If x ∈ ( ( -π/2) , (π/2) ) , then log sec x =

Question

If x ∈ ( ( -π/2) , (π/2) ) , then log sec x = (A) 2 cosec h-1 ( cot2 (x/2) - 1)  (B) 2 cosec h-1 ( cot2 (x/2) + 1)  (C) 2 cot h-1 (cosec2 (x/2) - 1)  (D) 2 cot h-1 (cosec2 (x/2) + 1)

Tardigrade Admin · Accepted Answer

For x ∈(-(π/2), (π/2)), log sec x=y (let) ⇒ sec x=ey ⇒ cos x=e-y ∵ ( sin h y/ cos h y)=(ey-e-y/ey+e-y) ⇒ ( cos h y- sin h y/ cos h y+ sin h y)=(e-y/ey)= cos 2 x ⇒ (( cos h (y/2)- sin h (y/2)/ cos h (y)2+ sin h (y)2)/2)= cos 2 x ⇒ ( cos h (y/2)- sin h (y/2)/ cos h (y)2+ sin h (y)2= cos x ⇒ (2 cos h (y/2)/2 sin h (y)2)=(1+ cos x/1- cos x)= cot /2) (x/2) ⇒ cot h (y/1) = cot 2 (x/2)=cosec2 (x/2)-1 ⇒ (y/2) = cot h -1(cosec2 (x/2)-1) ⇒ y=2 cot h -1(cosec2 (x/2)-1)

Q. If $x \in (\frac{- π}{2}, \frac{π}{2})$ , then $l o g sec x =$

$2 cosec h^{- 1} (cot^{2} \frac{x}{2} - 1)$

$2 cosec h^{- 1} (cot^{2} \frac{x}{2} + 1)$

$2 cot h^{- 1} (cose c^{2} \frac{x}{2} - 1)$

$2 cot h^{- 1} (cose c^{2} \frac{x}{2} + 1)$

Q. If x∈(2−π​,2π​) , then logsecx=

2cosech−1(cot22x​−1)

2cosech−1(cot22x​+1)

2coth−1(cosec22x​−1)

2coth−1(cosec22x​+1)

Q. If $x \in (\frac{- π}{2}, \frac{π}{2})$ , then $l o g sec x =$

$2 cosec h^{- 1} (cot^{2} \frac{x}{2} - 1)$

$2 cosec h^{- 1} (cot^{2} \frac{x}{2} + 1)$

$2 cot h^{- 1} (cose c^{2} \frac{x}{2} - 1)$

$2 cot h^{- 1} (cose c^{2} \frac{x}{2} + 1)$