1. The coefficient of the x5 term in the Maclaurin polynomial for sin (2 x ) is
(A) 0
(B) 0.0083333
(C) 0.016667
(D) 0.26667
Solution. The correct answer is (D).
The Maclaurin series for sin(2 x ) isHence, the coefficient of the x5 term is 0.26667.
2. Given f (3) = 6 , f ′(3) = 8 , f ′′(3) = 11 , and all other higher order derivatives of f (x ) are zero at x = 3 , and assuming the function and all its derivatives exist and are continuous between x = 3 and x = 7 , the value of f (7 ) is
(A) 38.000
(B) 79.500
(C) 126.00
(D) 331.50
Solution: The correct answer is (C).
The Taylor series is given bySince all the derivatives higher than second are zero,
3. Given that y(x ) is the solution to y (0) = 3 the value of y(0.2) from a second order Taylor polynomial around x=0 is
(A) 4.400
(B) 8.800
(C) 24.46
(D) 29.00
Solution: The correct answer is (C).
The second order Taylor polynomial is
4. The series is a Maclaurin series for the following function
(A) cos(x)
(B) cos(2 x)
(C) sin (x)
(D) sin (2 x)
Solution: The correct answer is (B).
5. The function dt is called the error function. It is used in the field of probability and cannot be calculated exactly. However, one can expand the integrand as a Taylor polynomial and conduct integration. The approximate value of erf (2.0) using the first three terms of the Taylor series around t = 0 is
(A) -0.75225
(B) 0.99532
(C) 1.5330
(D) 2.8586
Solution: The correct answer is (A).
Rewrite the integral asThe first three terms of the Taylor series for around t = 0 are
The first three terms of the Taylor series are
Hence
6. Using the remainder of Maclaurin polynomial of nth order for f (x ) defined as
, the order of the Maclaurin polynomial at least required to get an absolute true error of at most 10 −6 in the calculation of sin (0.1) is (do not use the exact value of sin (0.1) or cos(0.1) to find the answer, but the knowledge that |sin( x)| ≤ 1 and | cos( x) |≤ 1 ).
(A) 3
(B) 5
(C) 7
(D) 9
Solution : The correct answer is (B).
So when is
But since the Maclaurin series for sin (x ) only includes odd terms, n ≥ 5 .
1. What is a Taylor series and how is it used in mathematical methods of physics? |
2. How is the Taylor series derived and what are its key components? |
3. What are the applications of Taylor series in physics? |
4. Can the Taylor series be used to approximate any arbitrary function? |
5. How does the accuracy of a Taylor series approximation depend on the number of terms used? |
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