explain Kepler's law ??? good morning friends. bye bye going to school.
Answers
Answer:
In astronomy, Kepler's laws of planetary motion, published by Johannes Kepler between 1609 and 1619, describe the orbits of planets around the Sun. The laws modified the heliocentric theory of Nicolaus Copernicus, replacing its circular orbits and epicycles with elliptical trajectories, and explaining how planetary velocities vary. The three laws state that:
The orbit of a planet is an ellipse with the Sun at one of the two foci.
A line segment joining a planet and the Sun sweeps out equal areas during equal intervals of time.
The square of a planet's orbital period is proportional to the cube of the length of the semi-major axis of its orbit.
Explanation:
In astronomy, Kepler’s laws of planetary motion are three scientific laws describing the motion of planets around the sun.
Kepler first law – The law of orbits
Kepler first law – The law of orbitsKepler’s second law – The law of equal areas
Kepler first law – The law of orbitsKepler’s second law – The law of equal areasKepler’s third law – The law of periods
Kepler First law – The Law of Orbits
According to Kepler’s first law,” All the planets revolve around the sun in elliptical orbits having the sun at one of the foci”. The point at which the planet is close to the sun is known as perihelion and the point at which the planet is farther from the sun is known as aphelion.
It is the characteristics of an ellipse that the sum of the distances of any planet from two foci is constant. The elliptical orbit of a planet is responsible for the occurrence of seasons.
Kepler’s Second Law – The Law of Equal Areas
Kepler’s second law states ” The radius vector drawn from the sun to the planet sweeps out equal areas in equal intervals of time”
As the orbit is not circular, the planet’s kinetic energy is not constant in its path. It has more kinetic energy near perihelion and less kinetic energy near aphelion implies more speed at perihelion and less speed (vmin) at aphelion. If r is the distance of planet from sun, at perihelion (rmin) and at aphelion (rmax), then,
rmin + rmax = 2a × (length of major axis of an ellipse) . . . . . . . (1)
Kepler’s Second Law – The law of Equal Areas
Using the law of conservation of angular momentum the law can be verified. At any point of time, the angular momentum can be given as, L = mr2ω.
Now consider a small area ΔA described in a small time interval Δt and the covered angle is Δθ. Let the radius of curvature of the path be r, then the length of the arc covered = r Δθ.
ΔA = 1/2[r.(r.Δθ)]= 1/2r2Δθ
Therefore, ΔA/Δt = [ 1/2r2]Δθ/dt
\lim_{\Delta t\rightarrow 0}\frac{\Delta A}{\Delta t}=\frac{1}{2}r^{2}\frac{\Delta \theta }{\Delta t}lim
ΔΔt0
Δt
ΔΔ
=
2
1
r
2
Δt
ΔΔ
, taking limits both side as, Δt→0
⇒\frac{dA}{dt}=\frac{1}{2}r^{2}\omega
dt
dd
=
2
1
r
2
ω \frac{dA}{dt}=\frac{L}{2m}
dt
dd
=
2m
L
Now, by conservation of angular momentum, L is a constant.
Thus, dA/dt = constant
The area swept in equal interval of time is a constant.
Kepler’s second law can also be stated as “The areal velocity of a planet revolving around the sun in elliptical orbit remains constant which implies the angular momentum of a planet remains constant”. As the angular momentum is constant all planetary motions are planar motions, which is a direct consequence of central force.
Kepler’s Third Law – The Law of Periods
According to Kepler’s law of periods,” The square of the time period of revolution of a planet around the sun in an elliptical orbit is directly proportional to the cube of its semi-major axis”.
T2 ∝ a3
Shorter the orbit of the planet around the sun, shorter the time taken to complete one revolution. Using the equations of Newton’s law of gravitation and laws of motion, Kepler’s third law takes a more general form:
P2 = 4π2 /[G(M1+ M2)] × a3
where M1 and M2 are the masses of the two orbiting objects in solar masses.
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