User:Billymac00/sandbox

a=sin(45)+ 2*e(z) $$a=sin(45)+ 2*e(z)$$ ...an infinite, nonrepeating decimal can be represented using only the number 1?

Strava
Strava is a website and mobile app used to track athletic activity via GPS. Its headquarters are located in San Francisco CA. Most popular activities tracked are cycling and running/hiking. The site has aspects similar to other sites like mapmyride or ridewithgps. The basic service is free but there is an optional pay component to gain access to additional statistical detail like age and weight. Both amateur and professional (attached) members can be found as members.

Features
There are a number of features available which include the ability to search the database for routes and athletes. The site software provides a ranking of times on specific routes, including top male&female performance. Top performers are deemed KOM and QOM for King and Queen of the Mountain. There is ability to comment on, and give accolades on, performances. Depending on map zoom level, the most popular routes will be displayed on geographical search. As of June 2013 the list of activity designations include:
 * foot (run, walk,hike)
 * ride (cycle)
 * swim
 * ski (several variants incl snowboard)
 * skate (several variants)
 * surfing (windsurf, kitesurf)
 * snowshoe

There are additional features including periodic challenges to the membership and a blog on which members can request new features. Individual efforts can be kept private by members as well.

Data
Various aspects of logged activity include:
 * route (plan view)
 * elevation (net and unidirectional)
 * speed (average, min/max)
 * timing (total and moving time)
 * power/energy

Performances can be alternately be uploaded from Garmin, a file or manually.

External

 * Homepage

PN
excepting the first few, form 6n+/-1 adjacent to or prime offset from PPP (<p ). Considering the subset of primorials, and goal of 100million digit prime, 100th primorial has 220 digits. ln(p#)~p. ln(220-digit number) ~510 (as digits increase by 10, ln(*) will too 100million digit ~ 10^100million giving ln(*) as 230,000,000  ie 230 million For offset eval, we need primorial of size 2*n.  what primorial is this?? 230000000/510 *prime(100) giving p=2.4E8.(prime(14000000) We would need all primes <~ 10^10. This is hundreds of millions of offsets to compute (differences). So we key in on the trivial adjacency testing, which would just mean primorial primes...these are known at least as high as 1098133#−1 (PrimeGrid)