Все публикации

L-56: Complex Analysis0:32:51

L-56: Complex Analysis (A Power series represents an analytic function in its circle of convergence)

L-55: Complex Analysis0:23:11

L-55: Complex Analysis ( Circle and radius of convergence of power series)

L-56: Real Analysis0:20:10

L-56: Real Analysis (Sum and difference of two R- integrable functions are also R-integrable)

L-53: Complex Analysis0:21:00

L-53: Complex Analysis (Power series & Abel's Theorem)

L-54: Complex Analysis0:15:13

L-54: Complex Analysis (Cauchy Hadamard's theorem)

L-27: Differential Calculus0:22:11

L-27: Differential Calculus (Examples based on double points)

L-26: Differential Calculus0:17:04

L-26: Differential Calculus (Introduction to multiple points, double points)

L-52:Complex Analysis (Fundamental0:19:52

L-52:Complex Analysis (Fundamental theorem of Algebra)

L-55: Real Analysis0:19:48

L-55: Real Analysis (If f(x) is R- integrable then pf(x) is also R-integrable)

L-54: Real Analysis0:11:17

L-54: Real Analysis (A Riemann Integrable function is not necessarily monotonic)

L-53: Real Analysis0:28:15

L-53: Real Analysis (Examples on Riemann Integration)

L-25: Differential Calculus0:19:02

L-25: Differential Calculus (Asymptotes of Polar Curves)

L-24: Differential Calculus0:22:24

L-24: Differential Calculus (Position of curve with respect to its asymptotes)

L-23: Differential Calculus0:17:20

L-23: Differential Calculus (Examples on intersection of curve and its Asymptotes)

L-22: Differential Calculus0:24:02

L-22: Differential Calculus (Examples on intersection of curve and its Asymptotes)

L-51: Complex Analysis0:29:13

L-51: Complex Analysis (Application of Argument principle)

L-50: Complex Analysis0:10:58

L-50: Complex Analysis (Application of Rouche's theorem)

L-49: Complex Analysis0:23:07

L-49: Complex Analysis (Argument principal and Rouche's theorem)

L-48: Complex Analysis0:25:20

L-48: Complex Analysis (Zeros and Poles of a Meromorphic Function)

L-52: Real Analysis0:25:45

L-52: Real Analysis (A bounded function with finite limit points of discontinuities is R-integrable)

L-51: Real Analysis0:21:52

L-51: Real Analysis (Any bounded function with finite discontinuities is R integrable)

L-50: Real Analysis0:11:31

L-50: Real Analysis (Every monotonic function is R- integrable)

L-49: Real Analysis0:17:00

L-49: Real Analysis (If a function is continuous on closed interval then it is Riemman Integrable)

L-24: Differential Calculus0:29:51

L-24: Differential Calculus (Intersection of a curve and its asymptotes)

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