nd $$ f^{\prime}(x), f^{\prime \prime}(x), f^{\prime}(1) $$ and $$ f^{\prime \prime}(1) $$ when $$ f(x)=\frac{2 x}{x^{2}+1} $$

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We are given
$$
f(x)=\frac{2x}{x^2+1}.
$$
We'll find the first and second derivatives, and then evaluate them at $$ x=1 $$.

### Step 1. Compute $$ f'(x) $$

Write $$ f(x) $$ as a quotient with
$$
u(x)=2x \quad \text{and} \quad v(x)=x^2+1.
$$
Then,
$$
u'(x)=2,\quad v'(x)=2x.
$$
Using the quotient rule,
$$
f'(x)=\frac{u'(x)v(x)-u(x)v'(x)}{[v(x)]^2}=\frac{2(x^2+1)-2x(2x)}{(x^2+1)^2}.
$$
Simplify the numerator:
$$
2(x^2+1)-4x^2=2x^2+2-4x^2=2-2x^2.
$$
Thus,
$$
f'(x)=\frac{2-2x^2}{(x^2+1)^2}=\frac{2(1-x^2)}{(x^2+1)^2}.
$$

### Step 2. Compute $$ f''(x) $$

We have
$$
f'(x)=\frac{2(1-x^2)}{(x^2+1)^2}.
$$
Let
$$
u(x)=2(1-x^2) \quad \text{and} \quad w(x)=(x^2+1)^2.
$$
Differentiate:
$$
u'(x)=-4x,
$$
and for $$ w(x) $$ use the chain rule:
$$
w'(x)=2(x^2+1)\cdot 2x=4x(x^2+1).
$$

Applying the quotient rule again,
$$
f''(x)=\frac{u'(x)w(x)-u(x)w'(x)}{[w(x)]^2}=\frac{-4x(x^2+1)^2-2(1-x^2)\cdot 4x(x^2+1)}{(x^2+1)^4}.
$$
Factor out the common factors in the numerator:
$$
\text{Numerator}= -4x(x^2+1)\left[(x^2+1)+2(1-x^2)\right].
$$
Now simplify the bracket:
$$
(x^2+1)+2(1-x^2)=x^2+1+2-2x^2=3-x^2.
$$
Thus,
$$
f''(x)=\frac{-4x(x^2+1)(3-x^2)}{(x^2+1)^4}=\frac{-4x(3-x^2)}{(x^2+1)^3}.
$$

### Step 3. Evaluate at $$ x=1 $$

**First derivative:**
$$
f'(1)=\frac{2(1-1^2)}{(1^2+1)^2}=\frac{2(1-1)}{(1+1)^2}=\frac{2\cdot 0}{4}=0.
$$

**Second derivative:**
$$
f''(1)=\frac{-4\cdot 1\,(3-1^2)}{(1^2+1)^3}=\frac{-4\cdot(3-1)}{(1+1)^3}=\frac{-4\cdot 2}{8}=\frac{-8}{8}=-1.
$$

### Final Answers

$$
\begin{aligned}
f'(x)&=\frac{2(1-x^2)}{(x^2+1)^2}, \
f''(x)&=\frac{-4x(3-x^2)}{(x^2+1)^3},\[1mm]
f'(1)&=0,\[1mm]
f''(1)&=-1.
\end{aligned}
$$
$$ \begin{aligned} f'(x) &= \frac{2(1 - x^2)}{(x^2 + 1)^2}, \ f''(x) &= \frac{-4x(3 - x^2)}{(x^2 + 1)^3}, \ f'(1) &= 0, \ f''(1) &= -1. \end{aligned} $$

nd \( f^{\prime}(x), f^{\prime \prime}(x), f^{\prime}(1) \) and \( f^{\prime \prime}(1) \) when \( f(x)=\frac{2 x}{x^{2}+1} \)

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