找出 cot(7pi/4) 的准确值

Angles defined by the ratios of trigonometric functions are known as trigonometry angles. Trigonometric angles represent trigonometric functions. The value of the angle can be anywhere between 0-360°.

• Sin θ = Perpendicular / Hypotenuse = AB/AC
• Cosine θ = Base / Hypotenuse = BC / AC
• Tangent θ = Perpendicular / Base = AB / BC
• Cosecant θ = Hypotenuse / Perpendicular = AC/AB
• Secant θ = Hypotenuse / Base = AC/BC
• Cotangent θ = Base / Perpendicular = BC/AB

Sin θ = 1/ Cosec θ                    OR        Cosec θ = 1/ Sin θ

Cos θ = 1/ Sec θ                       OR        Sec θ = 1 / Cos θ

Cot θ = 1 / Tan θ                     OR         Tan θ = 1 / Cot θ

Cot θ = Cos θ / Sin θ               OR         Tan θ = Sin θ / Cos θ

Tan θ.Cot θ = 1

As we have cot(7π/4)

We can write it as cot (2π – π/4)

= cot (8π – π) / 4

= cot (7π/4)                                   {7pi/4 lies in the 4th Quadrant}

Therefore cot (2π – π/4) = -cot π/4           { cot  (180° – θ) = – cot θ }

                                      =  -1

As we have sin (7π/4)

We can write as sin (2π – π/4)

= sin(8π – π) / 4

= sin(7π/4)                                   {7pi/4 lies in the 4th Quadrant}

Therefore sin (2π – π/4) = sin π/4           {sin (180° – θ) = sin θ}

                                      = 1/√2

As we have tan (7π/4)

We can write as tan (2π – π/4)

= tan (8π – π) / 4

= tan (7π/4)                                   {7pi/4 lies in the 4th Quadrant}

Therefore tan (2π – π/4) = -tan π/4           { tan (180° – θ) = – tan θ }

                                      =  -1