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Physics

Math Rational Exponents

Rational Exponents

Grade 10

Sep 15, 2022

Key Concepts

Define a rational exponent.
Solve equations with rational exponents using the product of powers property.
Solve equations with rational exponents using the power of a power property.
Solve equations with rational exponents using the power of a product property.
Solve equations with rational exponents using the quotient of powers property.

Rational Exponents

Fractions

A part of a whole is called a fraction.

All fractions can be placed on the number line.

Types of Fractions

Decimal numbers

The numbers whose whole number part and fractional part are separated by a decimal point are called decimal points.

Factors and multiples

A factor is a number or a group of numbers that are multiplied together to make a product.

A multiple is the product of a quantity and a whole number.

Exponents

Repeated multiplication can be represented in more than one way.

You can use an exponent to write the repeated multiplication of a number.

A number that can be written using exponents is called a power.

We read as 2 raised to the power of 3.

Rational exponents

When a number p is raised to power 1/2, we can write them as √p.

The expressions with exponents that are rational numbers are called rational exponents (also called fractional exponents).

Laws of exponents

Law: When two terms with the same base are multiplied, the powers are added.

a^m×aⁿ=a^m+n

Example: Evaluate 2⁴ × 2⁹

Sol: 2⁴ × 2⁹= 2⁽⁴⁺⁹⁾

= 2¹³

= 8192

Use the product of powers property to solve equations with rational exponents

Law of exponents

Law: When raising a power to a new power, multiply the exponents.

(a^m)ⁿ=a^mn

Example: Evaluate (5³)²

Sol: (5³)²= 5^(3×2)

= 5⁶

= 15625

Use the power of a power property to solve equations with rational exponents

Law of exponents

Law: When multiplying expressions with the same exponent but different bases, multiply the bases and use the same exponent.

a^m×b^m=(a×b)^m

Example: Evaluate 6²×5²

Sol: 6²×5²= (6×5)²

= 30²

= 900

Use the power of a product property to solve equations with rational exponents

Law of exponents

Law: When dividing two powers with the same base, we subtract the exponents.

Use the quotient of powers property to solve equations with rational exponents

Exercise

Write the radical √14641 using rational exponents.
What is the value of x in 27^(x/2) = 3^(x-1)?
Solve: 3^(x/2+1) = 3^(-5x/2)
If the volume of a sphere is V=4/3 πr³ is equal to 392 m³. Find the radius.
Write the radical √b^a using rational exponent.

Concept Map

What we have learned

Repeated multiplication can be represented in more than one way.
You can use an exponent to write the repeated multiplication of a number.

Comments:

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