1- A student has used the Taylor Series to estimate the output of a function at a specific point (i.e., f(x2)). They kept reducing the step size (h=x2-x1) to decrease the error (e) of the estimates....

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1- A student has used the Taylor Series to estimate the output of a function at a specific point<br>(i.e., f(x2)). They kept reducing the step size (h=x2-x1) to decrease the error (e) of the<br>estimates. However, at one point, they noticed that the error is increasing instead of<br>decreasing, as reported below.<br>h<br>2<br>1.5<br>0.75<br>0.25<br>0.125<br>Error (&)<br>10%<br>6%<br>5%<br>7%<br>9%<br>A. What type of errors occurs when using a numerical method (i.e., the Taylor Series)?<br>B. In general, how can the error of an estimated value using the Taylor Series be minimized?<br>C. Why did the error increase after reducing the step size (h) in the above situation? Explain<br>it.<br>CS<br>Scanned with CamScanner<br>

Extracted text: 1- A student has used the Taylor Series to estimate the output of a function at a specific point (i.e., f(x2)). They kept reducing the step size (h=x2-x1) to decrease the error (e) of the estimates. However, at one point, they noticed that the error is increasing instead of decreasing, as reported below. h 2 1.5 0.75 0.25 0.125 Error (&) 10% 6% 5% 7% 9% A. What type of errors occurs when using a numerical method (i.e., the Taylor Series)? B. In general, how can the error of an estimated value using the Taylor Series be minimized? C. Why did the error increase after reducing the step size (h) in the above situation? Explain it. CS Scanned with CamScanner

Jun 04, 2022

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1- A student has used the Taylor Series to estimate the output of a function at a specific point (i.e., f(x2)). They kept reducing the step size (h=x2-x1) to decrease the error (e) of the estimates....

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