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Question

limx01cos x cos 2x cos 3xsin22x is equal to


A

7/2

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B

7/3

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C

7/4

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D

7/5

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Solution

The correct option is C

7/4


cos x cos 2x cos 3x

= 12{(2cos x cos 2x)cos 3x}

= 12{(cos 3x+cos x)cos 3x}

= 14{(2cos2 3x+2cos 3x cos 3x)}

= 14{1+cos 6x+cos 4x+cos 2x}

With this our expression becomes -
limx0114{1+cos 6x+cos 4x+cos 2x}sin22x
Now we can apply L'Hospital rule -
limx014{6sin 6x4sin 4x2sin 2x}4.sin 2x.cos 2x
limx014{6sin 6x4sin 4x2sin 2x}2.sin 4x
With the help of standard limits we'll get the above expression equal to 7/4.


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