What is SOHCAHTOA?
In Mathematics, there are different terms and definitions that are difficult to remember. Trigonometry is a part of Mathematics with many hard terms and those terms can be easily understood using the mnemonic phrase SOHCAHTOA. The mnemonic phrase SOHCAHTOA is a way of remembering three primary trigonometric ratios. Their names and abbreviations are sine (sin), cosine (cos), and tangent (tan). These three primary trigonometric ratios can be easily calculated using SOHCAHTOA.
In SOHCAHTOA,
SOH stands for Sine equals opposite over hypotenuse
Sine = \[\frac{Opposite}{Hypotenuse}\]
CAH stands for Cos equals adjacent over hypotenuse
Cosine = \[\frac{Adjacent}{Hypotenuse}\]
TOA stands for Tangent equals opposite over adjacent.
Tangent = \[\frac{Opposite}{Adjacent}\]
SOH CAH TOA Formula
In a right-angled triangle, the formula for SOH CAH TOA is given as:
SOH = Sine is opposite side over hypotenuse side.
CAH = Cosine is adjacent side over hypotenuse side.
TOA = Tangent is opposite side over adjacent side.
How To Do Trigonometry SOHCAHTOA?
In trigonometry, the right angle is a very special triangle with unique properties that are not found in the triangle. The mnemonic SOHCAHTOA is better to use here.
Let us see how to do trigonometry SOHCAHTOA in the right triangle.
In the right triangle ABC given above, angle C is a 90-degree angle and this angle is known as the right angle.
The side ‘c’ that is the longest side and opposite to the right angle is known as the hypotenuse side.
The side ‘b’ that is next to the right angle is known as the adjacent side whereas the side ‘a’ that is opposite to the right angle is known as the opposite side.
For any angle, say angle A, there are three basic trigonometric functions: These are
The sine of A
The cosine of A
The tangent of A
Now, here we will consider the mnemonic Soh - Cah -Toa.
The sine A is the ratio of the opposite sides of angle A over hypotenuse.
The cosine of A is the ratio of the adjacent sides of angle A over hypotenuse.
The tangent of A is the ratio of the opposite side of angle A divided by the hypotenuse.
Let us understand the trigonometric SOHCAHTOA with an example.
Trigonometric SOHCAHTOA Example
Let's say, you have a right-angled triangle and one of the angles of a right-angled triangle is 30 degrees. What is the length of the opposite side if the length of the hypotenuse side of a right-angled triangle is 4 units?
As we know, the value of sin 30 degrees is 12. This means the ratio between the opposite side and hypotenuse side is 1: 2., sine Using the sine formula, we get:
Sin 30⁰ = Soh = \[\frac{\text{Opposite Side}}{\text{Hypotenuse Side Side}}\]
\[\frac{1}{2}\] = \[\frac{\text{Opposite Side}}{4}\]
2 х Opposite side = 4
Opposite Side = \[\frac{4}{2}\] = 2
Therefore, the length of the opposite side is 2 units.
What is the SOHCAHTOA Used For?
SOHCAHTOA is a mnemonic way of remembering the three basic primary functions of trigonometry ratios that are used to find the unknown sides and angles of a right-angled triangle.
The term SOH, CAH, TOA in SOHCAHTOA is used to find the height of a building or the length of the shadow. With these angles, you can easily determine the angle that the shadow is cast from.
Did You Know
SOHCAHTOA Stands for
S - SINE
O - Opposite
H - Hypotenuse
C - Cosine
A - Adjacent
H - Hypotenuse
T - Tangent
O - Opposite
A - Adjacent
SOHCAHTOA Examples With Solution
1. In the Right Triangle PQR Given Below, Find the Sine, Cosine, and Tangent of Angle θ.
Considering the given angle θ in the above right-angled triangle PQR, PQ is the opposite side of angle θ, PR is the adjacent side of angle θ, and QR is the hypotenuse side of angle θ.
