DESCRIPTION:
This abstract music is shrouded with eerie, mysterious tones reminiscent of an underwater dream world. With synthesisers and plenty of ambient reverb, it is hard not to be drawn into Sphere’s ephemeral glow as the melody sways and billows. Perfect for beautifully accenting any passing of time, slow motion scenes or to highlight an expanding mind transcending and transitioning into other realms. Atmospheric, experimental and ethereal. I programmed this in Logic Pro. It's contemporary and experimental combined with a little sound design.

Spotify: https://spoti.fi/2OQuD9K
Apple Music and iTunes: https://apple.co/2LzeTtN
Amazon: https://amzn.to/2M3Rgdj
Tidal: https://tidal.com/album/92508599

YouTube Channel: http://www.youtube.com/jonbrookscomposer
Website: http://www.jonbrooks.co.uk

This music is subject to copyright and is provided for demonstration purposes only. © 2009 Jon Brooks.

Some of my musical influences include: Jerry Goldsmith, Gustav Mahler, Danny Elfman, R. Strauss, John Williams, James Newton-Howard, Wagner, Debussy, Patrick Doyle, Shostakovich, Vaughan Williams, Bill Conti, Sibelius, Elgar, Klaus Badelt, Michael Giacchino, Aerosmith, Elliot Goldenthal, Harry Gregson-Williams, James Horner, Def Leppard, Michael Kamen, Ennio Morricone, Hans Zimmer, Christopher Young, Gabriel Yared, Bon Jovi, Debbie Wiseman, Shirley Walker, Brian Tyler, Alan Silvestri, Howard Shore, The Beach Boys, Marc Shaiman, Wishbone Ash, Graeme Revell, John Powell, Mozart, Rachel Portman, Michael Nyman...... and many more!!!

SPHERE (As cited on Wikipedia)
A sphere (from Greek σφαῖρα — sphaira, "globe, ball") is a perfectly round geometrical object in three-dimensional space, such as the shape of a round ball. Like a circle, which is in two dimensions, a sphere is the set of points which are all the same distance r from a given point in space. This distance r is known as the "radius" of the sphere, and the given point is known as the center of the sphere. The maximum straight distance through the sphere is known as the "diameter". It passes through the center and is thus twice the radius.

In mathematics, a careful distinction is made between the sphere (a two-dimensional surface embedded in three-dimensional Euclidean space) and the ball (the three-dimensional shape consisting of a sphere and its interior).

Pairs of points on a sphere that lie on a straight line through its center are called antipodal points. A great circle is a circle on the sphere that has the same center and radius as the sphere, and consequently divides it into two equal parts. The shortest distance between two distinct non-antipodal points on the surface and measured along the surface, is on the unique great circle passing through the two points. Equipped with the great-circle distance, a great circle becomes the Riemannian circle.

If a particular point on a sphere is (arbitrarily) designated as its north pole, then the corresponding antipodal point is called the south pole and the equator is the great circle that is equidistant to them. Great circles through the two poles are called lines (or meridians) of longitude, and the line connecting the two poles is called the axis of rotation. Circles on the sphere that are parallel to the equator are lines of latitude. This terminology is also used for astronomical bodies such as the planet Earth, even though it is not spherical and only approximately spheroidal (see geoid).

A sphere is divided into two equal "hemispheres" by any plane that passes through its center. If two intersecting planes pass through its center, then they will subdivide the sphere into four lunes or biangles, the vertices of which all coincide with the antipodal points lying on the line of intersection of the planes. The antipodal quotient of the sphere is the surface called the real projective plane, which can also be thought of as the northern hemisphere with antipodal points of the equator identified. The round hemisphere is conjectured to be the optimal (least area) filling of the Riemannian circle. If the planes don't pass through the sphere's center, then the intersection is called spheric section.

The basic elements of Euclidean plane geometry are points and lines. On the sphere, points are defined in the usual sense, but the analogue of "line" may not be immediately apparent. If one measures by arc length one finds that the shortest path connecting two points lying entirely in the sphere is a segment of the great circle containing the points; see geodesic. Many theorems from classical geometry hold true for this spherical geometry as well, but many do not (see parallel postulate). In spherical trigonometry, angles are defined between great circles. Thus spherical trigonometry is different from ordinary trigonometry in many respects. For example, the sum of the interior angles of a spherical triangle exceeds 180 degrees. Also, any two similar spherical triangles are congruent.