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PROF.

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00:00:22,076 --> 00:00:26,950
JERISON: We're starting
a new unit today.

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00:00:26,950 --> 00:00:39,050
And, so this is Unit 2, and
it's called Applications

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00:00:39,050 --> 00:00:48,810
of Differentiation.

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00:00:48,810 --> 00:00:51,200
OK.

13
00:00:51,200 --> 00:00:57,400
So, the first application, and
we're going to do two today,

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00:00:57,400 --> 00:01:04,030
is what are known as
linear approximations.

15
00:01:04,030 --> 00:01:06,310
Whoops, that should
have two p's in it.

16
00:01:06,310 --> 00:01:12,460
Approximations.

17
00:01:12,460 --> 00:01:16,360
So, that can be summarized
with one formula,

18
00:01:16,360 --> 00:01:19,040
but it's going to take
us at least half an hour

19
00:01:19,040 --> 00:01:21,960
to explain how this
formula is used.

20
00:01:21,960 --> 00:01:24,100
So here's the formula.

21
00:01:24,100 --> 00:01:34,390
It's f(x) is approximately equal
to its value at a base point

22
00:01:34,390 --> 00:01:38,260
plus the derivative
times x - x_0.

23
00:01:38,260 --> 00:01:38,760
Right?

24
00:01:38,760 --> 00:01:42,720
So this is the main formula.

25
00:01:42,720 --> 00:01:44,310
For right now.

26
00:01:44,310 --> 00:01:52,140
Put it in a box.

27
00:01:52,140 --> 00:01:57,430
And let me just describe
what it means, first.

28
00:01:57,430 --> 00:01:59,830
And then I'll describe
what it means again,

29
00:01:59,830 --> 00:02:01,780
and several other times.

30
00:02:01,780 --> 00:02:04,690
So, first of all,
what it means is

31
00:02:04,690 --> 00:02:11,140
that if you have a
curve, which is y = f(x),

32
00:02:11,140 --> 00:02:18,860
it's approximately the
same as its tangent line.

33
00:02:18,860 --> 00:02:37,020
So this other side is the
equation of the tangent line.

34
00:02:37,020 --> 00:02:43,090
So let's give an example.

35
00:02:43,090 --> 00:02:50,190
I'm going to take the
function f(x), which is ln x,

36
00:02:50,190 --> 00:02:53,980
and then its derivative is 1/x.

37
00:02:58,990 --> 00:03:03,800
And, so let's take the
base point x_0 = 1.

38
00:03:03,800 --> 00:03:05,470
That's pretty much
the only place where

39
00:03:05,470 --> 00:03:08,900
we know the logarithm for sure.

40
00:03:08,900 --> 00:03:13,360
And so, what we plug in
here now, are the values.

41
00:03:13,360 --> 00:03:17,890
So f(1) is the log of 0.

42
00:03:17,890 --> 00:03:20,750
Or, sorry, the log
of 1, which is 0.

43
00:03:20,750 --> 00:03:28,130
And f'(1), well,
that's 1/1, which is 1.

44
00:03:28,130 --> 00:03:31,100
So now we have an
approximation formula which,

45
00:03:31,100 --> 00:03:34,020
if I copy down
what's right up here,

46
00:03:34,020 --> 00:03:40,560
it's going to be ln x is
approximately, so f(0)

47
00:03:40,560 --> 00:03:44,480
is 0, right?

48
00:03:44,480 --> 00:03:49,700
Plus 1 times (x - 1).

49
00:03:49,700 --> 00:03:52,910
So I plugged in here,
for x_0, three places.

50
00:03:52,910 --> 00:04:00,670
I evaluated the coefficients and
this is the dependent variable.

51
00:04:00,670 --> 00:04:03,720
So, all told, if you
like, what I have here

52
00:04:03,720 --> 00:04:11,100
is that the logarithm of
x is approximately x - 1.

53
00:04:11,100 --> 00:04:16,660
And let me draw a
picture of this.

54
00:04:16,660 --> 00:04:22,310
So here's the graph of ln x.

55
00:04:22,310 --> 00:04:26,920
And then, I'll draw in the
tangent line at the place

56
00:04:26,920 --> 00:04:30,350
that we're considering,
which is x = 1.

57
00:04:30,350 --> 00:04:33,030
So here's the tangent line.

58
00:04:33,030 --> 00:04:35,195
And I've separated a
little bit, but really

59
00:04:35,195 --> 00:04:37,551
I probably should have drawn
it a little closer there,

60
00:04:37,551 --> 00:04:38,050
to show you.

61
00:04:38,050 --> 00:04:42,870
The whole point is that
these two are nearby.

62
00:04:42,870 --> 00:04:44,400
But they're not
nearby everywhere.

63
00:04:44,400 --> 00:04:50,130
So this is the line y = x - 1.

64
00:04:50,130 --> 00:04:51,960
Right, that's the tangent line.

65
00:04:51,960 --> 00:04:55,240
They're nearby only
when x is near 1.

66
00:04:55,240 --> 00:04:58,010
So say in this
little realm here.

67
00:04:58,010 --> 00:05:05,050
So when x is approximately
1, this is true.

68
00:05:05,050 --> 00:05:06,580
Once you get a
little farther away,

69
00:05:06,580 --> 00:05:08,413
this straight line,
this straight green line

70
00:05:08,413 --> 00:05:10,540
will separate from the graph.

71
00:05:10,540 --> 00:05:14,610
But near this place
they're close together.

72
00:05:14,610 --> 00:05:17,920
So the idea, again, is that
the curve, the curved line,

73
00:05:17,920 --> 00:05:19,770
is approximately
the tangent line.

74
00:05:19,770 --> 00:05:25,350
And this is one example of it.

75
00:05:25,350 --> 00:05:29,850
All right, so I want to
explain this in one more way.

76
00:05:29,850 --> 00:05:32,690
And then we want to
discuss it systematically.

77
00:05:32,690 --> 00:05:37,090
So the second way that
I want to describe this

78
00:05:37,090 --> 00:05:39,310
requires me to remind
you what the definition

79
00:05:39,310 --> 00:05:41,290
of the derivative is.

