91影视

To justify with appropriate evidence to the transformation achieve linearity.

At different ranges from the light source, the intensity of the light bulb was evaluated. The question includes a scatterplot for the same.
The residual's computer output is also provided.

As a result, physics textbooks advise that the intensity-to-distance connection should follow an inverse square law. So, they squared the distance measurements and then calculated their reciprocals.
Because the residuals in the residual plot are centered around zero and there is no clear pattern in the residual plot, this transformation achieves linearity.
As a result, yes, it achieve linearity .

To determine the equation of the least-squares regression line.

At different ranges from the light source, the intensity of the light bulb was evaluated. The question includes a scatterplot for the same.
The residual's computer output is also provided.
Hence, physics textbooks advise that the intensity-to-distance connection should follow an inverse square law.
As a result, they squared the distance measurements and then calculated their reciprocals. The least square regression line's general equation is now:
$\hat{y}=a+bx$
In the given computer output, the coefficients of a and bare are presented in the column "Coef" as:
$a=-0.000595$
$b=0.299624$
The explanatory variable is expressed as "$Dis\tan c{e}^{-2}$".
The least square regression line is calculated using the following equation:
$\hat{y}=a+bx$
$=-0.000595+0.299624\frac{1}{x^2}$
Where $y$indicates the light intensity and $x$indicates the distance.

As a result, the equation is $\hat{y}=-0.000595+0.299624\frac{1}{x^2}$.

To predict the intensity of a $100$-watt bulb at a distance of $2.1$ meters.

At different ranges from the light source, the intensity of the light bulb was evaluated. The question includes a scatterplot for the same.
The residual's computer output is also provided. So, physics textbooks advise that the intensity-to-distance connection should follow an inverse square law. As a result, they squared the distance measurements and then calculated their reciprocals. Hence from part (b):
$\hat{y}=-0.000595+0.299624\frac{1}{x^2}$
Now, at a distance of $2.1$meters, predict the intensity of a $100$-watt lamp.
Then, by substituting $x$for the value of $x$,
$\hat{y}=-0.000595+0.299624\frac{1}{x^2}$
$=-0.000595+0.299624\frac{1}{2.1^2}$
$=0.0673$
As a result, the predicted intensity is $0.0673$candelas.