If tan (A – B) = 1, sec (A + B) = 2/√3, then the smallest positive value of B is (a) 25π/24 (b) 19π/24 (c) 13π/24 (d) 11π/24

If tan(A − B) = 1 and sec(A + B) = 2/√3, Find the Smallest Positive Value of B

Question:
If \[ \tan(A-B)=1 \] and \[ \sec(A+B)=\frac{2}{\sqrt3} \] then the smallest positive value of \[ B \] is

(a) \(\frac{25\pi}{24}\)
(b) \(\frac{19\pi}{24}\)
(c) \(\frac{13\pi}{24}\)
(d) \(\frac{11\pi}{24}\)

Solution

Given,

\[ \tan(A-B)=1 \]

Therefore,

\[ A-B=\frac{\pi}{4} \]

Also,

\[ \sec(A+B)=\frac{2}{\sqrt3} \]

Hence,

\[ \cos(A+B)=\frac{\sqrt3}{2} \]

Therefore,

\[ A+B=\frac{\pi}{6} \]

\[ A+B=\frac{11\pi}{6} \]

Taking the value that gives positive \(B\),

\[ A+B=\frac{11\pi}{6} \]

Now subtract:

\[ (A+B)-(A-B) = \frac{11\pi}{6}-\frac{\pi}{4} \]

\[ 2B = \frac{22\pi-3\pi}{12} \]

\[ 2B = \frac{19\pi}{12} \]

Therefore,

\[ B=\frac{19\pi}{24} \]

\[ \boxed{ B=\frac{19\pi}{24} } \]

Correct Option: (b)

Spread the love