80
00:05:41,290 --> 00:05:46,370
So, the definition
of a derivative

81
00:05:46,370 --> 00:05:53,360
is that it's the limit, as delta
x goes to 0, of delta f / delta

82
00:05:53,360 --> 00:05:56,410
x, that's one way of
writing it, all right?

83
00:05:56,410 --> 00:06:01,260
And this is the
way we defined it.

84
00:06:01,260 --> 00:06:03,860
And one of the things that
we did in the first unit

85
00:06:03,860 --> 00:06:09,070
was we looked at this backwards.

86
00:06:09,070 --> 00:06:12,890
We used the derivative knowing
the derivatives of functions

87
00:06:12,890 --> 00:06:14,250
to evaluate some limits.

88
00:06:14,250 --> 00:06:17,860
So you were supposed
to do that on your.

89
00:06:17,860 --> 00:06:21,200
In our test, there were
some examples there,

90
00:06:21,200 --> 00:06:23,200
at least one example,
where that was the easiest

91
00:06:23,200 --> 00:06:26,140
way to do the problem.

92
00:06:26,140 --> 00:06:28,850
So in other words, you can
read this equation both ways.

93
00:06:28,850 --> 00:06:31,770
This is really, of course, the
same equation written twice.

94
00:06:31,770 --> 00:06:34,970
Now, what's new about
what we're going to do now

95
00:06:34,970 --> 00:06:40,150
is that we're going to take
this expression here, delta f

96
00:06:40,150 --> 00:06:42,910
/ delta x, and
we're going to say

97
00:06:42,910 --> 00:06:45,810
well, when delta x
is fairly near 0,

98
00:06:45,810 --> 00:06:47,360
this expression is
going to be fairly

99
00:06:47,360 --> 00:06:49,450
close to the limiting value.

100
00:06:49,450 --> 00:06:53,760
So this is
approximately f'(x_0).

101
00:06:53,760 --> 00:07:00,730
So that, I claim, is the same
as what's in the box in pink

102
00:07:00,730 --> 00:07:02,810
that I have over here.

103
00:07:02,810 --> 00:07:10,840
So this approximation formula
here is the same as this one.

104
00:07:10,840 --> 00:07:13,760
This is an average
rate of change,

105
00:07:13,760 --> 00:07:16,420
and this is an infinitesimal
rate of change.

106
00:07:16,420 --> 00:07:17,980
And they're nearly the same.

107
00:07:17,980 --> 00:07:19,230
That's the claim.

108
00:07:19,230 --> 00:07:22,950
So you'll have various exercises
in which this approximation is

109
00:07:22,950 --> 00:07:25,220
the useful one to use.

110
00:07:25,220 --> 00:07:28,860
And I will, as I said, I'll be
illustrating this a little bit

111
00:07:28,860 --> 00:07:29,610
today.

112
00:07:29,610 --> 00:07:34,060
Now, let me just explain why
those two formulas in the boxes

113
00:07:34,060 --> 00:07:36,560
are the same.

114
00:07:36,560 --> 00:07:41,110
So let's just start over
here and explain that.

115
00:07:41,110 --> 00:07:47,150
So the smaller box is the same
thing if I multiply through

116
00:07:47,150 --> 00:07:55,490
by delta x, as delta f is
approximately f'(x_0) delta x.

117
00:07:55,490 --> 00:07:57,290
And now if I just
write out what this

118
00:07:57,290 --> 00:08:09,820
is, it's f(x),
right, minus f(x_0),

119
00:08:09,820 --> 00:08:11,630
I'm going to write it this way.

120
00:08:11,630 --> 00:08:16,450
Which is approximately
f'(x_0), and this is x - x_0.

121
00:08:16,450 --> 00:08:25,670
So here I'm using the
notations delta x is x - x0.

122
00:08:25,670 --> 00:08:28,160
And so this is the
change in f, this

123
00:08:28,160 --> 00:08:32,270
is just rewriting
what delta x is.

124
00:08:32,270 --> 00:08:36,480
And now the last step is
just to put the constant

125
00:08:36,480 --> 00:08:37,430
on the other side.

126
00:08:37,430 --> 00:08:47,010
So f(x) is approximately
f(x_0) + f'(x_0)(x - x_0).

127
00:08:47,010 --> 00:08:51,920
So this is exactly what I had
just to begin with, right?

128
00:08:51,920 --> 00:08:53,570
So these two are
just algebraically

129
00:08:53,570 --> 00:08:56,690
the same statement.

130
00:08:56,690 --> 00:09:00,660
That's one another
way of looking at it.

131
00:09:00,660 --> 00:09:05,100
All right, so now,
I want to go through

132
00:09:05,100 --> 00:09:08,590
some systematic
discussion here of

133
00:09:08,590 --> 00:09:12,250
several linear approximations,
which you're going

134
00:09:12,250 --> 00:09:14,850
to be wanting to memorize.

135
00:09:14,850 --> 00:09:18,020
And rather than it's being
hard to memorize these,

136
00:09:18,020 --> 00:09:19,760
it's supposed to remind you.

137
00:09:19,760 --> 00:09:22,440
So that you'll have a lot
of extra reinforcement

138
00:09:22,440 --> 00:09:25,240
in remembering
derivatives of all kinds.

139
00:09:25,240 --> 00:09:31,240
So, when we carry out these
systematic discussions,

140
00:09:31,240 --> 00:09:33,060
we want to make
things absolutely as

141
00:09:33,060 --> 00:09:34,550
simple as possible.

142
00:09:34,550 --> 00:09:36,640
And so one of the
things that we do

143
00:09:36,640 --> 00:09:40,380
is we always use the
base point to be x_0.

144
00:09:40,380 --> 00:09:44,180
So I'm always going
to have x_0 = 0

145
00:09:44,180 --> 00:09:48,920
in this standard list of
formulas that I'm going to use.

146
00:09:48,920 --> 00:09:52,030
And if I put x_0 =
0, then this formula

147
00:09:52,030 --> 00:09:56,130
becomes f(x), a little
bit simpler to read.

