Ask Question
24 October, 00:54

The volume V of a cylinder is computed using the values 8.8m for the diameter and 5.8m for the height. Use the linear approximation to estimate the maximum error in V if each of these values has a possible error of at most 8%.

+4
Answers (1)
  1. 24 October, 04:33
    0
    The maximum error is approximately Ev=24%

    Step-by-step explanation:

    the volume of the cylinder V is

    V = π/4*H*D²

    where H = height and D = diameter

    the variation of V will be

    dV = (∂V/∂H) * dH + (∂V/∂D) * dD

    dV = π/4*D²*dH + π/2*H*D*dD

    if we divide by the volume V

    dV / V = (π/4*D²*dH + π/2*H*D*dD) / (π/4*H*D²) = dH/H + 2*dD/D

    dV / V = dH/H + 2*dD/D

    then we can approximate

    error in V = Ev = ΔV/V ≈ dV/V

    error in H = Eh=ΔH/H ≈ dH/H

    error in D = Ed=ΔD/D ≈ dD/D

    thus

    Ev = Eh + 2*Ed

    since Ed=Eh=E=8%

    Ev = Eh + 2*Ed = 3*E=3*8%=24%

    Ev = 24%

    therefore the maximum error is approximately Ev=24%
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “The volume V of a cylinder is computed using the values 8.8m for the diameter and 5.8m for the height. Use the linear approximation to ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers