Examples of Multiplying Radicals

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Examples of Multiplying Radicals Correct example: Be careful to multiply the coefficients with coefficients and radicals with radicals. Incorrect Example:

Examples of Multiplying Radicals Correct example: Be careful to multiply the coefficients with coefficients and radicals with radicals. Incorrect Example:

Examples of Multiplying Radicals Correct example: Be careful to multiply the coefficients with coefficients and radicals with radicals. Incorrect Example: This is Wrong! Don’t multiply these together!

Adding and Subtracting Radicals Only like radicals can be added or subtracted. Like radicals can have different coefficients as long as the radicals are the same. Subtract the coefficients but keep the same radical. You may have to simplify your question first, to get a like radical.

Adding and Subtracting Radicals Example 1: Only like radicals can be added or subtracted. Like radicals can have different coefficients as long as the radicals are the same. Subtract the coefficients but keep the same radical. You may have to simplify your question first, to get a like radical.

Adding and Subtracting Radicals Example 1: Only like radicals can be added or subtracted. Like radicals can have different coefficients as long as the radicals are the same. Subtract the coefficients but keep the same radical. You may have to simplify your question first, to get a like radical.

Adding and Subtracting Radicals Example 1: Only like radicals can be added or subtracted. Like radicals can have different coefficients as long as the radicals are the same. Subtract the coefficients but keep the same radical. You may have to simplify your question first, to get a like radical. Example 2:

Adding and Subtracting Radicals Example 1: Only like radicals can be added or subtracted. Like radicals can have different coefficients as long as the radicals are the same. Subtract the coefficients but keep the same radical. You may have to simplify your question first, to get a like radical. Example 2:

Adding and Subtracting Radicals Example 1: Only like radicals can be added or subtracted. Like radicals can have different coefficients as long as the radicals are the same. Subtract the coefficients but keep the same radical. You may have to simplify your question first, to get a like radical. Example 2: Example 3:

Adding and Subtracting Radicals Example 1: Only like radicals can be added or subtracted. Like radicals can have different coefficients as long as the radicals are the same. Subtract the coefficients but keep the same radical. You may have to simplify your question first, to get a like radical. Example 2: Example 3:

Common Mistakes Made While Adding and Subtracting Radicals One common mistake is adding without having like radicals.

Common Mistakes Made While Adding and Subtracting Radicals One common mistake is adding without having like radicals.

Common Mistakes Made While Adding and Subtracting Radicals One common mistake is adding without having like radicals. Always make sure that the radicals are similar.

Common Mistakes Made While Adding and Subtracting Radicals One common mistake is adding without having like radicals. Always make sure that the radicals are similar. Another common mistake is forgetting to simplify.

Common Mistakes Made While Adding and Subtracting Radicals One common mistake is adding without having like radicals. Always make sure that the radicals are similar. Another common mistake is forgetting to simplify.

Common Mistakes Made While Adding and Subtracting Radicals One common mistake is adding without having like radicals. Always make sure that the radicals are similar. Another common mistake is forgetting to simplify. This question is not done! The answer is:

Combined Operations with Radicals You follow the same steps with these as you do with polynomials.

Combined Operations with Radicals You follow the same steps with these as you do with polynomials. Use the distribution property.

Combined Operations with Radicals You follow the same steps with these as you do with polynomials. Use the distribution property. Example:

Combined Operations with Radicals You follow the same steps with these as you do with polynomials. Use the distribution property. Example:

Combined Operations with Radicals You follow the same steps with these as you do with polynomials. Use the distribution property. Example:

Combined Operations with Radicals You follow the same steps with these as you do with polynomials. Use the distribution property. Example:

Common Mistakes made while doing combined operations Be careful to multiply correctly.

