Respuesta :
Answer:
For F=GMm/r^2
[tex]F = \frac{GMm}{r^{2} }[/tex]
a. [tex]M = \frac{Fr^{2} }{Gm}[/tex]
b. [tex]r = \sqrt{\frac{GMm}{F}}[/tex]
M=kxa^3/p^2
[tex]M = \frac{kxa^{3} }{p^{2} }[/tex]
a. [tex]p = \sqrt{\frac{kxa^{3} }{M}}[/tex]
b. [tex]a = \sqrt[3]{\frac{Mp^{2} }{kx}}[/tex]
Step-by-step explanation:
To solve for the unknown quantity, we will make the unknown quantity the subject of the given equation.
For F=GMm/r^2
a. M =
F=GMm/r^2
[tex]F = \frac{GMm}{r^{2} }[/tex]
The first thing to do is cross multiply, so that the equation gives
[tex]Fr^{2} = GMm[/tex]
Now, divide both sides of the equation by [tex]Gm[/tex], we then get
[tex]\frac{Fr^{2} }{Gm} = \frac{GMm}{Gm}[/tex]
Then, [tex]\frac{Fr^{2} }{Gm} = M[/tex]
Hence,
[tex]M = \frac{Fr^{2} }{Gm}[/tex]
b. r =
F=GMm/r^2
[tex]F = \frac{GMm}{r^{2} }[/tex]
Likewise, we will first cross multiply, we then get
[tex]Fr^{2} = GMm[/tex]
Now, divide both sides by [tex]F[/tex], so that the equation becomes
[tex]\frac{Fr^{2} }{F} = \frac{GMm}{F} \\[/tex]
∴ [tex]r^{2} = \frac{GMm}{F} \\[/tex]
Then,
[tex]r = \sqrt{\frac{GMm}{F}}[/tex]
For M=kxa^3/p^2
a. P =
M=kxa^3/p^2
[tex]M = \frac{kxa^{3} }{p^{2} }[/tex]
The first thing to do is cross multiply, so that the equation becomes
[tex]Mp^{2} = kxa^{3} \\[/tex]
Now, divide both sides by M, we then get
[tex]\frac{Mp^{2} }{M} = \frac{kxa^{3} }{M}[/tex]
∴ [tex]p^{2} = \frac{kxa^{3} }{M}[/tex]
Then,
[tex]p = \sqrt{\frac{kxa^{3} }{M}}[/tex]
b. a =
M=kxa^3/p^2
[tex]M = \frac{kxa^{3} }{p^{2} }[/tex]
Also, we will first cross multiply to get
[tex]Mp^{2} = kxa^{3} \\[/tex]
Then, divide both sides of the equation by [tex]kx[/tex] to get
[tex]\frac{Mp^{2} }{kx}= \frac{kxa^{3} }{kx}\\[/tex]
[tex]\frac{Mp^{2} }{kx}= a^{3}[/tex]
∴ [tex]a^{3} = \frac{Mp^{2} }{kx}[/tex]
Then,
[tex]a = \sqrt[3]{\frac{Mp^{2} }{kx}}[/tex]
