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9780521704632c06 CUFX213A/Peck 9780521618168 December 27, 2007 14:11
Section IBasic principlesy
Tangents to the
curve. Values
given by
differentiationyAB xAUC between
times A and B
given by integrationx(a)(b)Figure 6.7.Differentiation and integration.(a) Shows that when the equation for the curve
is differentiated it produces an expression that will give the value for the gradient of the
tangent to the curve at any selected point. (b) When finding the area under the curve (AUC),
it is essential to know the limiting values between which an area is defined. In the example
here, the upper limit is x=B and the lower limit x=A.Differentiation
Differentiation is a mathematical process used to find an expression that gives the
rate at which the variable represented on the y-axis changes as x changes. When
evaluated, the expression gives the gradient of the tangent to the curve for each
value of x (Figure6.7a). For the function y=f(x) we indicate that differentiation is
needed by writing:dy/dx.
Because differentiation only tells us about therateat which a function is changing all
functions whose graphs have exactly the same shape, but only differ in their position