Question 2 :
If A = {x | x is a positive mutliple of 3 less than 20} and B = {x | x is a prime number less than 20}, then n(A) + n(B) is<br/>
Question 3 :
The tabular form for the statement ‘Days of the week starting with the letter T’ will be<br/>
Question 4 :
Given below are two sets A and B: {tex}\mathrm{A}=\{1,2,3,4,5\}, \quad \mathrm{B}=\{1,2,3\} {/tex}<br>Which of the following is true?<br>{tex} A \subseteq B {/tex}<br>
Question 5 :
Given below are two sets {tex} A {/tex} and {tex} B {/tex} :<br> {tex} \mathrm{A}=\{1,2,3,4,5\}, \quad \mathrm{B}=\{1,2,3\} {/tex}<br> Which of the following is true?<br>{tex} B \subseteq A {/tex}<br>
Question 6 :
State whether each of the following statements is true (T) or false (F).<br>{tex} \phi=\{\ \} {/tex}<br>
Question 7 :
It is given that: {tex} \mathrm{H}=\{x: x {/tex} is a rational number. {tex} \} {/tex}<br>and {tex} \mathrm{K}=\{x: x {/tex} is an integer.}<br>Then,{tex} \mathrm{K} \subset \mathrm{H} {/tex} or {tex} \mathrm{H} \subset \mathrm{K} {/tex}
Question 9 :
State whether each of the following statements is true (T) or false (F). <br>{tex} \{\phi\} {/tex} is an empty set<br>
Question 10 :
Given below are two sets {tex} \mathrm{A} {/tex} and {tex} \mathrm{B} {/tex} : <br>{tex} \mathrm{A}=\{1,2,3,4,5\}, \quad \mathrm{B}=\{1,2,3\} {/tex} <br>Which of the following is true?<br>{tex} \mathrm{B} \subset \mathrm{A} {/tex}<br>