- 压杆失稳将在( )的纵向平面内发生。
- 图示水平放置圆截面直角折杆(ABC=90),,直径d=100 mm,AB=BC=l=2 m,q=1 kN/m,P=1.5 kN,[σ]=120 MPa。折杆的危险截面、危险截面的弯矩和扭矩分别为( )。
- 图示水平放置圆截面直角折杆(ABC=90),,直径d=100 mm,AB=BC=l=2 m,q=1 kN/m,P=1.5 kN,[σ]=120 MPa。试按第三强度理论校核AB杆的强度( )。
- 下列关于单元体的说法中错误的是( )。
- 以下判断错误的是( )。
- 变速箱中,等强度低速轴的直径比高速轴的直径( )。
- 构件的稳定性是指构件( )。
- 构件的刚度是指构件( )。
- 构件的强度是指构件( )
- 如果质点做匀速直线运动,则其受力情况是( )。
- 下列判断正确的是( )。
- 下列判断错误的是( )。
- 点沿曲线运动,图示给出的速度v和加速度a的情况中,不可能的是( )。
- 刚体作平动时,其上各点的运动轨迹可能是( )。
- 两齿轮啮合时,当两轮不做匀速转动,则( )。
- 力系中各力的作用线均平行的空间力系的独立平衡方程的数目是( )。
- 平面力偶等效的必要和充分条件是( )。
- 作用在刚体上的力偶的力偶矩是( )。
- 作用在刚体上的力是( )。
- 下述公理中,只适用于刚体的有( )。
- 工程力学课程由( )两部分组成。
- 工程力学主要研究的物体机械运动的( )等两个方面。
- 材料力学的研究对象是( )。
- 理论力学研究( )的机械运动的一般规律。
- 理论力学主要研究对象是( )。
- 图示手摇绞车的最大起重量P=1kN,材料为Q235钢,材料的许用应力为[s]=80MPa,试用第三强度理论确定绞车轴的直径。其解题步骤为:(1)危险截面、其弯矩、扭矩分别为 、 、 ;(2)其第三强度理论的强度条件、抗弯截面系数、轴直径公式分别为 、 、 。
- 图示直角曲拐AB=l、BC=a,材料的许用应力为[s],AB段直径为D,试用第四强度理论确定许可载荷[F]。
- 图示传动机构中,等截面实心圆轴的直径为d,轮C、E的直径为D,两皮带的张力分别为F和3F。材料为塑性材料,其许用应力为[s]。 求:(1)危险截面、其铅垂面的弯矩、水平面的弯矩、扭矩分别为 , 、 、 。(2)其第三强度理论的强度条件 。 (3)按第三强度理论求得许可载荷[F]= 。
- 托架如图所示,已知AB杆为矩形截面,宽度b=20mm,高度h=40mm,CD杆为圆形截面,直径D=10mm。两杆材料为钢,许用应力[s]=160MPa,试按强度要求计算结构许可载荷[F]。 其解题过程为:(1)CD杆受拉力、AC杆的压力大小分别为 、 ,AB杆的最大弯矩 。(2)CD杆受拉,其强度条件、截面面积、许可载荷分别为: 、 、 ;(3)AB杆为压、弯组合变形,其强度条件、截面面积、许可载荷分别为: 、 、 ;(4)所以按强度要求计算结构的许可载荷为 。
- 下列关于单元体的说法中错误的是 。
- 工字形截面简支梁受力如图示,其上各点的应力状态见图示,关于它们的正确性有四种答案,其中正确的一个是 。
- 在曲柄压力机构中,已知曲柄OA=R,连杆AB=l。在图示位置机构处于平衡,角度a、b和冲压力F已知,各杆自重不计。则连杆AB受到的力 ,在曲柄上加的力偶矩 。
- A、B、C、D处均为球形铰链,各杆件的重量不计,重物的重量为W。杆AB、AC、AD所受的力分别为 、 。
- 作用在刚体上的力是 ,作用在刚体上的力偶的力偶矩是 。
- 利用“力的可传性”将图(a)作用三铰拱上的D点的力F沿其作用线平移至图(b)的E点。(a)图中A处的反力为过A点 。
- 如图所示的结构由4根杆OB、BC、CE、AD 铰接而成,各杆重量不计,在杆OB上作用一个力偶M,则O处的反力为过O点 。
- 螺栓圈如图所示,受到3个力的作用,其合力向下,则图中的角度q = ,合力的大小等于 。
- 压杆一般分为三种类型,它们是按压杆的 分。
- 图示各段杆是材料相同、直径相等的圆截面细长压件,各杆长度不同,在图示中分别以杆件直径的倍数表示,则在轴向压力F的作用下, 杆将首先失稳。
