Question
Put the right card in the right bag.
✓
Answer
We know that, a fraction is of the from $\frac{\text{p}}{\text{q}},$ where $p$ is called the numerator $(N)$ and $q$ is called the Denominator $(D)$ than,
$a.$ If $\frac{\text{p}}{\text{q}}$ is a proper fractionk, i.e. $p < q,$ then the value of fraction is always less than $1.$
$b.$ If $\frac{\text{p}}{\text{q}}$ is an Improper fraction , i.e. $p > q,$ then the value of fraction is always greater than $1.$
$c.$ If $\frac{\text{p}}{\text{q}}$ is a fraction in which $p = q,$ then value of fraction is always aqual to $1.$
$i.\ \frac37 $
Here, $3 < 7,$ i.e. $N < D$. So, the value of fraction is less than $1.$
$ii.\ \frac44 $
Here, $4 = 4 ,$ i.e. $N = D.$ So, the value of fraction is equal to $1.$
$iii.\ \frac98$
Here, $9 > 8,$ i.e. $N > D.$ So, the value of fraction is greater than $1.$
$iv.\ \frac89$
Here, $8 < 9,$ i.e. $N < D.$ So, the value of fraction is less than $1.$
$v.\ \frac56$
Here, $5 < 6,$ i.e. $N < D.$ So, the value of fraction is less than $1.$
$vi.\ \frac{6}{11}$
$\frac{18}{18}$
$\frac{19}{25}$
Here, $19 < 25,$ i.e. $N < D.$ So, the value of fraction is less than $1.$
$ix.\ \frac23$
$\frac{13}{17}$
Here, $13 < 17,$ i.e. $N < D.$ So, the value of fraction is less than $1.$
$a.$ If $\frac{\text{p}}{\text{q}}$ is a proper fractionk, i.e. $p < q,$ then the value of fraction is always less than $1.$
$b.$ If $\frac{\text{p}}{\text{q}}$ is an Improper fraction , i.e. $p > q,$ then the value of fraction is always greater than $1.$
$c.$ If $\frac{\text{p}}{\text{q}}$ is a fraction in which $p = q,$ then value of fraction is always aqual to $1.$
$i.\ \frac37 $
Here, $3 < 7,$ i.e. $N < D$. So, the value of fraction is less than $1.$
$ii.\ \frac44 $
Here, $4 = 4 ,$ i.e. $N = D.$ So, the value of fraction is equal to $1.$
$iii.\ \frac98$
Here, $9 > 8,$ i.e. $N > D.$ So, the value of fraction is greater than $1.$
$iv.\ \frac89$
Here, $8 < 9,$ i.e. $N < D.$ So, the value of fraction is less than $1.$
$v.\ \frac56$
Here, $5 < 6,$ i.e. $N < D.$ So, the value of fraction is less than $1.$
$vi.\ \frac{6}{11}$
$\frac{18}{18}$
$\frac{19}{25}$
Here, $19 < 25,$ i.e. $N < D.$ So, the value of fraction is less than $1.$
$ix.\ \frac23$
$\frac{13}{17}$
Here, $13 < 17,$ i.e. $N < D.$ So, the value of fraction is less than $1.$
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