Question

show that error is addictive during multiplication and division
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Answer 1

Answer:

When two quantities are multiplied or divided, the relative error in the result is the sum of the relative errors in the multipliers. Z ± ΔZ = (A ± ΔA) (B ± ΔB) = AB ± B ΔA ± A ΔB ± ΔA ΔB. Dividing LHS by Z and RHS by AB we have, 1 ± (ΔZ/Z) = 1 ± (ΔA/A) ± (ΔB/B) ± (ΔA/A)(ΔB/B).

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Answer 2

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