Common Mistakes made while doing combined operations Be careful to multiply correctly. Correct Answer:

Common Mistakes made while doing combined operations Be careful to multiply correctly. Correct Answer:

Common Mistakes made while doing combined operations Be careful to multiply correctly. Correct Answer: Incorrect Answer:

Common Mistakes made while doing combined operations Be careful to multiply correctly. Correct Answer: Incorrect Answer:

Dividing Radicals (part 1) There are 4 steps to dividing radicals.

Dividing Radicals (part 1) There are 4 steps to dividing radicals. 1. Reduce coefficients and/or radicals by common factor (if you can).

Dividing Radicals (part 1) There are 4 steps to dividing radicals. 1. Reduce coefficients and/or radicals by common factor (if you can). 2.Take out any perfect squares (if possible).

Dividing Radicals (part 1) There are 4 steps to dividing radicals. 1. Reduce coefficients and/or radicals by common factor (if you can). 2.Take out any perfect squares (if possible). Rationalize denominators

Dividing Radicals (part 1) There are 4 steps to dividing radicals. 1. Reduce coefficients and/or radicals by common factor (if you can). 2.Take out any perfect squares (if possible). Rationalize denominators. Reduce coefficients again.

Dividing Radicals (part 1) There are 4 steps to dividing radicals. 1. Reduce coefficients and/or radicals by common factor (if you can). 2.Take out any perfect squares (if possible). Rationalize denominators. Reduce coefficients again. Example:

Dividing Radicals (part 1) There are 4 steps to dividing radicals. 1. Reduce coefficients and/or radicals by common factor (if you can). 2.Take out any perfect squares (if possible). Rationalize denominators. Reduce coefficients again. Example:

Dividing Radicals (part 1) There are 4 steps to dividing radicals. 1. Reduce coefficients and/or radicals by common factor (if you can). 2.Take out any perfect squares (if possible). Rationalize denominators. Reduce coefficients again. Example: Divide top and bottom by

Common Errors Done While Dividing Radicals Be careful not to divide a coefficient by a radical.

Common Errors Done While Dividing Radicals Be careful not to divide a coefficient by a radical. Example of this error:

Common Errors Done While Dividing Radicals Be careful not to divide a coefficient by a radical. Example of this error:

Common Errors Done While Dividing Radicals Be careful not to divide a coefficient by a radical. Example of this error: The correct answer to this question is:

Common Errors Done While Dividing Radicals Be careful not to divide a coefficient by a radical. Example of this error: The correct answer to this question is:

Common Errors Done While Dividing Radicals Be careful not to divide a coefficient by a radical. Example of this error: The correct answer to this question is: Multiply top and bottom by

Dividing Radicals (part 2) When rationalizing binomial denominators, multiply both sides by the conjugate.

Dividing Radicals (part 2) When rationalizing binomial denominators, multiply top and bottom by the conjugate.

Dividing Radicals (part 2) When rationalizing binomial denominators, multiply top and bottom by the conjugate. Binomial denominator.

Dividing Radicals (part 2) When rationalizing binomial denominators, multiply top and bottom by the conjugate. Example: Binomial denominator.

Dividing Radicals (part 2) When rationalizing binomial denominators, multiply top and bottom by the conjugate. Example: Binomial denominator.

Dividing Radicals (part 2) When rationalizing binomial denominators, multiply top and bottom by the conjugate. Example: Multiply numerator and denominator by Binomial denominator.

Dividing Radicals (part 2) When rationalizing binomial denominators, multiply top and bottom by the conjugate. Example: Multiply top and bottom by Binomial denominator.

Dividing Radicals (part 2) When rationalizing binomial denominators, multiply top and bottom by the conjugate. Example: Multiply top and bottom Binomial denominator.

13 Question Quiz! 4. 1. 2. 5. 6. 3. Solve without a calculator. Simplify. 2. 5. Use your calculator to solve. 6. 3.

Solve. Multiply. 11. 7. Divide. 12. 8. Add or Subtract. 13. 9. 10.

Answers! 1. 5 2. 1.1 3. 492 4. 1.5 5. 6. 7. 24 8. 9. 10.

11. 12. 13.