Sets, Relations and Functions
Combinatorics and Mathematical Induction
Binomial Theorem, Sequences and Series
Two Dimensional Analytical Geometry
Matrices and Determinants
Differential Calculus - Limits and Continuity
Differential Calculus - Differentiability and Methods of Differentiation
Introduction to Probability Theory
- Binomial Coefficients
- Binomial theorem for positive integral inde
If you would like to contribute notes or other learning material, please submit them using the button below.
Prove that the term independent of x in the expansion of `(x + 1/x)^(2n)` is `(1*3*5...(2n - 1)2^n)/(n!)`.
Sum of binomial coefficient in a particular expansion is 256, then number of terms in the expansion is:
Advertisement Remove all ads
- OR -