为比纸类多10千克,C将金属类误写为塑料类的2倍,D对塑料类的表达方式错误,不符合题意。","options":[{"id":"A","content":"0.4x + (0.4x - 10) + 0.5(0.4x - 10) + 6 = x"},{"id":"B","content":"0.4x + (0.4x + 10) + 0.5(0.4x + 10) + 6 = x"},{"id":"C","content":"0.4x + (0.4x - 10) + 2(0.4x - 10) + 6 = x"},{"id":"D","content":"0.4x + (x - 0.4x - 10) + 0.5(x - 0.4x - 10) + 6 = x"}]},{"id":2553,"content":"如图,在平面直角坐标系中,点A(2, 3)和点B(6, 3)是抛物线y = ax² + bx + c上的两点,且该抛物线的顶点位于线段AB的垂直平分线上。若该抛物线与x轴有两个交点,则下列结论中正确的是:","type":"选择题","subject":"数学","grade":"九年级","stage":"初中","difficulty":"中等","answer":"A","explanation":"由题意知,点A(2,3)和点B(6,3)在抛物线上,且它们的纵坐标相同,因此线段AB是水平的。线段AB的中点为((2+6)\/2, (3+3)\/2) = (4, 3)。由于抛物线的顶点在线段AB的垂直平分线上,而AB是水平的,其垂直平分线为竖直线x = 4,因此抛物线的对称轴为x = 4,即顶点横坐标为4,故选项A正确。又因为抛物线与x轴有两个交点,说明判别式Δ > 0,排除D。开口方向无法仅凭两点确定,C项中y轴交点c的值也无法确定,因此B和C不一定成立。综上,唯一必然正确的结论是A。","options":[{"id":"A","content":"抛物线的对称轴为直线x = 4"},{"id":"B","content":"抛物线的开口方向向下"},{"id":"C","content":"抛物线与y轴的交点在y轴正半轴上"},{"id":"D","content":"该抛物线的判别式Δ < 0"}]},{"id":1837,"content":"如图,在△ABC中,AB = AC,∠BAC = 120°,D为BC边上一点,且BD = 2DC。若AD = √7,则BC的长度为多少?","type":"选择题","subject":"数学","grade":"八年级","stage":"初中","difficulty":"中等","answer":"A","explanation":"本题考查等腰三角形性质、勾股定理及线段比例的综合运用。由于AB = AC且∠BAC = 120°,可知△ABC为顶角120°的等腰三角形。作AE⊥BC于E,则E为BC中点(等腰三角形三线合一),∠BAE = ∠CAE = 60°。设DC = x,则BD = 2x,BC = 3x,BE = EC = 1.5x。在Rt△AEB中,∠BAE = 60°,故∠ABE = 30°,可得AE = AB·sin60°,BE = AB·cos60° = AB\/2 = 1.5x,因此AB = 3x。于是AE = (3x)·(√3\/2) = (3√3\/2)x。在△ABD中,利用坐标法或向量法较复杂,改用勾股定理结合中线公式或面积法不便,转而使用余弦定理于△ABD和△ADC。但更简洁的方法是使用斯台沃特定理(Stewart's Theorem):在△ABC中,AD为从A到BC上点D的线段,满足AB²·DC + AC²·BD = AD²·BC + BD·DC·BC。代入AB = AC = 3x,BD = 2x,DC = x,BC = 3x,AD = √7,得:(9x²)(x) + (9x²)(2x) = 7·3x + (2x)(x)(3x) → 9x³ + 18x³ = 21x + 6x³ → 27x³ = 21x + 6x³ → 21x³ - 21x = 0 → 21x(x² - 1) = 0。解得x = 1(舍去x=0),故BC = 3x = 3。因此正确答案为A。","options":[{"id":"A","content":"3"},{"id":"B","content":"2√3"},{"id":"C","content":"√21"},{"id":"D","content":"3√3"}]},{"id":195,"content":"小明买了3支铅笔和2本笔记本,共花费18元。已知每本笔记本比每支铅笔贵3元,设每支铅笔的价格为x元,则下列方程正确的是( )。","type":"选择题","subject":"数学","grade":"初一","stage":"初中","difficulty":"简单","answer":"A","explanation":"设每支铅笔的价格为x元,根据题意,每本笔记本比每支铅笔贵3元,因此每本笔记本的价格为(x + 3)元。小明买了3支铅笔,总价为3x元;买了2本笔记本,总价为2(x + 3)元。两者相加等于总花费18元,因此方程为:3x + 2(x + 3) = 18。选项A正确。