A theoretical analysis is presented, showing the derivations of seven different linearization equations for the conical pendulum period T , as a function of radial and angular parameters. Experimental data obtained over a large range of fixed conical pendulum lengths (0.435 m – 2.130 m) are plotted with the theoretical lines and demonstrate excellent agreement. Two of the seven derived linearization equations were considered to be especially useful in terms of student understanding and relative mathematical simplicity. These linear analysis methods consistently gave an agreement of approximately 1.5% between the theoretical and experimental values for g , the acceleration due to gravity. An equation is derived theoretically (from two different starting equations), showing that the conical pendulum length L appropriate for a second pendulum can only occur within a defined limit: L 3 [ g / (4 p 2 )]. It is therefore possible to calculate the appropriate circular radius R or apex angle (0 £ f £ p / 2) for any length L in the calculated limit, so that the conical pendulum will have a one second period. A general equation is also derived for the period T , for periods other than one second.
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机译:进行了理论分析,显示了圆锥摆周期T的七个不同线性化方程的推导,它是径向和角度参数的函数。用理论线绘制了在大范围的固定圆锥摆长度(0.435 m – 2.130 m)上获得的实验数据,并证明了极好的一致性。就学生的理解和相对的数学简单性而言,七个导出的线性化方程中的两个被认为特别有用。这些线性分析方法始终给出g的理论值和实验值之间约1.5%的一致性,g是重力引起的加速度。从理论上(从两个不同的初始方程式)推导出一个方程,该方程表明适合于第二个摆的圆锥形摆长度L只能在定义的极限内出现:L 3 [g /(4 p 2)]。因此,可以为计算出的极限中的任何长度L计算适当的圆半径R或顶角(0 £ f £ p / 2),以使圆锥摆具有一秒钟的周期。还为周期T导出了除一秒以外的周期的一般方程。
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