Navigation
 Chapter 1  Fundamental Theorems of Calculus
 Chapter 2  Fundamental Integration Formulas
 Chapter 3  Techniques of Integration

Chapter 4  Applications of Integration
 Plane Areas in Rectangular Coordinates  Applications of Integration

Plane Areas in Polar Coordinates  Applications of Integration
 01 Area Enclosed by r = 2a cos^2 θ
 01 Area Enclosed by r = 2a sin^2 θ
 02 Area Bounded by the Lemniscate of Bernoulli r^2 = a^2 cos 2θ
 03 Area Enclosed by Cardioids: r = a(1 + sin θ); r = a(1  sin θ), r = a(1 + cos θ), r = a(1  cos θ)
 03 Area Inside the Cardioid r = a(1 + cos θ) but Outside the Circle r = a
 04 Area of the Inner Loop of the Limacon r = a(1 + 2 cos θ)
 05 Area Enclosed by FourLeaved Rose r = a cos 2θ
 05 Area Enclosed by r = a sin 2θ and r = a cos 2θ
 06 Area Within the Curve r^2 = 16 cos θ
 07 Area Enclosed by r = 2a cos θ and r = 2a sin θ
 08 Area Enclosed by r = a sin 3θ and r = a cos 3θ
 Area for grazing by the goat tied to a silo
 Length of Arc in XYPlane  Applications of Integration
 Length of Arc in Polar Plane  Applications of Integration
 Volumes of Solids of Revolution  Applications of Integration
Recent comments
 Hello po! Question lang po…1 week 3 days ago
 400000=120[14π(D2−10000)]
(…1 month 2 weeks ago  Use integration by parts for…2 months 1 week ago
 need answer2 months 1 week ago
 Yes you are absolutely right…2 months 2 weeks ago
 I think what is ask is the…2 months 2 weeks ago
 $\cos \theta = \dfrac{2}{…2 months 2 weeks ago
 Why did you use (1/SQ root 5…2 months 2 weeks ago
 How did you get the 300 000pi2 months 2 weeks ago
 It is not necessary to…2 months 2 weeks ago