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Chapter 2: Problem 77

What Does the Slope Mean? Suppose that the graph of the outdoor temperature over a certain period of time is a line. How is the weather changing if the slope of the line is positive? If it is negative? If it is zero?

Short Answer

Expert verified
A positive slope indicates warming, a negative slope indicates cooling, and a zero slope indicates constant temperature.

Step by step solution

01

Understanding the Slope

The slope of a line in a graph represents how much the dependent variable (in this case, outdoor temperature) changes as the independent variable (time) changes.
02

Positive Slope Interpretation

When the slope of the line is positive, it indicates that the outdoor temperature is increasing over time. This means the weather is becoming warmer.
03

Negative Slope Interpretation

When the slope of the line is negative, it suggests that the outdoor temperature is decreasing over time. Thus, the weather is getting cooler.
04

Zero Slope Interpretation

A zero slope means the line is horizontal, indicating that the outdoor temperature remains constant over time, with no increase or decrease in weather temperature.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Positive Slope
The concept of a positive slope is easy to visualize once you think of it as an upward journey on a graph. Imagine you're looking at a line on a graph. If this line rises from left to right, we say it has a positive slope. When applied to the context of outdoor temperature over time, a positive slope implies that the temperature is gradually increasing. In simpler terms, each step forward in time is accompanied by an upward climb in temperature.
This can indicate that the weather is warming up. For instance, if this graph were a snapshot of a morning into midday transition, a positive slope might tell you that the day is heating up as time moves forward.
  • Positive slope = line rises left to right
  • Temperature increases as time advances
  • Weather is becoming warmer
Negative Slope
A negative slope on a graph is the opposite of a positive slope. Envision this as a descent, a line falling as you move from left to right. When applied to the temperature vs. time scenario, a negative slope suggests that the temperature is dropping over time. This tells the story of the weather cooling down. For example, in an evening as the sun sets, the temperature graph would show a declining line, indicating a decrease in warmth.
  • Negative slope = line falls left to right
  • Temperature decreases as time progresses
  • Weather is getting cooler
Zero Slope
When a line on a graph is perfectly horizontal, we refer to it as having a zero slope. In the context of temperature changing over time, a zero slope means the temperature remains unchanged as time moves forward. This represents a consistent, steady climate condition. No increase or decrease in temperature implies stability. For example, on a day where the outdoor temperature is stable throughout, with no significant change, you'd observe a flat line on the graph. This could occur in a completely cloud-covered sky where sunlight and shade maintain a constant temperature.
  • Zero slope = line is horizontal
  • Temperature remains constant over time
  • Predictable and stable weather

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Most popular questions from this chapter

Find an equation of the perpendicular bisector of the line segment joining the points \(A(1,4)\) and \(B(7,-2)\)

Find the slope and y-intercept of the line, and draw its graph. $$ 3 x-4 y=12 $$

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Skidding in a Curve A car is traveling on a curve that forms a circular arc. The force \(F\) needed to keep the car from skidding is jointly proportional to the weight \(w\) of the car and the square of its speed \(s,\) and is inversely proportional to the radius \(r\) of the curve. (a) Write an equation that expresses this variation. (b) A car weighing 1600 lb travels around a curve at 60 \(\mathrm{mi} / \mathrm{h}\) . The next car to round this curve weighs 2500 \(\mathrm{lb}\) and requires the same force as the first car to keep from skidding. How fast is the second car traveling?

Global Warming Some scientists believe that the average surface temperature of the world has been rising steadily. The average surface temperature can be modeled by $$ T=0.02 t+15.0 $$ where \(T\) is temperature in \(^{\circ} \mathrm{C}\) and \(t\) is years since \(1950 .\) (a) What do the slope and \(T\) -intercept represent? (b) Use the equation to predict the average global surface temperature in 2050 .
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