Lesson 2 of 11 • 6 upvotes • 10:29mins
This lesson deals with the basic properties of Arithmetic Progression. It begins with a definition of AP, which is a sequence in which the difference between all the consecutive terms is constant. It then goes on to explain how this progression takes place in the sequence, the formula that should be used, proof of that formula, the sum and term of AP. This is followed by examples of how the formula for AP works.
11 lessons • 1h 45m
Introduction To Sequence And Series
8:07mins
Arithmetic Progression : Definition And Properties
10:29mins
Arithmetic Progressions : Formulas And Solved Examples
10:19mins
Geometric Progressions : Definition And Properties
9:10mins
Geometric Progression : Formulas And Solved Examples
10:31mins
Arithmetic-Geometric Progressions
10:29mins
Harmonic Progressions : Properties And Examples
9:59mins
Telescopic Summation : Definition And Solved Examples
9:53mins
Exponential Series And Euler's Constant E
10:14mins
Logarithmic Series : Definition And Properties
8:39mins
Miscellaneous Questions On Sequence And Series
7:07mins