In calculus, differentiation is a fundamental concept used to find the rate of change of a function. One of the most commonly asked differentiation problems involves trigonometric functions, including cotangent (cot x).
This topic will explain:
✔ The definition of cot x
✔ The formula for differentiating cot x
✔ A step-by-step derivation of d/dx (cot x)
✔ Examples of differentiation involving cot x
✔ The real-world applications of cotangent differentiation
Let’s explore the differentiation of cot x in detail!
1. What Is Cot x?
Cotangent, written as cot x, is a trigonometric function defined as:
This function is the reciprocal of the tangent function:
Understanding this definition helps in finding the derivative of cot x more easily.
2. What Is the Differentiation Formula of Cot x?
The derivative of cot x with respect to x is given by the formula:
where csc x (cosecant) is another trigonometric function defined as:
So, the derivative of cot x results in a negative squared cosecant function.
3. Step-by-Step Derivation of d/dx (cot x)
To find the derivative of cot x, we use the quotient rule, since cot x is written as cos x / sin x.
Step 1: Use the Quotient Rule
The quotient rule states that if a function is in the form f(x) / g(x), then its derivative is:
For cot x = cos x / sin x, let:
✔ f(x) = cos x (numerator)
✔ g(x) = sin x (denominator)
Now, differentiate both:
✔ f'(x) = -sin x
✔ g'(x) = cos x
Step 2: Apply the Quotient Rule
Step 3: Use the Pythagorean Identity
We use the identity:
So,
Thus,
Since 1 / sin² x = csc² x, we get:
This confirms the differentiation formula! ✅
4. Examples of Differentiating Cot x
Example 1: Basic Differentiation
Find d/dx (cot x)
Solution:
That’s the direct formula!
Example 2: Differentiating a Function Involving Cotangent
Find d/dx (cot 3x)
Solution:
Use the chain rule, where cot u has derivative -csc² u · du/dx.
Here, u = 3x, so du/dx = 3.
Example 3: Finding the Tangent Line
Find the equation of the tangent line to y = cot x at x = frac{pi}{4}.
Solution:
Step 1: Differentiate y = cot x
Step 2: Find the slope at x = π/4
Since sin(π/4) = 1/√2, we get:
So,
Step 3: Use the point-slope equation y – y₁ = m(x – x₁)
At x = π/4, cot (π/4) = 1, so y₁ = 1.
This is the equation of the tangent line.
5. Real-World Applications of Differentiating Cot x
Differentiating cotangent has various applications in mathematics, physics, and engineering.
✔ Physics – Used in wave motion and oscillation problems.
✔ Engineering – Helps in analyzing slopes in mechanical structures.
✔ Economics – Used in modeling rate changes in economic trends.
For example, in optics, cotangent functions are used to describe light wave behavior in lenses and mirrors.
The differentiation of cot x follows a standard formula:
✔ Definition – Cotangent is cos x / sin x.
✔ Formula – The derivative of cot x is -csc² x.
✔ Step-by-Step Derivation – Using the quotient rule, we get the result.
✔ Examples – Differentiating cot x, cot 3x, and finding tangent lines.
✔ Applications – Used in physics, engineering, and economics.
Understanding the derivative of cot x is essential for solving advanced calculus problems and real-world applications. 🎯