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प्रश्न
If 2y = `(cot^-1((sqrt3cosx + sinx)/(cosx - sqrt3 sinx)))^2`, x ∈ `(0, π/2)` then `dy/dx` is equal to ______.
पर्याय
`π/6 - x`
`π/3 - x`
`x - π/6`
`2x - π/3`
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उत्तर
If 2y = `(cot^-1((sqrt3cosx + sinx)/(cosx - sqrt3 sinx)))^2`, x ∈ `(0, π/2)` then `dy/dx` is equal to `underlinebb(x - π/6)`.
Explanation:
2y = `(cot^-1((sqrt3cosx + sinx)/(cosx - sqrt3 sinx)))^2`
2y = `(cot^-1((sqrt(3)/2 cosx + 1/2sinx)/(1/2cosx - sqrt(3)/2sinx)))^2`
2y = `(cot^-1((sin(π/3 + x))/(cos(π/3 + x))))^2`
= `(cot^-1tan(π/3 + x))^2`
= `(π/2 - tan^-1tan(π/3 + x))^2`
= 2y = `{{:((π/2 - (π/3 + x))^2, 0 < x < x/6),((π/2 - tan^-1 tan(π - (π/3 + x)))^2, π/6 < x < π/2):}`
2y = `{{:((π/6 - x)^2, 0 < x < π/6),(((7π)/6 - x)^2, π/6 < x < π/6):}`
`(2dy)/(dx) = {{:(2(π/2 - x)(-1), 0 < x < π/6),(2((7π)/6 - x)(-1), π/6 < x < (7π)/6):}`
`dy/dx = {((x - π/6)"," 0 < x < π/6), ((x - (7π)/6)"," π/6 < x < π/2):}`
