Respuesta :
Answer:
Magnitude of charges = 0.705 x 10⁻²⁰ C
Explanation:
Magnitude of electric field = 850 x 10⁴ N/C
Distance between dipoles = r 1.10 x 10⁻¹⁰ m
Torque on dipole = 6.6 x 10⁻²⁶ N.m
Magnitude of charges = q= ?
Torque on electric dipole is given by formula
[tex]\tau = pE \,sin\,theta\\\\p=q.r\\\\\theta = 90^o\\\\\tau=qrE\,sin\,(90)\\\\\tau=qrE\\\\q=\frac{\tau}{rE}\\\\q=\frac{6.6\times 10^{-26}}{(1.1\times 10^{-10}) (8.5\times 10^{4})}\\\\q=0.705\times 10^{-20}\, C[/tex]
Answer: q = 7.06 × 10^-21 C
the magnitude of the charges that make up the dipole is 7.06 × 10^-21 C
Explanation:
Given:
Torque, τ = 6.60×10^−26N⋅m
Angle made by p with a uniform electric field, θ = 90° (perpendicular)
Electric field, E = 8.50×10^4N/C
Length between dipole r = 1.10×10^−10 m
Torque acting on the dipole is given by the relation,
τ = pE sinθ....1
But,
p = qr .....2
Substituting equation 1 to 2
τ= qrEsinθ ....3
Making q the subject of formula
q = τ/rEsinθ .....4
Where;
q = magnitude of the charges that make up the dipole.
Substituting the given values into equation 4:
q = 6.60×10^−26N⋅m/(1.10×10^−10 m × 8.50×10^4N/C × sin90°)
q = 0.70588 × 10^-20 C
q = 7.06 × 10^-21 C
