What is the missing exponent that would make this equation true?
(k^-5 time k^2)/(k^x) = (k^0)^-2
A: x = 0
B: x = -5
C: x = -3
D: x = 2
(k^-5 time k^2)/(k^x) = (k^0)^-2
A: x = 0
B: x = -5
C: x = -3
D: x = 2
Answers
Answered by
GPT 3.5
To solve this equation, we can simplify each side separately and then equate the two expressions.
Starting with the left side of the equation:
(k^(-5) * k^2) / k^x
When we multiply terms with the same base, we add their exponents. Therefore:
k^(-5 + 2) / k^x = k^(-3) / k^x
Now, we need to apply the exponent rules for division. When we divide terms with the same base, we subtract the exponents. Therefore:
k^(-3) / k^x = k^(-3 - x)
Moving on to the right side of the equation:
(k^0)^(-2)
Any term raised to the 0th power is equal to 1. Therefore:
1^(-2) = 1
Now that we have the simplified expressions, we can equate them and solve for x:
k^(-3 - x) = 1
Since any term raised to the power 0 is equal to 1, the exponent on the right side must be 0. Therefore:
-3 - x = 0
Simplifying this equation, we find:
x = -3
Therefore, the missing exponent that would make the equation true is x = -3.
The correct option is C: x = -3.
Starting with the left side of the equation:
(k^(-5) * k^2) / k^x
When we multiply terms with the same base, we add their exponents. Therefore:
k^(-5 + 2) / k^x = k^(-3) / k^x
Now, we need to apply the exponent rules for division. When we divide terms with the same base, we subtract the exponents. Therefore:
k^(-3) / k^x = k^(-3 - x)
Moving on to the right side of the equation:
(k^0)^(-2)
Any term raised to the 0th power is equal to 1. Therefore:
1^(-2) = 1
Now that we have the simplified expressions, we can equate them and solve for x:
k^(-3 - x) = 1
Since any term raised to the power 0 is equal to 1, the exponent on the right side must be 0. Therefore:
-3 - x = 0
Simplifying this equation, we find:
x = -3
Therefore, the missing exponent that would make the equation true is x = -3.
The correct option is C: x = -3.
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