Want this question answered?
5800km /h and its the iss!
It is possible for something to be so far away from the Sun that that thing and the Sun would not be aware of each others existence. But for a human being the furthest man can get from the Sun at the moment is to be on the ISS when it is on the dark side of the Earth at Aphelion. However, the astronauts on the Moon at Aphelion and Apogee would have been the furthest man has travelled (If that possibility existed because of the positions of the orbits)
The International Space Station, or ISS, has been assembled in orbit from parts built here on Earth. The first segments of the ISS were launched into space in 1998, with other parts being added by several Space Shuttle missions. The ISS is not yet complete, and more parts are still under construction.
ISS is an internationally developed research facility, which is being assembled in low Earth orbit.
the iss orbit is an orbit which goes around the earth giving satalight signals
This is because of the Gravitational pull of the earth.
The ISS is in Low Earth Orbit and can be tracked by several sites on the internet. See related link
well you cant becaus the iss is trying to become the best team ther is
Earth's gravitational attraction keeps changing the direction of its movement continuously. This keeps orbits near Earth - such as the ISS - in an elliptical orbit.
Presently it is the ISS
244 MILES
This is hard to go through without a drawing, but let's try it: Draw the earth as a circle, with a center. Indicate the ISS with a dot. Draw a line from the earth's center to the ISS. Draw a line from the ISS tangent to the earth's surface. Draw the radius from the earth's center to the ISS horizon (the tangent point). A corollary in geometry tells us that a radius is perpendicular to a tangent. This is very helpful ... we know we have a right triangle. Hypotenuse is the line from the center to the ISS; its length is (earth radius)+(ISS altitude) = 3,970+240 = 4,210 miles. One leg = earth radius = 3,970 miles Other leg = distance from ISS to the horizon = sqrt[ hypotenuse2 - leg2 ] = sqrt(42102-39702) = 1,401 miles (rounded)