Ankur Estimated The Quotient Of \[$ 15 \frac{1}{3} \div \left(-4 \frac{2}{3}\right) \$\] To Be 3. Which Best Describes His Error?A. Ankur Multiplied The Compatible Numbers 15 And -3.B. Ankur Found That The Quotient Of A Positive Number And A

Introduction

Estimating quotients is an essential skill in mathematics, particularly when dealing with fractions and decimals. Ankur, in this scenario, estimated the quotient of $15 \frac{1}{3} \div \left(-4 \frac{2}{3}\right)$ to be 3. However, his estimation was incorrect. In this article, we will delve into the possible reasons behind Ankur's error and provide a detailed explanation of the correct approach to estimating quotients.

The Importance of Compatible Numbers

Compatible numbers are whole numbers that are close to the original numbers, making it easier to estimate quotients. Ankur's error might be related to his use of compatible numbers. Let's examine the given problem:

$15 \frac{1}{3} \div \left(-4 \frac{2}{3}\right)$

To estimate the quotient, Ankur might have used the compatible numbers 15 and -3. However, this approach is not entirely accurate.

The Correct Approach to Estimating Quotients

When estimating quotients, it's essential to consider the signs of the numbers involved. In this case, we have a positive dividend ($15 \frac{1}{3}$) and a negative divisor ($-4 \frac{2}{3}$). The quotient of a positive number and a negative number is always negative.

The Sign of the Quotient

The sign of the quotient is determined by the signs of the dividend and the divisor. If the dividend is positive and the divisor is negative, the quotient will be negative. Conversely, if the dividend is negative and the divisor is positive, the quotient will be negative.

Ankur's Error

Ankur's error lies in his estimation of the quotient. He might have multiplied the compatible numbers 15 and -3, which resulted in a positive quotient. However, this approach is incorrect because it ignores the signs of the numbers involved.

The Correct Calculation

To calculate the quotient, we need to convert the mixed numbers to improper fractions:

$15 \frac{1}{3} = \frac{46}{3}$

$-4 \frac{2}{3} = -\frac{14}{3}$

Now, we can calculate the quotient:

$\frac{46}{3} \div \left(-\frac{14}{3}\right) = \frac{46}{3} \times \left(-\frac{3}{14}\right) = -\frac{46}{14} = -\frac{23}{7}$

Conclusion

Ankur's error in estimating the quotient of $15 \frac{1}{3} \div \left(-4 \frac{2}{3}\right)$ to be 3 can be attributed to his incorrect use of compatible numbers. He might have multiplied the compatible numbers 15 and -3, resulting in a positive quotient. However, the correct approach involves considering the signs of the numbers involved and calculating the quotient using improper fractions.

The Importance of Understanding Signs

Understanding the signs of numbers is crucial when estimating quotients. The sign of the quotient is determined by the signs of the dividend and the divisor. In this case, the positive dividend and negative divisor resulted in a negative quotient.

The Correct Estimation

To estimate the quotient, we need to consider the signs of the numbers involved. In this case, we can estimate the quotient by considering the magnitudes of the numbers:

$15 \frac{1}{3} \approx 15$

$-4 \frac{2}{3} \approx -5$

Now, we can estimate the quotient:

$15 \div (-5) \approx -3$

The Final Answer

Ankur's error in estimating the quotient of $15 \frac{1}{3} \div \left(-4 \frac{2}{3}\right)$ to be 3 can be attributed to his incorrect use of compatible numbers. The correct approach involves considering the signs of the numbers involved and calculating the quotient using improper fractions.

The Final Calculation

To calculate the quotient, we need to convert the mixed numbers to improper fractions:

$15 \frac{1}{3} = \frac{46}{3}$

$-4 \frac{2}{3} = -\frac{14}{3}$

Now, we can calculate the quotient:

$\frac{46}{3} \div \left(-\frac{14}{3}\right) = \frac{46}{3} \times \left(-\frac{3}{14}\right) = -\frac{46}{14} = -\frac{23}{7}$

The Final Answer

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Introduction

Estimating quotients is an essential skill in mathematics, particularly when dealing with fractions and decimals. In our previous article, we discussed Ankur's error in estimating the quotient of $15 \frac{1}{3} \div \left(-4 \frac{2}{3}\right)$ to be 3. In this article, we will provide a Q&A section to help you better understand the concept of quotient estimation.

Q: What is quotient estimation?

A: Quotient estimation is the process of approximating the result of a division operation. It involves using mental math strategies to estimate the quotient of two numbers.

Q: Why is quotient estimation important?

A: Quotient estimation is important because it helps students develop their mental math skills, which are essential for solving real-world problems. It also helps students understand the concept of division and how to apply it in different situations.

Q: What are some common strategies for quotient estimation?

A: Some common strategies for quotient estimation include:

• Using compatible numbers: This involves using whole numbers that are close to the original numbers to estimate the quotient.
• Using mental math: This involves using mental math strategies, such as rounding numbers or using estimation techniques, to estimate the quotient.
• Using visual aids: This involves using visual aids, such as number lines or hundreds charts, to help estimate the quotient.

Q: How do I estimate the quotient of a positive number and a negative number?

A: When estimating the quotient of a positive number and a negative number, you need to consider the signs of the numbers involved. If the dividend is positive and the divisor is negative, the quotient will be negative. Conversely, if the dividend is negative and the divisor is positive, the quotient will be negative.

Q: What is the difference between a quotient and a product?

A: A quotient is the result of a division operation, while a product is the result of a multiplication operation. For example, if you divide 12 by 3, the quotient is 4. If you multiply 12 by 3, the product is 36.

Q: How do I estimate the quotient of a decimal number and a whole number?

A: When estimating the quotient of a decimal number and a whole number, you can use the following strategies:

• Round the decimal number to the nearest whole number.
• Use the rounded decimal number to estimate the quotient.
• Check your estimate by dividing the original decimal number by the whole number.

Q: What are some common mistakes to avoid when estimating quotients?

A: Some common mistakes to avoid when estimating quotients include:

• Ignoring the signs of the numbers involved.
• Using incompatible numbers to estimate the quotient.
• Not checking your estimate by dividing the original numbers.

Q: How can I practice quotient estimation?

A: You can practice quotient estimation by using online resources, such as math games and worksheets, or by working with a partner or tutor. You can also practice estimating quotients by using real-world examples, such as calculating the cost of items or the amount of time it takes to complete a task.

Conclusion

Quotient estimation is an essential skill in mathematics that helps students develop their mental math skills and understand the concept of division. By using common strategies, such as using compatible numbers and mental math, and avoiding common mistakes, you can improve your quotient estimation skills. Remember to practice quotient estimation regularly to become more confident and accurate in your calculations.