- 压杆的柔度综合反映了压杆的 对临界压力的影响。
- 下面说法错误的是 。
- 压杆失稳将在 的纵向平面内发生。
- 圆截面细长压杆的材料及支撑情况保持不变,将其直径及杆长同时增加1倍,压杆的 。
- 两根细长压杆a和b的长度、横截面面积、约束状态及材料相同,若其横截面形状分别为正方形和圆形,则两压力杆的临界压力Fcr,a和Fcr,b的关系是 。
- 如图外伸梁受均布载荷、集中力与力偶的作用,梁的剪力图、弯矩图分别为 、 。
- 外伸梁AE受均布载荷的作用,载荷集度为q。图中BC=CD=l,AB=DE=a。欲使支座B、D处弯矩的绝对值与梁中点C处弯矩相等,则长度l与a的关系为 。
- 矩形截面外伸梁如图所示,已知矩形截面高宽比h/b=1.5,材料许用应力[s]=10MPa。支座A、B处的约束反力 ,危险截面及弯矩为 、 ,确定梁横截面的宽度的过程 。
- T字型铸铁悬臂梁,截面尺寸如图所示,已知: Iz=1.0186´10-4m4,h1=96.4mm, h2=153.6mm。材料的许用拉应力[st]= 40MPa,许用压应力[sc]= 80MPa。可能的危险截面及弯矩分别为 ,计算计算此梁的许可载荷P的过程 。
- 某圆轴的外伸部分是空心圆截面,载荷如图所示,轴承A、B处的约束反力 ,可能的危险截面及弯矩分别为 ,计算轴内最大正应力的过程 。
- T字形截面铸铁梁的荷载及截面尺寸如图所示,C为截面的形心,截面对中性轴的惯性矩为Iz=8.86´10-6 m4,y1=95mm,y2=45mm。材料的许用拉应力[st]=40 MPa,许用压应力[sc]=140 MPa。危险截面为 ,校核梁的正应力强度过程 。
- 图示截面对z轴的惯性矩与抗弯截面系数分别为 、 。
- 图示情况, 。
- 悬臂梁如图所示,下列5个位移关系中正确的是 。
- 两段同样直径的实心钢轴由法兰盘籍螺栓连接,如图所示。轴的转速n=240r/min,若圆轴材料的许用切应力[t]=80MPa,则轴的扭矩、最大切应力及强度校核的结果分别为 、 。
- 由薄板卷成薄壁圆筒后,用一排铆钉固定。已知薄壁圆筒厚为t,平均直径为D,长为l,铆钉许用切应力为[t],横截面面积为A。此圆筒受图示扭转力偶M作用时,铆钉个数 。
- 图示两端固定的阶梯圆轴,在截面突变处C受一外力偶矩T作用,若d1= 2d2,固定端的约束力偶矩TA和TB分别为 。
- 两段同样直径的实心钢轴由法兰盘籍六只螺栓连接,如图所示,h=180mm。轴的转速n=240r/min,若螺栓材料的许用切应力[t]=55MPa,则各螺栓受到的剪力(或切应力)及螺栓的直径计算正确的是 。
- 图示传动轴,n=300转/分,B轮为主动轮,输入功率PB=10kW,A、C、D轮为从动轮,输出功率为PA=4.5kW,PC=3.5kW,PD=2kW。该传动轴的最大扭矩 ,材料为钢,其切变模量G=80GPa,许用切应力[t]=40MPa,圆轴单位长度许可扭转角[q]=1.0°/m。根据 ,设计出该传动轴的最合适的直径 。
- 以下判断错误的是 。
- 变速箱中,等强度低速轴的直径比高速轴的直径 。
- 一阶梯形钢轴如图所示,m2=1.5kNm,材料的切变模量G=80GPa,求:AB与BC段单位长度扭转角相等,(1)在B截面加的力偶m1= ;(2)AB段及BC段单位长度扭转角的大小为 (3)此时C截面相对A截面的扭转角jCA= 。
- 铸铁圆轴在外力作用下发生图示的破坏,其破坏前受力状态应为如图 所示,该轴是被 的。
- 如图所示,实心圆轴和空心圆轴通过牙嵌式离合器连接在一起,已知轴传递功率为P(kW),转速为n(r/min),材料的许用切应力为[t],空心圆轴的内外径之比为a。则实心圆轴直径d1与空心圆轴外径D2的最小值分别为 。
- 等截面均值杆如图所示,其杆长为l,横截面积为A,单位体积重为g。求该杆在自重作用下的最大轴力 ,最大应力 ,杆的总变形量 。
- 构件的强度是指构件 ,构件的刚度是指构件 ,构件的稳定性是指构件 。
- 活塞销将活塞和连杆连接起来,如图所示。活塞销的剪应力为__________,挤压应力为____________。
