Subscribe to our Youtube Channel - https://www.youtube.com/channel/UCZBx269Tl5Os5NHlSbVX4Kg
Example 29 - Chapter 3 Class 11 Trigonometric Functions
Last updated at Feb. 13, 2020 by Teachoo
Transcript
Example 29 Prove that cos2 ๐ฅ+cos2 (๐ฅ+๐/3) + cos2 (๐ฅโ๐/3) = 3/2 Lets first calculate all 3 terms separately We know that cos 2x = 2 cos2 x โ 1 cos 2x + 1 = 2cos2 x ๐๐๐ โกใ2๐ฅ + 1ใ/2 = cos2 x So, cos2 x = ๐๐จ๐ฌโกใ๐๐ + ๐ใ/๐ Replacing x with ("x + " ๐/3) is about cos2 ("x" +๐/3) = cosโกใ2(๐ฅ + ๐/3)+1ใ/2 = cosโกใ(2๐ฅ + 2๐/3) + 1ใ/2 Similarly, Replacing x with ("x โ" ๐/3) in cos2 x = cosโกใ2๐ฅ + 1ใ/2 cos2 ("x" โ๐/3) = cosโกใ2(๐ฅ โ ๐/3)+ 1ใ/2 = cosโกใ(2๐ฅ โ 2๐/3)+ 1ใ/2 Solving L.H.S cos2 x + cos2 (๐ฅ+ ๐/3) + cos2 (๐ฅโ๐/3) = (1 + cosโก2๐ฅ)/2 + (1 + cosโก(2๐ฅ + 2๐/3))/2 + (1 + cosโก(2๐ฅ โ 2๐/3))/2 = 1/2 [1+cosโกใ2๐ฅ+1+๐๐๐ (2๐ฅ+2๐/3)+1+๐๐๐ (2๐ฅโ2๐/3)ใ ] = 1/2 [3+cosโกใ2๐ฅ+๐๐๐ (2๐ฅ+2๐/3)+๐๐๐ (2๐ฅโ2๐/3)ใ ] = 1/2 [3+cosโกใ2๐ฅ+2๐๐๐ ((2๐ฅ + 2๐/3 + 2๐ฅ โ 2๐/3)/2).๐๐๐ ((2๐ฅ + 2๐/3 โ(2๐ฅ โ 2๐/3))/2)ใ ] Using cos x + cos y = 2 cos ((๐ฅ + ๐ฆ)/2). cos ((๐ฅ โ ๐ฆ)/2) Replace x by ("2" ๐ฅ" + " 2๐/3) & y by ("2x โ " 2๐/3) = 1/2 [3+cosโกใ2๐ฅ+2๐๐๐ ((4๐ฅ + 0)/2).๐๐๐ ((0 + 4๐/3)/2)ใ ] = 1/2 [3+cosโกใ2๐ฅ+2๐๐๐ (4๐ฅ/2).๐๐๐ ((4๐/3)/2)ใ ] = 1/2 [3+cosโกใ2๐ฅ+2 cosโก2๐ฅ cosโกใ2๐/3ใ ใ ] = 1/2 [3+cosโกใ2๐ฅ+2 cosโก2๐ฅ cosโก(๐โ๐/3) ใ ] = 1/2 [3+cosโกใ2๐ฅ+2 cosโก2๐ฅ ใ (ใโcosใโก(๐/3) ) ] = 1/2 [3+cosโกใ2๐ฅ+2 cosโก2๐ฅ ใ (โ1/2) ] (As cos (ฯ โ ๐) = โcos ๐) = 1/2 [3+cosโกใ2๐ฅโ2 ร1/2รcosโก2๐ฅ ใ ] = 1/2 [3+cosโกใ2๐ฅโcosโก2๐ฅ ใ ] = 1/2 [3+0] = 3/2 = R.H.S. Hence, L.H.S. = R.H.S. Hence Proved
Examples
Example 1
Example 2
Example 3
Example 4
Example 5 Important
Example 6 Important
Example 7 Important
Example 8
Example 9 Important
Example 10
Example 11 Important
Example 12
Example 13
Example 14
Example 15
Example 16 Important
Example 17 Important
Example 18
Example 19 Important
Example 20
Example 21
Example 22 Important
Example 23
Example 24 Important
Example 25 Important
Example 26 Important
Example 27 Important
Example 28 Important
Example 29 Important You are here
Chapter 3 Class 11 Trigonometric Functions
Serial order wise
About the Author
Davneet Singh
Davneet Singh is a graduate from Indian Institute of Technology, Kanpur. He has been teaching from the past 9 years. He provides courses for Maths and Science at Teachoo.