148
00:09:56,130 --> 00:09:59,980
It becomes f(x)
is f(0) + f'(0) x.

149
00:10:03,520 --> 00:10:05,950
So this is probably
the form that you'll

150
00:10:05,950 --> 00:10:10,680
want to remember most.

151
00:10:10,680 --> 00:10:12,580
That's again, just the
linear approximation.

152
00:10:12,580 --> 00:10:16,010
But one always has
to remember, and this

153
00:10:16,010 --> 00:10:22,650
is a very important thing, this
one only worked near x is 1.

154
00:10:22,650 --> 00:10:29,170
This approximation here really
only works when x is near x_0.

155
00:10:29,170 --> 00:10:31,600
So that's a little addition
that you need to throw in.

156
00:10:31,600 --> 00:10:38,810
So this one works
when x is near 0.

157
00:10:38,810 --> 00:10:40,770
You can't expect it
to be true far away.

158
00:10:40,770 --> 00:10:42,790
The curve can go
anywhere it wants,

159
00:10:42,790 --> 00:10:46,500
when it's far away from
the point of tangency.

160
00:10:46,500 --> 00:10:49,060
So, OK, so let's work this out.

161
00:10:49,060 --> 00:10:51,560
Let's do it for
the sine function,

162
00:10:51,560 --> 00:10:56,401
for the cosine function,
and for e^x, to begin with.

163
00:10:56,401 --> 00:10:56,900
Yeah.

164
00:10:56,900 --> 00:10:57,400
Question.

165
00:10:57,400 --> 00:11:02,522
STUDENT: [INAUDIBLE]

166
00:11:02,522 --> 00:11:03,022
PROF.

167
00:11:03,022 --> 00:11:03,126
JERISON: Yeah.

168
00:11:03,126 --> 00:11:04,125
When does this one work.

169
00:11:04,125 --> 00:11:07,410
Well, so the question was,
when does this one work.

170
00:11:07,410 --> 00:11:12,100
Again, this is when x
is approximately x_0.

171
00:11:12,100 --> 00:11:18,130
Because it's actually the
same as this one over here.

172
00:11:18,130 --> 00:11:20,050
OK.

173
00:11:20,050 --> 00:11:23,010
And indeed, that's
what's going on when

174
00:11:23,010 --> 00:11:24,870
we take this limiting value.

175
00:11:24,870 --> 00:11:26,760
Delta x going to 0 is the same.

176
00:11:26,760 --> 00:11:27,980
Delta x small.

177
00:11:27,980 --> 00:11:37,050
So another way of saying it
is, the delta x is small.

178
00:11:37,050 --> 00:11:41,030
Now, exactly what we mean by
small will also be explained.

179
00:11:41,030 --> 00:11:45,240
But it is a matter to
some extent of intuition

180
00:11:45,240 --> 00:11:47,620
as to how much, how good it is.

181
00:11:47,620 --> 00:11:49,650
In practical cases,
people will really

182
00:11:49,650 --> 00:11:52,950
care about how small it is
before the approximation is

183
00:11:52,950 --> 00:11:53,970
useful.

184
00:11:53,970 --> 00:11:56,710
And that's a serious issue.

185
00:11:56,710 --> 00:12:00,200
All right, so let me carry out
these approximations for x.

186
00:12:00,200 --> 00:12:06,710
Again, this is
always for x near 0.

187
00:12:06,710 --> 00:12:08,930
So all of these are
going to be for x near 0.

188
00:12:08,930 --> 00:12:10,790
So in order to make
this computation,

189
00:12:10,790 --> 00:12:15,170
I have to evaluate the function.

190
00:12:15,170 --> 00:12:17,817
I need to plug in
two numbers here.

191
00:12:17,817 --> 00:12:19,150
In order to get this expression.

192
00:12:19,150 --> 00:12:23,070
I need to know what f(0) is and
I need to know what f'(0) is.

193
00:12:23,070 --> 00:12:26,110
If this is the function f(x),
then I'm going to make a little

194
00:12:26,110 --> 00:12:30,615
table over to the right here
with f' and then I'm going

195
00:12:30,615 --> 00:12:33,160
to evaluate f(0), and
then I'm going to evaluate

196
00:12:33,160 --> 00:12:38,150
f'(0), and then read off
what the answers are.

197
00:12:38,150 --> 00:12:41,450
Right, so first of all if
the function is sine x,

198
00:12:41,450 --> 00:12:44,170
the derivative is cosine x.

199
00:12:44,170 --> 00:12:49,690
The value of f(0),
that's sine of 0, is 0.

200
00:12:49,690 --> 00:12:51,550
The derivative is cosine.

201
00:12:51,550 --> 00:12:54,060
Cosine of 0 is 1.

202
00:12:54,060 --> 00:12:55,350
So there we go.

203
00:12:55,350 --> 00:12:58,850
So now we have the
coefficients 0 and 1.

204
00:12:58,850 --> 00:13:01,070
So this number is 0.

205
00:13:01,070 --> 00:13:04,480
And this number is 1.

206
00:13:04,480 --> 00:13:11,310
So what we get here is 0 + 1x,
so this is approximately x.

207
00:13:11,310 --> 00:13:18,080
There's the linear
approximation to sin x.

208
00:13:18,080 --> 00:13:20,570
Similarly, so now this
is a routine matter

209
00:13:20,570 --> 00:13:22,440
to just read this
off for this table.

210
00:13:22,440 --> 00:13:23,940
We'll do it for the
cosine function.

211
00:13:23,940 --> 00:13:30,230
If you differentiate the
cosine, what you get is -sin x.

212
00:13:30,230 --> 00:13:34,940
The value at 0 is 1, so
that's cosine of 0 at 1.

213
00:13:34,940 --> 00:13:39,540
The value of this
minus sine at 0 is 0.

214
00:13:39,540 --> 00:13:43,890
So this is going back
over here, 1 + 0x,

215
00:13:43,890 --> 00:13:48,170
so this is approximately 1.

216
00:13:48,170 --> 00:13:52,300
This linear function
happens to be constant.

