Misc 6 - Chapter 3 Class 11 Trigonometric Functions

Last updated at April 16, 2024 by

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Misc 6 Prove that ((sin⁑〖7π‘₯ + sin⁑〖5π‘₯) + (sin⁑〖9π‘₯ + sin⁑〖3π‘₯)γ€— γ€— γ€— γ€—)/((cos⁑〖7π‘₯ + π‘π‘œπ‘  5π‘₯) + (cos⁑〖9π‘₯ + cos⁑〖3π‘₯)γ€— γ€— γ€— ) = tan 6x Solving L.H.S ((sin⁑〖7π‘₯ + sin⁑〖5π‘₯) + (sin⁑〖9π‘₯ + sin⁑〖3π‘₯)γ€— γ€— γ€— γ€—)/((cos⁑〖7π‘₯ + π‘π‘œπ‘  5π‘₯) + (cos⁑〖9π‘₯ + cos⁑〖3π‘₯)γ€— γ€— γ€— ) Lets solve numerator and Denominator separately Solving numerator (sin 7x + sin 5x) + ( sin 9x + sin 3x) = 2 sin ((7π‘₯ + 5π‘₯)/2) cos ((7π‘₯ βˆ’ 5π‘₯)/2) + 2sin ((9π‘₯ +3π‘₯)/2) cos ((9π‘₯ βˆ’3π‘₯)/2) = 2 sin (12π‘₯/2) . cos (2π‘₯/2) + 2sin (12π‘₯/2) cos (6π‘₯/2) = 2 sin 6x . cos x + 2 sin 6x . cos 3x = 2 sin 6x (cos x + cos 3x) Now solving Denominator (cos 7x + cos 5x) + (cos 9x + cos 3x) = 2 cos ((7π‘₯ + 5π‘₯)/2) cos ((7π‘₯ βˆ’ 5π‘₯)/2) + 2 cos ((9π‘₯ +3π‘₯)/2) cos ((9π‘₯ βˆ’3π‘₯)/2) = 2 cos (12π‘₯/2) . cos (2π‘₯/2) + 2 cos (12π‘₯/2) cos (6π‘₯/2) = 2 cos 6x . cos x + 2 cos 6x . cos 3x = 2 cos 6x (cos x + cos 3x) Now solving L.H.S ((sin⁑〖7π‘₯ + sin⁑〖5π‘₯) + (sin⁑〖9π‘₯ + sin⁑〖3π‘₯)γ€— γ€— γ€— γ€—)/((cos⁑〖7π‘₯ + π‘π‘œπ‘  5π‘₯) + (cos⁑〖9π‘₯ + cos⁑〖3π‘₯)γ€— γ€— γ€— ) = (𝟐 π’”π’Šπ’β‘πŸ”π’™ (𝒄𝒐𝒔⁑𝒙 + π’„π’π’”β‘πŸ‘π’™))/(𝟐 π’„π’π’”β‘πŸ”π’™ (𝒄𝒐𝒔⁑𝒙 + π’„π’π’”β‘πŸ‘π’™)) = (sin⁑6π‘₯ )/(cos⁑6π‘₯ ) = tan 6x = R.H.S Hence L.H.S = R.H.S Hence proved

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Davneet Singh has done his B.Tech from Indian Institute of Technology, Kanpur. He has been teaching from the past 14 years. He provides courses for Maths, Science, Social Science, Physics, Chemistry, Computer Science at Teachoo.