其他选项中,B错误地将笔记本价格设为比铅笔便宜,C和D则颠倒了铅笔和笔记本的数量与单价对应关系,均不符合题意。","options":[{"id":"A","content":"3x + 2(x + 3) = 18"},{"id":"B","content":"3x + 2(x - 3) = 18"},{"id":"C","content":"3(x + 3) + 2x = 18"},{"id":"D","content":"3(x - 3) + 2x = 18"}]},{"id":2519,"content":"某学生设计了一个几何图案,由一个边长为2的正方形绕其一个顶点逆时针旋转60°后得到一个新的图形。若原正方形的顶点A位于坐标原点(0,0),且边AB沿x轴正方向,则旋转后点B的新坐标最接近以下哪个选项?(参考数据:cos60°=0.5,sin60°=√3\/2≈0.866)","type":"选择题","subject":"数学","grade":"九年级","stage":"初中","difficulty":"简单","answer":"A","explanation":"原正方形边长为2,点B初始坐标为(2, 0)。将点B绕原点(即点A)逆时针旋转60°,可利用旋转公式:新坐标(x', y') = (x·cosθ - y·sinθ, x·sinθ + y·cosθ)。代入x=2, y=0, θ=60°,得x' = 2×0.5 - 0×(√3\/2) = 1,y' = 2×(√3\/2) + 0×0.5 = √3。因此旋转后点B的坐标为(1, √3),选项A正确。选项C虽然数值接近(因√3≈1.732),但表达不规范,不符合数学精确性要求;选项B是未旋转的坐标;选项D计算错误。本题考查旋转与坐标变换,结合三角函数知识,难度适中,符合九年级学生认知水平。","options":[{"id":"A","content":"(1, √3)"},{"id":"B","content":"(2, 0)"},{"id":"C","content":"(1, 1.732)"},{"id":"D","content":"(0.5, 1.5)"}]},{"id":2446,"content":"某校八年级开展‘数学建模’活动,研究校园内一座直角三角形花坛的围栏长度。已知花坛的两条直角边分别为√12米和√27米,现需在斜边上安装装饰灯带。若每米灯带成本为8元,则安装整条斜边灯带的总费用最接近以下哪个数值?","type":"选择题","subject":"数学","grade":"八年级","stage":"初中","difficulty":"中等","answer":"B","explanation":"首先化简两条直角边:√12 = 2√3,√27 = 3√3。根据勾股定理,斜边c = √[(2√3)² + (3√3)²] = √[12 + 27] = √39 ≈ 6.245米。每米灯带8元,总费用为6.245 × 8 ≈ 49.96元,最接近48元。因此选B。本题综合考查二次根式化简与勾股定理的实际应用,难度适中。","options":[{"id":"A","content":"40元"},{"id":"B","content":"48元"},{"id":"C","content":"56元"},{"id":"D","content":"64元"}]},{"id":302,"content":"长方形","type":"选择题","subject":"数学","grade":"初一","stage":"小学","difficulty":"简单","answer":"答案待完善","explanation":"解析待完善","options":[]},{"id":649,"content":"在一次班级环保活动中,某学生收集了若干个塑料瓶。如果他将收集数量的一半再减去3个,正好等于他最初收集数量的六分之一。那么他最初收集的塑料瓶数量是____个。","type":"填空题","subject":"数学","grade":"初一","stage":"初中","difficulty":"简单","answer":"9","explanation":"设该学生最初收集的塑料瓶数量为x个。根据题意,'数量的一半再减去3个'表示为(1\/2)x - 3,'最初数量的六分之一'表示为(1\/6)x。根据等量关系可列方程:(1\/2)x - 3 = (1\/6)x。解这个一元一次方程:两边同时乘以6消去分母,得3x - 18 = x;移项得3x - x = 18,即2x = 18;解得x = 9。因此,他最初收集了9个塑料瓶。","options":[]},{"id":2490,"content":"某学生制作一个圆锥形纸帽,已知纸帽的底面半径为3 cm,侧面展开图是一个圆心角为120°的扇形。若该学生想用一根细绳沿着纸帽的底面边缘缠绕一圈并拉直测量长度,则这根细绳的长度应为多少?","type":"选择题","subject":"数学","grade":"九年级","stage":"初中","difficulty":"简单","answer":"A","explanation":"题目考查圆的周长公式与扇形圆心角的关系。已知圆锥底面半径为3 cm,要求底面边缘一圈的长度,即求底面圆的周长。根据圆的周长公式 C = 2πr,代入 r = 3,得 C = 2π × 3 = 6π cm。虽然题目中提到了侧面展开图是120°的扇形,但该信息用于干扰或后续拓展,本题仅需求底面周长,因此无需使用该条件。正确答案为A。","options":[{"id":"A","content":"6π cm"},{"id":"B","content":"9π cm"},{"id":"C","content":"12π cm"},{"id":"D","content":"18π cm"}]}]