Active forum topics
- Ceva’s Theorem Is More Than a Formula for Concurrency
- The Chain Rule Explained: Don't Just Memorize, Visualize It
- The Intuition Behind Integration by Parts (Proof & Example)
- Statics
- Calculus
- Hydraulics: Rotating Vessel
- Inverse Trigo
- Application of Differential Equation: Newton's Law of Cooling
- Problems in progression
- General Solution of $y' = x \, \ln x$
New forum topics
- Ceva’s Theorem Is More Than a Formula for Concurrency
- The Chain Rule Explained: Don't Just Memorize, Visualize It
- The Intuition Behind Integration by Parts (Proof & Example)
- Statics
- Calculus
- Hydraulics: Rotating Vessel
- Inverse Trigo
- Problems in progression
- General Solution of $y' = x \, \ln x$
- engineering economics: construct the cash flow diagram
Recent comments
- Wow! :>2 weeks ago
- In general, the centroid of …2 weeks 3 days ago
- isn't the centroid of the…2 weeks 3 days ago
- I get it now, for long I was…1 month ago
- Why is BD Tension?
is it not…1 month ago - Bakit po nagmultiply ng 3/4…2 months 3 weeks ago
- Determine the least depth…1 year ago
- Solve mo ang h manually…2 months 3 weeks ago
- Paano kinuha yung height na…1 year 1 month ago
- It's the unit conversion…1 year 1 month ago
Re: zone of a sphere
I think integration will do, I did not try it though. Here is the derivation of total surface area of the sphere by integration: http://www.mathalino.com/reviewer/derivation-formulas/derivation-formul….
It is interesting to note that the area of spherical zone, $A = 2\pi rh$ will become area of the sphere if $h = 2r$.