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प्रश्न
Evaluate `tan (tan^-1(-1) + π/3)`.
मूल्यांकन
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उत्तर
We have to find: `tan (tan^-1(-1) + π/3)`
Let’s find tan−1 (−1) first:
tan−1 (−1)
Let y = tan−1 (−1)
We know that
tan−1 (−x) = −tan−1 x
y = −tan−1 (1)
y = `-π/4`
Since the range of tan−1 is `(-π/2,pi/2)`.
Hence, tan−1 (−1) = `-π/4` is correct.
Now, `tan (tan^-1(-1) + π/3)`
= `tan(-π/4 + π/3)`
= `tan(π/3 - π/4)`
Using tan (A − B) = `(tan A - tan B)/(1 + tan A tan B)`
= `(tan (π/3) - tan (π/4))/(1 + tan (π/3) tan (π/4))`
= `(sqrt(3) - 1)/(1 + sqrt(3) xx 1)`
= `(sqrt(3) - 1)/(1 + sqrt(3))`
= `(sqrt(3) - 1)/(sqrt(3) + 1)`
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