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Important Inverse Trignometric Functions Formulas for JEE and NEET
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Page 1 Page # 44 INVERSE TRIGONOMETRIC FUNCTIONS 1. Principal Values & Domains of Inverse Trigonometric/Circular Functions: Function Domain Range (i) y = sin ?1 x where ? 1 ? x ? 1 ? ? ? ? ? 2 2 y (ii) y = cos ?1 x where ? 1 ? x ? 1 0 ? y ? ? (iii) y = tan ?1 x where x ? R 2 y 2 ? ? ? ? ? (iv) y = cosec ?1 x where x ? ? 1 or x ? 1 ? ? ? ? ? 2 2 y , y ? 0 (v) y = sec ?1 x where x ? ?1 or x ? 1 0 ? y ? ?; y ? ? 2 (vi) y = cot ?1 x where x ? R 0 < y < ? Page 2 Page # 44 INVERSE TRIGONOMETRIC FUNCTIONS 1. Principal Values & Domains of Inverse Trigonometric/Circular Functions: Function Domain Range (i) y = sin ?1 x where ? 1 ? x ? 1 ? ? ? ? ? 2 2 y (ii) y = cos ?1 x where ? 1 ? x ? 1 0 ? y ? ? (iii) y = tan ?1 x where x ? R 2 y 2 ? ? ? ? ? (iv) y = cosec ?1 x where x ? ? 1 or x ? 1 ? ? ? ? ? 2 2 y , y ? 0 (v) y = sec ?1 x where x ? ?1 or x ? 1 0 ? y ? ?; y ? ? 2 (vi) y = cot ?1 x where x ? R 0 < y < ? Page # 45 P - 2 (i) sin ?1 (sin x) = x, ? ? ? ? ? 2 2 x (ii) cos ?1 (cos x) = x; 0 ? x ? ? (iii) tan ?1 (tan x) = x; ? ? ? ? ? 2 2 x (iv) cot ?1 (cot x) = x; 0 < x < ? (v) sec ?1 (sec x) = x; 0 ? x ? ?, x ? 2 ? (vi) cosec ?1 (cosec x) = x; x ? 0, ? ? ? ? ? 2 2 x P - 3 (i) sin ?1 ( ?x) = ? sin ?1 x, ??????????1 ? x ? 1 (ii) tan ?1 ( ?x) = ? tan ?1 x, x ? R (iii) cos ?1 ( ?x) = ? ? cos ?1 x, ???1 ? x ? 1 (iv) cot ?1 ( ?x) = ? ? cot ?1 x, x ? R P - 5 (i) sin ?1 x + cos ?1 x = ? 2 , ?1 ? x ? 1 (ii) tan ?1 x + cot ?1 x = ? 2 , x ? R (iii) cosec ?1 x + sec ?1 x = ? 2 , ?x ? ? 1 2. Identities of Addition and Substraction: I - 1 (i) sin ?1 x + sin ?1 y = sin ?1 x y y x 1 1 2 2 ? ? ? ? ? ? ? ? ? , x ? 0, y ? 0 & (x 2 + y 2 ) ? 1 = ? ? sin ?1 x y y x 1 1 2 2 ? ? ? ? ? ? ? ? ? , x ? 0, y ? 0 & x 2 + y 2 > 1 (ii) cos ?1 x + cos ?1 y = cos ?1 x y x y ? ? ? ? ? ? ? ? ? 1 1 2 2 , x ? 0, y ? 0 (iii) tan ?1 x + tan ?1 y = tan ?1 x y xy ? ? 1 , x > 0, y > 0 & xy < 1 = ? + tan ?1 x y xy ? ? 1 , x > 0, y > 0 & xy > 1 = ? 2 , x > 0, y > 0 & xy = 1 Page 3 Page # 44 INVERSE TRIGONOMETRIC FUNCTIONS 1. Principal Values & Domains of Inverse Trigonometric/Circular Functions: Function Domain Range (i) y = sin ?1 x where ? 1 ? x ? 1 ? ? ? ? ? 2 2 y (ii) y = cos ?1 x where ? 1 ? x ? 1 0 ? y ? ? (iii) y = tan ?1 x where x ? R 2 y 2 ? ? ? ? ? (iv) y = cosec ?1 x where x ? ? 