证明 (cos θ sec θ)/cot θ = tan θ
三角学是一门数学学科,研究直角三角形的边长和角之间的关系。三角函数,也称为测角函数、角函数或圆函数,是建立角度与直角三角形两条边之比之间关系的函数。六个主要的三角函数是正弦、余弦、正切、余切、正割或余割。
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°.
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如上图中的直角三角形所示:
- 斜边:与直角相对的边是斜边,它是直角三角形中最长的边,与90°角相对。
- 底:角 C 所在的一侧称为底。
- 垂直:考虑角度 C 的对边。
三角函数
三角函数有 6 个基本的三角函数,它们是正弦、余弦、正切、余割、正割和余切。现在让我们看看三角函数。六个三角函数如下,
- 正弦:它被定义为垂直和斜边的比率,它表示为 sin θ
- 余弦:定义为底边与斜边的比值,表示为 cos θ
- 正切:它被定义为一个角度的正弦和余弦之比。因此,切线的定义是垂直与底的比值,并表示为 tan θ
- cosecant:它是 sin θ 的倒数,表示为 cosec θ。
- 割线:它是 cos θ 的倒数,表示为 sec θ。
- cotangent:它是 tan θ 的倒数,表示为 cot θ。
根据上图,三角比是
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
互惠身份
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
三角比值 0° 30° 45° 60° 90° Sin θ 0 1/2 1/√2 √3/2 1 Cos θ 1 √3/2 1/√2 1/2 0 Tan θ 0 1/√3 1 √3 Not Defined Sec θ Not Defined 2 √2 2/√3 1 Cosec θ 1 2/√3 √2 2 Not Defined Cot θ Not Defined √3 1 1/√3 0
补角和补角的三角恒等式
- 互补角:和等于90°的一对角
- 补角:和等于 180° 的一对角
互补角的恒等式是
sin (90° – θ) = cos θ
cos (90° – θ) = sin θ
tan (90° – θ) = cot θ
cot (90° – θ) = tan θ
sec (90° – θ) = cosec θ
cosec (90° – θ) = sec θ
补角的恒等式
sin (180° – θ) = sin θ
cos (180° – θ) = – cos θ
tan (180° – θ) = – tan θ
cot (180° – θ) = – cot θ
sec (180° – θ) = – sec θ
cosec (180° – θ) = – cosec θ
三角学象限
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证明 (cos θ sec θ)/cot θ = tan θ
解决方案:
Here we have cos theta sec theta / cot theta = tan theta
Therefore { cos θ sec θ }/ cot θ = tan θ
By taking L.H.S
cos θ sec θ / cot θ
we can write cos θ sec θ as 1
= (cos θ sec θ )/cot θ
= 1/cot θ { Cos θ = 1/ Sec θ therefore Cos θ Sec θ = 1}
= tan θ { Tan θ = 1 / Cot θ }
Therefore LHS = RHS
{cos θ sec θ}/ cot θ = tan θ
Hence Proved
类似问题
问题 1:如果 A、B 和 C 是三角形 ABC 的内角,那么证明 sin [(B + C)/2] = cos A/2?
解决方案:
Here We will use the trigonometric ratios of complementary angles
sin (90° – θ) = cosθ
As We know that for ΔABC,
∠A + ∠B + ∠C = 180° (Angle sum property of triangle)
∠B + ∠C = 180° – ∠A
On dividing both sides by 2, we get,
(∠B + ∠C)/2 = (180° – ∠A)/2
(∠B + ∠C)/2 = 90° – ∠A/2
Now, Applying sin angles on both the sides:
Therefrore
sin {(∠B + ∠C)/2} = sin (90° – ∠A/2) {Since, sin (90° – θ) = cos θ}
sin (∠B + ∠C)/2 = cos A/2
Hence Proved
问题 2:证明 (1 – sin 2 θ) sec 2 θ = 1
解决方案:
We have (1 – sin2 θ )sec2 θ = 1
Take LHS
= (1 – sin2 θ )sec2 θ
= cos2 θ sec2 θ { 1 – sin2 θ = cos2 θ }
= cos2 θ (1/cos2θ) { sec θ = 1 /cos θ or sec2 θ = 1/cos2 θ }
= 1
= RHS
Therefore
(1 – sin2 θ )sec2 θ = 1
Hence Proved