Milk And Cream Are Mixed Together For A Recipe. The Total Volume Of The Mixture Is 1 Cup. If The Milk Contains $2\%$ Fat, The Cream Contains $18\%$ Fat, And The Mixture Contains $6\%$ Fat, How Much Cream Is In The Mixture?A.

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Introduction

In this article, we will delve into a mixture problem involving milk and cream. The problem states that the total volume of the mixture is 1 cup, with the milk containing 2% fat and the cream containing 18% fat. We are also given that the mixture contains 6% fat. Our goal is to determine the amount of cream in the mixture.

Understanding the Problem

Let's break down the problem and understand what we are trying to solve. We have two mixtures: milk and cream. The milk contains 2% fat, while the cream contains 18% fat. When we mix these two mixtures together, we get a new mixture that contains 6% fat. We are asked to find the amount of cream in this new mixture.

Defining the Variables

To solve this problem, we need to define some variables. Let's say the amount of milk in the mixture is x cups, and the amount of cream in the mixture is y cups. Since the total volume of the mixture is 1 cup, we can write the equation:

x + y = 1

Calculating the Fat Content

Now, let's calculate the fat content of the mixture. The milk contains 2% fat, so the amount of fat in the milk is 0.02x cups. The cream contains 18% fat, so the amount of fat in the cream is 0.18y cups. The total fat content of the mixture is 0.06(1) = 0.06 cups. We can set up the equation:

0.02x + 0.18y = 0.06

Solving the System of Equations

We now have a system of two equations with two variables:

x + y = 1 0.02x + 0.18y = 0.06

We can solve this system of equations using substitution or elimination. Let's use substitution. We can solve the first equation for x:

x = 1 - y

Substituting this expression for x into the second equation, we get:

0.02(1 - y) + 0.18y = 0.06

Expanding and simplifying, we get:

0.02 - 0.02y + 0.18y = 0.06

Combine like terms:

0.16y = 0.04

Divide by 0.16:

y = 0.25

Finding the Amount of Cream

Now that we have found the value of y, we can find the amount of cream in the mixture. Since y represents the amount of cream in the mixture, we can conclude that the amount of cream in the mixture is 0.25 cups.

Conclusion

In this article, we solved a mixture problem involving milk and cream. We defined the variables, calculated the fat content, and solved the system of equations to find the amount of cream in the mixture. We found that the amount of cream in the mixture is 0.25 cups.

Final Answer

Introduction

In our previous article, we solved a mixture problem involving milk and cream. We found that the amount of cream in the mixture is 0.25 cups. In this article, we will answer some frequently asked questions related to the problem.

Q: What is the total volume of the mixture?

A: The total volume of the mixture is 1 cup.

Q: What is the fat content of the milk?

A: The fat content of the milk is 2%.

Q: What is the fat content of the cream?

A: The fat content of the cream is 18%.

Q: What is the fat content of the mixture?

A: The fat content of the mixture is 6%.

Q: How did you solve the system of equations?

A: We solved the system of equations using substitution. We first solved the first equation for x, and then substituted this expression for x into the second equation.

Q: Can you explain the concept of mixture problems?

A: Yes, mixture problems involve finding the amount of a particular substance in a mixture. In this problem, we were given the fat content of the milk and cream, and we needed to find the amount of cream in the mixture.

Q: What are some real-world applications of mixture problems?

A: Mixture problems have many real-world applications, such as:

  • Cooking: When you mix different ingredients to create a recipe, you are solving a mixture problem.
  • Chemistry: When you mix different chemicals to create a new substance, you are solving a mixture problem.
  • Business: When you mix different products to create a new product, you are solving a mixture problem.

Q: Can you provide more examples of mixture problems?

A: Yes, here are a few more examples of mixture problems:

  • Example 1: A bakery mixes 2% sugar and 18% sugar to create a new type of cookie. If the mixture contains 6% sugar, how much of the mixture is sugar?
  • Example 2: A chemist mixes 2% acid and 18% acid to create a new type of solution. If the mixture contains 6% acid, how much of the mixture is acid?
  • Example 3: A business mixes 2% profit and 18% profit to create a new type of product. If the mixture contains 6% profit, how much of the mixture is profit?

Conclusion

In this article, we answered some frequently asked questions related to the milk and cream mixture problem. We explained the concept of mixture problems, provided real-world applications, and offered more examples of mixture problems.

Final Answer

The final answer is: 0.25\boxed{0.25}