217
00:13:52,300 --> 00:13:58,730
And finally, if I do need e^x,
its derivative is again e^x,

218
00:13:58,730 --> 00:14:02,840
and its value at 0 is 1, the
value of the derivative at 0 is

219
00:14:02,840 --> 00:14:04,180
also 1.

220
00:14:04,180 --> 00:14:09,500
So both of the terms here,
f(0) and f'(0), they're both 1

221
00:14:09,500 --> 00:14:15,400
and we get 1 + x.

222
00:14:15,400 --> 00:14:18,360
So these are the
linear approximations.

223
00:14:18,360 --> 00:14:19,610
You can memorize these.

224
00:14:19,610 --> 00:14:23,940
You'll probably remember them
either this way or that way.

225
00:14:23,940 --> 00:14:26,130
This collection of
information here

226
00:14:26,130 --> 00:14:28,556
encodes the same
collection of information

227
00:14:28,556 --> 00:14:29,430
as we have over here.

228
00:14:29,430 --> 00:14:31,460
For the values of the
function and the values

229
00:14:31,460 --> 00:14:36,310
of their derivatives at 0.

230
00:14:36,310 --> 00:14:39,370
So let me just emphasize again
the geometric point of view

231
00:14:39,370 --> 00:14:48,840
by drawing pictures
of these results.

232
00:14:48,840 --> 00:14:56,605
So first of all, for the sine
function, here's the sine

233
00:14:56,605 --> 00:15:03,500
- well, close enough.

234
00:15:03,500 --> 00:15:07,170
So that's - boy, now that is
quite some sine, isn't it?

235
00:15:07,170 --> 00:15:10,570
I should try to make the two
bumps be the same height,

236
00:15:10,570 --> 00:15:11,870
roughly speaking.

237
00:15:11,870 --> 00:15:15,450
Anyway the tangent line
we're talking about is here.

238
00:15:15,450 --> 00:15:17,730
And this is y = x.

239
00:15:17,730 --> 00:15:22,870
And this is the function sine x.

240
00:15:22,870 --> 00:15:28,870
And near 0, those things
coincide pretty closely.

241
00:15:28,870 --> 00:15:34,040
The cosine function, I'll
put that underneath, I guess.

242
00:15:34,040 --> 00:15:35,110
I think I can fit it.

243
00:15:35,110 --> 00:15:39,390
Make it a little smaller here.

244
00:15:39,390 --> 00:15:44,850
So for the cosine
function, we're up here.

245
00:15:44,850 --> 00:15:48,500
It's y = 1.

246
00:15:48,500 --> 00:15:51,990
Well, no wonder the
tangent line is constant.

247
00:15:51,990 --> 00:15:54,630
It's horizontal.

248
00:15:54,630 --> 00:15:57,920
The tangent line is horizontal,
so the function corresponding

249
00:15:57,920 --> 00:15:59,560
is constant.

250
00:15:59,560 --> 00:16:04,890
So this is y = cos x.

251
00:16:04,890 --> 00:16:14,790
And finally, if I draw y = e^x,
that's coming down like this.

252
00:16:14,790 --> 00:16:17,870
And the tangent line is here.

253
00:16:17,870 --> 00:16:19,410
And it's y = 1 + x.

254
00:16:19,410 --> 00:16:24,700
The value is 1 and
the slope is 1.

255
00:16:24,700 --> 00:16:28,030
So this is how to remember
it graphically if you like.

256
00:16:28,030 --> 00:16:34,810
This analytic picture
is extremely important

257
00:16:34,810 --> 00:16:37,950
and will help you to
deal with sines, cosines

258
00:16:37,950 --> 00:16:41,090
and exponentials.

259
00:16:41,090 --> 00:16:41,730
Yes, question.

260
00:16:41,730 --> 00:16:45,806
STUDENT: [INAUDIBLE]

261
00:16:45,806 --> 00:16:46,306
PROF.

262
00:16:46,306 --> 00:16:48,181
JERISON: The question
is what do you normally

263
00:16:48,181 --> 00:16:50,350
use linear approximations for.

264
00:16:50,350 --> 00:16:51,140
Good question.

265
00:16:51,140 --> 00:16:52,260
We're getting there.

266
00:16:52,260 --> 00:16:54,210
First, we're getting a
little library of them

267
00:16:54,210 --> 00:16:56,220
and I'll give you
a few examples.

268
00:16:56,220 --> 00:17:02,540
OK, so now, I need
to finish the catalog

269
00:17:02,540 --> 00:17:05,700
with two more examples which
are just a little bit, slightly

270
00:17:05,700 --> 00:17:07,620
more challenging.

271
00:17:07,620 --> 00:17:09,860
And a little bit less obvious.

272
00:17:09,860 --> 00:17:22,356
So, the next couple that we're
going to do are ln(1+x) and (1

273
00:17:22,356 --> 00:17:25,530
+ x)^r.

274
00:17:25,530 --> 00:17:28,130
OK, these are the last two
that we're going to write down.

275
00:17:28,130 --> 00:17:30,850
And that you need
to think about.

276
00:17:30,850 --> 00:17:34,930
Now, the procedure is
the same as over here.

277
00:17:34,930 --> 00:17:39,230
Namely, I have to write down
f' and I have to write down

278
00:17:39,230 --> 00:17:41,992
f'(0) and I have to
write down f'(0).

279
00:17:41,992 --> 00:17:43,450
And then I'll have
the coefficients

280
00:17:43,450 --> 00:17:46,970
to be able to fill in
what the approximation is.

281
00:17:46,970 --> 00:17:51,840
So f' = 1 / (1+x), in the
case of the logarithm.

282
00:17:51,840 --> 00:17:57,010
And f(0), if I plug in,
that's log of 1, which is 0.

283
00:17:57,010 --> 00:18:01,190
And f' if I plug
in 0 here, I get 1.

284
00:18:01,190 --> 00:18:04,850
And similarly if I do it for
this one, I get r(1+x)^(r-1).

285
00:18:07,850 --> 00:18:12,320
And when I plug in f(0),
I get 1^r, which is 1.

