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0:16:03
L-15: Dynamics (Hooke's Law Introduction to horizontal elastic string)
0:20:47
L-4: Numerical Analysis (Fundamental theorem of difference calculus)
0:18:52
L-14: Dynamics (Examples of SHM)
0:19:19
L-3: Numerical Analysis (Expressing the function in terms of leading term and differences)
0:20:16
L-13: Dynamic (Examples on SHM)
0:24:32
L-2: Numerical Analysis (Backward difference operator and properties of difference operators)
0:22:37
L-12: Dynamics (Examples on SHM)
0:27:29
L-1: Numerical Analysis (Introduction, Forward difference operator and forward difference table)
0:22:01
L-11: Dynamics (Amplitude, Period, Frequency and geometric representation of SHM)
0:19:02
L-10: Dynamics (Introduction to Simple Harmonic Motion (SHM))
0:22:22
L-61: Real Analysis (First and Second mean value theorem of Integral Calculus)
0:16:24
L-60: Real Analysis (Fundamental theorem of Integral Calculus)
0:14:53
L-9: Dynamics (Examples on tangential end normal velocity and acceleration)
0:16:26
L-8: Dynamics (Examples on tangential end normal velocity and acceleration)
0:26:00
L-7: Dynamics (Examples on tangential and normal velocity and acceleration)
0:24:59
L-6: Dynamics (Tangential and Normal velocity and acceleration)
0:25:07
L-4: Dynamics (Examples on radial and transverse velocities and acceleration)
0:13:38
L-5: Dynamics (Examples on radial and transverse velocities and acceleration)
0:33:27
L-3: Dynamics (Examples on radial and transverse velocities and accelerations)
0:25:07
L-2: Dynamics (Radial & transverse acceleration, relation between linear & angular velocity)
0:26:37
L-1: Dynamics (Introduction, Derivation of radial and transverse velocities)
0:18:55
L-59: Real Analysis (Integral function is continuous and differetiable)
0:15:40
L-58: Real Analysis (Modulus of a Riemann integrable function is also Riemann integrable)
0:18:24
L-57: Real Analysis (Product of two R- integrable functions is R- integral)
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