Asked by WeaponXasks
What is the Quotient Rule of Integer Exponents?(1 point)
Responses
xaxb=xa+b
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A plus b power
xaxb=xa−b
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A minus b power
xaxb=xb−a
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the b minus A power
xaxb=xab
Responses
xaxb=xa+b
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A plus b power
xaxb=xa−b
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A minus b power
xaxb=xb−a
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the b minus A power
xaxb=xab
Answers
Answered by
GPT 3.5
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A minus b power
Answered by
WeaponXasks
Simplify x675x453
.(1 point)
.(1 point)
Answered by
GPT 3.5
To simplify the expression x^675 * x^453, we can use the quotient rule of integer exponents, which states that x^a * x^b = x^(a+b).
Using this rule, we can simplify the expression as follows:
x^675 * x^453 = x^(675+453) = x^1128
Therefore, the simplified expression is x^1128.
Using this rule, we can simplify the expression as follows:
x^675 * x^453 = x^(675+453) = x^1128
Therefore, the simplified expression is x^1128.
Answered by
WeaponXasks
says its wrong
Answered by
GPT 3.5
I apologize for the error. Let's correct it.
To simplify the expression x^675 * x^453, we can again use the quotient rule of integer exponents, which states that x^a * x^b = x^(a+b).
Using this rule, we can simplify the expression as follows:
x^675 * x^453 = x^(675+453) = x^1128
Therefore, the simplified expression is still x^1128. If this answer is marked as incorrect, please provide the correct answer or any additional information that may help me better understand the problem.
To simplify the expression x^675 * x^453, we can again use the quotient rule of integer exponents, which states that x^a * x^b = x^(a+b).
Using this rule, we can simplify the expression as follows:
x^675 * x^453 = x^(675+453) = x^1128
Therefore, the simplified expression is still x^1128. If this answer is marked as incorrect, please provide the correct answer or any additional information that may help me better understand the problem.
Answered by
WeaponXasks
it doesn't say anything else other than Simplify x675x453
.(1 point), so idk why its wrong
.(1 point), so idk why its wrong
Answered by
GPT 3.5
I apologize for the misunderstanding. To simplify the expression x^675 * x^453, we can add the exponents together:
x^675 * x^453 = x^(675 + 453) = x^1128
So the simplified expression is x^1128. If this is marked as incorrect, please let me know and provide any further information that may help clarify the problem.
x^675 * x^453 = x^(675 + 453) = x^1128
So the simplified expression is x^1128. If this is marked as incorrect, please let me know and provide any further information that may help clarify the problem.
Answered by
WeaponXasks
What is the missing exponent in the following equation?
e?e65 = e38
(1 point)
e?e65 = e38
(1 point)
Answered by
GPT 3.5
The missing exponent in the equation e^? * e^65 = e^38 is -27.
To solve for the missing exponent, we can use the quotient rule of integer exponents, which states that e^a / e^b = e^(a-b).
In this case, since e^? * e^65 = e^38, we can rewrite this equation as e^? / e^65 = e^38.
Therefore, we have ? - 65 = 38.
Solving for ?, we find that ? = 38 + 65 = 103.
Therefore, the missing exponent in the equation is -27.
To solve for the missing exponent, we can use the quotient rule of integer exponents, which states that e^a / e^b = e^(a-b).
In this case, since e^? * e^65 = e^38, we can rewrite this equation as e^? / e^65 = e^38.
Therefore, we have ? - 65 = 38.
Solving for ?, we find that ? = 38 + 65 = 103.
Therefore, the missing exponent in the equation is -27.