Rewrite The Expression With Correct Notation:$\[ 8 \sqrt{7} - \frac{5}{7} \\]

Understanding the Basics of Radicals and Fractions

When dealing with mathematical expressions that involve radicals and fractions, it's essential to understand the rules for simplifying them. A radical is a symbol used to represent the square root of a number, while a fraction is a way of expressing a part of a whole. In this article, we will focus on rewriting an expression that involves both radicals and fractions, using the correct notation.

The Expression to be Simplified

The given expression is: ${ 8 \sqrt{7} - \frac{5}{7} }$

Breaking Down the Expression

To simplify this expression, we need to break it down into its individual components. The first part of the expression is $8 \sqrt{7}$, which is a product of a number and a radical. The second part of the expression is $\frac{5}{7}$, which is a fraction.

Simplifying the Radical

To simplify the radical, we need to understand that the square root of a number is a value that, when multiplied by itself, gives the original number. In this case, the square root of 7 is a value that, when multiplied by itself, gives 7. However, we cannot simplify the radical further because 7 is a prime number and cannot be factored into smaller numbers.

Simplifying the Fraction

To simplify the fraction, we need to find the greatest common divisor (GCD) of the numerator and the denominator. In this case, the GCD of 5 and 7 is 1, which means that the fraction cannot be simplified further.

Rewriting the Expression

Now that we have broken down the expression into its individual components and simplified the radical and the fraction, we can rewrite the expression using the correct notation. The correct notation for the expression is:

$8 \sqrt{7} - \frac{5}{7}$

Rationalizing the Denominator

However, we can further simplify the expression by rationalizing the denominator. To rationalize the denominator, we need to multiply the fraction by a value that will eliminate the radical from the denominator. In this case, we can multiply the fraction by $\frac{\sqrt{7}}{\sqrt{7}}$, which is equivalent to 1.

Simplifying the Expression

After rationalizing the denominator, the expression becomes:

$8 \sqrt{7} - \frac{5 \sqrt{7}}{7}$

Combining Like Terms

Now that we have simplified the expression, we can combine like terms. In this case, we can combine the two terms that involve the radical.

The Final Expression

After combining like terms, the final expression is:

$8 \sqrt{7} - \frac{5 \sqrt{7}}{7} = \frac{56 \sqrt{7} - 5 \sqrt{7}}{7}$

Simplifying the Final Expression

Finally, we can simplify the final expression by combining the two terms in the numerator.

The Simplified Final Expression

After simplifying the final expression, we get:

$\frac{51 \sqrt{7}}{7}$

Conclusion

In conclusion, rewriting an expression with correct notation involves breaking down the expression into its individual components, simplifying the radical and the fraction, and combining like terms. By following these steps, we can simplify complex expressions and arrive at the final answer.

Common Mistakes to Avoid

When rewriting expressions with radicals and fractions, there are several common mistakes to avoid. These include:

• Not simplifying the radical: Failing to simplify the radical can lead to incorrect answers.
• Not rationalizing the denominator: Failing to rationalize the denominator can lead to incorrect answers.
• Not combining like terms: Failing to combine like terms can lead to incorrect answers.

Tips for Simplifying Expressions

When simplifying expressions with radicals and fractions, here are some tips to keep in mind:

• Break down the expression into its individual components: This will make it easier to simplify the expression.
• Simplify the radical: This will make it easier to simplify the expression.
• Rationalize the denominator: This will make it easier to simplify the expression.
• Combine like terms: This will make it easier to simplify the expression.

Real-World Applications

Simplifying expressions with radicals and fractions has many real-world applications. These include:

• Science: Simplifying expressions with radicals and fractions is essential in science, where complex equations need to be solved.
• Engineering: Simplifying expressions with radicals and fractions is essential in engineering, where complex equations need to be solved.
• Finance: Simplifying expressions with radicals and fractions is essential in finance, where complex equations need to be solved.

