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Question

\tan θ = \frac{a}{b}

হলে নিচের কোনটি সত্য?

\sin θ = \frac{b}{a^{2} + b^{2}}

\cos θ = \frac{a}{\sqrt{a^{2} + b^{2}}}

s e c θ = \frac{a^{2} + b^{2}}{a}

\cos e c θ = \frac{a^{2} + b^{2}}{a}

ANSWER : 2

Descrption

সমাধান: tanθ = a/b&nbsp;হলে <img 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" alt="https://elasticbeanstalk-ap-southeast-1-051040323559.s3.amazonaws.com/livemcq-files/media/uploads/Screenshot_105_dkgp61Q.png"> cosecθ =&nbsp;অতিভুজ/&nbsp;লম্ব &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &nbsp; = √(a2&nbsp;+ b2)/a&nbsp;

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