KeerthanaPosted on अगर tanα=mm+1,tanβ=12m+1\tan \alpha=\frac{m}{m+1}, \tan \beta=\frac{1}{2 m+1}tanα=m+1m,tanβ=2m+11, तो α+β\alpha+\betaα+β के बराबर aπ2\frac{\pi}{2}2π bπ6\frac{\pi}{6}6π cπ3\frac{\pi}{3}3π dπ4\frac{\pi}{4}4π Answer : Option DExplanation : हम जानते हैं कि, tan(α+β)=tanα+tanβ1−tanα⋅tanβ\tan (\alpha+\beta)=\frac{\tan \alpha+\tan \beta}{1-\tan \alpha \cdot \tan \beta}tan(α+β)=1−tanα⋅tanβtanα+tanβ ⇒tan(α+β)=mm+1+12m+11−m(m+1)⋅1(2m+1)\Rightarrow \tan (\alpha+\beta)=\frac{\frac{m}{m+1}+\frac{1}{2 m+1}}{1-\frac{m}{(m+1)} \cdot \frac{1}{(2 m+1)}}⇒tan(α+β)=1−(m+1)m⋅(2m+1)1m+1m+2m+11 ∵tanα=mm+1\because \tan \alpha=\frac{m}{m+1}∵tanα=m+1m tanβ=12m+1=2m2+m+m+1(m+1)(2m+1)2m2+3m+1−m\tan \beta=\frac{1}{2 m+1}=\frac{2 m^{2}+m+m+1}{\frac{(m+1)(2 m+1)}{2 m^{2}+3 m+1-m}}tanβ=2m+11=2m2+3m+1−m(m+1)(2m+1)2m2+m+m+1 =2m2+2m+12m2+2m+1=1=\frac{2 m^{2}+2 m+1}{2 m^{2}+2 m+1}=1=2m2+2m+12m2+2m+1=1 ⇒tan(α+β)=1\Rightarrow \tan (\alpha+\beta)=1⇒tan(α+β)=1 tan(α+β)=tanπ4\tan (\alpha+\beta)=\tan \frac{\pi}{4}tan(α+β)=tan4π ∴α+β=π4\therefore \alpha+\beta=\frac{\pi}{4}∴α+β=4π. Rate This:NaN / 5 - 1 votesAdd comment
