This is a slightly odd question because to a certain extent it is self-answering. There are two distinct forces used in this way - centrifugal and centripetal. The centrifugal forces are those which are directed away from the centre and the centripetal are those directed towards the centre. The words themselves take their roots from Greek and Latin, with centrifugal meaning "fleeing from the centre" (Greek kentron + Latin fugere, to flee) and centripetal meaning "seeking the centre" (Greek kentroncentre + Latin petere to seek). Thus the term used is simply a way of describing the direction in which the force acts. The 'science part' is why a particular force, in a particular situation, acts in one way or the other - and that depends on the physical circumstance described.
no, centripetal force is inversely proportional to radius of the circle.
Centripital forces.
yes
Centripetal acceleration is acceleration towards the center of the movement.
Centripetal force is a force that makes a body follow a curved path: it is always directed orthogonal to the velocity of the body, toward the instantaneous center of curvature of the path.I linked my source.
centripetal- Dashun Walden
Centripetal force is the force that keeps an object moving in a circular path. It always acts towards the center of the circle. In a circular orbit, the centripetal force is provided by the gravitational force between the orbiting object and the object it is moving around. If there were no central force, the object would move in a straight line tangent to the circle.
The Centripetal Force
Centripetal force is always directed towards the center of the circle of motion that an object is traveling in.
Centripetal force is a force that makes a body follow a curved path: it is always directed orthogonal to the velocity of the body, toward the instantaneous center of curvature of the path. The term centripetal force comes from the Latin words centrum ("center") and petere ("tend towards", "aim at"), signifying that the force is directed inward toward the center of curvature of the path. Isaac Newton's description was: "A centripetal force is that by which bodies are drawn or impelled, or in any way tend, towards a point as to a center."
Tending towards the center, according to WordWeb, a dictionary program which compiles definitions from several dictionaries and gives the most accurate (in it's opinion). In terms of physics, i.e. centripetal force, centripetal acceleration, centripetal motion, etc, etc, it refers to the motion of an object in a circular path, or the force which keeps it in such a path. The force is always directed towards the center of the circle as by the definition above.
In the case of circular movement, the centripetal force points towards the center of the circle.
Towards the centre of the circle. Centripetal actually means "centre finding".
Centripetal acceleration is acceleration towards the center of the movement.
For circular motion to occur, there must be a centripetal force( a force that is always directed towards the centre of the circle). The centripetal force is defined as F = mv2/r Where F is the centripetal force, m is the mass of the orbiting body, v is the velocity of the body, and r is the distance to the centre of the circle. If you whirl a conker above your head, the centripetal force is provided by the tension of the string. For a planet orbiting the sun, the centripetal force is provided by gravity.
Centripetal force is a force that makes a body follow a curved path: it is always directed orthogonal to the velocity of the body, toward the instantaneous center of curvature of the path.I linked my source.
centripetal- Dashun Walden
Centripetal force wants to move something towards the centre. So in a satellites case that would be the Gravity of the Earth. If you had a rock tied to a string you were spinning around, the Centripetal Force would be the tension in the string acting towards the centre.
Centripetal force, which is the product of the mass and the centripetal acceleration.Fcp = m x acpYou can measure the acp in various ways:acp = v2 / r acp = ω2 x r
If an object follows a circular path, it must have a centripetal force on it to keep it moving in a circle. Centripetal means "toward the center of the circle". The force causes Centripetal acceleration toward the center witch is along the radius of the circular path. Tangential acceleration occurs at a Tangent to the circular path and is always perpendicular to the centripetal acceleration. Always perpendicular to the radius of the circle.