Ex 6.3,9 - Chapter 6 Class 12 Application of Derivatives

Last updated at Dec. 16, 2024 by

Β  Ex 6.3, 9 - What is the maximum value of sin x + cos x? - Ex 6.3 - Ex 6.3

part 2 - Ex 6.3,9 - Ex 6.3 - Serial order wise - Chapter 6 Class 12 Application of Derivatives
part 3 - Ex 6.3,9 - Ex 6.3 - Serial order wise - Chapter 6 Class 12 Application of Derivatives

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Ex 6.3, 9 What is the maximum value of the function sin⁑π‘₯+cos⁑π‘₯? Let f(π‘₯)=sin⁑π‘₯+cos⁑π‘₯ Consider the interval π‘₯ ∈ [0 , 2πœ‹] Finding f’(𝒙) f’(π‘₯)=𝑑(sin⁑π‘₯ + cos⁑π‘₯ )/𝑑π‘₯ f’(π‘₯)=cos⁑π‘₯βˆ’sin⁑π‘₯ Putting f’(𝒙)=𝟎 cos⁑π‘₯βˆ’sin⁑π‘₯=0 cos⁑π‘₯=sin⁑π‘₯ 1 =sin⁑π‘₯/cos⁑π‘₯ 1= tan⁑π‘₯ tan π‘₯=1 Since π‘₯ ∈ [0 , 2πœ‹] tan π‘₯=1 at π‘₯=πœ‹/4 , π‘₯=5πœ‹/4 in the interval [0 , 2πœ‹] We have given the interval π‘₯ ∈ [0 , 2πœ‹] Hence Calculating f(π‘₯) at π‘₯=0 ,πœ‹/4 , 5πœ‹/4 & 2πœ‹ Hence Maximum Value of f(π‘₯) is √𝟐 at 𝒙 = 𝝅/πŸ’

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