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 Ta có $\sin 5\alpha -2\sin \alpha \left(\cos 4\alpha +\cos 2\alpha \right)=\sin 5\alpha -2\sin \alpha .\cos 4\alpha -2\sin \alpha .\cos 2\alpha$

$=\sin 5\alpha -\left(\sin 5\alpha -\sin 3\alpha \right)-\left(\sin 3\alpha -\sin \alpha \right)$

$=\sin \alpha .$

Vậy $\sin 5\alpha -2\sin \alpha \left(\cos 4\alpha +\cos 2\alpha \right)=\sin \alpha$

\(VT=\dfrac{sin\alpha}{1+cos\alpha}+\dfrac{1+cos\alpha}{sin\alpha}\)

\(=\dfrac{sin^2\alpha+\left(1+cos\alpha\right)^2}{sin\alpha\left(1+cos\alpha\right)}\)

\(=\dfrac{sin^2\alpha+1+2cos\alpha+cos^2\alpha}{sin\alpha\left(1+cos\alpha\right)}\\ =\dfrac{\left(sin^2\alpha+cos^2\alpha\right)+1+2cos\alpha}{sin\alpha\left(1+cos\alpha\right)}\\ =\dfrac{2+2cos\alpha}{sin\alpha\left(1+cos\alpha\right)}\\ =\dfrac{2\left(1+cos\alpha\right)}{sin\alpha\left(1+cos\alpha\right)}\\ =\dfrac{2}{sin\alpha}=VP\left(dpcm\right)\)

\(sinA.cosB.cosC+sinB.cosC.cosA+sinC.cosB.cosA\)

\(=cosC\left(sinA.cosB+cosA.sinB\right)+sinC.cosB.cosA\)

\(=cosC.sin\left(A+B\right)+sinC.cosB.cosA\)

\(=cosC.sinC+sinC.cosA.cosB\)

\(=sinC\left(cosC+cosA.cosB\right)=sinC\left(-cos\left(A+B\right)+cosA.cosB\right)\)

\(=sinC\left(-cosA.cosB+sinA.sinB+cosA.cosB\right)\)

\(=sinA.sinB.sinC\)

Vì A+B+C=180^{\circ}A+B+C=180∘ nên V T=\dfrac{\sin ^{3} \dfrac{B}{2}}{\cos \left(\dfrac{180^{\circ}-B}{2}\right)}+\dfrac{\cos ^{3} \dfrac{B}{2}}{\sin \left(\dfrac{180^{\circ}-B}{2}\right)}-\dfrac{\cos \left(180^{\circ}-B\right)}{\sin B} \cdot \tan BVT=cos(2180∘−B​)sin32B​​+sin(2180∘−B​)cos32B​​−sinBcos(180∘−B)​⋅tanB.

V T=\dfrac{\sin ^{3} \dfrac{B}{2}}{\cos \left(\dfrac{180^{\circ}-B}{2}\right)}+\dfrac{\cos ^{3} \dfrac{B}{2}}{\sin \left(\dfrac{180^{\circ}-B}{2}\right)}-\dfrac{\cos \left(180^{\circ}-B\right)}{\sin B} \cdot \tan BVT=cos(2180∘−B​)sin32B​​+sin(2180∘−B​)cos32B​​−sinBcos(180∘−B)​⋅tanB =\dfrac{\sin ^{3} \dfrac{B}{2}}{\sin \dfrac{B}{2}}+\dfrac{\cos ^{3} \dfrac{B}{2}}{\cos \dfrac{B}{2}}-\dfrac{-\cos B}{\sin B} \cdot \tan B=\sin ^{2} \dfrac{B}{2}+\cos ^{2} \dfrac{B}{2}+1=2=V P=sin2B​sin32B​​+cos2B​cos32B​​−sinB−cosB​⋅tanB=sin22B​+cos22B​+1=2=VP

Suy ra điều phải chứng minh.

1) Vì \(\dfrac{\sin\alpha}{\cos\alpha}=\dfrac{\dfrac{đối}{huyền}}{\dfrac{kề}{huyền}}=\dfrac{đối}{kề}\)

nên \(\tan\alpha=\dfrac{\sin\alpha}{\cos\alpha}\)

2) Vì \(\dfrac{\cos\alpha}{\sin\alpha}=\dfrac{\dfrac{kề}{huyền}}{\dfrac{đối}{huyền}}=\dfrac{kề}{đối}\)

nên \(\cot\alpha=\dfrac{\cos\alpha}{\sin\alpha}\)