Asked by d
Which of the following correctly solves the equation log3(2x−1)=log3(3x)
?(1 point)
Responses
x=1
x equals 1
x=−1
x equals negative 1
x=1/5
x equals Start Fraction 1 over 5 End Fraction
no solution
no solution
?(1 point)
Responses
x=1
x equals 1
x=−1
x equals negative 1
x=1/5
x equals Start Fraction 1 over 5 End Fraction
no solution
no solution
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To solve the equation \( \log_3(2x - 1) = \log_3(3x) \), we can use the property of logarithms that states if \( \log_b(a) = \log_b(c) \), then \( a = c \) (as long as \( a > 0 \) and \( c > 0 \)).
Setting the arguments equal to each other, we get:
\[
2x - 1 = 3x
\]
Next, we will rearrange the equation:
\[
2x - 3x = 1 \\
-x = 1 \\
x = -1
\]
Now we need to check if \( x = -1 \) is a valid solution by substituting it back into the original logarithmic functions:
1. For \( 2x - 1 \):
\[
2(-1) - 1 = -2 - 1 = -3
\]
Since logarithms of negative numbers are undefined, \( \log_3(2(-1) - 1) \) is undefined.
2. For \( 3x \):
\[
3(-1) = -3
\]
Again, \( \log_3(-3) \) is undefined.
Since both sides are undefined for \( x = -1 \), it is not a valid solution.
Next, we need to check if there are any other possible values for \( x \). The arguments inside the logarithms must be greater than zero:
\[
2x - 1 > 0 \quad (1)
\]
\[
3x > 0 \quad (2)
\]
From inequality (1):
\[
2x > 1 \\
x > \frac{1}{2}
\]
From inequality (2):
\[
3x > 0 \\
x > 0
\]
Both conditions imply \( x > \frac{1}{2} \). Since \( x = -1 \) does not satisfy this condition and we haven't found any other solutions, we conclude that the original equation has **no solution** when considering the requirements for logarithms.
Thus, the correct response is:
**no solution**.
Setting the arguments equal to each other, we get:
\[
2x - 1 = 3x
\]
Next, we will rearrange the equation:
\[
2x - 3x = 1 \\
-x = 1 \\
x = -1
\]
Now we need to check if \( x = -1 \) is a valid solution by substituting it back into the original logarithmic functions:
1. For \( 2x - 1 \):
\[
2(-1) - 1 = -2 - 1 = -3
\]
Since logarithms of negative numbers are undefined, \( \log_3(2(-1) - 1) \) is undefined.
2. For \( 3x \):
\[
3(-1) = -3
\]
Again, \( \log_3(-3) \) is undefined.
Since both sides are undefined for \( x = -1 \), it is not a valid solution.
Next, we need to check if there are any other possible values for \( x \). The arguments inside the logarithms must be greater than zero:
\[
2x - 1 > 0 \quad (1)
\]
\[
3x > 0 \quad (2)
\]
From inequality (1):
\[
2x > 1 \\
x > \frac{1}{2}
\]
From inequality (2):
\[
3x > 0 \\
x > 0
\]
Both conditions imply \( x > \frac{1}{2} \). Since \( x = -1 \) does not satisfy this condition and we haven't found any other solutions, we conclude that the original equation has **no solution** when considering the requirements for logarithms.
Thus, the correct response is:
**no solution**.
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