ࡱ> 241} Kbjbj .Phh ZZZZZnnnn,n$0>^www$ $ $ $ $ $ $$&(.$]Zwwwww.$ZZ$wZZ$w$r|"T|#@N;%F"#$0$"C)k0C)|#C)Z|#xwwwwwww.$.$0www$wwwwC)wwwwwwwww : PHYSICS 201 Equations SheetTranslational Motion Rotational Motion LINEARANGULARTime t  tDisplacement x; (x = r) Velocityv = x/t; (v = r)   = /tAccelerationa = v/t; (a = r)  = /t  EMBED Equation.3 Kinematic Equationsv = v0 + at = 0 + tx = (v + v0)t = ( + 0)tx = v0t + at2 = 0t + t2v2 = v02 + 2ax2 = 02 + 2Inertiam = massI = Rotational inertia;  EMBED Equation.3 To createforce = Ftorque =  = LA FNewton's second law of motion F = ma = IF = p/t = L/tWorkFxKinetic EnergyTranslational Kinetic Energy = TKE = mv2Rotational Kinetic Energy = RKE = I2Momentump = mV L = IConservation of momentummivi = mfvfIii = Iff Pressure = Force/Area Pabs = Patm + PG Density = Mass/Volume Pressure (P) due to depth h of fluid of density ; P = gh. 1 atm = 1.013 x 105 N/m2 = 76 cm.Hg = 760 mm.Hg The density of the air is 1.29 kg/m3; Density of water = 1000 kg/m3 = 1 g/cm3; Acceleration due to gravity = g = 9.8 m/s2. Area of a circle of radius r, Acircle =  r2 .Area of a rectangle of length l, and width w, Arec=l x w; Area of a triangle, Atriangle= 0.5 x base x height. Volume of a cylinder of radius r and height h; V=  r2h; Volume of a sphere = (4/3)  r3. 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Solving rotational motion problems using kinematic equations. Relating linear quantities with angular quantities using radius. Rotational Dynamics Torque, center of gravity, moment of inertia, rotational work, rotational kinetic energy, and angular momentum. Solving problems involving objects in equilibrium using the conditions for equilibrium. Applying Newton s second law for rotational motion. Conservation of angular momentum. Chapter-16: Hooke s law and Simple Harmonic Motion Hooke s law, period, frequency, and amplitude. Elastic potential energy. Pendulum and resonance. Oscillating mass on a spring. Chapter 11: Fluid Statics Density, pressure, pressure at depth h, barometer, atmospheric pressure, gauge pressure, absolute pressure, Pascal s principle, and Archimedes principle. Distinguishing absolute pressure from gauge pressure. Measuring the atmospheric pressure. Calculating pressure due to depth of fluid. Study the problems in the Archimedes principle lab hand-out. Chapter 9: Statics Understanding the conditions for equilibrium. 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