Accordingly,
Sin θ = SOH = \[\frac{\text{Opposite Side}}{\text{Hypotenuse Side}}\] = \[\frac{5}{13}\]
Cos θ = CAH = \[\frac{\text{Adjacent Side}}{\text{Hypotenuse Side}}\] = \[\frac{12}{13}\]
Tan θ = TOA = \[\frac{\text{Opposite Side}}{\text{Adjacent Side}}\] = \[\frac{5}{12}\]
2. In the Figure Given Below, Find the Value of Sin B, Cos C, and Tan C
Solution:
In the Δ ABD given above:
Using the Pythagorean theorem, we get
AB² = AD² + BD²
13² = AD² + 5²
AD² = 169 - 25
AD² = 144
AD = 12
In the Δ ACD given above:
Using the Pythagorean theorem, we get
AC² = AD² + CD²
AC² = 12² + 16²
AC² = 144 + 256
AC² = 400
AC² = 20
AC = 12
Accordingly,
Sin B = SOH = \[\frac{\text{Opposite Side}}{\text{Hypotenuse Side}}\] = \[\frac{AD}{AB}\] = \[\frac{12}{13}\]
Cos C = CAH = \[\frac{\text{Adjacent Side}}{\text{Hypotenuse Side}}\] = \[\frac{CD}{AC}\] = \[\frac{16}{20}\] = \[\frac{4}{5}\]
Tan C = TOA = \[\frac{\text{Opposite Side}}{\text{Adjacent Side}}\] = \[\frac{AD}{CD}\] = \[\frac{12}{16}\] = \[\frac{3}{4}\]
FAQs on SOHCAHTOA
1. What is SOHCAHTOA in Class 10 Maths, and what does each part of the mnemonic mean?
SOHCAHTOA is a mnemonic device used in trigonometry to remember the relationships between the sides of a right-angled triangle and its angles. It helps recall the three primary trigonometric ratios:
- SOH: Sine = Opposite / Hypotenuse
- CAH: Cosine = Adjacent / Hypotenuse
- TOA: Tangent = Opposite / Adjacent
The 'Opposite' and 'Adjacent' sides are defined in relation to the specific acute angle being considered.
2. How do you apply SOHCAHTOA to find the length of an unknown side in a right-angled triangle?
To find an unknown side length using SOHCAHTOA, you can follow these steps:
- Step 1: Identify the known angle and the known side length. Determine whether the known side is opposite the angle, adjacent to it, or the hypotenuse.
- Step 2: Identify the side you need to find (Opposite, Adjacent, or Hypotenuse).
- Step 3: Choose the correct trigonometric ratio (SOH, CAH, or TOA) that connects the known angle, the known side, and the unknown side.
- Step 4: Set up the equation and solve for the unknown side length.
3. Why does the SOHCAHTOA rule only work for right-angled triangles?
SOHCAHTOA is fundamentally based on the specific properties of a right-angled triangle. The definitions of Opposite, Adjacent, and especially the Hypotenuse (the side opposite the 90° angle) are fixed and unambiguous only in this context. In triangles that are not right-angled (oblique triangles), there is no hypotenuse, and the relationships between sides and angles are described by other rules, such as the Sine Rule or the Cosine Rule.
4. How do you correctly identify the 'Opposite' and 'Adjacent' sides relative to an angle?
This is a common point of confusion. The identification of these sides is always relative to the acute angle (θ) you are focusing on:
- The Hypotenuse is always the longest side, directly opposite the right angle. It never changes.
- The Opposite side is the side directly across from the angle θ; it does not touch the angle.
- The Adjacent side is the side that is next to the angle θ, but is not the hypotenuse.
If you change the reference angle, the Opposite and Adjacent sides will switch roles.
5. Is SOHCAHTOA considered a formula itself in trigonometry?
No, SOHCAHTOA is not a formula. It is a mnemonic, which is a memory aid. It helps you remember the actual formulas for the three basic trigonometric functions:
- The formula for Sine is: sin(θ) = Opposite/Hypotenuse
- The formula for Cosine is: cos(θ) = Adjacent/Hypotenuse
- The formula for Tangent is: tan(θ) = Opposite/Adjacent
SOHCAHTOA is simply a convenient way to recall these three fundamental equations.
6. How are the other trigonometric ratios like Cosecant (csc), Secant (sec), and Cotangent (cot) related to SOHCAHTOA?
Cosecant, Secant, and Cotangent are the reciprocal ratios of Sine, Cosine, and Tangent, respectively. While SOHCAHTOA doesn't directly name them, it provides the foundation for them:
- Cosecant (csc) is the reciprocal of Sine, so csc(θ) = Hypotenuse / Opposite.
- Secant (sec) is the reciprocal of Cosine, so sec(θ) = Hypotenuse / Adjacent.
- Cotangent (cot) is the reciprocal of Tangent, so cot(θ) = Adjacent / Opposite.
7. What is an example of using SOHCAHTOA to find a missing angle?
Imagine a right-angled triangle where the side opposite angle 'A' is 8 cm and the hypotenuse is 10 cm. To find angle A:
- Identify knowns: You have the Opposite side (8) and the Hypotenuse (10).
- Choose the ratio: The ratio that uses Opposite and Hypotenuse is SOH (Sine).
- Set up the equation: sin(A) = Opposite / Hypotenuse = 8 / 10 = 0.8.
- Solve for the angle: To find A, you use the inverse sine function: A = sin⁻¹(0.8). Using a calculator, this gives A ≈ 53.13°.
