Westonci.ca is the ultimate Q&A platform, offering detailed and reliable answers from a knowledgeable community. Experience the ease of finding accurate answers to your questions from a knowledgeable community of professionals. Explore comprehensive solutions to your questions from a wide range of professionals on our user-friendly platform.

The graph shows the data points in the table and the exponential regression model associated with the data.

\begin{tabular}{|c|c|}
\hline \multicolumn{2}{|c|}{ Lawn Care } \\
\hline Days after treatment & Number of weeds \\
\hline 2 & 100 \\
\hline 4 & 26 \\
\hline 6 & 6 \\
\hline 8 & 2 \\
\hline 10 & 1 \\
\hline
\end{tabular}

Based on the graph of the regression model, which is true?

A. The number of weeds is decreasing by a multiplicative rate.
B. The number of weeds is increasing by a multiplicative rate.
C. The number of weeds is decreasing by an additive rate.


Sagot :

Based on the graph of the regression model that describes the relationship between the number of days after treatment and the number of weeds, we observe the following data points:
- On day 2, there are 100 weeds.
- On day 4, there are 26 weeds.
- On day 6, there are 6 weeds.
- On day 8, there are 2 weeds.
- On day 10, there is 1 weed.

When examining these data points, we can observe that the number of weeds is decreasing over time. Specifically, the decrease in the number of weeds seems to be proportional, which indicates an exponential decay. In exponential decay, the quantity decreases by a consistent percentage over equal intervals of time, i.e., it decreases by a multiplicative factor.

For instance, between day 2 (100 weeds) and day 4 (26 weeds), the number of weeds diminishes significantly. The same pattern is observed between each subsequent pair of data points, suggesting a consistent multiplicative rate of decrease.

Therefore, it is true that:

The number of weeds is decreasing by a multiplicative rate.