微積分大一基礎(chǔ)知識經(jīng)典講解

1、Chapter1 Functions(函數(shù))1.Definition 1)Afunctionf is a rule that assigns to each element x in a set A exactly one element, called f(x), in a set B.2)The set A is called the domain(定義域) of the function.3)The range(值域)of f is the set of all possible values of f(x) as x varies through out the domain.2.Ba

2、sic Elementary Functions(基本初等函數(shù))1) constant functionsf(x)=c2) power functions3) exponential functions domain: R range: 4) logarithmic functions domain: range: R5) trigonometric functionsf(x)=sinx f(x)=cosx f(x)=tanx f(x)=cotx f(x)=secx f(x)=cscx6) inversetrigonometric functionsdomainrangegraphf(x)=a

3、rcsinx or f(x)=arccosx orf(x)=arctanx or Rf(x)=arccotx or R3. DefinitionGiven two functions f and g, the composite function(復(fù)合函數(shù))is defined byNote Example If find each function and its domain.4.Definition An elementary function(初等函數(shù))is constructed using combinations(addition加, subtraction減, multipli

4、cation乘, division除) and compositionstarting with basic elementary functions.Example isanelementary function.isanelementary function.1)Polynomial(多項式) Functionswhere n is a nonnegative integer.The leading coefficient(系數(shù)) The degree of the polynomial is n.In particular(特別地),The leading coefficient con

5、stant functionThe leading coefficient linear functionThe leading coefficient quadratic(二次) functionThe leading coefficient cubic(三次) function2)Rational(有理) Functions where P and Q are polynomials.3) Root Functions4.Piecewise Defined Functions(分段函數(shù))5.6.Properties(性質(zhì))1)Symmetry(對稱性)even function: in i

6、ts domain.symmetric w.r.t.(with respect to關(guān)于) the y-axis.odd function: in its domain.symmetric about the origin.2) monotonicity(單調(diào)性)A function f is called increasingon interval(區(qū)間) I if It is called decreasing on I if 3) boundedness(有界性)4) periodicity (周期性)Example f(x)=sinxChapter 2 Limits and Conti

7、nuity1.Definition We write and say “f(x) approaches(tends to趨向于) L as x tends to a ”if we can make the values of f(x) arbitrarily(任意地) close to L by taking x to be sufficiently(足夠地) close to a(on either side of a) but not equal to a.Note means that in finding the limit of f(x) as x tends to a, we ne

8、ver consider x=a.In fact, f(x) need not even be defined when x=a. The only thing that matters is how f is defined near a.2.Limit LawsSuppose that c is a constant and the limitsexist. ThenNoteFrom 2), we have3. 1)2)Note4.One-Sided Limits1)left-hand limitDefinition We write and say “f(x) tends to L as

9、 x tends to a from left ”if we can make the values of f(x) arbitrarily close to L by taking x to be sufficiently close to a and x less than a.2)right-hand limitDefinition We write and say “f(x) tends to L as x tends to a from right ”if we can make the values of f(x) arbitrarily close to L by taking x to be sufficiently close to a and x greater than a.5.TheoremSolutionSolution6.Infinitesimals(無窮小量) and infinities(無窮大量)1)Definition We say f(x) is an infinitesimal as is some number or Example1 is an infinitesimal asExample2 is an infinitesimal as2)Theoremand g(x) is bounded.Note Example 3)Defin