Hyperbolic Functions in Maths: Formulas, Properties & Applications

The concept of hyperbolic functions plays a key role in mathematics and is widely applicable to both real-life situations and exam scenarios. These functions serve as the counterparts of trigonometric functions but are defined using hyperbolas rather than circles. Understanding hyperbolic functions is crucial for students in Class 11 and 12, as well as those preparing for JEE, NEET, and other competitive exams.

What Is Hyperbolic Functions?

Hyperbolic functions are mathematical functions analogous to trigonometric functions, but they are based on the properties of the unit hyperbola instead of the unit circle. The main hyperbolic functions are sinh, cosh, tanh, and their reciprocals and inverses. You’ll find this concept applied in areas such as calculus, differential equations, and complex numbers.

Key Formula for Hyperbolic Functions

Here are the standard formulas for the six basic hyperbolic functions, defined using exponential functions:

Function	Definition	Domain	Range
sinh x	\( \frac{e^x - e^{-x}}{2} \)	\( \mathbb{R} \)	\( \mathbb{R} \)
cosh x	\( \frac{e^x + e^{-x}}{2} \)	\( \mathbb{R} \)	\( [1, \infty) \)
tanh x	\( \frac{sinh\,x}{cosh\,x} = \frac{e^x - e^{-x}}{e^x + e^{-x}} \)	\( \mathbb{R} \)	\( (-1, 1) \)
coth x	\( \frac{cosh\,x}{sinh\,x} \)	\( \mathbb{R}, x \neq 0 \)	\( (-\infty, -1)\cup(1, \infty) \)
sech x	\( \frac{1}{cosh\,x} \)	\( \mathbb{R} \)	\( (0, 1] \)
csch x	\( \frac{1}{sinh\,x} \)	\( \mathbb{R}, x \neq 0 \)	\( (-\infty, 0)\cup(0, \infty) \)

Cross-Disciplinary Usage

Hyperbolic functions are not only useful in Maths but also play an important role in Physics, Computer Science, and engineering. For instance, they are used in the study of special relativity, architecture (like the shape of suspension bridge cables), and signal processing. Students preparing for competitive exams like JEE or NEET will see their relevance in calculus and applied problems.

Properties and Identities of Hyperbolic Functions

• sinh(−x) = −sinh(x)     (odd function)
• cosh(−x) = cosh(x)      (even function)
• cosh²x − sinh²x = 1
• tanh x = sinh x / cosh x
• sum and difference formulas:
  sinh(x ± y) = sinh x cosh y ± cosh x sinh y
  cosh(x ± y) = cosh x cosh y ± sinh x sinh y

Step-by-Step Illustration

1. Express \( e^x \) and \( e^{-x} \) in terms of sinh x and cosh x:
   
   Add = cosh x + sinh x = \( \frac{e^x + e^{-x}}{2} \) + \( \frac{e^x - e^{-x}}{2} \) = \( e^x \)
   Subtract = cosh x − sinh x = \( e^{-x} \)
2. Solve: Simplify \( \frac{sinh\,x}{cosh\,x} \):
   
   \( \frac{(e^x - e^{-x})/2}{(e^x + e^{-x})/2} = \frac{e^x - e^{-x}}{e^x + e^{-x}} = tanh\,x \)

Derivatives and Integrals of Hyperbolic Functions

Function	Derivative	Integral
sinh x	cosh x	cosh x + C
cosh x	sinh x	sinh x + C
tanh x	sech2x	ln|cosh x| + C

Inverse Hyperbolic Functions

The inverses of hyperbolic functions are also important. They are called area hyperbolic functions and are used to find the value of x for a given value of a hyperbolic function.

Function	Inverse Formula
sinh-1x	ln(x + √(x2 + 1))
cosh-1x	ln(x + √(x2 - 1))
tanh-1x	0.5 × ln((1 + x)/(1 − x))

Speed Trick or Vedic Shortcut

Here’s a quick way to remember the derivatives of hyperbolic functions: They are similar to trigonometric functions, but there is no sign change. For example, the derivative of sinh x is cosh x, and the derivative of cosh x is sinh x (not negative). This trick helps avoid common mistakes in differentiation during board or JEE exams.

Example Trick: If you know the derivatives of sine and cosine (sin' = cos, cos' = -sin), just drop the minus sign for their hyperbolic counterparts!

Tricks like this can save you precious seconds in competitive exams. Vedantu’s live classes cover these subtle differences for better exam performance.

Try These Yourself

• Find the value of sinh(0) and cosh(0).
• Simplify \( tanh^2 x + sech^2 x \).
• Prove: cosh²x – sinh²x = 1.
• Differentiate tanh x with respect to x.

Frequent Errors and Misunderstandings

• Confusing hyperbolic functions with trigonometric functions—especially in derivatives or signs.
• Forgetting domains in inverse hyperbolic formulas.
• Mixing up properties: e.g., thinking sinh x is always positive like sin x (it's not—it takes all real values).

Relation to Other Concepts

The idea of hyperbolic functions connects closely with topics such as Trigonometric Functions and Exponential Functions. Mastering this helps with understanding advanced calculus, differential equations, and the transformation of equations from the circular to hyperbolic form. Check out Derivatives of Parametric Functions for more applications.

Applications and Problem-Solving

Hyperbolic functions appear in real-world problems, such as the shape of cables on suspension bridges (called catenary curves) and in the solutions of certain integrals. Here’s a classic example:

1. Model the cable of a suspension bridge as \( y(x) = a \cosh(x/a) + b \).

2. If the lowest point of the cable is at (0, 30) and the cable is attached to pillars at x = ±140, y = 80:

3. Substitute into the formula:

\( 30 = a \cosh(0/a) + b \implies 30 = a + b \)

\( 80 = a \cosh(140/a) + b \)

4. Solve these equations to find values for a and b using algebra (or a calculator).

5. Use these values to write the final equation for the bridge cable.

Summary Table & Quick Revision

Formula	Key Points
cosh2x − sinh2x = 1	Pythagorean-like identity
sinh(−x) = −sinh(x),   cosh(−x) = cosh(x)	Even/Odd properties
tanh x = sinh x / cosh x	Definition from basics
sinh-1x = ln(x + √(x2 + 1))	Inverse formula

Classroom Tip

A quick way to remember hyperbolic identities is: They mostly look like trigonometric identities—but with signs changed here and there. Vedantu’s teachers often use visual comparisons and color-coded charts to make learning these more memorable during live classes.

We explored hyperbolic functions—from definition, formulas, examples, common mistakes, and their connection to other mathematical topics. Continue practicing with Vedantu to become confident in solving problems using this concept. For deeper insights, visit Integration by Substitution and Inverse Trigonometric Functions for related techniques.