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
- 阶梯型直杆如图所示,3个外力分别作用于B、C、D截面,图示杆轴力图正确的是 。
- 一均匀拉伸的板条如图所示,若受力其表面同时画正方形a和b,则受力后正方形a和b分别为 。
- 以下判断错误的是 。
- 如果质点做匀速直线运动,则其受力情况是 。
- 下列物理量在国际单位中, 是导出量。
- 下列判断正确的是 。
- 牛头刨床如图所示。已知O1A=r,杆O1A以匀角速度ω1绕O1 轴转动。图示瞬时杆O1A在水平位置,此时杆O2B的角速度ω2= ,滑枕CD的速度vCD= 。
- 图示偏心轮摇杆机构中,摇杆O1A借助弹簧压在半径为R的偏心轮C上。偏心轮C绕轴O以匀角速w 转动带动摇杆绕轴O1转动。图示瞬时OC⊥OO1,q =60°。以轮心C点为动点,动系固连于O1A杆,图是瞬时动点的绝对速度va ,相对速度vr ,牵连速度ve ,摇杆O1A的角速度w1 。
- 双曲柄连杆机构如图所示,O1 A=O2B=r,O1O2=AB,曲柄O1 A绕O1轴转动,并通过连杆AB上的套筒C带动CD杆沿铅直导轨作往复运动。当杆O1 A、O2B与水平线成j角时,O1 A杆的角速度为w,角加速度为e 。该瞬时CD杆的速度等于 、加速度等于 。
- 图示平面机构中,曲柄OA=r,以角速度ω转动。连杆AB带动摇杆CD,并拖动轮E(点E为轮心) 沿水平面滚动。已知CD = 3CB,图示位置时A、B、E 三点恰在同一水平线上,且CD⊥ED,此瞬时B点的速度等于 ,D点的速度等于 ,E点的速度等于 。
- 偏心圆盘绕轴O以匀角速度ω作顺时针转动,使顶杆AB沿铅直滑槽上下移动。点O在滑槽的轴线上,凸轮半径为R,圆心为C,偏心距是OC=e。当CO^AC时,顶杆AB的速度 。
- 摇杆OC绕O轴摆动,通过销子K带动齿条AB上下移动,齿条又带动半径R=50mm的齿轮绕O1轴摆动,如图所示。图示瞬时摇杆OC的角速度为ω0。图中尺寸L已知。以齿条AB上销子K为动点,动系固连于摇杆OC,该瞬时牵连速度方向为 ,齿轮的角速度 。
- 下列判断正确的是 。
- 各力的作用线均平行于一固定平面的空间力系的独立平衡方程的数目是 ,各力的作用线均与一直线相交的空间力系的独立平衡方程的数目是 。
- 一个刚体受平面一般力系作用而平衡,可列出 个独立的平衡方程,其中一个至少是 方程。由n个刚体组成的刚体系,可列出 个独立的平衡方程。
- 两根细长压杆一个横截面为正方形,另一个为圆形,它们的长度相等、横截面面积相等、约束状态及材料相同,则两压力杆的临界压力Fcr,方和Fcr,圆的关系是( )。
- 压杆一般分为三种类型,它们是按压杆的( )分类。
- 以下措施中,( )并不能提高细长压杆的稳定性。
- 圆截面细长压杆的材料及支撑情况保持不变,将其直径及杆长同时增加1倍,压杆的( )。
- 加固压杆两端的约束会提高压杆的稳定性。( )
- 将普通钢材换成优质的高强度钢,压杆的稳定性会大大提高。( )
- 横截面相同,空心压杆比实心压杆稳定。( )
- 压杆中间增加约束会降低稳定性。( )
- 合理的设计是压杆沿各方向柔度相同。( )
- 图示简支梁受集中力作用,,图(a)、( )为同一截面梁的两种不同放置方式。图(a)截面梁的抗弯刚度(A)图( )截面梁的抗弯刚度。
- 下列物理量在国际单位中,( )是基本量不是导出量。
- 曲柄摇杆机构如图所示,O1A=r,O1O=l,O1A杆的角速度1已知。O1AO1O时,杆O2A的角速度( )。
答案:FAB,cr=269.42 kN###[F]=77.8 kN
答案:
答案:
答案:柔度最大
答案:A截面,MA=2P,TA=4.5P。
答案:A截面,MAz =-6 Nm,MAy=3 Nm,TA=2 kNm。
答案:Dmin=33 mm
答案:
答案:[P]=3.2 kN
答案:
答案:C截面,MCz=Fl,MCy=2Fl,TC=2FR。
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