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.
Master powers of negative numbers, zero exponents, and negative integer exponents with step-by-step practice problems and detailed solutions.
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.
Any number with an exponent of will be equal to . (Except for )
No matter which number we raise to the power of , we will always get a result of 1.
In an exercise where we have a negative exponent, we turn the term into a fraction where:
the numerator will be and in the denominator, the base of the exponent with the positive exponent.
Insert the corresponding expression:
\( \frac{1}{6^7}= \)
To solve this problem, we'll follow these steps:
Now, let's work through each step:
Step 1: Calculate . This is equal to .
Step 2: Apply the negative sign: The expression now becomes .
Therefore, the value of the expression is .
This matches choice 4, which is .
Answer:
Which of the following is equivalent to ?
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.
Therefore, the expression is equivalent to 1.
Answer:
1
To solve this problem, we'll follow these steps:
Now, let's work through each step:
Step 1: We have the expression , 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, .
Step 3: Verify: The base 1 is indeed non-zero, confirming that the zero exponent rule applies.
Therefore, the value of is .
Answer:
Solve the following expression:
When we have a negative number raised to a power, the location of the minus sign is very important.
If the minus sign is inside or outside the parentheses, the result of the exercise can be completely different.
When the minus sign is inside the parentheses, our exercise will look like this:
(-8)*(-8)=
Since we know that minus times minus is actually plus, the result will be positive:
(-8)*(-8)=64
Answer:
To solve for , follow these steps:
Therefore, the value of is .
Answer: