Mathematical Models: Mechanical Vibrations, Population Dynamics, and Traffic Flow : an Introduction to Applied Mathematics |
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Page 56
... Solution The concept of the stability of solutions is considered to be one of the fundamental aspects of applied mathematics . Now we are pursuing this subject with respect to the stability of the equilibrium positions of a pen- dulum ...
... Solution The concept of the stability of solutions is considered to be one of the fundamental aspects of applied mathematics . Now we are pursuing this subject with respect to the stability of the equilibrium positions of a pen- dulum ...
Page 95
... solution in the phase plane . Letting v = dx / dt and using the chain rule ( d2x / dt2 ) = v ( dv / dx ) yields the ... solution by first drawing the isoclines , curves along which the slope of the solution is constant . As above along v ...
... solution in the phase plane . Letting v = dx / dt and using the chain rule ( d2x / dt2 ) = v ( dv / dx ) yields the ... solution by first drawing the isoclines , curves along which the slope of the solution is constant . As above along v ...
Page 98
... solution ? In this case show that the isocline itself is a solution curve . 26.2 . Consider a linear oscillator with linear friction : m d2x dt2 dx + cdt + kx = 0 . ( a ) Show that E = m / 2 ( dx / dt ) 2 + ( k / 2 ) x2 is a decreasing ...
... solution ? In this case show that the isocline itself is a solution curve . 26.2 . Consider a linear oscillator with linear friction : m d2x dt2 dx + cdt + kx = 0 . ( a ) Show that E = m / 2 ( dx / dt ) 2 + ( k / 2 ) x2 is a decreasing ...
Contents
NEWTONS | 6 |
OSCILLATION OF A SPRINGMASS SYSTEM | 12 |
QUALITATIVE AND QUANTITATIVE BEHAVIOR | 18 |
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Mathematical Models: Mechanical Vibrations, Population Dynamics, and Traffic ... Richard Haberman No preview available - 1998 |
Common terms and phrases
amplitude of oscillation analyze approximation Assume birth c₁ calculation characteristics Consider constant coefficient corresponding d2x dt2 damping de/dt decreases delay depend derived determine difference equation discussed dx dt dx/dt energy integral equilibrium population equilibrium solution equivalent example exercise exponential Figure formula function growth rate Hint increases initial conditions initial value problem isoclines linearized stability analysis logistic equation mass mathematical model maximum method of characteristics motion moving N₁ Newton's nonlinear pendulum number of cars obtained occur ordinary differential equations oscillation P₁ partial differential equation period phase plane Pmax population growth potential energy r₁ result sharks shock Show shown in Fig simple harmonic motion Sketch the solution sketched in Fig slope solution curves solve species spring spring-mass system stable straight line Suppose Taylor series tion traffic flow trajectories Umax unstable equilibrium position variables vector x₁ yields zero