Answer:
1.349 × 10¹² electrons
Explanation:
At equilibrium, the tension T in the string is resolved into horizontal and vertical components. Tcos17 being the vertical component and Tsin17 the horizontal component. The electrostatic force of repulsion at equilibrium, F = kq²/r² where q = excess charge on sphere and r = distance apart at equilibrium,F acts horizontally to the left and its weight, mg acts vertically downwards.
For equilibrium, sum of horizontal components = 0 and sum of horizontal components = 0. So, Tsin17 - F = 0
Tsin17 = F ⇒ Tsin17 = kq²/r² (1)
Also Tcos17 - mg = 0 ⇒ Tcos17 = mg (2)
Dividing (1) by (2), we have
Tsin17/Tcos17 = kq²/r² ÷ mg
tan17 = kq²/mgr²
q = r√(mgtan17/k)
We find r using cosine rule r = √(500² + 500² -2 × 500²cos 2 × 17) since the string and the masses form an isosceles triangle at equilibrium.
r = √(2 × 500² -2 × 500²cos34) = 500√2(1 - cos 34) = 500√2 × 0.1710 =120.89 mm = 0.1209 m
substituting m = 9.60 g = 9.6 × 10⁻³ g, k = 9 × 10⁹ Nm²/C² and r into q, we have,
q = r√(mgtan17/k)
= 0.1209 m√(9.6 × 10⁻³ g × 9.8 m/s² × tan17/9 × 10⁹ Nm²/C²)
= 0.1209 m√(28.76 × 10⁻³ N/9 × 10⁹ Nm²/C²)
= 0.1209 m√(3.195 × 10⁻¹² C²/m²)
= 0.1209 m × 1.7877 × 10⁻⁶ C/m
= 0.2161 × 10⁻⁶ C
= 2.161 × 10⁻⁷ C
To find the number of surplus electrons, n on each sphere, we divide q by e the electron charge.
So, n = q/e = 2.161 × 10⁻⁷ C ÷ 1.602 × 10⁻¹⁹ C = 0.6825 × 10¹² = 1.349 × 10¹² electrons
The number of surplus electrons on each sphere : 3.27 * 10¹²
Given data :
Mass of metal spheres = 9.60 g
length of string = 500 mm
Angle made by each string with the vertical ( ∅ ) = 17°
we will apply the formula below
number of surplus electrons ( n ) = [tex]\frac{q}{e}[/tex] ----- ( 1 )
whereby :
Considering The forces acting on the metal spheres
Tan ∅ = [tex]\frac{q^{2} }{4\pi e_{o}mgr^{2} }[/tex] ----- ( 2 )
First step : Determine the distance between the spheres
r = 2l * sin∅
= 2 * 0.500 * sin17°
= 0.2924 m
Next step : Determine the charge on each sphere
Back to equation ( 2 )
Tan 17° = [tex]\frac{(8.99*10^{9}) * q^{2} }{(9.60 * 10^{-3})*(9.81)*(0.2924 )^{2} }[/tex]
q² = [ ( 0.3057 ) * ( 9.60 * 10⁻³ ) * ( 9.81 ) * ( 0.2924 )² ] / ( 8.99 * 10⁹ )
= 0.00246 / 8.99 * 10⁹
= 2.7364 * 10⁻¹³
Charge on each sphere ( q ) = √ ( 2.7364 * 10⁻¹³ ) = 5.23 * 10⁻⁷ C
Final step : The number of surplus electrons on each sphere
Back to equation ( 1 )
n = q / e
= ( 5.23 * 10^-7 ) / ( 1.6 * 10^-19 )
= 3.27 * 10¹²
Hence we can conclude that the number of surplus electrons on each sphere : 3.27 * 10¹².
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