$F=\frac{dp}{dt}$ or $F=ma$?

Question

The second law of Sir Isaac Newton or also known as the fundamental relation of dynamics : $$\vec{F}=m\vec{a}$$ Which can be derived using the definition of the force : $$\vec{F}=\frac{d\vec{p}}{dt}$$ But only if $m$ is treated as a constant. What if $m$ is not a constant? absolutely we're not having the same result. Then what we must apply $F=ma$ or $F=dp/dt$ ?

score 4 · Accepted Answer · answered May 11 '20 at 20:50

In classical mechanics mass is always a constant. Matter is conserved (it gets a little more complicated in relativity and quantum mechanics but that need not concern us here). When dealing with a question involving "variable mass", for example rocket propulsion, one must divide the mass into the parts which are moving differently. See e.g. Rocket equation. The force accelerating the rocket is $ma$, where $m$ is variable. It is NOT $ma + v\dot m$

This answer should be awarded 'correct answer'. +1 from me. – Gert May 11 '20 at 21:17 — Gert, May 11 '20 at 21:17

score 0 · Answer 2 · answered May 11 '20 at 20:17

0

if m=const both are the same, if m ist not constant like in rockets you have to use change of impulse .

answered May 11 '20 at 20:17

trula

6,146

$F=\frac{dp}{dt}$ or $F=ma$?

2 Answers2