make half of a strawberry-blueberry smoothie
the recipe calls for 2 strawberries and 4 blueberries. what is the ratio, and how many strawberries and blueberries would you put in the blender?
The ratio of strawberries to blueberries in the original recipe is 1:2 (2 strawberries to 4 blueberries). To make half of the smoothie, we need to use half of each ingredient.
Half of 2 strawberries is 1 strawberry.
Half of 4 blueberries is 2 blueberries.
Therefore, for half of the smoothie, you would put 1 strawberry and 2 blueberries in the blender.
make 4 blueberry almond smoothies
the recipe calls for 2 blueberries and 3 almonds. what is the ratio, and how many blueberries and almonds would you put in the blender?
The ratio of blueberries to almonds in the original recipe is 2:3 (2 blueberries to 3 almonds). To make 4 smoothies, we need to calculate the total amount of each ingredient needed and then divide it by 4 to determine the amount per smoothie.
Total blueberries needed:
2 blueberries per smoothie * 4 smoothies = 8 blueberries
Total almonds needed:
3 almonds per smoothie * 4 smoothies = 12 almonds
Therefore, for 4 blueberry almond smoothies, you would put 8 blueberries and 12 almonds in the blender.
the corner cafe serves a bowl of oatmeal with 6 ounces of water and 4 ounces of oats.
describe the relationship between the amount of water and oats in the ratio to 6 to 4
The ratio between the amount of water and oats in the bowl of oatmeal is 6:4, which simplifies to 3:2. This means that for every 3 parts of water, you would have 2 parts of oats.
In this scenario, for every 6 ounces of water, there are 4 ounces of oats. This relationship shows that the amount of water is 1.5 times greater than the amount of oats in the bowl of oatmeal served at the Corner Cafe.
now describe the relationship between the ratios 6 to 4 and 3 to 2.
the ratio 6 to 4 is a. equivalent or b. not equivalent to the ratio 3 to 2 because the relationship between the water and oats is a. the same or b. different
The ratio 6 to 4 can be simplified to 3 to 2. When comparing the ratios 6 to 4 (3 to 2) and 3 to 2, they are equivalent ratios because they represent the same relationship between the amount of water and oats in the bowl of oatmeal.
Therefore, the relationship between the water and oats in the two ratios is the same.