286
00:18:12,320 --> 00:18:18,850
And here I get r
(1)^(r-1), which is r.

287
00:18:18,850 --> 00:18:22,830
So the corresponding statement
here is that ln(1+x) is

288
00:18:22,830 --> 00:18:24,790
approximately x.

289
00:18:24,790 --> 00:18:31,140
And (1+x)^r is
approximately 1 + rx.

290
00:18:31,140 --> 00:18:35,660
That's 0 + 1x and
here we have 1 + rx.

291
00:18:41,370 --> 00:18:44,320
And now, I do want
to make a connection,

292
00:18:44,320 --> 00:18:47,120
explain to you what's going
on here and the connection

293
00:18:47,120 --> 00:18:48,750
with the first example.

294
00:18:48,750 --> 00:18:50,800
We already did the
logarithm once.

295
00:18:50,800 --> 00:18:53,520
And let's just point out
that these two computations

296
00:18:53,520 --> 00:18:57,470
are the same, or
practically the same.

297
00:18:57,470 --> 00:19:02,580
Here I use the base point
1, but because of my,

298
00:19:02,580 --> 00:19:05,420
sort of, convenient
form, which will end up,

299
00:19:05,420 --> 00:19:07,180
I claim, being much
more convenient

300
00:19:07,180 --> 00:19:09,310
for pretty much
every purpose, we

301
00:19:09,310 --> 00:19:14,510
want to do these things
near x is approximately 0.

302
00:19:14,510 --> 00:19:19,040
You cannot expand the logarithm
and understand a tangent line

303
00:19:19,040 --> 00:19:22,730
for it at x equals 0, because
it goes down to minus infinity.

304
00:19:22,730 --> 00:19:27,260
Similarly, if you
try to graph (1+x)^r,

305
00:19:27,260 --> 00:19:30,690
x^r without the 1 here,
you'll discover that sometimes

306
00:19:30,690 --> 00:19:33,260
the slope is infinite,
and so forth.

307
00:19:33,260 --> 00:19:35,500
So this is a bad
choice of point.

308
00:19:35,500 --> 00:19:39,030
1 is a much better choice
of a place to expand around.

309
00:19:39,030 --> 00:19:42,150
And then we shift things so
that it looks like it's x = 0,

310
00:19:42,150 --> 00:19:43,600
by shifting by the 1.

311
00:19:43,600 --> 00:19:50,950
So the connection with the
previous example is that

312
00:19:50,950 --> 00:19:57,020
the-- what we wrote before I
could write as ln u = u - 1.

313
00:19:57,020 --> 00:20:00,890
Right, that's just recopying
what I have over here.

314
00:20:00,890 --> 00:20:04,930
Except with the letter u
rather than the letter x.

315
00:20:04,930 --> 00:20:12,790
And then I plug in, u = 1 + x.

316
00:20:12,790 --> 00:20:14,920
And then that, if
I copy it down,

317
00:20:14,920 --> 00:20:16,880
you see that I have
a u in place of 1+x,

318
00:20:16,880 --> 00:20:19,020
that's the same as this.

319
00:20:19,020 --> 00:20:22,880
And if I write out u-1,
if I subtract 1 from u,

320
00:20:22,880 --> 00:20:23,924
that means that it's x.

321
00:20:23,924 --> 00:20:25,840
So that's what's on the
right-hand side there.

322
00:20:25,840 --> 00:20:27,720
So these are the
same computation,

323
00:20:27,720 --> 00:20:38,860
I've just changed the variable.

324
00:20:38,860 --> 00:20:44,220
So now I want to try to
address the question that was

325
00:20:44,220 --> 00:20:47,380
asked about how this is used.

326
00:20:47,380 --> 00:20:49,370
And what the importance is.

327
00:20:49,370 --> 00:20:58,010
And what I'm going to do is
just give you one example here.

328
00:20:58,010 --> 00:21:02,690
And then try to emphasize.

329
00:21:02,690 --> 00:21:05,930
The first way in which
this is a useful idea.

330
00:21:05,930 --> 00:21:10,460
So, or maybe this is
the second example.

331
00:21:10,460 --> 00:21:13,330
If you like.

332
00:21:13,330 --> 00:21:16,460
So we'll call this
Example 2, maybe.

333
00:21:16,460 --> 00:21:19,070
So let's just take
the logarithm of 1.1.

334
00:21:19,070 --> 00:21:22,220
Just a second.

335
00:21:22,220 --> 00:21:25,710
Let's take the logarithm of 1.1.

336
00:21:25,710 --> 00:21:30,150
So I claim that, according to
our rules, I can glance at this

337
00:21:30,150 --> 00:21:33,680
and I can immediately see
that it's approximately 1/10.

338
00:21:33,680 --> 00:21:35,710
So what did I use here?

339
00:21:35,710 --> 00:21:42,630
I used that ln(1+x)
is approximately x,

340
00:21:42,630 --> 00:21:46,281
and the value of x
that I used was 1/10.

341
00:21:46,281 --> 00:21:46,780
Right?

342
00:21:46,780 --> 00:21:48,850
So that is the
formula, so I should

343
00:21:48,850 --> 00:21:54,560
put a box around these
two formulas too.

344
00:21:54,560 --> 00:21:57,730
That's this formula here,
applied with x = 1/10.

345
00:21:57,730 --> 00:22:01,680
And I'm claiming that 1/10 is
a sufficiently small number,

346
00:22:01,680 --> 00:22:08,845
sufficiently close to 0,
that this is an OK statement.

347
00:22:08,845 --> 00:22:10,220
So the first
question that I want

348
00:22:10,220 --> 00:22:12,000
to ask you is,
which do you think

349
00:22:12,000 --> 00:22:14,470
is a more complicated thing.

350
00:22:14,470 --> 00:22:19,244
The left-hand side or
the right-hand side.

351
00:22:19,244 --> 00:22:21,160
I claim that this is a
more complicated thing,

352
00:22:21,160 --> 00:22:24,070
you'd have to go to a calculator
to punch out and figure out

353
00:22:24,070 --> 00:22:25,170
what this thing is.

