Answer:
117 km
Explanation:
The 1st day, Rosie walked
[tex]d_1 = 18 km[/tex]
The 2nd day, she walked 90% of the distance walked the previous day, so
[tex]d_2 = 0.90d_1 = 0.90 (18)[/tex]
Similarly, on the 3rd day she walked
[tex]d_3 = 0.90 d_2 = 0.90 (0.90)(18)=(0.90)^2 (18)[/tex]
So the distance walked at the nth day is
[tex]d_n = (0.90)^{n-1} 18[/tex]
This is a geometrical series of the form
[tex]d_n = d_1 r^{n-1}[/tex]
where [tex]d_1 = 18[/tex] and [tex]r=0.90[/tex]. The sum of such a series is given by
[tex]\sum d_n = d_1(\frac{1-r^n}{1-r})[/tex]
So for n = 10, we find:
[tex]\sum d_{10}= 18(\frac{1-0.90^{10}}{1-0.90})=117 km[/tex]
We will see that the total distance walked at the end of the 10 days is 117km
We know that on the first day, she walks a distance of 18 km.
The next day, she walks 90% of that, so the distance walked on day 2 is:
d(2) = (90%/100%)*18km = 0.9*18km
On day 3, she walks the 90% of what she walked on day 2, so the distance is:
d(3) = (90%/100%)*0.9*18km = 0.9^2*18km
We already can see tha pattern here, on day x, she walks a distance:
d(x) = 18km*(0.9)^(x - 1)
This is an exponential decay.
Then the total distance walked on the first 10 days is:
D = 18km*(1 + 0.9 + 0.9^2 + 0.9^3 + ... + 0.9^9) = 117 km
If you want to learn more about exponential decays, you can read:
https://brainly.com/question/11464095
