Answer Banksin (3x) = sin (x)(3 cos² (x) – sin² (x))sin (3x) = sin (x) cos (2x) – cos (x) sin (2x)sin (3x) = sin (x) cos (2x) + cos (x) sin (2x)sin (3x) = sin (x)(3 – 2 sin² (x))sin (3x) = sin (x)(-(1 – sin² (x)) – sin² (x))sin (3x) = sin (x) sin (2x) + cos (x) cos (2x)sin (3x) = sin (x)(cos² (x) – sin² (x)) +2 sin (x) cos (x) cos (x)sin (3x) = sin (x)(- cos² (x) – sin² (x))sin (3x) = sin (x)(cos² (x) – sin² (x)) – 2 sin (x) cos (x) cos (x)sin (3x) = 2 sin (x) sin (x) cos (x) + cos (x)(cos? (x) – sin? (x))sin (3x) = cos (x)(cos² (x) + sin² (x))sin (3x) = sin (x)(3(1 – sin² (x) – sin² (x))sin (3x) = sin (x)(3 – 4 sin? (x)) Show that \sin{(3x)} = 3\sin{(x)} - 4\sin^{3}{(x)}\text{.} You will need to use five expressions in total ordered from top tobottom.Suggestion: Note that \sin{(3x)} = \sin{(x+ 2x)}\text{,} and then apply sum and double-angle formulas.(\sin{(3x)} = \sin{(x + 2x)}\)\(\sin{(3x)} = 3\sin{(x)} - 4\sin^{3}{(x)}\)

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Answered: Show that \sin{(3x)} = 3\sin{(x)} -…

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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Show that \sin{(3x)} = 3\sin{(x)} - 4\sin^{3}{(x)}\text{.} You will need to use five expressions in total ordered from top to bottom. Suggestion: Note that \sin{(3x)} = \sin{(x+ 2x)}\text{,} and then apply sum and double-angle formulas. (\sin{(3x)} = \sin{(x+ 2x)}\)