Mathematics 12th + JEE Tangent and Normals
Slope of Tangent and Normal
Equations of the Tangents and the Normals
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Kumar Rohan
Physics and Mathematics
Tangents & Normals — Complete Formula
- ⭐ – Most used in JEE
- ⚠️ – Common Mistake
- 💡 – Memory Hint
Slope of Tangent
| Concept | Formula | Symbols Meaning | Key Notes / Tricks |
|---|---|---|---|
| Slope | [m = \dfrac{dy}{dx}] | [m] = slope, [y] = dependent variable, [x] = independent variable | Instantaneous slope ⭐ |
💡 Memory Hint:
Derivative gives slope of tangent
Equation of Tangent
Point Form
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Tangent | [y – y_1 = m(x – x_1)] | [(x_1, y_1)] = point of contact, [m] = slope at that point | Most used ⭐ |
General Form
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Tangent | Substitute [y = f(x)] in point form | [f(x)] = function | Standard method ⭐ |
Normal to the Curve
Slope of Normal
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Slope | [m_n = -\dfrac{1}{m}] | [m_n] = slope of normal, [m] = slope of tangent | Negative reciprocal ⭐ |
Equation of Normal
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Normal | [y – y_1 = m_n(x – x_1)] | [(x_1, y_1)] = point | Direct application ⭐ |
💡 Memory Hint:
Normal ⟂ tangent
Parametric Form
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Slope | [\dfrac{dy}{dx} = \dfrac{dy/dt}{dx/dt}] | [t] = parameter | Important ⭐ |
| Tangent | Use slope in point form | — | Standard approach |
Implicit Function
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Slope | Differentiate implicitly | [y] depends on [x] | Solve for [\dfrac{dy}{dx}] ⭐ |
Angle Between Two Curves
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Angle | [\tan\theta = \left( \dfrac{m_1 – m_2}{1 + m_1 m_2}\right)] |
Condition of Parallel & Perpendicular Tangents
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Parallel | [m_1 = m_2] | — | Same slope ⭐ |
| Perpendicular | [m_1 m_2 = -1] | — | Negative reciprocal ⭐ |
Subtangent and Subnormal
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Subtangent | [\dfrac{y}{dy/dx}] | [y] = ordinate | Important ⭐ |
| Subnormal | [y \cdot \dfrac{dy}{dx}] | — | Less frequent |
💡 Memory Hint:
Subtangent = y / slope
Length of Tangent & Normal
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Tangent Length | [\left( y \sqrt{1 + \left(\dfrac{dy}{dx}\right)^2}\right)] | ||
| Normal Length | [\left( y \sqrt{1 + \dfrac{1}{(dy/dx)^2}}\right)] |
Derivative at a Point (Alternate Form)
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Slope at [x = a] | [m = f'(a)] | — | Direct substitution ⭐ |
Special Cases
| Concept | Formula | Symbols Meaning | Key Notes |
|---|---|---|---|
| Horizontal Tangent | [\dfrac{dy}{dx} = 0] | — | Flat line ⭐ |
| Vertical Tangent | [\dfrac{dx}{dy} = 0] | — | Infinite slope ⚠️ |
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