354
00:22:25,170 --> 00:22:26,230
This is easy.

355
00:22:26,230 --> 00:22:28,730
You know what a tenth is.

356
00:22:28,730 --> 00:22:31,530
So the distinction
that I want to make

357
00:22:31,530 --> 00:22:37,190
is that this half, this
part, this is hard.

358
00:22:37,190 --> 00:22:40,700
And this is easy.

359
00:22:40,700 --> 00:22:43,090
Now, that may look
contradictory,

360
00:22:43,090 --> 00:22:45,610
but I want to just do
it right above as well.

361
00:22:45,610 --> 00:22:48,940
This is hard.

362
00:22:48,940 --> 00:22:52,160
And this is easy.

363
00:22:52,160 --> 00:22:52,870
OK.

364
00:22:52,870 --> 00:22:56,850
This looks uglier, but
actually this is the hard one.

365
00:22:56,850 --> 00:22:58,650
And this is giving us
information about it.

366
00:22:58,650 --> 00:23:00,930
Now, let me show
you why that's true.

367
00:23:00,930 --> 00:23:02,530
Look down this column here.

368
00:23:02,530 --> 00:23:05,230
These are the hard
ones, hard functions.

369
00:23:05,230 --> 00:23:07,360
These are the easy functions.

370
00:23:07,360 --> 00:23:09,970
What's easier than this?

371
00:23:09,970 --> 00:23:11,260
Nothing.

372
00:23:11,260 --> 00:23:11,760
OK.

373
00:23:11,760 --> 00:23:12,590
Well, yeah, 0.

374
00:23:12,590 --> 00:23:14,480
That's easier.

375
00:23:14,480 --> 00:23:16,060
Over here it gets even worse.

376
00:23:16,060 --> 00:23:21,090
These are the hard functions
and these are the easy ones.

377
00:23:21,090 --> 00:23:24,910
So that's the main advantage
of linear approximation

378
00:23:24,910 --> 00:23:27,730
is you get something much
simpler to deal with.

379
00:23:27,730 --> 00:23:30,380
And if you've made a
valid approximation

380
00:23:30,380 --> 00:23:33,510
you can make much
progress on problems.

381
00:23:33,510 --> 00:23:35,780
OK, we'll be doing
some more examples,

382
00:23:35,780 --> 00:23:38,990
but I saw some more questions
before I made that point.

383
00:23:38,990 --> 00:23:39,490
Yeah.

384
00:23:39,490 --> 00:23:42,373
STUDENT: [INAUDIBLE]

385
00:23:42,373 --> 00:23:42,873
PROF.

386
00:23:42,873 --> 00:23:46,080
JERISON: Is this
ln of 1.1 or what?

387
00:23:46,080 --> 00:23:48,410
STUDENT: [INAUDIBLE]

388
00:23:48,410 --> 00:23:49,115
PROF.

389
00:23:49,115 --> 00:23:52,580
JERISON: This is a parens there.

390
00:23:52,580 --> 00:23:56,430
It's ln of 1.1, it's the
digital number, right.

391
00:23:56,430 --> 00:23:59,820
I guess I've never used that
before a decimal point, have I?

392
00:23:59,820 --> 00:24:04,834
I don't know.

393
00:24:04,834 --> 00:24:05,500
Other questions.

394
00:24:05,500 --> 00:24:11,910
STUDENT: [INAUDIBLE]

395
00:24:11,910 --> 00:24:12,410
PROF.

396
00:24:12,410 --> 00:24:12,990
JERISON: OK.

397
00:24:12,990 --> 00:24:14,900
So let's continue here.

398
00:24:14,900 --> 00:24:18,570
Let me give you some more
examples, where it becomes

399
00:24:18,570 --> 00:24:21,460
even more vivid if you like.

400
00:24:21,460 --> 00:24:24,340
That this approximation
is giving us something

401
00:24:24,340 --> 00:24:30,190
a little simpler to deal with.

402
00:24:30,190 --> 00:24:34,960
So here's Example 3.

403
00:24:34,960 --> 00:24:48,400
I want to, I'll find the linear
approximation near x = 0.

404
00:24:48,400 --> 00:24:52,340
I also - when I write this
expression near x = 0,

405
00:24:52,340 --> 00:24:55,020
that's the same thing as this.

406
00:24:55,020 --> 00:24:58,940
That's the same thing as
saying x is approximately 0 -

407
00:24:58,940 --> 00:25:06,360
of the function e^(-3x)
divided by square root 1+x.

408
00:25:09,170 --> 00:25:17,390
So here's a function.

409
00:25:17,390 --> 00:25:17,890
OK.

410
00:25:17,890 --> 00:25:21,990
Now, what I claim I want
to use for the purposes

411
00:25:21,990 --> 00:25:26,830
of this approximation,
are just the sum

412
00:25:26,830 --> 00:25:32,110
of the approximation formulas
that we've already derived.

413
00:25:32,110 --> 00:25:33,850
And just to combine
them algebraically.

414
00:25:33,850 --> 00:25:35,350
So I'm not going
to do any calculus,

415
00:25:35,350 --> 00:25:37,080
I'm just going to remember.

416
00:25:37,080 --> 00:25:41,580
So with e^(-3x), it's pretty
clear that I should be using

417
00:25:41,580 --> 00:25:44,570
this formula for e^x.

418
00:25:44,570 --> 00:25:47,820
For the other one, it may be
slightly less obvious but we

419
00:25:47,820 --> 00:25:53,470
have powers of 1+x over here.

420
00:25:53,470 --> 00:25:55,510
So let's plug those in.

421
00:25:55,510 --> 00:26:04,640
I'll put this up so that
you can remember it.

422
00:26:04,640 --> 00:26:10,810
And we're going to carry
out this approximation.

423
00:26:10,810 --> 00:26:16,380
So, first of all, I'm going
to write this so that it's

424
00:26:16,380 --> 00:26:17,910
slightly more suggestive.

425
00:26:17,910 --> 00:26:23,630
Namely, I'm going to
write it as a product.