Conclusion

In conclusion, rewriting an expression with correct notation involves breaking down the expression into its individual components, simplifying the radical and the fraction, and combining like terms. By following these steps, we can simplify complex expressions and arrive at the final answer.

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

A: A radical is a symbol used to represent the square root of a number, while a fraction is a way of expressing a part of a whole.

Q: How do I simplify a radical?

A: To simplify a radical, you need to find the square root of the number inside the radical. If the number inside the radical is a perfect square, you can simplify the radical by taking the square root of the number.

Q: How do I simplify a fraction?

A: To simplify a fraction, you need to find the greatest common divisor (GCD) of the numerator and the denominator. If the GCD is greater than 1, you can simplify the fraction by dividing both the numerator and the denominator by the GCD.

Q: What is rationalizing the denominator?

A: Rationalizing the denominator is the process of eliminating the radical from the denominator of a fraction. This is done by multiplying the fraction by a value that will eliminate the radical from the denominator.

Q: How do I rationalize the denominator?

A: To rationalize the denominator, you need to multiply the fraction by a value that will eliminate the radical from the denominator. This can be done by multiplying the fraction by the conjugate of the denominator.

Q: What is the conjugate of a denominator?

A: The conjugate of a denominator is a value that, when multiplied by the denominator, will eliminate the radical from the denominator.

Q: How do I combine like terms?

A: To combine like terms, you need to add or subtract the coefficients of the terms that have the same variable.

Q: What are like terms?

A: Like terms are terms that have the same variable and the same exponent.

Q: How do I simplify an expression with radicals and fractions?

A: To simplify an expression with radicals and fractions, you need to break down the expression into its individual components, simplify the radical and the fraction, and combine like terms.

Q: What are some common mistakes to avoid when simplifying expressions with radicals and fractions?

A: Some common mistakes to avoid when simplifying expressions with radicals and fractions include not simplifying the radical, not rationalizing the denominator, and not combining like terms.

Q: What are some tips for simplifying expressions with radicals and fractions?

A: Some tips for simplifying expressions with radicals and fractions include breaking down the expression into its individual components, simplifying the radical and the fraction, rationalizing the denominator, and combining like terms.

Q: How do I apply simplifying expressions with radicals and fractions in real-world situations?

A: Simplifying expressions with radicals and fractions is essential in many real-world situations, including science, engineering, and finance. By simplifying complex equations, you can arrive at the final answer and make informed decisions.

Q: What are some examples of real-world applications of simplifying expressions with radicals and fractions?

A: Some examples of real-world applications of simplifying expressions with radicals and fractions include:

• Science: Simplifying expressions with radicals and fractions is essential in science, where complex equations need to be solved to understand the behavior of physical systems.
• Engineering: Simplifying expressions with radicals and fractions is essential in engineering, where complex equations need to be solved to design and optimize systems.
• Finance: Simplifying expressions with radicals and fractions is essential in finance, where complex equations need to be solved to make informed investment decisions.

Q: How do I practice simplifying expressions with radicals and fractions?

A: To practice simplifying expressions with radicals and fractions, you can try solving problems that involve radicals and fractions. You can also use online resources, such as calculators and worksheets, to practice simplifying expressions with radicals and fractions.

Q: What are some resources for learning more about simplifying expressions with radicals and fractions?

A: Some resources for learning more about simplifying expressions with radicals and fractions include:

• Textbooks: There are many textbooks available that cover the topic of simplifying expressions with radicals and fractions.
• Online resources: There are many online resources available that provide tutorials and examples of simplifying expressions with radicals and fractions.
• Tutorials: There are many tutorials available that provide step-by-step instructions on how to simplify expressions with radicals and fractions.

Q: How do I know if I have simplified an expression correctly?

A: To know if you have simplified an expression correctly, you need to check your work by plugging the simplified expression back into the original equation. If the simplified expression satisfies the original equation, then you have simplified the expression correctly.