Powers Special Cases Practice - Negative Exponents & Zero Power

Master powers of negative numbers, zero exponents, and negative integer exponents with step-by-step practice problems and detailed solutions.

📚What You'll Master in This Practice Session

Determine signs when raising negative numbers to even and odd powers
Apply the zero exponent rule to solve problems with any base to power 0
Convert negative exponents to fractions using reciprocal properties
Distinguish between (-5)² and -5² notation and solve correctly
Simplify complex expressions with multiple negative exponents
Work with fractions that have negative exponents by flipping and making positive

Understanding Powers - special cases

Complete explanation with examples

Powers - Special Cases

Powers of negative numbers

When we have an exponent on a negative number, we can get a positive result or a negative result.
We will know this based on the exponent – whether it is even or odd.

Powers with exponent 0

Any number with an exponent of $0$ will be equal to $1$ . (Except for $0$ )
No matter which number we raise to the power of $0$ , we will always get a result of 1.

Powers with negative integer exponents

In an exercise where we have a negative exponent, we turn the term into a fraction where:
the numerator will be $1$ and in the denominator, the base of the exponent with the positive exponent.

Detailed explanation

Practice Powers - special cases

Test your knowledge with 41 quizzes

Insert the corresponding expression:

$$ $\left(\frac{1}{3}\right)^{-4}=$

Examples with solutions for Powers - special cases

Step-by-step solutions included

Exercise #1

Which of the following is equivalent to $100^0$ ?

Step-by-Step Solution

Let's solve the problem step by step using the Zero Exponent Rule, which states that any non-zero number raised to the power of 0 is equal to 1.

Consider the expression: $100^0$ .
According to the Zero Exponent Rule, if we have any non-zero number, say $a$ , then $a^0 = 1$ .
Here, $a = 100$ which is clearly a non-zero number, so following the rule, we find that:
$100^0 = 1$ .

Therefore, the expression $100^0$ is equivalent to 1.

Answer:

Video Solution

Exercise #2

$112^0=\text{?}$

Step-by-Step Solution

We use the zero exponent rule.

$X^0=1$ We obtain

$112^0=1$ Therefore, the correct answer is option C.

Answer:

Video Solution

Exercise #3

$4^0=\text{?}$

Step-by-Step Solution

To solve this problem, we need to find the value of $4^0$ .

Step 1: According to the properties of exponents, for any non-zero number $a$ , the zero power $a^0$ is always equal to 1.
Step 2: Here, our base is 4, which is a non-zero number.
Step 3: Applying the zero exponent rule, we find:

$4^0 = 1$

Thus, the answer to the question is $1$ , corresponding to choice 3.

Answer:

$1$

Video Solution

Exercise #4

$(\frac{1}{8})^0=\text{?}$

Step-by-Step Solution

To solve the problem, $(\frac{1}{8})^0$ , we utilize the Zero Exponent Rule, which states that any non-zero number raised to the power of zero equals $1$ .

Here's a step-by-step explanation:

Step 1: Identify the base and ensure it is non-zero. In this case, the base is $\frac{1}{8}$ , which is indeed non-zero.
Step 2: Apply the Zero Exponent Rule. According to this rule, $\left(\frac{1}{8}\right)^0 = 1$ .
Step 3: Conclude the result: The expression evaluates to $1$ .

Therefore, the correct answer to the problem $(\frac{1}{8})^0$ is $1$ .

Answer:

Video Solution

Exercise #5

$1^0=$

Step-by-Step Solution

To solve this problem, we'll follow these steps:

Step 1: Recognize that the base of the exponent is 1.
Step 2: Apply the Zero Exponent Rule.
Step 3: Verify the result is consistent with mathematical rules.

Now, let's work through each step:
Step 1: We have the expression $1^0$ , where 1 is the base.
Step 2: According to the Zero Exponent Rule, any non-zero number raised to the power of zero is equal to 1. Hence, $1^0 = 1$ .
Step 3: Verify: The base 1 is indeed non-zero, confirming that the zero exponent rule applies.

Therefore, the value of $1^0$ is $1$ .

Answer:

$1$

Video Solution

Frequently Asked Questions

Everything you need to know about Powers - special cases

What happens when you raise a negative number to an even power?

When you raise a negative number to an even power, the result is always positive. For example, (-4)² = (-4) × (-4) = 16. This is because multiplying two negative numbers gives a positive result.

What happens when you raise a negative number to an odd power?

When you raise a negative number to an odd power, the result is always negative. For example, (-4)³ = (-4) × (-4) × (-4) = -64. The negative sign remains because you have an odd number of negative factors.

Why does any number to the power of 0 equal 1?

Any non-zero number raised to the power of 0 equals 1 by mathematical definition. This rule applies universally: 5⁰ = 1, 100⁰ = 1, and (2/3)⁰ = 1. The only exception is 0⁰, which is undefined.

How do you solve problems with negative exponents?

To solve negative exponents, convert them to fractions with the reciprocal base and positive exponent. For example: 3⁻² = 1/3² = 1/9. The negative exponent means "take the reciprocal and make the exponent positive."

What's the difference between (-5)² and -5²?

The parentheses make a crucial difference: • (-5)² = (-5) × (-5) = 25 (the exponent applies to the entire negative number) • -5² = -(5²) = -25 (the exponent only applies to 5, then you apply the negative sign)

How do you handle fractions with negative exponents?

When a fraction has a negative exponent, flip the fraction and make the exponent positive. For example: (3/4)⁻² becomes (4/3)². This works because taking the reciprocal cancels out the negative exponent.

What are the most common mistakes with powers of negative numbers?

Common mistakes include: 1. Forgetting that even powers of negatives are positive 2. Confusing (-x)ⁿ with -xⁿ notation 3. Not applying the zero exponent rule correctly 4. Incorrectly handling negative exponents in fractions

How do you simplify expressions with multiple negative exponents?

Work step by step: convert each negative exponent to its reciprocal form, then use fraction operations. For example, 2⁻³/4⁻² becomes (1/2³)/(1/4²) = (1/8)/(1/16) = 16/8 = 2. Always convert negative exponents first, then simplify.

Practice by Question Type

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Applying the formula Calculating powers with negative exponents Complete the equation converting Negative Exponents to Positive Exponents Identify the greater value Multiplying Exponents with the same base Presenting powers in the denominator as powers with negative exponents Presenting powers with negative exponents as fractions Presenting powers with negative exponents as fractions Using laws of exponents with parameters Using the laws of exponents Using variables Adding parentheses in the correct place Applying the formula Combination with exercise Identify the greater value Applying the formula Using the laws of exponents

Powers Special Cases Practice - Negative Exponents & Zero Power

Understanding Powers - special cases

Powers - Special Cases

Powers of negative numbers

Powers with exponent 0

Powers with negative integer exponents

Practice Powers - special cases

Examples with solutions for Powers - special cases

Frequently Asked Questions

What happens when you raise a negative number to an even power?

What happens when you raise a negative number to an odd power?

Why does any number to the power of 0 equal 1?

How do you solve problems with negative exponents?

What's the difference between (-5)² and -5²?

How do you handle fractions with negative exponents?

What are the most common mistakes with powers of negative numbers?

How do you simplify expressions with multiple negative exponents?

More Powers - special cases Questions

Zero Exponent Rule

Negative Exponents

Powers of Negative Numbers

Practice by Question Type

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