426
00:26:23,630 --> 00:26:27,220
And there you can
now see the exponent.

427
00:26:27,220 --> 00:26:31,870
In this case, r = 1/2, eh
-1/2, that we're going to use.

428
00:26:31,870 --> 00:26:32,900
OK.

429
00:26:32,900 --> 00:26:39,880
So now I have
e^(-3x) (1+x)^(-1/2),

430
00:26:39,880 --> 00:26:41,940
and that's going to
be approximately--

431
00:26:41,940 --> 00:26:44,220
well I'm going to
use this formula.

432
00:26:44,220 --> 00:26:48,760
I have to use it correctly. x is
replaced by -3x, so this is 1 -

433
00:26:48,760 --> 00:26:50,160
3x.

434
00:26:50,160 --> 00:26:52,270
And then over here,
I can just copy

435
00:26:52,270 --> 00:26:57,900
verbatim the other approximation
formula with r = -1/2.

436
00:26:57,900 --> 00:27:05,670
So this is times 1 - 1/2 x.

437
00:27:05,670 --> 00:27:11,080
And now I'm going to carry
out the multiplication.

438
00:27:11,080 --> 00:27:17,100
So this is 1 - 3x
- 1/2 x + 3/2 x^2.

439
00:27:27,310 --> 00:27:32,090
So now, here's our formula.

440
00:27:32,090 --> 00:27:34,340
So now this isn't
where things stop.

441
00:27:34,340 --> 00:27:36,960
And indeed, in this
kind of arithmetic

442
00:27:36,960 --> 00:27:39,420
that I'm describing
now, things are

443
00:27:39,420 --> 00:27:43,780
easier than they are in
ordinary algebra, in arithmetic.

444
00:27:43,780 --> 00:27:47,770
The reason is that there's
another step, which

445
00:27:47,770 --> 00:27:49,200
I'm now going to perform.

446
00:27:49,200 --> 00:27:54,602
Which is that I'm going to
throw away this term here.

447
00:27:54,602 --> 00:27:55,560
I'm going to ignore it.

448
00:27:55,560 --> 00:27:57,480
In fact, I didn't even
have to work it out.

449
00:27:57,480 --> 00:27:59,070
Because I'm going
to throw it away.

450
00:27:59,070 --> 00:28:01,520
So the reason is
that already, when

451
00:28:01,520 --> 00:28:03,424
I passed from this
expression to this one,

452
00:28:03,424 --> 00:28:05,340
that is from this type
of thing to this thing,

453
00:28:05,340 --> 00:28:07,940
I was already throwing away
quadratic and higher-ordered

454
00:28:07,940 --> 00:28:09,460
terms.

455
00:28:09,460 --> 00:28:12,650
So this isn't the
only quadratic term.

456
00:28:12,650 --> 00:28:13,640
There are tons of them.

457
00:28:13,640 --> 00:28:14,920
I have to ignore
all of them if I'm

458
00:28:14,920 --> 00:28:16,128
going to ignore some of them.

459
00:28:16,128 --> 00:28:20,240
And in fact, I only want to
be left with the linear stuff.

460
00:28:20,240 --> 00:28:23,220
Because that's all I'm really
getting a valid computation

461
00:28:23,220 --> 00:28:24,080
for.

462
00:28:24,080 --> 00:28:28,060
So, this is approximately
1 minus, so let's see.

463
00:28:28,060 --> 00:28:32,450
It's a total of 7/2 x.

464
00:28:32,450 --> 00:28:36,410
And this is the answer.

465
00:28:36,410 --> 00:28:38,290
This is the linear part.

466
00:28:38,290 --> 00:28:42,800
So the x^2 term is negligible.

467
00:28:42,800 --> 00:28:46,680
So we drop x^2 term.

468
00:28:46,680 --> 00:28:55,712
Terms, and higher.

469
00:28:55,712 --> 00:28:57,420
All of those terms
should be lower-order.

470
00:28:57,420 --> 00:29:00,180
If you imagine x is
1/10, or maybe 1/100,

471
00:29:00,180 --> 00:29:04,470
then these terms will end
up being much smaller.

472
00:29:04,470 --> 00:29:08,970
So we have a rather
crude approach.

473
00:29:08,970 --> 00:29:10,530
And that's really
the simplicity,

474
00:29:10,530 --> 00:29:15,360
and that's the savings.

475
00:29:15,360 --> 00:29:21,020
So now, since this unit
is called Applications,

476
00:29:21,020 --> 00:29:24,380
and these are indeed
applications to math,

477
00:29:24,380 --> 00:29:30,360
I also wanted to give you
a real-life application.

478
00:29:30,360 --> 00:29:34,290
Or a place where linear
approximations come up

479
00:29:34,290 --> 00:29:46,590
in real life.

480
00:29:46,590 --> 00:29:50,560
So maybe we'll call
this Example 4.

481
00:29:50,560 --> 00:29:57,270
This is supposedly
a real-life example.

482
00:29:57,270 --> 00:30:06,580
I'll try to persuade
you that it is.

483
00:30:06,580 --> 00:30:09,840
So I like this example because
it's got a lot of math,

484
00:30:09,840 --> 00:30:11,170
as well as physics in it.

485
00:30:11,170 --> 00:30:17,000
So here I am, on the
surface of the earth.

486
00:30:17,000 --> 00:30:24,610
And here is a satellite
going this way.

487
00:30:24,610 --> 00:30:30,790
At some velocity, v.
And this satellite

488
00:30:30,790 --> 00:30:33,630
has a clock on it because
this is a GPS satellite.

489
00:30:33,630 --> 00:30:37,720
And it has a time, T, OK?

490
00:30:37,720 --> 00:30:41,160
But I have a watch, in
fact it's right here.

491
00:30:41,160 --> 00:30:44,030
And I have a time which I keep.

492
00:30:44,030 --> 00:30:48,170
Which is T', And there's
an interesting relationship

493
00:30:48,170 --> 00:30:56,650
between T and T', which
is called time dilation.

494
00:30:56,650 --> 00:31:04,860
And this is from
special relativity.

495
00:31:04,860 --> 00:31:06,470
And it's the following formula.

