[{"data":1,"prerenderedAt":-1},["ShallowReactive",2],{"$f24NobgQ1TLGfFpNkYlm1vX3r2aiqHFnxbu40lRhHPsI":3},{"answer":4,"createTime":5,"id":6,"options":7,"origin":10,"question":16,"related":17,"source":25,"type":26},[],"2023-05-07 18:50:50",6316115,[8,9],"解决运动物体在某一时刻的瞬时速度问题","求平均速度",{"courseId":11,"courseImg":12,"courseName":13,"workId":14,"workName":15},"1000006305","https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F5f2f5617f02359a26ed78dcb09123072.png","文史哲与艺术中的数学","3764994","第五章单元测试","微积分的来源之一是( )",[18,27,35,43,46,55,63,71,79,87],{"answer":19,"createTime":5,"id":20,"options":21,"question":24,"source":25,"type":26},[],6316083,[22,23],"能","不能","如果一个旅店要有无穷多个房间,且都住满了旅客,又新来一个旅客,用数学思维我们能不能把它安排进去( )","v2",0,{"answer":28,"createTime":5,"id":29,"options":30,"question":34,"source":25,"type":26},[],6316088,[31,32,33],"一定是有限的量","一定是无限的量","可能是有限的量,也可能是无限的量","俗话说&quot;不积跬步不无以至千里&quot;,从数学角度看无穷个无限小的量累加之后( )",{"answer":36,"createTime":5,"id":37,"options":38,"question":42,"source":25,"type":26},[],6316106,[39,40,41],"2种","3种","4种","消除一个悖论一般来说有( )种选择",{"answer":44,"createTime":5,"id":6,"options":45,"question":16,"source":25,"type":26},[],[8,9],{"answer":47,"createTime":5,"id":48,"options":49,"question":53,"source":25,"type":54},[],6316123,[50,51,52],"建立极限的理论","认识实数的理论","增加对无理数的认识","第一次危机真正的解决,从根本上来说要( )",1,{"answer":56,"createTime":5,"id":57,"options":58,"question":62,"source":25,"type":26},[],6316125,[59,60,61],"无理数的发现","无穷小是0么","悖论的产生","第一次数学危机指的是( )",{"answer":64,"createTime":5,"id":65,"options":66,"question":70,"source":25,"type":26},[],6316127,[67,68,69],"策梅洛-弗兰克尔公理系统","康托尔公理系统","希尔伯特公理体系","ZF公理系统指的是( )",{"answer":72,"createTime":5,"id":73,"options":74,"question":78,"source":25,"type":26},[],6316132,[75,76,77],"一","二","三","第( )次数学危机为微积分找到可靠的根基",{"answer":80,"createTime":5,"id":81,"options":82,"question":86,"source":25,"type":26},[],6316134,[83,84,85],"古希腊","印度","中国","毕达哥拉斯是( )的哲学家、数学家、天文学家",{"answer":88,"createTime":5,"id":89,"options":90,"question":94,"source":25,"type":26},[],6316150,[91,92,93],"牛顿","狄德金","莱布尼茨","( )证明了广义二项式定理,并为幂级数的研究做出了贡献"]