Trigonometry basic and advance concepts, Relations, Rules, Formulae, identities, theorems
What is trigonometry definition
Trigonometry (from Greek "tri" meaning three, "gon" meaning side and metron meaning measure) is a branch of mathematics that studies relationships between side lengths and angles of triangles.
Trigonometry uses & trigonometry practical applications.
Trigonometry has been applied in area such as Engineering, surveying, navigation, mechanics, geodesy, construction.
Trigonometric ratios
Trigonometric ratio help in finding the missing angles and sides of triangle.
trigonometric ratios are ratio between sides of
Let us take a Right Angle triangle as ABC
- Trigonometry Addition Formulae & Trigonometry Subtraction Formulae
sin(A+B) = sinA.cosB + cosA.sinB
sin(A−B) = sinA.cosB − cosA.sinB
cos(A+B) = cosA.cosB − sinA.sinB
cos(A−B) = cosA.cosB + sinA.sinB
tan(A+B)=1 − tanAtanBtanA + tanB
tan(A−B)=1 + tanAtanBtanA − tanB
cot(A±B)=cotAcotB ± 1cotAcotB ∓ 1
tan(4Ï€±Î¸)=1 ∓ tanθ1 ± tanθ
cot(4Ï€±Î¸)=cotθ ± 1cotθ ∓ 1
- Trigonometry Multiple & Trigonometry Submultiple Angle Formulae
sin2θ =2sinθcosθ =1+tan2θ2tanθ
cos2θ =cos2θ−sin2θ
=2cos2θ−1 =1−2sin2θ =1+tan2θ1−tan2θ
tan2θ =1−tan2θ2tanθ
cos3θ =4cos3θ−3cosθ
sin3θ =3sinθ−4sin3θ
sin3θ =43sinθ−sin3θ
tan3θ =1−3tan2θ
3tanθ−tan3θ
3tanθ−tan3θ
cos3θ =43cosθ + cos 3θ
- Trigonometry Identities Formulae
sin2θ+cos2θ =1 1+tan2θ =sec2θ 1+cot2θ =cosec2θ
- Trigonometric Relations Formulae
tanθ =cos θ sin θ
cot θ =sin θ cos θ
cot θ =tan θ 1
cosec θ =sin θ 1
sec θ =cos θ 1
- Table of Trigonometric Ratios or Trigonometry ratios tables
trigonometry table download
Checkout our post on Physics concept
