Simplifying Exponents

Presentation

•

Mathematics

•

11th Grade

•

Hard

James Gonzalez

FREE Resource

13 Slides • 33 Questions

Simplifying Exponents

Dr. Tom Giles

Exponent Properties

When multiplying powers add the exponents

Some text here about the topic of discussion

Multiple Choice

Simplify the following expression using exponential notation.

$2^2\cdot2^4$

$2^8$

$2^6$

$4^6$

$4^8$

Exponent Properties

When you have a power of a power, multiply the exponents

Some text here about the topic of discussion

Multiple Choice

(x³)⁴

x¹²

x^-1

x⁷

x⁰

Exponent Properties

When you have a power of a product, distribute the exponent.

Some text here about the topic of discussion

Multiple Choice

Simplify: (3x²)³

27x⁶

9x⁶

3x⁶

9x⁵

Exponent Properties

When you have a quotient of powers, subtract the exponent.

Some text here about the topic of discussion

Multiple Choice

$Simplify\ \ \frac{x^8}{x^2}$

$x^4$

$x^6$

$6x$

Exponent Properties

When you have a negative exponent, take the reciprocal to make positive.

Some text here about the topic of discussion

Multiple Choice

Rewrite using a positive exponent.
7^-10

¹/_7¹⁰

7¹⁰

¹/_7^-10

-70

Multiple Choice

Simplify the expression:
c⁴⋅c³=

^c12

c⁴⁺³

c⁷

Multiple Choice

Simplify the expression: 3x²⋅x²=

3x²⁺²

3x⁴

Multiple Choice

According to exponent rules, when we raise a power to another exponent we _______ the exponents.

add

subtract

multiply

divide

Multiple Choice

Simplify 4^-2=

1/16

-16

1/4

-42

Multiple Choice

Multiple Choice

Anything raised to a power of zero is always:

itself

negative

Multiple Choice

(5³x²y⁴)⁰

5xy

Multiple Choice

Simplify

(2a²b⁴z)(6a³b²z⁵)

8a⁵b⁶z⁶

12a⁶b⁸z⁵

12a⁵b⁶z⁶

8a⁶b⁸z⁵

Multiple Choice

(6x²)(-3x⁵)

18x⁷

-18x⁷

18x⁷

3x⁷

Multiple Choice

When dividing powers with the same base, you _______________ the exponents.

Add

Subtract

Multiply

Divide

Multiple Choice

Simplify

x⁴/3

3x¹⁰

36x¹⁰

3x⁴

Multiple Choice

2 / x²

-2x²

2x²

2x¹⁴

Multiple Choice

Simplify.

Multiple Choice

Simplify the expression shown. Your answer should contain only positive exponents.

16a¹²b¹⁴

Radical

Expressions

The opposite of a root is an exponent!
To simplify SQUARE ROOTS:
- Write the radicand as a product of numbers, one of which is a PERFECT SQUARE.
- Find the square root of the perfect square.

Radical Expressions

Basics/Square Roots

Multiple Choice

$\sqrt[]{36}$

NOT ALL SQUARE ROOTS ARE PERFECT!
- When this happens you should follow the same process ,but you will need to leave any remaining products that cannot come out of the radical underneath the root.

Radical Expressions

Basics/Square Roots

Multiple Choice

$\sqrt[]{18}$

$3\sqrt[]{2}$

$2\sqrt[]{9}$

$2\sqrt[]{3}$

$\sqrt[]{9}$

Expon

Multiple Choice

$\sqrt[3]{54}$

$3\sqrt[3]{18}$

$2\sqrt[3]{3}$

$3\sqrt[3]{2}$

$18\sqrt[3]{3}$

Multiple Choice

$\sqrt[3]{64}$

Open Ended

What does B.I.T.E stand for?

Type response here

Fractional Exponents can be written as radical expressions!

Bottom

Index

Top

Exponent

Radical Expressions

Fractional Exponents

Multiple Choice

$13^{\frac{1}{4}}$

$\sqrt[]{13}$

$\sqrt[4]{13}$

$\left(\sqrt[4]{13}\right)^2$

$3\sqrt[3]{2}$

Multiple Select

$7^{\frac{3}{5}}$ This fractional exponent can be written in TWO ways! Select two choices!

$\left(\sqrt[3]{7}\right)^5$

$\left(\sqrt[5]{7}\right)^3$

$\sqrt[3]{7^5}$

$\sqrt[5]{7^3}$

Multiple Choice

Write the following as a radical expression: $x^{\frac{3}{2}}$

(Be careful! ;)

$\sqrt[]{x^3}$

$\sqrt[2]{x^3}$

$\sqrt[3]{x^2}$

$\left(\sqrt[3]{x}\right)^2$

Multiple Choice

$\sqrt[]{18}$

$3\sqrt[]{2}$

$2\sqrt[]{9}$

$2\sqrt[]{3}$

$\sqrt[]{9}$

To simplify CUBE ROOTS:
- Write the radicand as a product of numbers, one of which is a PERFECT CUBE.
- Find the cube root of the perfect cube.

Radical Expressions

Cube Root & Beyond

Simplifying Exponents

Dr. Tom Giles

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