91影视

The regression line is:

$$\begin{gathered} \stackrel{铃�}{y}=92.29鈭�0.05762x \\ s=15.9880 \\ {r}^2=64.6\% \end{gathered}$$

Yes, given there is no strong curvature in the scatterplot and no strong curvature in the residual plot, the linear model is adequate. As a result, we can conclude that a linear model is suitable for capturing the link between wildebeest abundance and the fraction of grass area burned.

From the computer output we have the slope and the constant as,

$$\begin{gathered} b_0=92.29 \\ {b}_1=鈭�0.05762 \end{gathered}$$

Thus, the regression line is:

$$\begin{gathered} y=b_0+b_{1}x \\ 鈬�\stackrel{铃�}{y}=92.29鈭�0.05762x \end{gathered}$$

Where $x$ be wildebeest and $y$ be the percent of the grass area burned.

The regression line is:

$$\begin{gathered} \stackrel{铃�}{y}=92.29鈭�0.05762x \\ {b}_0=92.29 \\ {b}_1=0.05762 \end{gathered}$$

The slope in a regression equation is the coefficient of $x$and it reflects the average rise or decrease in $y$per unit of $x$This means that per thousand wildebeest, the proportion burned lowers by $0.05762$percent on average.

When x is 0, the y-intercept is the regression line's constant and represents the average y-value. When there are wildebeest, this means that 92.29 percent of the grass area is burned on average. However, having zero wildebeest is not acceptable, as the value of the $y-$intercept then has no relevance in this situation.

The standard error indicates that the regression line's projected percent of grass area burned differs by $15.9880$on average from the actual percent of grass area burned.

The coefficient of determination indicates that the least-squares regression line using the number of wildebeest as the explanatory variable explains $64.6$ percent of the variation in the proportion of grass burned.