a scatterplot is used to display data where x is the amount of time, in minutes, one member can tolerate the…

a scatterplot is used to display data where x is the amount of time, in minutes, one member can tolerate the heat in a sauna, and y is the temperature, in degrees fahrenheit, of the sauna. which interpretation describes a line of best fit of y = - 1.5x + 173 for the data?\nthe member can tolerate a temperature of 173° fahrenheit for 0 minutes.\nthe amount of time the member can tolerate the heat in a sauna is 173 minutes.\nthe time increased 1.5 minutes for every degree fahrenheit the temperature increased.\nthe time decreased 1.5 minutes for every degree fahrenheit the temperature decreased.

a scatterplot is used to display data where x is the amount of time, in minutes, one member can tolerate the heat in a sauna, and y is the temperature, in degrees fahrenheit, of the sauna. which interpretation describes a line of best fit of y = - 1.5x + 173 for the data?\nthe member can tolerate a temperature of 173° fahrenheit for 0 minutes.\nthe amount of time the member can tolerate the heat in a sauna is 173 minutes.\nthe time increased 1.5 minutes for every degree fahrenheit the temperature increased.\nthe time decreased 1.5 minutes for every degree fahrenheit the temperature decreased.

Answer

Explanation:

Step1: Recall slope - intercept form

The equation of a line is $y = mx + b$, where $m$ is the slope and $b$ is the y - intercept. In the given equation $y=-1.5x + 173$, $m=-1.5$ and $b = 173$.

Step2: Analyze the y - intercept

When $x = 0$ (time is 0 minutes), $y=173$. This means the member can tolerate a temperature of 173°F for 0 minutes.

Step3: Analyze the slope

The slope $m=-1.5=\frac{\Delta y}{\Delta x}$. A negative slope means that as $x$ (time) increases, $y$ (temperature) decreases. Specifically, for every 1 - unit increase in $x$, $y$ decreases by 1.5 units. Or for every 1 - degree Fahrenheit decrease in temperature ($\Delta y=- 1$), the time ($x$) increases by 1.5 minutes.

Answer:

The member can tolerate a temperature of 173°F for 0 minutes.