Motivation
You may need the material of this chapter for:- finding and interpreting rates of change such as velocity, acceleration, etc.
- interpreting solutions of differential equations
- finding optimal values of various engineering variables
- sketching the graph of an engineering function
- finding areas, centroids, etc.
- evaluating volumes, moments of inertia, etc.
- evaluating mean and rms values of alternating currents
- evaluating probability, the mean and standard deviation in statistics
10.1 Review
10.1.1 The derivative as a gradient and rate of change ➤292 309➤➤
For each of the following functions find:(a) The gradient or slope of the graph of the function at the point specified
(b) The rate of change of the function at the point specified
(i) y=x^2 , x= 1 (ii)y=cosx, x=π10.1.2 Tangent and normal to a curve ➤293 310➤➤
Find the equations of the (i) tangent and (ii) the normal to the curvey=x^2 −x−1at
the point (2, 1).10.1.3 Stationary points and points of inflection ➤294 310➤➤
Locate and classify any stationary points and points of inflection of the following functions(i) 16x− 3 x^3 (ii) x+1
x(iii) xex(iv) sinxcosx (v) x^410.1.4 Curve sketching in Cartesian coordinates ➤299 310➤➤
Sketch the functions given in Q10.1.3.10.1.5 Applications of integration – area under a curve ➤304 310➤➤
A.Find the area enclosed between the curve, thex-axis and the limits stated for each of
the following cases:
(i) y= 4 x^2 + 1 x=0, 2 (ii) y=xex x=0, 1B.Find the area enclosed between the curvesy=x^2 −xandy= 2 x−x^2.