Which of the following is developed to result in the answer of 1?
9 answers
Without knowing the options, it is not possible to determine which of the following is developed to result in the answer of 1. Please provide the options for a specific answer.
Which of the following is developed to result in the answer of 1?
(-2.97)(0)
13 - (7.42)(0)
3 (8^(2))
5^(0) + 9^(0)
(-2.97)(0)
13 - (7.42)(0)
3 (8^(2))
5^(0) + 9^(0)
The expression that is developed to result in the answer of 1 is:
5^(0) + 9^(0)
5^(0) + 9^(0)
which of the following is an equivalent expression to 1/2 ( 9 - 7^(0)) + (29^(0))
1/2 (9 - 1) + 1
1/2 (9 - 0) + 0
1/2 (9 - 1) - 1
1/2 (2) + 1
1/2 (9 - 1) + 1
1/2 (9 - 0) + 0
1/2 (9 - 1) - 1
1/2 (2) + 1
The equivalent expression to 1/2 (9 - 7^(0)) + (29^(0)) is:
1/2 (9 - 0) + 0
1/2 (9 - 0) + 0
which of the following shows the correct process of solving -4 (3 + 12^(0)) + 15^(0)
To solve the expression -4 (3 + 12^(0)) + 15^(0), we follow the order of operations, which includes evaluating exponents, performing multiplication and addition/subtraction from left to right. Here is the correct process:
First, we evaluate the exponent 12^(0). Any number raised to the power of 0 is equal to 1. So, 12^(0) = 1.
The expression now becomes: -4 (3 + 1) + 15^(0)
Next, simplify the addition: -4 (4) + 15^(0)
Then, perform the multiplication: -16 + 15^(0)
Finally, evaluate 15^(0). Any non-zero number raised to the power of 0 is equal to 1. So, 15^(0) = 1.
The final expression simplifies to: -16 + 1 = -15
First, we evaluate the exponent 12^(0). Any number raised to the power of 0 is equal to 1. So, 12^(0) = 1.
The expression now becomes: -4 (3 + 1) + 15^(0)
Next, simplify the addition: -4 (4) + 15^(0)
Then, perform the multiplication: -16 + 15^(0)
Finally, evaluate 15^(0). Any non-zero number raised to the power of 0 is equal to 1. So, 15^(0) = 1.
The final expression simplifies to: -16 + 1 = -15
which of the following shows the correct process of solving -4 (3 + 12^(0)) + 15^(0) by generating an equivalent expression using the zero power rule
To solve the expression -4 (3 + 12^(0)) + 15^(0) using the zero power rule, we need to convert any base raised to the power of 0 to 1. Here is the correct process:
First, evaluate 12^(0) using the zero power rule: 12^(0) = 1.
The expression now becomes: -4 (3 + 1) + 15^(0)
Next, simplify the addition: -4 (4) + 15^(0)
Now, apply the zero power rule to 15^(0): 15^(0) = 1.
The expression becomes: -4 (4) + 1
Finally, perform the multiplication and addition: -16 + 1.
The final expression simplifies to: -15
First, evaluate 12^(0) using the zero power rule: 12^(0) = 1.
The expression now becomes: -4 (3 + 1) + 15^(0)
Next, simplify the addition: -4 (4) + 15^(0)
Now, apply the zero power rule to 15^(0): 15^(0) = 1.
The expression becomes: -4 (4) + 1
Finally, perform the multiplication and addition: -16 + 1.
The final expression simplifies to: -15
31 answers