960 PHYSICS A. MECHANICS 1. Physical quantities and units (3 double periods) 1.1 Base quantities and SI units - 1.2 Dimensions of physical quantities - dimensions of a quantity -falsify a physics formula - predict a physics formula 1.3 Scalars and vectors - addition and subtraction of vectors 1.4 Errors - characteristics of systematic and random errors - Examples of each type of errors - precision(d.p.) and accuracy(s.f.) 2. Kinematics and dynamics (9 double periods) 2.1 Rectilinear motion x= ut – ½ at 2 ; v-t graph for t and a - work-energy theorem for u, v and x 2.2 Motion with constant acceleration Same as 2.1 2.3 Projectiles x= u x t ; y = u y t – ½ gt 2 2.4 Newton’s laws of motion ; F = ma ; 2.5 Conservation of momentum - definition and use 2.6 Elastic and non-elastic collisions - definition and use 3. Work, energy, and power (3 double periods) 3.1 Work - definition ; work-energy theorem 3.2 Potential energy - 3.3 Kinetic energy - 3.4 Conservation of energy Conservation of energy; conservation of mechanical energy 1
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960 PHYSICS
A. MECHANICS
1. Physical quantities and units (3 double periods)
1.1 Base quantities and SI units -
1.2 Dimensions of physical quantities - dimensions of a quantity
-falsify a physics formula
- predict a physics formula
1.3 Scalars and vectors - addition and subtraction of vectors
1.4 Errors - characteristics of systematic and random errors
- Examples of each type of errors
- precision(d.p.) and accuracy(s.f.)
2. Kinematics and dynamics (9 double periods)
2.1 Rectilinear motion x= ut – ½ at2 ; v-t graph for t and a
- work-energy theorem for u, v and x
2.2 Motion with constant acceleration Same as 2.1
2.3 Projectiles x= ux t ; y = uy t – ½ gt2
2.4 Newton’s laws of motion ; F = ma ;
2.5 Conservation of momentum - definition and use
2.6 Elastic and non-elastic collisions - definition and use
3. Work, energy, and power (3 double periods)
3.1 Work - definition ; work-energy theorem
3.2 Potential energy -
3.3 Kinetic energy -
3.4 Conservation of energy Conservation of energy; conservation of mechanical energy
3.5 PowerAverage ; Instantaneous P = Fv
3.6 Efficiency Explain dissipation of heat affecting efficiency
1
4. Circular motion (4 double periods)
4.1 Uniform circular motion Condition for circular motion
4.2 Centripetal acceleration; state and use
4.3 Centripetal force; state and use
5. Rotation of rigid body (5 double periods)
5.1 Kinematics and dynamics of rotation and ω- t graph
and
; ;
5.2 Centre of mass Definition of c.m. for masses in a plane
5.3 Moment of inertia I =mr2 for particle and for rigid body
5.4 Angular momentum L = Iω for rigid body and L = rmv for particle
5.5 Conservation of angular momentum Definition and uses
5.6 Rotation kinetic energy
6. Statics (3 double periods)
6.1 Equilibrium of particles and
6.2 Closed polygon Equivalent to
6.3 Equilibrium of rigid bodies ; and resultant moment about any point = 0
System of three forces, the forces intercept at a common point( vector diagram)
