Consider the error in using the approximation sin(x) z x on the interval [-1, 1]. (a) Reasoning informally, on what interval is this approximation an overestimate? An underestimate? (For each, give your answer as an interval or list of intervals, e.g., to specify the intervals -0.25 < x < 0.5 and 0.75 < x < 1, enter [-0.25, 0.75), (0.75,1] Enter none if there are no such intervals.) (b) Use the Error Bound for Taylor Polynomials to find a good smallest bound for the error in approximating sin(x) with x on this interval: error bound = Now, consider the error in using the approximation sin(x) × x + * + on the same interval. (c) Reasoning informally, on what interval is this approximation an overestimate? An underestimate? (For each, give your answer as an interval or list of intervals, e.g., to specify the intervals -0.25 < x < 0.5 and 0.75 < x < 1, enter [-0.25, 0.75), (0.75,1] Enter none if there are no such intervals.) (d) Use the Error Bound for Taylor Polynomials to find a good smallest bound for the error in approximating sin(x) with x + + on this interval:

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Consider the error in using the approximation sin(x) - x on the interval [-1, 1].
(a) Reasoning informally, on what interval is this approximation an overestimate?
An underestimate?
(For each, give your answer as an interval or list of intervals, e.g., to specify the intervals -0.25 < x < 0.5 and 0.75 < x < 1, enter [-0.25, 0.75), (0.75,1] Enter none if there
are no such intervals.)
(b) Use the Error Bound for Taylor Polynomials to find a good smallest bound for the error in approximating sin(x) with x on this interval:
error bound =
Now, consider the error in using the approximation sin(x) x x +
+
on the same interval.
(c) Reasoning informally, on what interval is this approximation an overestimate?
An underestimate?
(For each, give your answer as an interval or list of intervals, e.g., to specify the intervals –0.25 < x < 0.5 and 0.75 < x < 1, enter [-0.25, 0.75), (0.75,1] Enter none if there
are no such intervals.)
(d) Use the Error Bound for Taylor Polynomials to find a good smallest bound for the error in approximating sin(x) with x + +
on this interval:
error bound =
Transcribed Image Text:Consider the error in using the approximation sin(x) - x on the interval [-1, 1]. (a) Reasoning informally, on what interval is this approximation an overestimate? An underestimate? (For each, give your answer as an interval or list of intervals, e.g., to specify the intervals -0.25 < x < 0.5 and 0.75 < x < 1, enter [-0.25, 0.75), (0.75,1] Enter none if there are no such intervals.) (b) Use the Error Bound for Taylor Polynomials to find a good smallest bound for the error in approximating sin(x) with x on this interval: error bound = Now, consider the error in using the approximation sin(x) x x + + on the same interval. (c) Reasoning informally, on what interval is this approximation an overestimate? An underestimate? (For each, give your answer as an interval or list of intervals, e.g., to specify the intervals –0.25 < x < 0.5 and 0.75 < x < 1, enter [-0.25, 0.75), (0.75,1] Enter none if there are no such intervals.) (d) Use the Error Bound for Taylor Polynomials to find a good smallest bound for the error in approximating sin(x) with x + + on this interval: error bound =
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