1.5 Equations, statements, and graphs 39calculus, most of our work with equations and graphs will be done with
the aid of the calculus.Problems 1.59
Sketch graphs of the following equations and inequalities:1 yx 2 x0 3 y0
4 y=(x-1)2 5 y=(x+1)2 6 y=x3
7 y=1+x 8 y=1+x2 9xy=-110 y+x^111 y(1+x)2^1 12 y1+x2^1
x 1(^13) y +x2 14 y=x+ 1 15 y=x -I
16 y=IxI 17 y=Ix-2I 18 y= (x+IxI)
19 0<x<1 20 0<y<1 21 0<x+y<1
22 Ixl<1 23 Ix-2I< (^24) <x<
25 y < x2 (^26) lyi < Ixi (^27) Iyi < x2
28 lxi + IyI (^29) IxI + IYI < 1 30 Ixi + IYI > 1
31 With Figure 1.58 out of sight, sketch graphs of y= sin x and y = cos x.
If unsuccessful, glance at Figure 1.58 and try again.
32 Figure 1.591, which features half of an equilateral triangle each side of
which has length 2, shows that
r 1
sin 6 = 2' cos 6 = 2 sin 3 = (^2) cos (^3) = i
AI %\
Cultivate the ability to sketch this figure quickly. Use the I \
information obtained from it to locate points on the graphs a
or y = sin x ana y = cos x. sketch a right triangle in 1
which each leg has unit length and obtain more points on Figure 1.591
the graphs. Finally, sketch graphs of y = sin x and
y = cos x again. Remark: We need familiarity with our graphs, and we need
confidence in them.
33 Sketch graphs of
(a) y = 3 sin x (b) y = sin 2x (c) y = sin (x + 2)
Remark: Graphs of equations of the form y = E sin (wx + a) are called sinusoids,
and we hear very often that E is the amplitude, w is the angular frequency, and
a is the phase angle of the sinusoid.
34 Where are the points (x,y) for which 0 5 x S 2ir and sin x 5 y S cos x?
35 Supposing that h 0 0, find the slope m of the secant line (or chord)
containing the two points of the graph of the equation y = x2 having x coordi-
nates xl and xl + It. 11ns.: 2xi + h.
(^36) It is sometimes quite important to have correct information about the
graphs of y = x8 and y = xK Sketch the graphs over the interval -2 5 x 5 2.