Prove that :
sin (2×30°)=2 tan 30°1+tan2 30°\text{sin }(2 \times 30°) = \dfrac{2 \text{ tan 30°}}{1 + \text{tan}^2 \text{ 30°}}sin (2×30°)=1+tan2 30°2 tan 30°
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L.H.S. = sin (2 x 30°) = sin 60° = 32\dfrac{\sqrt3}{2}23
R.H.S.
=2 tan 30°1+tan2 30°=2×131+(13)2=231+13=233+13=2343=2×34×3=32= \dfrac{2 \text{ tan 30°}}{1 + \text{tan}^2 \text{ 30°}}\\[1em] = \dfrac{2 \times \dfrac{1}{\sqrt3}}{1 + \Big(\dfrac{1}{\sqrt3}\Big)^2}\\[1em] = \dfrac{\dfrac{2}{\sqrt3}}{1 + \dfrac{1}{3}}\\[1em] = \dfrac{\dfrac{2}{\sqrt3}}{\dfrac{3 + 1}{3}}\\[1em] = \dfrac{\dfrac{2}{\sqrt3}}{\dfrac{4}{3}}\\[1em] = \dfrac{2 \times 3}{4 \times \sqrt3}\\[1em] = \dfrac{\sqrt3}{2}\\[1em]=1+tan2 30°2 tan 30°=1+(31)22×31=1+3132=33+132=3432=4×32×3=23
∴ L.H.S. = R.H.S.
Hence, sin (2×30°)=2 tan 30°1+tan2 30°\text{sin }(2 \times 30°) = \dfrac{2 \text{ tan 30°}}{1 + \text{tan}^2 \text{ 30°}}sin (2×30°)=1+tan2 30°2 tan 30°
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(tan 60° + 1tan 60° - 1)2=1 + cos 30°1 - cos 30°\Big(\dfrac{\text{tan 60° + 1}}{\text{tan 60° - 1}}\Big)^2 = \dfrac{\text{1 + cos 30°}}{\text{1 - cos 30°}}(tan 60° - 1tan 60° + 1)2=1 - cos 30°1 + cos 30°
3 cosec2 60° - 2 cot2 30° + sec2 45° = 0.
cos (2×30°)=1−tan2 30°1+tan2 30°\text{cos }(2 \times 30°) = \dfrac{1 - \text{tan}^2 \text{ 30°}}{1 + \text{tan}^2 \text{ 30°}}cos (2×30°)=1+tan2 30°1−tan2 30°
tan(2×30°)=2 tan 30°1−tan2 30°\text{tan} (2 \times 30°) = \dfrac{\text{2 tan 30°}}{1 - \text{tan}^2 \text{ 30°}}tan(2×30°)=1−tan2 30°2 tan 30°
