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Question

If f(x)= ∣∣ ∣∣13cosx1sinx13cosx1sinx1∣∣ ∣∣, then which of the following is/are correct ?

A
f(x) has maximum value 12
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B
f(x) has maximum value 10
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C
f (x) has maximum value 10
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D
f (x) has minimum value 0
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Solution

The correct options are
B f(x) has maximum value 10
D f (x) has minimum value 0
f(x)=8cos2x3sin2x+1 This can be written as
f(x)=4cos2x3sin2x+5
Differentiating with respect to x and simplifying gives us.
tan2x=34 hence the sets of values will be
sin2x=35, cos2x=45
or
sin2x=35, cos2x=45
Therefore after substituting, we get the minimum and maximum values as 0 and 10 respectively.

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