The % error is found as 0.55%. The discrepancy between the calculated value and the correct value is referred to as an "error" in statistics.
What is the error?
An error is a mistaken or erroneous action. In some contexts, an error is interchangeable with a mistake.
The discrepancy between the calculated value and the correct value is referred to as an "error" in statistics.
Given;
[tex]\rm f(x)= \frac{3x-7}{4} \\\\ g(x) = 2x-1[/tex]
The value of the f(0) is;
[tex]\rm f(x)= \frac{3x-7}{4} \\\\ \rm f(0)= \frac{3\times 0-7}{4} \\\\ f(0)= - \frac{7}{4}[/tex]
The value of the g(f(0) is;
[tex]g(x)=2x-1\\\\ \rm g(f(0))=2 \times \frac{-7}4} -1 \\\\ g(f(0))= -3.5 -1 \\\\ g(f(0))= -4.5[/tex]
The given value of the g(f(0) is 2, and the error is found as;
[tex]\rm \% error = \frac{Given value - obtianed value }{obtained value } \\\\ \% error = =\frac{-2+4.5}{-4.5} \\\\ \% error = 0.55[/tex]
Hence,the % error is found as 0.55%.
To learn more about the error refer to the link;
https://brainly.com/question/13286220
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