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25 votes
25 votes

\sf \large \: If \: y = Sin x \: * Cos \: 2x \: Find (dy)/(dx)

Thanku!​

User Matusko
by
2.8k points

2 Answers

19 votes
19 votes

Answer:

  • cos (x) cos (2x) - 2sin(x) sin(2x)

Solution:

(See the solution in the photo)

\sf \large \: If \: y = Sin x \: * Cos \: 2x \: Find (dy)/(dx) Thanku!​-example-1
\sf \large \: If \: y = Sin x \: * Cos \: 2x \: Find (dy)/(dx) Thanku!​-example-2
User Lopezdp
by
2.6k points
16 votes
16 votes

Answer:


\sf -5\cos \left(x\right)+6\cos ^3\left(x\right)

Step-by-step explanation:


\sf y = sin(x) * cos(2x)


\rightarrow \sf (d)/(dx)\left(sin\left(x\right)\ * \:\:cos\left(2x\right)\right)


\sf \bold {Apply\:the\:Product\:Rule}:\quad \left(f\cdot g\right)'=f\:'\cdot g+f\cdot g'


\rightarrow \sf (d)/(dx)\left(\sin \left(x\right)\right)\cos \left(2x\right)+(d)/(dx)\left(\cos \left(2x\right)\right)\sin \left(x\right)


\sf \bold{ Apply \ differentiation \ rule \ \ \ : } \ \ \ sin(x) = cos(x) \ \ and \ \ cos(x) = -sin(x)


\rightarrow \sf \cos \left(x\right)\cos \left(2x\right)+\left(-\sin \left(2x\right)\ * \:2\right)\sin \left(x\right)


\rightarrow \sf \cos \left(x\right)\cos \left(2x\right)\left-2\sin \left(2x\right)\sin \left(x\right)


\sf \bold {use \ the \ formulae \ : \ cos(2x) = 2cos^2(x) - 1} \ {and} \ \ \sf \bold{sin(x) = 2 sin x cos x}


\rightarrow \sf cos(x) (2cos^2 (x) -1) -2(2sin(x)cos(x)sin(x))


\rightarrow \sf 2cos^3 (x) - cos(x) - 4sin^2(x) cos(x)


\rightarrow \sf -5\cos \left(x\right)+6\cos ^3\left(x\right)

User Ege Ersoz
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2.7k points