To find the maximum value of E for the expression a + 5c - d, we need to determine the absolute error for each variable involved.
Absolute error is the difference between the measured or estimated value and the true or accepted value.
For the variables given:
a: No error is provided, so we assume it to be exact.
c: No error is provided, so we assume it to be exact.
d: No error is provided, so we assume it to be exact.
Therefore, the absolute error for a is 0, the absolute error for c is 0, and the absolute error for d is 0.
So, to find the maximum value of E for a + 5c - d, we simply evaluate the expression using the maximum values provided for a, c, and d:
Maximum value of E = 15300 + 5(100) - 0 = 15300 + 500 - 0 = 15800
Therefore, the maximum value of E for a + 5c - d is 15800.
Define the term absolute error in C= 15300 100 and d a+b+c+d = α = 10.00 0.05, b 0.0356 ± 0.0002 62000 500 Find the Maximum value of E in
ii. a + 5c-d
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