1 or x ? 1 ? ? ? ? ? 2 2 y , y ? 0 (v) y = sec ?1 x where x ? ?1 or x ? 1 0 ? y ? ?; y ? ? 2 (vi) y = cot ?1 x where x ? R 0 < y < ? Page # 45 P - 2 (i) sin ?1 (sin x) = x, ? ? ? ? ? 2 2 x (ii) cos ?1 (cos x) = x; 0 ? x ? ? (iii) tan ?1 (tan x) = x; ? ? ? ? ? 2 2 x (iv) cot ?1 (cot x) = x; 0 < x < ? (v) sec ?1 (sec x) = x; 0 ? x ? ?, x ? 2 ? (vi) cosec ?1 (cosec x) = x; x ? 0, ? ? ? ? ? 2 2 x P - 3 (i) sin ?1 ( ?x) = ? sin ?1 x, ??????????1 ? x ? 1 (ii) tan ?1 ( ?x) = ? tan ?1 x, x ? R (iii) cos ?1 ( ?x) = ? ? cos ?1 x, ???1 ? x ? 1 (iv) cot ?1 ( ?x) = ? ? cot ?1 x, x ? R P - 5 (i) sin ?1 x + cos ?1 x = ? 2 , ?1 ? x ? 1 (ii) tan ?1 x + cot ?1 x = ? 2 , x ? R (iii) cosec ?1 x + sec ?1 x = ? 2 , ?x ? ? 1 2. Identities of Addition and Substraction: I - 1 (i) sin ?1 x + sin ?1 y = sin ?1 x y y x 1 1 2 2 ? ? ? ? ? ? ? ? ? , x ? 0, y ? 0 & (x 2 + y 2 ) ? 1 = ? ? sin ?1 x y y x 1 1 2 2 ? ? ? ? ? ? ? ? ? , x ? 0, y ? 0 & x 2 + y 2 > 1 (ii) cos ?1 x + cos ?1 y = cos ?1 x y x y ? ? ? ? ? ? ? ? ? 1 1 2 2 , x ? 0, y ? 0 (iii) tan ?1 x + tan ?1 y = tan ?1 x y xy ? ? 1 , x > 0, y > 0 & xy < 1 = ? + tan ?1 x y xy ? ? 1 , x > 0, y > 0 & xy > 1 = ? 2 , x > 0, y > 0 & xy = 1 Page # 46 I - 2 (i) sin ?1 x ? sin ?1 y = sin ?1 ? ? ? ? ? ? ? ? ? 2 2 x1 y y1 x , x ? 0, y ? 0 (ii) cos ?1 x ? cos ?1 y = cos ?1 ? ? ? ? ? ? ? ? ? 2 2 y 1 x 1 y x , x ? 0, y ? 0, x ? y (iii) tan ?1 x ? tan ?1 y = tan ?1 y x 1 y x ? ? , x ? 0, y ? 0 I - 3 (i) sin ?1 ? ? ? ? ? ? ? 2 x 1 x 2 = ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? 2 1 2 1 2 1 x if x sin 2 x if x sin 2 | x | if x sin 2 1 1 1 (ii) cos ?1 (2 x 2 ? 1) = ? ? ? ? ? ? ? ? ? ? ? ? ? 0 x 1 if x cos 2 2 1 x 0 if x cos 2 1 1 (iii) tan ?1 2 x 1 x 2 ? = ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? 1 x if x tan 2 1 x if x tan 2 1 | x | if x tan 2 1 1 1 (iv) sin ?1 2 1 2 x x ? = ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? 1 x if x tan 2 1 x if x tan 2 1 | x | if x tan 2 1 1 1 (v) cos ?1 2 2 x 1 x 1 ? ? = ? ? ? ? ? ? ? ? ? 0 x if x tan 2 0 x if x tan 2 1 1 If tan ?1 x + tan ?1 y + tan ?1 z = tan ?1 ? ? ? ? ? ? ? ? ? ??? xz zy y x 1 zyx z y x if, x > 0, y > 0, z > 0 & (xy + yz + zx) < 1 NOTE: (i) If tan ?1 x + tan ?1 y + tan ?1 z = ? then x + y + z = xyz (ii) If tan ?1 x + tan ?1 y + tan ?1 z = ? 2 then xy + yz + zx = 1 (iii) tan ?1 1 + tan ?1 2 + tan ?1 3 = ?Read More
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