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Binomial Theorem Formulas for Class 11 Maths Chapter 8

Are you looking for Binomial Theorem formulas for class 11 Chapter 8? Today, we are going to share Binomial Theorem formulas for class 11 Chapter 8 according to student requirements. You are not a single student who is searching Binomial Theorem formulas for class 11 Chapter 8. According to me, thousands of students are searching Binomial Theorem formulas for class 11 Chapter 8 per month. If you have any doubt or issue related to Binomial Theorem formulas then you can easily connect with through social media for discussion. Binomial Theorem formulas will very helpful to understand the concept and questions of the chapter Binomial Theorem. I would like to suggest you remember Binomial Theorem formulas for the whole life. It also helps you with higher studies.

A Binomial Theorem helps to expand a binomial given for any positive integral n.
\((a+b)^n={}^{n}\textrm{C}_{0}\:a^n+{}^{n}\textrm{C}_{1}\:a^{n-1}.b+{}^{n}\textrm{C}_{2}\:a^{n-2}.b^2+…+{}^{n}\textrm{C}_{n-1}\:a.b^{n-1}+{}^{n}\textrm{C}_{n}\:b^n\)

  1. The general term of an expansion (a + b)n is \(T_{r+1}={}^{n}\textrm{C}_{r}\:a^{n-r}.b^r\)
  2. In the expansion of (a + b)n; if n is even, then the middle term is \((\frac{n}{2}+1)^{th}\) term.
  3. In the expansion of (a + b)n; if n is odd, then the middle terms are \((\frac{n+1}{2})^{th}\) and \((\frac{n+1}{2}+1)^{th}\) terms

Summary Binomial Theorem Formulas

We have listed top important formulas for the Binomial Theorem for class 11 Chapter 8 which helps support solving questions related to chapter Binomial Theorem. I would like to say that after remembering the Binomial Theorem formulas you can start the questions and answers the solution of the Binomial Theorem chapter. If you faced any problem to find a solution of Binomial Theorem questions, please let me know through commenting or mail.

NCERT Class 11 Maths Formulas By chapters

NCERT Solutions Class 11 Maths by Chapters

  • Chapter 1 Sets
  • Chapter 2 Relations and Functions
  • Chapter 3 Trigonometric Functions
  • Chapter 4 Principle of Mathematical Induction
  • Chapter 5 Complex Numbers and Quadratic Equations
  • Chapter 6 Linear Inequalities
  • Chapter 7 Permutations and Combinations
  • Chapter 8 Binomial Theorem
  • Chapter 9 Sequences and Series
  • Chapter 10 Straight lines
  • Chapter 11 Conic Sections
  • Chapter 12 Introduction to Three Dimensional Geometry
  • Chapter 13 Limits and Derivatives
  • Chapter 14 Mathematical Reasoning
  • Chapter 15 Statistics
  • Chapter 16 Probability


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