448,674 views
38 votes
38 votes
At a berry farm, Clayton picks 1 1/4

cups of blackberries and twice as many raspberries. He takes the berries home and uses them to make mixed-berry muffins. If Clayton needs 3/4
of a cup of mixed berries for each batch of muffins, how many batches can he make?
Write your answer as a whole number, fraction, or mixed number. Simplify any fractions.

User Hugh Bothwell
by
3.0k points

2 Answers

15 votes
15 votes

Final answer:

Clayton can make 5 batches of mixed-berry muffins with the berries he picked, as he has a total of 15/4 cups of berries and each batch requires 3/4 cup of berries.

Step-by-step explanation:

The question asks how many batches of mixed-berry muffins Clayton can make with the berries he picked if each batch requires ¾ cup of berries. Clayton picks 1 ¼ cups of blackberries and twice as many raspberries, which equals 2 × 1 ¼ cups = 2 × 5/4 cups = 5/2 cups of raspberries. To find the total number of cups of berries, add the blackberries and raspberries together: 1 ¼ cups + 2 ½ cups = 5/4 cups + 5/2 cups = 5/4 cups + 10/4 cups = 15/4 cups. To determine how many batches of muffins he can make, divide the total number of cups of berries by the cups needed per batch: (15/4 cups) ÷ (3/4 cups per batch) = (15/4) × (4/3) = 5 batches. Therefore, Clayton can make 5 batches of mixed-berry muffins.

User Ashraff Ali Wahab
by
3.2k points
17 votes
17 votes

Answer: 1 1/4 batches of muffins

Step-by-step explanation:

  1. multiply 1 1/4 (5/4) by 2 and get 5/2 (2 1/2)
  2. next add 5/2 (10/4) and 5/4 and get 15/4
  3. divide 15/4 by 3 and get 5/4
  4. simplify that out into 1 1/4
User Swar
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3.3k points