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Snarik · Answer 1 · 2020-05-10T12:50:41+0000

f(x)=(x^2)/(x^2+k^2)

By definition of the derivative,

$f'(x)=\displaystyle\lim_(h\to0)\frac{((x+h)^2)/((x+h)^2+k^2)-(x^2)/(x^2+k^2)}h$

$f'(x)=\displaystyle\lim_(h\to0)((x+h)^2(x^2+k^2)-x^2((x+h)^2+k^2))/(h(x^2+k^2)((x+h)^2+k^2))$

$f'(x)=(k^2)/(x^2+k^2)\displaystyle\lim_(h\to0)((x+h)^2-x^2)/(h((x+h)^2+k^2))$

$f'(x)=(k^2)/(x^2+k^2)\displaystyle\lim_(h\to0)(2xh+h^2)/(h((x+h)^2+k^2))$

$f'(x)=(k^2)/(x^2+k^2)\displaystyle\lim_(h\to0)(2x+h)/((x+h)^2+k^2)$

f'(x)=(2xk^2)/((x^2+k^2)^2)

(k^2)/((x^2+k^2)^2) is positive for all values of
and
. As pointed out,
$x\ge0$ , so
$f'(x)\ge0$ for all
$x\ge0$ . This means the proportion of occupied binding sites is an increasing function of the concentration of oxygen, meaning the presence of more oxygen is consistent with greater availability of binding sites. (The question says as much in the second sentence.)

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