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28 October, 02:16

What ocean depth would the volume of an aluminium sphere be reduced by 0.10%

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  1. 28 October, 03:07
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    6400 m

    Explanation:

    You need to use the bulk modulus, K:

    K = ρ dP/dρ

    where ρ is density and P is pressure

    Since ρ is changing by very little, we can say:

    K ≈ ρ ΔP/Δρ

    Therefore, solving for ΔP:

    ΔP = K Δρ / ρ

    We can calculate K from Young's modulus (E) and Poisson's ratio (ν):

    K = E / (3 (1 - 2ν))

    Substituting:

    ΔP = E / (3 (1 - 2ν)) (Δρ / ρ)

    Before compression:

    ρ = m / V

    After compression:

    ρ+Δρ = m / (V - 0.001 V)

    ρ+Δρ = m / (0.999 V)

    ρ+Δρ = ρ / 0.999

    1 + (Δρ/ρ) = 1 / 0.999

    Δρ/ρ = (1 / 0.999) - 1

    Δρ/ρ = 0.001 / 0.999

    Given:

    E = 69 GPa = 69*10⁹ Pa

    ν = 0.32

    ΔP = 69*10⁹ Pa / (3 (1 - 2*0.32)) (0.001/0.999)

    ΔP = 64.0*10⁶ Pa

    If we assume seawater density is constant at 1027 kg/m³, then:

    ρgh = P

    (1027 kg/m³) (9.81 m/s²) h = 64.0*10⁶ Pa

    h = 6350 m

    Rounded to two sig-figs, the ocean depth at which the sphere's volume is reduced by 0.10% is approximately 6400 m.
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