 Hi and how are you all today? And Priyanka let us proceed on with the question that is given to us. Says exam whether the following statements are true or false. So for each and every statement we need to tell whether the statement is a true statement or a false statement giving valid reasons. Now the first statement given to us says that elements of this set AB is not a subset of ABC. So but we can clearly see that elements E and B are present in this set also. So that means this is a subset of this set but it's given to us that it is not so. The answer will be that it is a false statement as we know this set is a subset of this set as all the elements of the first set belongs to this second set. Right? Proceeding on with the second part it says AE is a subset of X is to X is a vowel in English alphabets. Now let us think of all the vowels that is A E I O U. So A and E are present in this set so that means it is a subset so that means this is a true statement which is given to us. Proceeding on to the third statement it says that 1 2 3 is a subset of 1 3 5 but the element 2 is not present in this set and hence it is a false statement as a set can be a subset of another set when all the elements of the set are present in the other set also. Next it says that A is a subset of A B C so as we can see that A is present in both these sets so therefore it is a true statement as this is a subset of this set. Proceeding on to the fifth part it says E belongs to A B C. Now this will be a false statement and do you know why it will be a false statement? It will be a false statement because an element can only belong to a set not a set cannot be cannot belong to a or we can have separate sign a set cannot belong to a set only an element can belong to a set. Now here both of them are set so therefore it will be a false statement as it is a subset of this set not belongs to. Proceeding on with the last and final part now here we are given two sets now first of all X is to excellent even natural number less than six so can we think of even natural number less than six let us write down in roster form that will be two and four because it's given to us that it should be less than six therefore we are not including six in it is a subset of X is to X is a natural number which divides 36 so the natural number which divides 36 is 1 2 3 4 9 12 18 and 36 so that means does two and four belongs to this set does two and four is a subset of this set this sign means subset so this comes out to be a true statement because both these elements are present in this set also so hence we will write down that this is a true statement so this ends the question that was given to us today in this session we learned how you can tell whether a statement is a true or a false statement giving valid justifications to your answers bye for now