QUESTION IMAGE
Question
attempt 1: 10 attempts remaining. find the derivative. $y = \frac{2x - 1}{3x + 1}$; $y=$
Step1: Recall quotient - rule
The quotient - rule states that if $y=\frac{u}{v}$, then $y^\prime=\frac{u^\prime v - uv^\prime}{v^{2}}$. Here, $u = 2x - 1$, $u^\prime=2$, $v = 3x + 1$, and $v^\prime=3$.
Step2: Apply quotient - rule
Substitute $u$, $u^\prime$, $v$, and $v^\prime$ into the quotient - rule formula:
\[
$$\begin{align*}
y^\prime&=\frac{(2)(3x + 1)-(2x - 1)(3)}{(3x + 1)^{2}}\\
&=\frac{6x+2-(6x - 3)}{(3x + 1)^{2}}\\
&=\frac{6x + 2-6x + 3}{(3x + 1)^{2}}\\
&=\frac{5}{(3x + 1)^{2}}
\end{align*}$$
\]
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$\frac{5}{(3x + 1)^{2}}$