The number of toy kangaroos, K, in a toy box after 't' days is given by $K = t^{2} + 20 t$ $K=t^2+20t$ . Estimate the rate at which the number of kangaroos is changing after 3 days?

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The number of toy kangaroos, K, in a toy box after 't' days is given by $K = t^{2} + 20 t$ $K=t^2+20t$ . Estimate the rate at which the number of kangaroos is changing after 3 days?

$K = t^{2} + 20 t$ $K=t^2+20t$

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Answer 1 · 2018-04-13T03:10:41

After 3 days, the number of kangaroos is increasing by 26 kangaroos per day.

Explanation:

The rate of change of a function is the derivative of that function.

First take the derivative of $K = t^{2} + 20 t$ $K=t^2+20t$ .
The derivative of $t^{n}$ $t^n$ is $n t^{n - 1}$ $nt^(n-1)$ by the power rule.
So the derivative of $t^{2}$ $t^2$ is $2 t$ $2t$ .
The derivative of $a t$ $at$ is just $a$ $a$ , so the derivative of $20 t$ $20t$ is just $20$ $20$ .
You should end up with $K'=2t+20$ when you add them together.

The question wants to know the rate of change after 3 days, so just plug in 3:
$K'=2(3)+20$
$K'=26$
So there you have it- after 3 days, the number of kangaroos is increasing by 26 kangaroos per day.

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The number of toy kangaroos, K, in a toy box after 't' days is given by $K = t^{2} + 20 t$ $K=t^2+20t$ . Estimate the rate at which the number of kangaroos is changing after 3 days?

$K = t^{2} + 20 t$ $K=t^2+20t$

1 Answer

Explanation:

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Science

Math

Humanities

... and beyond

The number of toy kangaroos, K, in a toy box after 't' days is given by K=t^2+20tK=t2+20tK=t^2+20t. Estimate the rate at which the number of kangaroos is changing after 3 days?

K=t^2+20tK=t2+20tK=t^2+20t

1 Answer

Explanation:

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Impact of this question

The number of toy kangaroos, K, in a toy box after 't' days is given by $K = t^{2} + 20 t$ $K=t^2+20t$ . Estimate the rate at which the number of kangaroos is changing after 3 days?

$K = t^{2} + 20 t$ $K=t^2+20t$