Exponents, Square Roots and Cube Roots

Square Roots

Cube Roots

Pythagorean theorem

Scientific Notation

Exponent Properties

100

The square root of 64

What is 8?

100

The cube root of 125

What is 5?

100

Use the Pythagorean theorem a2 + b2 = c2 to find the missing hypotenuse for the triangle with legs 3 and 4 cm long

5 cm

100

Express the following number in standard form

8 \cdot 10^7

80,000,000

100

Simplify as a single power

8^4 \cdot 8^5

8⁹

200

The square root of 144

What is 12?

200

The cube root of 1000

What is 10?

200

Use the Pythagorean theorem a2 + b2 = c2 to find the missing hypotenuse for the triangle whose legs are 6 and 8.

200

Express 213,000,000 in scientific notation

2.13 xx 10^8

200

Simplify as a single power

\frac{7^8}{7^2}

7⁶

300

The square root of 1600

What is 40?

300

The cube root of 343

What is 7?

300

Use the Pythagorean theorem a2 + b2 = c2 to find the missing hypotenuse for the triangle whose legs are 5 and 12.

300

Express 0.00054 in scientific notation

5.4 xx 10^{-4)

300

Write as a single power

((-8)^3)^7

(-8)²¹

400

The square root of 4900

What is 70?

400

The cube root of 729

What is 9?

400

Use the Pythagorean theorem a2 + b2 = c2 to find the missing hypotenuse for the triangle whose legs are 9 and 12.

400

Express in scientific notation

0.000007

7 x10^-6

400

Simplify

\frac{2x^5 \cdot x^-2}{x^0}

2x³

500

The square root of 10000

What is 100?

500

The cube root of 1728

What is 12?

500

Use the Pythagorean theorem a2 + b2 = c2 to find the missing hypotenuse for the triangle whose legs are 12 and 16.

500

NO CALCULATOR. Write the product in scientific notation.

(3 xx 10^{-8}) \cdot (21 xx 10^{11})

6.3 xx 10^4

500

Simplify

\frac{(3x^4)^2 \cdot 2x}{6x}

3x⁸