Tangents and Normals The equation of a tangent and normal takes the form of a straight line i.e. To find the equation you need to find a value for x, y.

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Presentation transcript:

Tangents and Normals The equation of a tangent and normal takes the form of a straight line i.e. To find the equation you need to find a value for x, y and m and then substitute to find the value of c.

Find the equation of the tangent to the curve y = x2 – 3x + 18 at the point (1, 16). x = 1 y = 16 Substituting

To find the equation of the normal, use the perpendicular gradient i.e.

Worksheet 2

Rules of Differentiation Differentiating Trig Functions

A list of the trigonometry differentials is given in your formula sheet.

Exponential

Chain Rule applies when we have a function of a function e. g Chain Rule applies when we have a function of a function e.g. Take two functions: Now combine them into one function by eliminating u Function 1 Function 2

Chain Rule applies when we have a function of a function e. g Chain Rule applies when we have a function of a function e.g. Take two functions: Note: Function 1 Function 2

Think of it like this: Differentiate the first function as a whole and then differentiate what is inside of it.

Differentiate function 1 Think of it like this: Differentiate the first function as a whole... Differentiate function 1

Think of it like this: Differentiate the first function as a whole and then differentiate what is inside of it. Then function 2

Example: Function 1 Function 2 Differential of 2x + 4 Differential of sin

Differentiating logs Note: You can only differentiate natural log so any other base needs to be converted first.

Examples

Hard Example 1 4 3 2 4 1 3 2

Product Rule

Product Rule f g

Product Rule

Product Rule

Quotient Rule

Quotient Rule f g

Quotient Rule

Quotient Rule

Quotient Rule

Quotient Rule

Quotient Rule

When a curve is written in the form it is said to be defined explicitly. When a curve is written in the form it is said to be defined implicitly. Example:

Implicit differentiation Differentiating with respect to x

Implicit differentiation Differentiating with respect to x

Implicit differentiation Differentiating with respect to x

Implicit differentiation

Implicit differentiation

Parametric Equations

Parametric Equations

Parametric Equations

Parametric Equations

Example 2

Second derivative

Second derivative

Second derivative

Example 2