1 Answer

Trnc · Answer 1 · 2021-02-11T16:03:25+0000

Answer:

The electric force is
$6.2\cdot 10^(35)$ times stronger than the gravitational force

Step-by-step explanation:

The magnitude of the electrostatic force between two charges is given by:

F_E=k(q_1 q_2)/(r^2)

where:

$k=8.99\cdot 10^9 Nm^(-2)C^(-2)$ is the Coulomb's constant

q_1, q_2 are the two charges

r is the separation between the two charges

In this problem:

$q_1=1.6\cdot 10^(-19)C$ (charge of the proton)

$q_2=3.2\cdot 10^(-19)C$ (charge of a nucleus of helium, twice the charge of a proton)

$r=100 \mu m = 100\cdot 10^(-6) m$

So the electric force is

$F_E=(8.99\cdot 10^9)((1.6\cdot 10^(-19))(3.2\cdot 10^(-19)))/((100\cdot 10^(-6))^2)=4.6\cdot 10^(-20) N$

Instead, the magnitude of the gravitational force between two objects is given by :

F_G=G(m_1 m_2)/(r^2)

where

$G=6.67\cdot 10^(-11) m^3 kg^(-1)s^(-2)$ is the gravitational constant

m1, m2 are the masses of the two objects

r is the separation between them

Here we have:

$m_1=1.67\cdot 10^(-27)kg$ is the mass of the proton

$m_2=6.68\cdot 10^(-27)kg$ is the mass of a nucleus of helium (4 times the mass of the proton)

$r=100 \mu m = 100\cdot 10^(-6) m$ is the separation

So the gravitational force is

$F_G=(6.67\cdot 10^(-11))((1.67\cdot 10^(-27))(6.68\cdot 10^(-27)))/((100\cdot 10^(-6))^2)=7.4\cdot 10^(-56) N$

So, we see that the electric force is much stronger than the gravitational factor, by a factor of:

$(F_E)/(F_G)=(4.6\cdot 10^(-20))/(7.4\cdot 10^(-56))=6.2\cdot 10^(35)$

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