Evaluate :
cot241°tan249°−2sin275°cos215°\dfrac{\text{cot}^2 41°}{\text{tan}^2 49°} - 2\dfrac{\text{sin}^2 75°}{\text{cos}^2 15°}tan249°cot241°−2cos215°sin275°
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Solving,
⇒cot241°tan249°−2sin275°cos215°⇒cot241°tan2(90°−41°)−2sin275°cos2(90°−75°)\Rightarrow \dfrac{\text{cot}^2 41°}{\text{tan}^2 49°} - 2\dfrac{\text{sin}^2 75°}{\text{cos}^2 15°} \\[1em] \Rightarrow \dfrac{\text{cot}^2 41°}{\text{tan}^2 (90° - 41°)} - 2\dfrac{\text{sin}^2 75°}{\text{cos}^2 (90° - 75°)}⇒tan249°cot241°−2cos215°sin275°⇒tan2(90°−41°)cot241°−2cos2(90°−75°)sin275°
By formula,
tan (90° - θ) = cot θ and cos (90° - θ) = sin θ
⇒cot241°cot241°−2sin275°sin275°⇒1−2⇒−1.\Rightarrow \dfrac{\text{cot}^2 41°}{\text{cot}^2 41°} - 2\dfrac{\text{sin}^2 75°}{\text{sin}^2 75°} \\[1em] \Rightarrow 1 - 2 \\[1em] \Rightarrow -1.⇒cot241°cot241°−2sin275°sin275°⇒1−2⇒−1.
Hence, cot241°tan249°−2sin275°cos215°\dfrac{\text{cot}^2 41°}{\text{tan}^2 49°} - 2\dfrac{\text{sin}^2 75°}{\text{cos}^2 15°}tan249°cot241°−2cos215°sin275° = -1
Answered By
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cosec (65° + A) - sec (25° - A)
2tan 57°cot 33°−cot 70°tan 20°−22\dfrac{\text{tan 57°}}{\text{cot 33°}} - \dfrac{\text{cot 70°}}{\text{tan 20°}} - \sqrt{2}2cot 33°tan 57°−tan 20°cot 70°−2cos 45°
Evaluate:
cos 70°sin 20°+cos 59°sin 31°−8 sin230°\dfrac{\text{cos 70°}}{\text{sin 20°}} + \dfrac{\text{cos 59°}}{\text{sin 31°}} - \text{8 sin}^2 30°sin 20°cos 70°+sin 31°cos 59°−8 sin230°
A triangle ABC is right angled at B; find the value of sec A. cosec C - tan A. cot Csin B\dfrac{\text{sec A. cosec C - tan A. cot C}}{\text{sin B}}sin Bsec A. cosec C - tan A. cot C
