STROUD Worked examples and exercises are in the text PROGRAMME F11 DIFFERENTIATION.

STROUD Worked examples and exercises are in the text PROGRAMME F11 DIFFERENTIATION

STROUD Worked examples and exercises are in the text The gradient of a straight-line graph The gradient of a curve at a given point Algebraic determination of the gradient of a curve Derivatives of powers of x Differentiation of polynomials Derivatives – an alternative notation Differentiation of products of functions Differentiation of a quotient of two functions Functions of a function Second derivatives Newton-Raphson iterative method [optional] Programme F11: Differentiation

STROUD Worked examples and exercises are in the text The gradient of a straight-line graph Programme F11: Differentiation The gradient of the sloping line straight line in the figure is defined as: the vertical distance the line rises and falls between the two points P and Q the horizontal distance between P and Q

STROUD Worked examples and exercises are in the text The gradient of a straight-line graph Programme F11: Differentiation The gradient of the sloping straight line in the figure is given as:

STROUD Worked examples and exercises are in the text The gradient of a straight-line graph The gradient of a curve at a given point Algebraic determination of the gradient of a curve Derivatives of powers of x Differentiation of polynomials Derivatives – an alternative notation Differentiation of products of functions Differentiation of a quotient of two functions Functions of a function Second derivatives Newton-Raphson iterative method Programme F11: Differentiation

STROUD Worked examples and exercises are in the text The gradient of a curve at a given point Programme F11: Differentiation The gradient of a curve between two points will depend on the points chosen:

STROUD Worked examples and exercises are in the text The gradient of a curve at a given point The gradient of a curve at a point P is defined to be the gradient of the tangent at that point:

STROUD Worked examples and exercises are in the text The gradient of a straight-line graph The gradient of a curve at a given point Algebraic determination of the gradient of a curve Derivatives of powers of x Differentiation of polynomials Derivatives – an alternative notation Differentiation of products of functions Differentiation of a quotient of two functions Functions of a function (Second derivatives –MOVED to a later set of slides) Newton-Raphson iterative method Programme F11: Differentiation

STROUD Worked examples and exercises are in the text Algebraic determination of the gradient of a curve Programme F11: Differentiation The gradient of the chord PQ is and the gradient of the tangent at P is

STROUD Worked examples and exercises are in the text Algebraic determination of the gradient of a curve Programme F11: Differentiation As Q moves to P so the chord rotates. When Q reaches P the chord is coincident with the tangent.

STROUD Worked examples and exercises are in the text The gradient of a straight-line graph The gradient of a curve at a given point Algebraic determination of the gradient of a curve Derivatives of powers of x Differentiation of polynomials Derivatives – an alternative notation Differentiation of products of functions Differentiation of a quotient of two functions Functions of a function Newton-Raphson iterative method Programme F11: Differentiation

STROUD Worked examples and exercises are in the text Derivatives of powers of x Two straight lines Two curves Programme F11: Differentiation

STROUD Worked examples and exercises are in the text Derivatives of powers of x Two straight lines Programme F11: Differentiation (a)

STROUD Worked examples and exercises are in the text Derivatives of powers of x Two straight lines (b) Programme F11: Differentiation

STROUD Worked examples and exercises are in the text Derivatives of powers of x Two curves Programme F11: Differentiation (a) so

STROUD Worked examples and exercises are in the text Derivatives of powers of x Two curves Programme F11: Differentiation (b) so

STROUD Worked examples and exercises are in the text Derivatives of powers of x A clear pattern is emerging:

STROUD Worked examples and exercises are in the text Algebraic determination of the gradient of a curve At Q: So As Therefore called the derivative of y with respect to x.

STROUD Worked examples and exercises are in the text Differentiation of polynomials Programme F11: Differentiation To differentiate a polynomial, we differentiate each term in turn:

STROUD Worked examples and exercises are in the text Derivatives – an alternative notation Programme F11: Differentiation The double statement: can be written as:

STROUD Worked examples and exercises are in the text Towards derivatives of trigonometric functions (JAB) Limiting value of is 1 I showed this in an earlier lecture by a rough argument. Following slide includes most of a rigorous argument. Programme F11: Differentiation

STROUD Worked examples and exercises are in the text Programme F11: Differentiation Area of triangle POA is: Area of sector POA is: Area of triangle POT is: Therefore: That is ((using fact that the cosine tends to 1 -- JAB)):

STROUD Worked examples and exercises are in the text Derivatives of trigonometric functions and … Programme F11: Differentiation The table of standard derivatives can be extended to include trigonometric and the exponential functions: ((JAB:)) The trig cases use the identities for finding sine and cosine of the sum of two angles, and an approximation I gave earlier for the cosine of a small angle. (Shown in class).

STROUD Worked examples and exercises are in the text Differentiation of products of functions Programme F11: Differentiation Given the product of functions of x: then: This is called the product rule.

STROUD Worked examples and exercises are in the text Differentiation of a quotient of two functions Programme F11: Differentiation Given the quotient of functions of x: then: This is called the quotient rule.

STROUD Worked examples and exercises are in the text Functions of a function Differentiation of a function of a function To differentiate a function of a function we employ the chain rule. If y is a function of u which is itself a function of x so that: Then: This is called the chain rule. Programme F11: Differentiation

STROUD Worked examples and exercises are in the text Functions of a function Differentiation of a function of a function Programme F11: Differentiation Many functions of a function can be differentiated at sight by a slight modification to the list of standard derivatives:

STROUD Worked examples and exercises are in the text The gradient of a straight-line graph The gradient of a curve at a given point Algebraic determination of the gradient of a curve Derivatives of powers of x Differentiation of polynomials Derivatives – an alternative notation Differentiation of products of functions Differentiation of a quotient of two functions Functions of a function Newton-Raphson iterative method [optional] Programme F11: Differentiation

STROUD Worked examples and exercises are in the text Newton-Raphson iterative method [OPTIONAL] Tabular display of results Programme F11: Differentiation Given that x 0 is an approximate solution to the equation f(x) = 0 then a better solution is given as x 1, where: This gives rise to a series of improving solutions by iteration using: A tabular display of improving solutions can be produced in a spreadsheet.

STROUD Worked examples and exercises are in the text PROGRAMME F11 DIFFERENTIATION.

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STROUD Worked examples and exercises are in the text PROGRAMME F11 DIFFERENTIATION.

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Presentation on theme: "STROUD Worked examples and exercises are in the text PROGRAMME F11 DIFFERENTIATION."— Presentation transcript:

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