1.1 Describing how quantities change with respect to each other

    Cards (106)

    • On which axis is the independent variable typically plotted?
      x-axis
    • What does the y-axis represent on a graph?
      Dependent variable
    • The graph of a quadratic functional relationship is a parabolic curve.

      True
    • Steps to define a functional relationship
      1️⃣ Identify two quantities
      2️⃣ Determine if one depends on the other
      3️⃣ Describe the dependency with a function
      4️⃣ Verify that each input has one output
    • What is the notation for the independent variable?
      `x`
    • The shape and characteristics of the graph provide insights into the nature of the functional relationship.
    • What does the shape of a graph indicate about a functional relationship?
      Its nature
    • What type of curve represents an exponential functional relationship?
      Curved line
    • The rate of change is calculated as the change in the dependent variable divided by the change in the independent variable.
    • What is the rate of change for the function y = 2x + 3</latex>?
      2
    • In a functional relationship, each input value of the independent variable corresponds to one output value of the dependent variable.
    • The independent variable is what you change, and the dependent variable is what you measure.
    • If \( y = f(x) = 2x + 3 \), the graph is a straight line with points like \((0, 3)\), \((1, 5)\), and (2, 7).
    • In an exponential relationship, the dependent variable grows or decays proportionally to its current value.
    • The dependent variable represents the input to the function.
      False
    • An example of the independent variable is the number of hours studied, while the dependent variable is the exam score.
    • What type of graph shows a constant change in the dependent variable for a given change in the independent variable?
      Straight line
    • A linear functional relationship is represented by a straight line with a constant rate of change.
      True
    • An inverse functional relationship is represented by a hyperbolic curve.
      True
    • What does the slope of a line represent graphically?
      Rate of change
    • The slope of a quadratic functional relationship changes as the independent variable changes.
    • A positive slope indicates that the line rises from left to right.

      True
    • An undefined slope is represented by a vertical line.

      True
    • The slope indicates how quickly the dependent variable changes in relation to changes in the independent variable
    • How is the slope of a line calculated?
      (change in y) / (change in x)
    • What is the independent variable typically plotted on?
      x-axis
    • The independent variable is typically plotted on the x-axis
    • Match the functional relationship with its graphical representation:
      Linear ↔️ A straight line
      Quadratic ↔️ A parabolic curve
      Exponential ↔️ A curved line
      Inverse ↔️ A hyperbolic curve
    • The rate of change for a linear relationship is constant.

      True
    • The formula for the rate of change is (change in y) / (change in x)
    • The slope of a line measures its steepness and direction on a graph.

      True
    • A negative slope indicates that the function is decreasing
    • The graphical representation of the instantaneous rate of change is the slope of a tangent
    • The independent variable represents the input
    • The output of a function is typically plotted on the y-axis.

      True
    • The independent variable represents the input to a function.

      True
    • Why is it crucial to understand the difference between independent and dependent variables?
      Analyzing functional relationships
    • Functional relationships are often represented graphically using a coordinate plane.plane
    • What type of curve represents a quadratic functional relationship?
      Parabolic curve
    • What is a functional relationship between two quantities?
      Dependency between variables
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