Question Text
Question 2 :
State whether the statement is true (T) or false (F).<br/>If $\dfrac{p}{q}$ is a rational number, then $p$ cannot be equal to zero.
Question 8 :
<span>$ \dfrac { \sqrt { 15 } }{ \sqrt { 3 } } $ </span> is not a<br/>
Question 10 :
Assertion: $2$ is a rational number.
Reason: The square roots of all positive integers are irrationals.
Question 12 :
<span>State whether the statements given are True or False<br></span>Every negative integer is not a negative rational number
Question 13 :
If p: All integers are rational numbers and <span>q: Every rational number is an integer, then which of the following statement is correct?</span>
Question 15 :
<div>In the following determine rational numbers a and b: </div><div><br/></div> $\dfrac{\sqrt{11}-\sqrt{7}}{\sqrt{11}+\sqrt{7}}=a-b\sqrt{77}$
Question 16 :
Product of the two fractions $\displaystyle \frac{12}{24}$ and $\displaystyle \frac{36}{72}$ is equal to
Question 17 :
In the standard form of a rational numbers, the denominator is always a
Question 18 :
State whether the statements given are True or False<br>Zero is a rational number
Question 19 :
<div>State whether the statement is true/false.<br/></div>$8$ can be written as a rational number with any integer as denominator.
Question 21 :
A computer is programmed to add $3$ to the number $N$, multiply the result by $3$, subtract $3$, and divide this result by $3$. The computer answer will be
Question 22 :
State whether the given statement is true or false.<br>The sum of two rational numbers is rational.<br>