## Lecture 6 Binomial Theorem Examples Class 11 Maths

"Courage is one step ahead of fear." – Coleman Young Lecture - 6 Chapter 8 Binomial Theorem NCERT ExamplesExample 4. Using binomial theorem, prove that always leaves remainder 1 when divided by 25.Example 6.  Show that the middle term in the expansion of is , where n is a positive integer.Example 10. Find the term …

## Lecture 5 Chapter 8 Binomial Theorem Class 11

It does not matter how slowly you go as long as you do not stop. – Confucius Lecture - 5 Chapter 8 Binomial Theorem NCERT Miscellaneous Exercise Question 1. Find a, b and n in the expansion of if the first three terms of the expansion are 729, 7290 and 30375, respectively.Question 3. Find the …

## Lecture 4 Middle Terms Binomial Theorem Class 11

Never give up. Great things take time. Be patient. Lecture - 4 Chapter 8 Binomial Theorem Method to find Middle term in a Binomial ExpansionNCERT Exercise 8.2Find the middle terms in the expansions ofQuestion 7. Question 8. Question 10. The coefficients of the terms in the expansion of are in the ratio 1 : 3 : 5. Find …

## Lecture 3 General Term Chapter 8 Class 11 Maths

You have to be at your strongest when you’re feeling at your weakest. Lecture - 3 Chapter 8 Binomial Theorem Total number of terms in a Binomial Expansion, General Term of Binomial Expansion, Finding Term in a Binomial ExpansionNCERT Exercise 8.2Find the coefficient ofQuestion 1.  in Question 2. in Write the general term in the …

## Exercise 8.1 Chapter 8 Binomial Theorem Lecture 2

Keep going. Everything you need will come to you at the perfect time. Lecture - 2 Chapter 8 Binomial Theorem NCERT Exercise 8.1Question 4. Question 5. Using binomial theorem, evaluate each of the following:Question 6. Question 7. Question 8. Question 9. Question 10. Using Binomial Theorem, indicate which number is larger or 1000.Question 11. Find …

## Lecture 1 Chapter 8 Binomial Theorem Class 11 Maths

Tough times don’t last. Tough people do. – Robert H. Schuller Lecture - 1 Chapter 8 Binomial Theorem Introduction to Binomial TheoremPascal Triangle and Derivation for Binomial Theorem NCERT Exercise 8.1Expand each of the expressions in Exercises 1 to 5.Question 1. Question 2. Question 3.