Over which interval does $f(t) = 2^t -t$ have a negative average rate of change?

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Answer 1 · 2017-10-07T12:29:13

$t<-log_2(ln2)$

First differentiate - define $z = 2^x$ for simplicity.

$:. z = 2^x$
$= (e^(ln2))^x$
$= e^(x*ln2)$

Define $u = x*ln2$

$:. z = e^u$
$:. (dz)/(du) = e^u$
(The derivative of $e$ to the power of any number is itself.)

$(du)/(dx) = ln2$ .

$:. dy/dx = e^(x*ln2)*ln2$
$= 2^x*ln2$ .

Defining $f(x) = 2^t - t$

$:. f'(t) = 2^t*ln2 - 1$ .

Letting $f'(t) < 0$

$:. 2^t*ln2 < 1$
$:. 2^t < 1/ln2$
$:. t < log_2(ln2)^-1$
$:. t < -log_2(ln2)$ .

Or, $t< (-ln(ln2)) / ln2$ .

Answer 2 · 2017-10-08T02:10:59

There are infinitely many intervals over which $f$ has a negative rate of change.

On any interval $[a,b}$ with $f(a) > f(b)$ , the average rate of change, $(f(b)-f(a))/(b-a)$ is negative.

Pick an interval using the graph below.

graph{2^x-x [-6.063, 5.036, -0.603, 4.947]}

For example $[-4,2]$ or $[-20,1}$ or any of infinitely many intervals.

Over which interval does f(t) = 2^t -tf(t) = 2^t -t have a negative average rate of change?