 Hi and welcome to the session. I am Asha and I am going to help you with the following question which says, give one example each of a binomial of degree 35 and of a monomial of degree 100. An algebraic expression that has only one term is called a monomial, only one term. A binomial is an algebraic expression which has two terms and the highest power of the variable in a polynomial is called the degree of the polynomial. That is the highest power of the variables, the degree of the polynomial. This is the key idea which we should know before finding the solution of the problem. Let us now start with the solution. First we are required to find a binomial whose degree is 35. So a binomial is an algebraic expression which has two terms. Let us put a plus sign between these two terms. Now we are required to write the binomial whose degree is 35. So let the variable be x and its degree is 35 and let us take any constant which will be the coefficient of x raised to the power 35. This can be any whole number, any natural number or any real number. So let us take it as 3. Then we have to write here any number with any degree. So let us take 4 variable x with power 23. So this is a binomial of degree 35 since the highest degree of this algebraic expression is 35. Similarly, we can write many more polynomials whose degree are 35. Let us write minus 3 out here, minus 4, x raised to the power 2 and minus 4, x raised to the power 35 plus 10. So these all are examples of binomials of degree 35. Now we are required to write the monomials whose degree is 100. So monomials are the algebraic expressions which have only one term therefore let the variable y and here we are writing the monomial with degree 100. So the monomial is the algebraic expression with little y and we are required to write it as a polynomial whose degree is 100. Now we can write any coefficient way. Let us write it as 30. Also we can take some other examples. Let us take the coefficient of real number here y raised to the power 100. So these all are single terms with degree 100. Let us take some more examples with coefficients negative minus 100 y raised to the power 100. So these all are monomials with degree 100. Thus since I have to give only one example therefore 3, x raised to the power 35 minus 4 is the binomial since it has two terms with degree 35. It is the highest exponent of the variable x. And now we are write one monomial with degree 100 therefore 2 over 2 y raised to the power 100 is a monomial with degree 100. So this completes the solution. Hope you enjoyed this session. Thank you and bye for now.