Question
If \( \log _{5}(-3 x+5)=3 \), then what is the value of \( x ? \)
Ask by Lang Conner. in the United States
Jan 25,2025
Real Tutor Solution
Tutor-Verified Answer
Answer
\( x = -40 \)
Solution
To solve the equation \( \log _{5}(-3x + 5) = 3 \), follow these steps:
1. **Understand the Logarithmic Equation:**
\[
\log_b A = C \quad \text{implies} \quad A = b^C
\]
Applying this to the given equation:
\[
-3x + 5 = 5^3
\]
2. **Calculate the Exponent:**
\[
5^3 = 125
\]
So,
\[
-3x + 5 = 125
\]
3. **Solve for \( x \):**
\[
-3x = 125 - 5
\]
\[
-3x = 120
\]
\[
x = \frac{120}{-3}
\]
\[
x = -40
\]
4. **Verify the Domain:**
The argument of the logarithm must be positive:
\[
-3x + 5 > 0
\]
Substituting \( x = -40 \):
\[
-3(-40) + 5 = 120 + 5 = 125 > 0
\]
Thus, \( x = -40 \) is valid.
**Final Answer:**
\(\boxed{-40}\)
Reviewed and approved by the UpStudy tutoring team
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Simplify this solution Mind Expander
To solve the equation \( \log_{5}(-3x + 5) = 3 \), we first convert the logarithmic equation into its exponential form. This gives us: \[ -3x + 5 = 5^3 \] Calculating \( 5^3 \): \[ -3x + 5 = 125 \] Now, we will isolate \( x \) by subtracting 5 from both sides: \[ -3x = 125 - 5 \] \[ -3x = 120 \] Next, we divide both sides by -3: \[ x = \frac{120}{-3} \] \[ x = -40 \] So, the value of \( x \) is \[ \boxed{-40} \]
