Question

sonia fills a 40/3ml glass from a 63/3ml bottle of juice. How much juice is left in the bottle ?​

Answer 1

$\mathfrak{\large{\underline{\underline{Answer :-}}}}$

The juice remaining in the bottle is $\tt{7 \dfrac{2}{3}}$ ml.

$\mathfrak{\large{\underline{\underline{Explanation :-}}}}$

Given :

Capacity of the bottle = $\tt{\dfrac{63}{3}}$

Juice removed from the bottle = $\tt{\dfrac{40}{3}}$

To find :

The juice remaining in the bottle

Solution :

We need to simply, subtract the quantity removed from total capacity of the bottle.

$\tt{\implies} \: \dfrac{63}{3} - \dfrac{40}{3}$

They are already like fractions, so we don't need to find the LCM.

$\tt{\implies} \: \dfrac{23}{3}$

The numerator is more than the denominator, so convert it into mixed fraction.

$\tt{\implies} \: 7 \dfrac{2}{3}$

$\therefore$ The juice remaining in the bottle is $\tt{7 \dfrac{2}{3}}$ ml.

Answer 2

Answer

juice remaining inside the bottle =

$\tt{7 \dfrac{2}{3}}$

here,

$\The bottles capacity=\tt{\dfrac{63}{3}}$

$\Juice which is removed out=\tt {\dfrac{40}{3}}$

Juice remaining inside the bottle

$\tt{{\implies}}\:\dfrac{63}{3}-\dfrac {40}{3}$

Find the LCM now

$\tt{\implies}\:\dfrac{23}{3}$

The number is more than the denominator so, now we should make a mixed fraction

$\tt{\implies} \: 7 \dfrac{2}{3}$

$\{7 \dfrac{2}{3}}ml$