Trigonometric ratios are the ratios of the side lengths of a right-angled triangle. Three common trigonometric ratios are the sine (sin), cosine (cos), and tangent (tan). There are three more trigonometric ratios, cosecant (cosec), secant (sec), and cotangent (cot), that is, the inverse of sine, cosine, and tangent.
Thus, it is used to determine the ratios of any 2 sides of a right-angled triangle with respect to specific angles.
The value of these trigonometric ratios is calculated using the measure of any special acute angle θ in a right-angled triangle.
Formulas
The standard formulas for the given trigonometric ratios for θ (where θ is an acute angle) are:
Sine (sin): It is the ratio of the opposite side (perpendicular side) to θ to the hypotenuse
∴ sin θ = Opposite side/ Hypotenuse
Cosine (cos): It is the ratio of the adjacent side to θ to the hypotenuse
∴ cos θ = Adjacent side/ Hypotenuse
Tangent (tan): It is the ratio of the opposite side to θ to the side adjacent to θ
∴ tan θ = Opposite side/ Adjacent side
Cosecant (cosec): It is the multiplicative inverse of sine
∴ cosec θ = 1/sin θ = Hypotenuse /Opposite side
Secant (sec): It is the multiplicative inverse of cosine
∴ sec θ = 1/cos θ = Hypotenuse/ Adjacent side
Cotangent (cot): It is the multiplicative inverse of tangent
∴ cot θ = 1/tan θ = Adjacent side/Opposite side
In the given right-triangle ABC, the trigonometric ratios are shown:
Trigonometric Ratios
Thus, with respect to ∠C, the ratios of trigonometry are:
sine C = Side opposite to ∠C/Hypotenuse = AB/AC
cos C = Side adjacent to ∠C/Hypotenuse = BC/AC
tan C = Side opposite to ∠C/Side adjacent to ∠) = AB/BC = sin ∠C/cos ∠C
cosec C= 1/sin C = Hypotenuse/ Side Opposite to ∠C = AC/AB
sec C = 1/cos C = Hypotenuse/ Side Opposite to ∠C = AC/BC
cot C = 1/tan C = Side adjacent to ∠C/Side opposite to ∠C = BC/AB
All the ratios written above for ∠C in all possible right triangles will be the same. The same being with ∠A
An Easy Way to Remember Trigonometric Ratios
The word sohcahtoa can be used to remember the trigonometric ratio formulas of sine, cosine, and tangent:
Acronyms
Descriptions
Formulas
SOH
Sine is Opposite over Hypotenuse
Sin θ = Opposite side/ Hypotenuse
CAH
Cosine is Adjacent over Hypotenuse
Cos θ = Adjacent side/ Hypotenuse
TOA
Tangent is Opposite over Adjacent
Tan θ = Opposite side/ Adjacent side
Trigonometric Ratios Table
The trigonometric ratios table displays the values of trigonometric ratios for the standard angles 0°, 30°, 45°, 60°, and 90° used in several trigonometric calculations.
Trigonometric Ratios Table
Trigonometric Ratios Identities
Several trigonometric ratios identities make our calculations simpler such as:
sin2 θ + cos2 θ = 1
1 + tan2 θ = sec2 θ
1 + cot2 θ = cosec2 θ
There are also some variations of the above 3 identities, which are nothing but rearranging the ones given above.
Trigonometric Ratios of Complementary Angles Identities
The complement of an angle θ is (90° – θ). Accordingly, the trigonometric ratios of complementary angles are:
sin (90°- θ) = cos θ
cos (90°- θ) = sin θ
cosec (90°- θ) = sec θ
sec (90°- θ) = cosec θ
tan (90°- θ) = cot θ
cot (90°- θ) = tan θ
Other Trigonometric Ratios Identities
The sum, difference, and product trigonometric ratios identities are:
sin (A + B) = sin A cos B + cos A sin B
sin (A – B) = sin A cos B – cos A sin B
cos (A + B) = cos A cos B – sin A sin B
cos (A – B) = cos A cos B + sin A sin B
tan (A + B) = (tan A + tan B)/ (1 – tan A tan B)
tan (A – B) = (tan A – tan B)/ (1 + tan A tan B)
cot (A + B) = (cot A cot B – 1)/(cot B – cot A)
cot (A – B) = (cot A cot B + 1)/(cot B – cot A)
2 sin A⋅cos B = sin(A + B) + sin(A – B)
2 cos A⋅cos B = cos(A + B) + cos(A – B)
2 sin A⋅sin B = cos(A – B) – cos(A + B)
The half, double, and triple-angles trigonometric ratios identities
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