Mallory's Border Collie Had 23 Puppies In 4 Litters. Determine The Rate For A Ratio Of The Two Different Quantities.A. { \frac{4}{23}$}$ Puppies Per Litter B. { \frac{23}{4}$}$ Puppies Per Litter C. { \frac{23}{27}$}$

Understanding Ratios and Rates in Mathematics

In mathematics, a ratio is a comparison of two numbers or quantities, often expressed as a fraction. A rate, on the other hand, is a comparison of two quantities with different units. In this article, we will explore how to determine the rate for a ratio of two different quantities, using the example of Mallory's Border Collie having 23 puppies in 4 litters.

What is a Ratio?

A ratio is a way of expressing the relationship between two numbers or quantities. It is often expressed as a fraction, with the first number being the numerator and the second number being the denominator. For example, if we have 4 litters and 23 puppies, the ratio of puppies to litters can be expressed as $\frac{23}{4}$.

What is a Rate?

A rate is a comparison of two quantities with different units. It is often expressed as a fraction, with the first quantity being the numerator and the second quantity being the denominator. For example, if we have 23 puppies and 4 litters, the rate of puppies per litter can be expressed as $\frac{23}{4}$.

Determining the Rate for a Ratio

To determine the rate for a ratio, we need to identify the two quantities being compared and express them as a fraction. In the example of Mallory's Border Collie, we have 23 puppies and 4 litters. To determine the rate of puppies per litter, we can express the ratio as $\frac{23}{4}$.

However, the question asks for the rate of puppies per litter, which is the inverse of the ratio. To find the rate, we need to invert the ratio, which means swapping the numerator and the denominator. Therefore, the rate of puppies per litter is $\frac{4}{23}$.

Analyzing the Options

Let's analyze the options provided:

A. $\frac{4}{23}$ puppies per litter B. $\frac{23}{4}$ puppies per litter C. $\frac{23}{27}$ puppies per litter

Option A is the correct answer, as it represents the rate of puppies per litter. Option B is the ratio of puppies to litters, not the rate. Option C is not relevant to the problem, as it does not represent the rate of puppies per litter.

Conclusion

In conclusion, determining the rate for a ratio of two different quantities involves identifying the two quantities being compared and expressing them as a fraction. To find the rate, we need to invert the ratio, which means swapping the numerator and the denominator. In the example of Mallory's Border Collie, the rate of puppies per litter is $\frac{4}{23}$.

Key Takeaways

• A ratio is a comparison of two numbers or quantities, often expressed as a fraction.
• A rate is a comparison of two quantities with different units, often expressed as a fraction.
• To determine the rate for a ratio, we need to identify the two quantities being compared and express them as a fraction.
• To find the rate, we need to invert the ratio, which means swapping the numerator and the denominator.

Real-World Applications

Understanding ratios and rates is essential in various real-world applications, such as:

• Cooking: Measuring ingredients and cooking times
• Science: Measuring quantities and rates of chemical reactions
• Finance: Calculating interest rates and investment returns
• Sports: Measuring player performance and team statistics

By understanding ratios and rates, we can make informed decisions and solve problems in various contexts.
Frequently Asked Questions: Ratios and Rates

In the previous article, we explored the concept of ratios and rates in mathematics. In this article, we will answer some frequently asked questions related to ratios and rates.

Q: What is the difference between a ratio and a rate?

A: A ratio is a comparison of two numbers or quantities, often expressed as a fraction. A rate, on the other hand, is a comparison of two quantities with different units, often expressed as a fraction.

Q: How do I determine the rate for a ratio?

A: To determine the rate for a ratio, you need to identify the two quantities being compared and express them as a fraction. Then, you need to invert the ratio, which means swapping the numerator and the denominator.

Q: What is the inverse of a ratio?

A: The inverse of a ratio is obtained by swapping the numerator and the denominator. For example, the inverse of $\frac{4}{23}$ is $\frac{23}{4}$.

Q: How do I simplify a ratio?

A: To simplify a ratio, you need to find the greatest common divisor (GCD) of the numerator and the denominator. Then, you can divide both numbers by the GCD to simplify the ratio.

Q: What is the difference between a ratio and a proportion?

A: A ratio is a comparison of two numbers or quantities, while a proportion is a statement that two ratios are equal. For example, $\frac{4}{23} = \frac{y}{x}$ is a proportion.

Q: How do I solve a proportion?

A: To solve a proportion, you need to cross-multiply the two ratios. This means multiplying the numerator of the first ratio by the denominator of the second ratio, and vice versa.

Q: What is the difference between a ratio and a fraction?

A: A ratio is a comparison of two numbers or quantities, while a fraction is a way of expressing a part of a whole. For example, $\frac{4}{23}$ is a fraction, while $\frac{4}{23}$ is a ratio.

Q: How do I convert a ratio to a decimal?

A: To convert a ratio to a decimal, you need to divide the numerator by the denominator.

Q: What is the difference between a ratio and a percentage?

A: A ratio is a comparison of two numbers or quantities, while a percentage is a way of expressing a part of a whole as a fraction of 100. For example, 25% is a percentage, while $\frac{1}{4}$ is a ratio.

Q: How do I calculate a percentage from a ratio?

A: To calculate a percentage from a ratio, you need to multiply the ratio by 100.

Q: What is the difference between a ratio and a ratio scale?

A: A ratio is a comparison of two numbers or quantities, while a ratio scale is a scale that has equal intervals between consecutive values. For example, a ratio scale can be used to measure temperature in degrees Celsius.

Q: How do I create a ratio scale?

A: To create a ratio scale, you need to define the unit of measurement and the equal intervals between consecutive values.

Conclusion

In conclusion, ratios and rates are essential concepts in mathematics that are used to compare two numbers or quantities. By understanding ratios and rates, you can solve problems in various contexts, such as cooking, science, finance, and sports. We hope that this article has answered some of your frequently asked questions related to ratios and rates.

Key Takeaways

• A ratio is a comparison of two numbers or quantities, often expressed as a fraction.
• A rate is a comparison of two quantities with different units, often expressed as a fraction.
• To determine the rate for a ratio, you need to identify the two quantities being compared and express them as a fraction.
• To simplify a ratio, you need to find the greatest common divisor (GCD) of the numerator and the denominator.
• A proportion is a statement that two ratios are equal.
• To solve a proportion, you need to cross-multiply the two ratios.
• A ratio can be converted to a decimal by dividing the numerator by the denominator.
• A percentage is a way of expressing a part of a whole as a fraction of 100.
• A ratio scale is a scale that has equal intervals between consecutive values.