here is the topic of the problem:
You are given $2$ baseballs (consider them as perfect solid spheres) have equal properties with mass $m = 0,142kg$, radius $r_0 = 0.037m$ in the space and thay are $1m$ apart (the distance between their centres of mass), both of their initial velocities are $0$, calculate how long they will collide to (touch) each other? Given gravitational constant is $G = 6,67408 \cdot 10^{-11}$.
Here is my solution:
Since the system is symmetric, we just analyse $1$ ball, let's consider it is ball $m_1$.
Let's call the distance function between those $2$ balls $m_1$ and $m_2$ is $r(t) (m)$ which is depended on time $t$, in which $r(0) = 1 (m)$. (*)
Therefore the question we are looking for can be understanded as in which time $t$ that can make the function $r(t) = 2 \cdot r_0= 0.074 (m)$ (find $t$)
We got gravitational force equation changes through time is: $F(t) = G \cdot \frac{m^2}{r^2(t)} (N)$ (notice that $m_1 = m_2 = m)$
Acceleration function for ball $m_1$ is: $a(t) = \frac{F(t)}{m_1} = G \cdot \frac{m}{r^2(t)} \approx \frac{9.477 \cdot 10^{-12}}{r^2(t)} (m/s^2)$
We notice that $a(t) = r''(t) = \frac{9.477 \cdot 10^{-12}}{r^2(t)}$
$\Leftrightarrow r''(t) - \frac{9.477 \cdot 10^{-12}}{r^2(t)} = 0$ (**)
I think from (*) and (**) we can solve for the general form of this equation. However, I'm still a secondary school student right now, so at this step, my mathematical knowledge is not ripe enough for these kinds of equation, as I did some researches I knew that these kinds of equations are called "second-order differential equations" or something like that, and literally I have no idea how to deal with them. Can someone help me through this problem please? I'm dedicatedly seeking for the answer, thank you!
by the way, this is not homework exercise or something, I'm just a math, physics enthusiast and I'm kinda bored right now so I come up with this problem myself
