Multiplying Radicals

Presentation

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Mathematics

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9th - 12th Grade

•

Practice Problem

•

Medium

•

CCSS

HSN.RN.A.2

Standards-aligned

Nakeyta Coleman

Used 20+ times

FREE Resource

14 Slides • 8 Questions

Multiplying radicals with variables

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Multiplying Radicals

When multiplying radicals with the same variables follow the following steps:
Step 1: Multiply the same variables together. *Remember when you multiply the same variables you add the exponents
Step 2: Simplify if possible

Some text here about the topic of discussion

Multiplying radicals with multiple variables inside

When multiplying radicals with multiple variables follow the following steps:
Step 1: Multiply the same variables together (x with x, y with y, etc). *Remember when you multiply the same variables you add the exponents
Step 2: Simplify if possible

Some text here about the topic of discussion

Example

Subject | Subject

Some text here about the topic of discussion

Multiply numbers together

Multiply variables together

Check if you can simplify

Simplify

Multiplying Radicals

When only radicands

1. Combine and multiply

2. Check factors and simplify

When simplifying is possible

Sometimes, multiplying the radicals can result in expressions that can still be simplified.

If the radicals have coefficients, do the work in two parts:

Multiply the coefficients.
Multiply the radicals.
Don't forget to check if you can simplify.

When there are coefficients

Multiple Choice

Multiply and simplify if possible:

$\sqrt[]{xy^3z^8}\cdot\sqrt[]{x^7y^4z}$

$x^4y^3z^4\sqrt[]{yz}$

$x^8y^7z^9$

$x^6y^3\sqrt[]{xyz}$

$xyz^{24}$

Multiple Choice

Multiply and simplify if possible:

$\sqrt[]{4x^2}\cdot\sqrt[]{6x^6}$

$\sqrt[]{10x^{10}}$

$2x^4\sqrt[]{6}$

$24x^8$

$x^4\sqrt[]{2}$

Multiple Choice

Multiply and simplify if possible:

$\sqrt[]{x^4}\cdot\sqrt[]{x^5}$

$\sqrt[]{x^{20}}$

$\sqrt[]{x}$

$x^9$

$x^4\sqrt[]{x}$

Multiple Choice

Multiply and simplify if possible:

$\sqrt[]{x^2}\cdot\sqrt[]{x^8}$

$x^5$

$x^3\sqrt[]{x}$

$x^{10}$

$x^4$

Multiple Choice

Multiply and simplify if possible:

$\sqrt[]{x^4y^2}\cdot\sqrt[]{x^7y^5}$

$x^3y\sqrt[]{xy}$

$x^{11}y^7$

$x^5y^3\sqrt[]{xy}$

$x^3y^2$

Multiple Choice

Multiply the radical expressions together.

$\sqrt[]{7}\cdot\sqrt[]{2}$

$\sqrt[]{9}$

$3$

$\sqrt[]{14}$

$14$

Multiple Choice

$2\sqrt[]{5}\left(\sqrt[]{4}+2\sqrt[]{3}\right)$

$4\sqrt[]{5}+4\sqrt[]{15}$

$8\sqrt[]{20}$

$4\sqrt[]{5}$

$4\sqrt[]{20}+2\sqrt[]{15}$

Multiple Choice

Multiply the radical expressions together.

$5\sqrt[]{2}\cdot7\sqrt[]{3}$

$12\sqrt[]{5}$

$10\sqrt[]{21}$

$35\sqrt[]{6}$

$35\sqrt[]{5}$

Multiplying radicals with variables

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