4.5 Solving Related Rates Problems

    Cards (31)

    • Steps to solve related rates problems
      1️⃣ Identify the variables and their rates of change
      2️⃣ Draw a diagram if necessary
      3️⃣ Establish the equation relating the variables
      4️⃣ Differentiate the equation with respect to time
      5️⃣ Substitute the given values and solve for the unknown rate
    • What is the notation for the rate of volume change?
      dVdt\frac{dV}{dt}
    • Match the variable with its rate of change and notation:
      Distance ↔️ Speed, \frac{dx}{dt}</latex>
      Area ↔️ Rate of area change, dAdt\frac{dA}{dt}
      Volume ↔️ Rate of volume change, dVdt\frac{dV}{dt}
    • Drawing a diagram highlights the relationships between variables and their rates of change.

      True
    • Steps to solve a related rates problem using a diagram:
      1️⃣ Draw a diagram to visualize relationships
      2️⃣ Identify the variables and their rates of change
      3️⃣ Establish the equation relating the variables
      4️⃣ Differentiate the equation with respect to time
    • Drawing a diagram can help visualize the relationships between variables, making it easier to set up the equation.

      True
    • Match the variable with its rate of change notation:
      Distance (xx) ↔️ dxdt\frac{dx}{dt}
      Area (AA) ↔️ dAdt\frac{dA}{dt}
      Volume (VV) ↔️ dVdt\frac{dV}{dt}
    • What is the equation relating the area AA and radius rr of a circle?

      A=A =πr2 \pi r^{2}
    • Match the shape with its area equation:
      Circle ↔️ A=A =πr2 \pi r^{2}
      Square ↔️ A=A =s2 s^{2}
      Rectangle ↔️ A=A =lw lw
      Triangle ↔️ A=A =12bh \frac{1}{2}bh
    • The equation \frac{dA}{dt} = 2\pi r \frac{dr}{dt}</latex> relates the rate of change of area to the rate of change of radius for a circle.

      True
    • If the radius of a circle is increasing at a rate of drdt=\frac{dr}{dt} =3 cm / s 3 \text{ cm / s}, what is the rate of change of the area when r=r =5 cm 5 \text{ cm}?

      30π cm2/s30\pi \text{ cm}^{2} / \text{s}
    • The rate of change of distance is called speed
    • The variables in an expanding circle are radius and area.

      True
    • What is the equation for the area of a circle?
      A=A =πr2 \pi r^{2}
    • Drawing a diagram in related rates problems helps visualize the relationships between variables and their rates of change
    • If the problem involves an expanding circle with radius r</latex> and area AA, the relevant equation is A=A =πr2 \pi r^{2}, which relates the two variables
    • When differentiating A=A =πr2 \pi r^{2} with respect to time, the result is dAdt=\frac{dA}{dt} =2πrdrdt 2\pi r \frac{dr}{dt}, which relates the rate of change of the area to the rate of change of the radius
    • Drawing a diagram in related rates problems is crucial for visualizing the relationships between variables and their rates of change.

      True
    • A diagram simplifies complex problems by visually representing the scenario, making it easier to understand.

      True
    • What is the purpose of differentiating an equation with respect to time in related rates problems?
      Express rates of change
    • Identify the initial values of the variables and any known rates of change
    • What is the derivative of a variable with respect to time denoted as?
      dxdt\frac{dx}{dt}
    • Drawing a diagram in related rates problems helps simplify complex problems.
    • What is one benefit of drawing a diagram in related rates problems?
      Simplifies complex problems
    • What is the first step in solving a related rates problem?
      Establish the equation
    • Why is it necessary to differentiate the equation with respect to time in related rates problems?
      Express rates of change
    • What are the rates of change in an expanding circle problem with radius rr and area AA?

      drdt\frac{dr}{dt} and dAdt\frac{dA}{dt}
    • Drawing a diagram is crucial in solving related rates problems because it helps visualize the relationships between the variables
    • Establishing an equation to relate variables is crucial in solving related rates problems
    • What are the steps to substitute given values and solve for the unknown rate in related rates problems?
      Identify givens, substitute, solve
    • The rate of change of the area of a circle is 30π cm2/s30\pi \text{ cm}^{2} / \text{s} when the radius is 5 cm5 \text{ cm} and increasing at a rate of 3 cm / s3 \text{ cm / s}.

      True
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