Paisley has 8\tfrac{1}{4}8 4 1 cups of yogurt to make smoothies. Each smoothie uses \tfrac{11}{16} 16 11 cup of yogurt. How many smoothies can Paisley make with the yogurt?<…

Question

asked Jul 1, 2022 174k views

1 Answer

Jeremias Nater · Answer 1 · 2022-07-06T11:14:33+0000

Given:

Total Yogurt =
8(1)/(4) cups

Yogurt required for each smoothie =
(11)/(16) cup

To find:

The number of smoothies that Paisley can make with the yogurt.

Solution:

We know that,

$\text{Number of smoothies}=\frac{\text{Total yogurt}}{\text{Yogurt required for each smoothie}}$

Substituting the given values, we get

$\text{Number of smoothies}=(8(1)/(4))/((11)/(16))$

$\text{Number of smoothies}=8(1)/(4)* (16)/(11)$

$\text{Number of smoothies}=(32+1)/(4)* (16)/(11)$

$\text{Number of smoothies}=(33)/(4)* (16)/(11)$

$\text{Number of smoothies}=3* 4$

$\text{Number of smoothies}=12$

Therefore, the number of smoothies is 12.