5. Use the given Taylor Series Expansion on Cosine and Sine function cos I 1 2! 4! 6! E(-1)" (2n)! n=0 sin r 3! 5! 7! 9! 22n+1 E(-1)" (2n – 1)! (2n + 1)! - n=1 n=0 http://people.math.sc.edu/girardi/ml42/handouts/10sTaylorPolySeries.pdf to create a script that will compute cos(x), sin(x) and tan(x). • Computing cos(x) and sin(x) must be done by using LOOP! THESE COMPUTATION MUST BE DONE within USER DEFINED FUNCTIONS. THEN, RETURN THESE VALUES TO main() in order to display cos(x), sin(x) and tan(x) which is sin(x) / cos(x). Use n = 50 or WAY LESS for the upper bound of n!

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Question
5. Use the given Taylor Series Expansion on Cosine and Sine function
cos I
1
4!
6!
x²n
E(-1)"
(2n)!
n=0
sin z
3!
5!
7!
9!
_ z2n-1
(2n – 1)!
x²n=1
x2n+1
El-1)(a-1)
Σ-
(2n + 1)!
n=1
n=0
http://people.math.sc.edu/girardi/m142/handouts/10sTaylorPolySeries.pdf
to create a script that will compute cos(X), sin(x) and tan(x).
• Computing cos(x) and sin(x) must be done by using LOOP! THESE COMPUTATION
MUST BE DONE within USER DEFINED FUNCTIONS. THEN, RETURN THESE
VALUES TO main() in order to display cos(x), sin(x) and tan(x) which is sin(x) / cos(x).
Use n = 50 or WAY LESS for the upper bound ofn!
+
+
+
||
Transcribed Image Text:5. Use the given Taylor Series Expansion on Cosine and Sine function cos I 1 4! 6! x²n E(-1)" (2n)! n=0 sin z 3! 5! 7! 9! _ z2n-1 (2n – 1)! x²n=1 x2n+1 El-1)(a-1) Σ- (2n + 1)! n=1 n=0 http://people.math.sc.edu/girardi/m142/handouts/10sTaylorPolySeries.pdf to create a script that will compute cos(X), sin(x) and tan(x). • Computing cos(x) and sin(x) must be done by using LOOP! THESE COMPUTATION MUST BE DONE within USER DEFINED FUNCTIONS. THEN, RETURN THESE VALUES TO main() in order to display cos(x), sin(x) and tan(x) which is sin(x) / cos(x). Use n = 50 or WAY LESS for the upper bound ofn! + + + ||
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