Question 1 - Miscellaneous - Chapter 2 Class 12 Inverse Trigonometric Functions
Last updated at Dec. 16, 2024 by Teachoo
Last updated at Dec. 16, 2024 by Teachoo
Question 1 Prove that tan−1 1/5 + tan−1 1/7 + tan−1 1/3 + tan−1 1/8 = 𝜋/4 We know that tan−1 x + tan−1 y = tan−1 ((𝐱 + 𝐲 )/(𝟏 − 𝐱𝐲)) tan−1 𝟏/𝟓 + tan−1 𝟏/𝟕 = tan−1 (1/5 + 1/7)/(1− 1/5 × 1/7) = tan−1 ((7 + 5)/(5(7)))/( (35 − 1)/35 ) = tan−1 (6/17) tan−1 𝟏/𝟑 + tan−1 𝟏/𝟖 = tan−1 (1/3 + 1/8)/(1− 1/3 × 1/8) = tan−1 ( (8 + 3)/(3(8)))/( (24 − 1)/24) = tan − 1 (11/23) Solving L.H.S tan−1 1/5 + tan−1 1/7 + tan−1 1/3 + tan−1 1/8 = ("tan−1 " 1/5 " + tan−1 " 1/7) + ("tan−1 " 1/3 " + tan−1 " 1/8) = tan-1 (𝟔/𝟏𝟕) + tan−1 (𝟏𝟏/𝟐𝟑) = tan−1 (6/17 + 11/23)/(1 − 6/17 × 11/23) We know that tan−1 x + tan−1 y = tan−1 ((𝒙 + 𝒚 )/(𝟏 − 𝒙𝒚)) Replacing x by 6/17 and y by 11/23 = tan−1 ( (6(23) + 11(17))/(17(23)))/(1 − 66/391) = tan−1 ( (138 + 187)/391)/((391 − 66)/391) = tan−1 ( 325/391)/(325/391) = tan−1 1 = tan−1 ("tan " 𝝅/𝟒) = π/4 = R.H.S Hence proved (As tan 𝜋/4 = 1)
About the Author
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 and Computer Science at Teachoo