1—Basic Stuff 17OR, if you’re clever with partial fractions, you might realize that you can rearrangefas
x
a^2 −x^2
=
− 1 / 2
x−a
+
− 1 / 2
x+a
,
and then follow the ideas of techniques 8 and 9 to sketch the graph. It’s not obvious that this is any
easier; it’s just different.
Exercises1 Expressexin terms of hyperbolic functions.
2 Ifsinhx= 4/ 3 , what iscoshx? What istanhx?
3 Iftanhx= 5/ 13 , what issinhx? What iscoshx?
4 Letnandmbe positive integers. Leta=n^2 −m^2 , b= 2nm,c=n^2 +m^2. Show thata-b-c
form the integer sides of a right triangle. What are the first three independent “Pythagorean triples?”
By that I mean ones that aren’t just a multiple of one of the others.
5 Evaluate the integral
∫a0 dxx
(^2) cosx. Use parametric differentiation starting withcosαx.
6 Evaluate
∫a
0 dxxsinhxby parametric differentiation.
7 Differentiatexexsinxcoshxwith respect tox.
8 Differentiate
∫x 20 dtsin(xt)with respect tox.
9 Differentiate
∫+x−xdte
−xt^4 with respect tox.
10 Differentiate
∫+x−xdtsin(xt
(^3) )with respect tox.
11 Differentiate
∫√^3 sin(kx)
0 dte
−αt^3 J 0 (βt)with respect tox.J 0 is a Bessel function.
12 Sketch the functiony=v 0 t−gt^2 / 2. (First step: set all constants to one.v 0 =g= 2 = 1. Except
exponents)
13 Sketch the functionU=−mgy+ky^2 / 2. (Again: set the constant factors to one.)
14 SketchU=mg`(1−cosθ).
15 SketchV=−V 0 e−x
(^2) /a 2
.
16 Sketchx=x 0 e−αtsinωt.
17 Is it all right in Eq. (1.22) to replace “∆xk→ 0 ” with “N→∞?” [No.]
18 Draw a graph of the curve parametrized asx= cosθ,y= sinθ.
Draw a graph of the curve parametrized asx= coshθ,y= sinhθ.
19 What is the integral
∫badxe
−x^2?