6.4 Frictional forces
7. Gravitation (3 double periods)
2
7.1 Newton law of universal gravitation
7.2 Gravitational field strength;
7.3 Gravitational potential or ;
7.4 Relationship between g and G9.81 =
7.5 Satellite motion in circular orbits or ;
7.6 Escape velocity;
8. Simple harmonic motion (3 double periods)
8.1 Characteristics of simple harmonic motion and definition
8.2 Kinematics of simple harmonic motion or
8.3 Energy in simple harmonic motionSpring-mass system is used ;
K.E. E = and P.E. U =
Energy of oscillation =
8.4 Systems in simple harmonic motion Derive that oscillation of mass on a spring is a S.H.M.
9. Oscillations (1 double period)
9.1 Free oscillations S.H.M.
9.2 Damped oscillations Describe underdamping, critical damping and overdamping
9.3 Forced oscillations Variation of oscillation amplitude with frequency of the external force
9.4 Resonance and damping How damping factor affects resonance
B. WAVES
10. Wave motion (3 double periods)
3
10.1 Waves and energy -
10.2 Progressive waves; ; ; =
10.3 Wave intensityIntensity = ;
Spherical wave,
10.4 Principle of superposition definition
10.5 Standing waves Standing wave in a string:
n = the nth overtone
10.6 Longitudinal waves and transverse waves Differences
11. Sound waves (4 double periods)
11.1 Propagation of sound waves ;
comparing y-t graph with graph
11.2 Sources of sound -standing wave in string, open pipe and closed pipe.
Graphic presentation of standing waves in both open and closed pipes
for open pipe
for closed pipe
11.3 Intensity of soundIntensity I = ;
Sound intensity level
11.4 Beat , y-t graph for beat
11.5 Doppler effect
C. PROPERTIES OF MATTER
12. State of matter (2 double periods)
12.1 Solid, liquid, and gas Comparing from microscopic and macroscopic perspectives
12.2 Crystalline solids Comparing crystal and amorphous
4
12.3 Intermolecular force curve Sketch and explain the F-r graph;
12.4 Potential energy curve Sketch the U-r graph and use it to explain 0 K and expansion of solid
13. Deformation of solids (3 double periods)
13.1 Stress and strain ;
13.2 Force-extension graphs and stress-strain graphs
13.3 Young modulus;
13.4 Strain energyStrain energy =
D. THERMODYNAMICS
14. Kinetic theory of gases (4 double periods)
14.1 Ideal gas equation Definition of an ideal gas ; pV=nRT
14.2 Kinetic theory of gases Assumptions of ideal gas in kinetic theory;
; ;
5
14.3 Pressure of a gas -
14.4 Molecular kinetic energy ;
14.5 Rms speed of molecules Calculation
14.6 Degrees of freedom explain
14.7 Law of equipartition of energyKinetic energy per degree of freedom per molecule=
14.8 Internal energy of an ideal gas Internal energy = total kinetic energy for ideal gas
Monatomic gas per mole: ; ;
Diatomic gas per mole : ; ;
Polyatomic gas per mole : ; ;
14.9 Distribution of molecular speeds Maxwell-Boltzmann speed distribution graph
15. Thermodynamics of gases (5 double periods)
15.1 Heat capacity
15.2 Work
15.3 First law of thermodynamics State and explain or
15.4 Internal energy Definition for cV and cp ; and
27.2 Interference Constructive interference or maxima:
Optical path difference = m
Destructive interference or minima
Optical path difference = (m + ½ )
27.3 Two-slit interference pattern o.p.d.= .
For maxima, = m ;
27.4 Air wedgeo.p.d. =2t+ ;
For minima, 2t+ =(m+ ½ ) , ;
13
Or ;
27.5 Thin film o.p.d.= 2n1t ( n2 > n1)
For minima(non-reflective), 2n1t = (m + ½ )
For maxima(reflective), 2n1t = m
27.6 Diffraction at single slito.p.d.=
For 1st minima, = ;
27.7 Diffraction gratings o.p.d = d sin
For maxima,
27.8 PolarisationAfter polarizer,
From polarizer through analyzer, ;
G. QUANTUM PHYSICS
28. Photons (2 double periods)
28.1 Photoelectric effect State the three important observations in photoelectric effect experiment that could not be explain using wave theory of light.
28.2 Concept of light quantisationEnergy of photon or =
Einstein equation for photoelectric effect:
, w = work function of the cathode metal
= threshold frequency
29. Wave-particle duality (1 double period)
14
29.1 De Broglie’s relationFor wave, ;
For particle, ; =
29.2 Electron diffraction
H. ATOMIC PHYSICS
30. Atomic structure (2 double periods)
30.1 Bohr’s postulate State the two Bohr’s postulates for hydrogen-like atoms
30.2 Energy levels in atoms Orbital energy En = P.E. + K.E.
eV
30.3 Line spectra
31. X-ray (2 double periods)
31.1 X-ray spectra Explain the production of continuous X-rays and characteristic X-rays
31.2 X-ray diffraction Bragg’s law
32. Laser (1 double period)
32.1 Principles of production Explain: - metastable excited state
- population inversion
- stimulated emission
32.2 Characteristics Characteristics of laser light
32.3 Uses Examples on uses of laser
I. NUCLEAR PHYSICS
33. Nucleus (2 double periods)
33.1 Discovery of neutrons
33.2 Atomic number and mass number -
33.3 Mass defect and binding energy Einstein mass-energy equivalent
Mass defect=total mass of nucleons – mass of nucleus
Calculating binding energy per nucleon for a nucleus
15
Sketch and explain graph of binding energy per nucleon against nucleon number
33.4 Isotopes -
33.5 Mass spectrometryVelocity selector, qE = qvB;
Deflector:
34. Radioactivity (2 double periods)
34.1 Radioactive decay Explain decay constant
34.2 Decay constant and half-life
34.3 Use of radioisotopes Examples of radioactivity as tracer
35. Nuclear reaction (2 double periods)
35.1 Nuclear reaction Calculating Q-value or nuclear energy from mass difference
35.2 Nuclear fission two fragments about equal mass
+ one to three neutrons
calculating the Q-value
35.3 Nuclear fusion p-p cycle in the sun
two combine to form
one combine with to form
two combine to form
36. Elementary particles (2 double periods)
36.1 Basic forces Name the four basic forces in order of strength.
State the characteristics of leptons and hadrons
Comparing leptons and hadrons
Examples of leptons and hadrons
16
36.2 Quarks Explain ad give some examples of quarks
36.3 Neutrinos Explain the existence of neutrino from the energy spectrum of the particles in beta emission.
Note
A list of fundamental physical constants as shown below will be provided for Papers 1 and 2. These data are included in the Data Booklet for STPM. Other data, specific to indivudual questions, will be given with the individual questions.