Solve the equation for $c$.}
-$10^{4 \mathrm{c}+1}=\mathrm{d}$
A) $\mathrm{c}=\frac{\log (\mathrm{d}-1)}{4}$
B) $c=\log \left(\frac{d-1}{4}\right)$
C) $\mathrm{c}=\frac{\log \mathrm{d}-1}{4}$
D) $\mathrm{c}=\log \mathrm{d}-\frac{1}{4}$

Question

Quizplus · Accepted Answer

The Answer of Solve the equation for $c$.}
-$10^{4 \mathrm{c}+1}=\mathrm{d}$
A) $\mathrm{c}=\frac{\log (\mathrm{d}-1)}{4}$
B) $c=\log \left(\frac{d-1}{4}\right)$
C) $\mathrm{c}=\frac{\log \mathrm{d}-1}{4}$
D) $\mathrm{c}=\log \mathrm{d}-\frac{1}{4}$

Solve the Equation For ccc } - 104c+1=d10^{4 \mathrm{c}+1}=\mathrm{d}104c+1=d A) c=log⁡(d−1)4\mathrm{c}=\frac{\log (\mathrm{d}-1)}{4}c=4log(d−1)​ B) c=log⁡(d−14)c=\log \left(\frac{d-1}{4}\right)c=log(4d−1​)

Solve the Equation For $c$ }
- $10^{4 \mathrm{c}+1}=\mathrm{d}$ A) $\mathrm{c}=\frac{\log (\mathrm{d}-1)}{4}$ B) $c=\log \left(\frac{d-1}{4}\right)$