Textbook Question
Differentiating Implicitly
Use implicit differentiation to find dy/dx in Exercises 1–14.
x²(x – y)² = x² – y²
4. Applications of Derivatives
Implicit Differentiation
Back4. Applications of Derivatives
Implicit Differentiation
- Textbook Question
Differentiating Implicitly
Use implicit differentiation to find dy/dx in Exercises 1–14.
xy = cot(xy)
- Textbook Question
Differentiating Implicitly
Use implicit differentiation to find dy/dx in Exercises 1–14.
x⁴ + sin y = x³y²
- Textbook Question
Differentiating Implicitly
Use implicit differentiation to find dy/dx in Exercises 1–14.
x cos(2x + 3y) = y sin x
- Textbook Question
Find dr/dθ in Exercises 15–18.
r – 2√θ = (3/2)θ²/³ + (4/3)θ³/⁴
- Textbook Question
Second Derivatives
In Exercises 19–26, use implicit differentiation to find dy/dx and then d²y/dx². Write the solutions in terms of x and y only.
x²/³ + y²/³ = 1
- Textbook Question
Second Derivatives
In Exercises 19–26, use implicit differentiation to find dy/dx and then d²y/dx². Write the solutions in terms of x and y only.
y² – 2x = 1 – 2y
- Textbook Question
Second Derivatives
In Exercises 19–26, use implicit differentiation to find dy/dx and then d²y/dx². Write the solutions in terms of x and y only.
2√y = x – y
- Textbook Question
In Exercises 29 and 30, find the slope of the curve at the given points.
y² + x² = y⁴ – 2x at (–2,1) and (–2,–1)
- Textbook Question
Slopes, Tangent Lines, and Normal Lines
In Exercises 31–40, verify that the given point is on the curve and find the lines that are (a) tangent and (b) normal to the curve at the given point.
x²y² = 9, (–1,3)
- Textbook Question
Slopes, Tangent Lines, and Normal Lines
In Exercises 31–40, verify that the given point is on the curve and find the lines that are (a) tangent and (b) normal to the curve at the given point.
y = 2 sin(πx – y), (1,0)
- Textbook Question
The eight curve Find the slopes of the curve y⁴ = y² – x² at the two points shown here.
- Textbook Question
The folium of Descartes (See Figure 3.27)
b. At what point other than the origin does the folium have a horizontal tangent line?
- Textbook Question
The devil’s curve (Gabriel Cramer, 1750) Find the slopes of the devil’s curve y⁴ – 4y² = x⁴ – 9x² at the four indicated points.
- Textbook Question
The folium of Descartes (See Figure 3.27)
c. Find the coordinates of the point A in Figure 3.29 where the folium has a vertical tangent line.