496
00:31:06,470 --> 00:31:13,720
T' = T divided by the
square root of 1 - v^2/c^2,

497
00:31:13,720 --> 00:31:17,230
where v is the velocity
of the satellite,

498
00:31:17,230 --> 00:31:22,960
and c is the speed of light.

499
00:31:22,960 --> 00:31:28,080
So now I'd like to get a
rough idea of how different

500
00:31:28,080 --> 00:31:34,980
my watch is from the
clock on the satellite.

501
00:31:34,980 --> 00:31:38,540
So I'm going to use
this same approximation,

502
00:31:38,540 --> 00:31:40,990
we've already used it once.

503
00:31:40,990 --> 00:31:42,010
I'm going to write t.

504
00:31:42,010 --> 00:31:43,990
But now let me just remind you.

505
00:31:43,990 --> 00:31:46,809
The situation here is, we
have something of the form

506
00:31:46,809 --> 00:31:47,350
(1-u)^(-1/2).

507
00:31:52,410 --> 00:31:55,760
That's what's happening when
I multiply through here.

508
00:31:55,760 --> 00:31:59,500
So with u = v^2 / c^2.

509
00:32:02,080 --> 00:32:05,240
So in real life, of
course, the expression

510
00:32:05,240 --> 00:32:07,780
that you're going to use
the linear approximation on

511
00:32:07,780 --> 00:32:10,280
isn't necessarily itself linear.

512
00:32:10,280 --> 00:32:11,990
It can be any physical quantity.

513
00:32:11,990 --> 00:32:15,940
So in this case it's v
squared over c squared.

514
00:32:15,940 --> 00:32:18,189
And now the
approximation formula

515
00:32:18,189 --> 00:32:20,230
says that if this is
approximately equal to, well

516
00:32:20,230 --> 00:32:21,540
again it's the same rule.

517
00:32:21,540 --> 00:32:25,870
There's an r and then x
is -u, so this is - - 1/2,

518
00:32:25,870 --> 00:32:34,610
so it's 1 + 1/2 u.

519
00:32:34,610 --> 00:32:40,350
So this is approximately,
by the same rule, this is T,

520
00:32:40,350 --> 00:32:55,800
T' is approximately t
T(1 + 1/2 v^2/c^2) Now,

521
00:32:55,800 --> 00:32:58,150
I promised you that this
would be a real-life problem.

522
00:32:58,150 --> 00:33:02,520
So the question is when people
were designing these GPS

523
00:33:02,520 --> 00:33:06,666
systems, they run clocks
in the satellites.

524
00:33:06,666 --> 00:33:08,790
You're down there, you're
making your measurements,

525
00:33:08,790 --> 00:33:12,270
you're talking to
the satellite by--

526
00:33:12,270 --> 00:33:15,310
or you're receiving its
signals from its radio.

527
00:33:15,310 --> 00:33:19,010
The question is, is this
going to cause problems

528
00:33:19,010 --> 00:33:23,670
in the transmission.

529
00:33:23,670 --> 00:33:25,580
And there are dozens
of such problems

530
00:33:25,580 --> 00:33:27,180
that you have to check for.

531
00:33:27,180 --> 00:33:29,950
So in this case, what
actually happened

532
00:33:29,950 --> 00:33:35,010
is that v is about 4
kilometers per second.

533
00:33:35,010 --> 00:33:38,740
That's how fast the GPS
satellites actually go.

534
00:33:38,740 --> 00:33:41,430
In fact, they had to decide to
put them at a certain altitude

535
00:33:41,430 --> 00:33:43,950
and they could've tweaked
this if they had put them

536
00:33:43,950 --> 00:33:46,040
at different places.

537
00:33:46,040 --> 00:33:55,330
Anyway, the speed of light is
3 * 10^5 kilometers per second.

538
00:33:55,330 --> 00:34:01,100
So this number, v^2 / c^2
is approximately 10^(-10).

539
00:34:05,710 --> 00:34:11,160
Now, if you actually keep
track of how much of an error

540
00:34:11,160 --> 00:34:15,530
that would make in a GPS
location, what you would find

541
00:34:15,530 --> 00:34:17,820
is maybe it's a millimeter
or something like that.

542
00:34:17,820 --> 00:34:20,080
So in fact it doesn't matter.

543
00:34:20,080 --> 00:34:21,380
So that's nice.

544
00:34:21,380 --> 00:34:23,180
But in fact the
engineers who were

545
00:34:23,180 --> 00:34:26,870
designing these systems actually
did use this very computation.

546
00:34:26,870 --> 00:34:29,270
Exactly this.

547
00:34:29,270 --> 00:34:31,640
And the way that
they used it was,

548
00:34:31,640 --> 00:34:35,190
they decided that because
the clocks were different,

549
00:34:35,190 --> 00:34:38,740
when the satellite broadcasts
its radio frequency,

550
00:34:38,740 --> 00:34:40,350
that frequency would be shifted.

551
00:34:40,350 --> 00:34:41,500
Would be offset.

552
00:34:41,500 --> 00:34:44,426
And they decided that the
fidelity was so important

553
00:34:44,426 --> 00:34:46,050
that they would send
the satellites off

554
00:34:46,050 --> 00:34:49,120
with this kind of,
exactly this, offset.

555
00:34:49,120 --> 00:34:51,460
To compensate for the
way the signal is.

556
00:34:51,460 --> 00:34:53,360
So from the point of
view of good reception

557
00:34:53,360 --> 00:34:56,950
on your little GPS device, they
changed the frequency at which

558
00:34:56,950 --> 00:35:00,160
the transmitter
in the satellites,

559
00:35:00,160 --> 00:35:04,990
according to exactly this rule.

560
00:35:04,990 --> 00:35:08,120
And incidentally, the reason
why they didn't-- they ignored

561
00:35:08,120 --> 00:35:11,010
higher-order terms, the
sort of quadratic terms,

562
00:35:11,010 --> 00:35:17,460
is that if you take u^2
that's a size 10^(-20).

563
00:35:17,460 --> 00:35:20,104
And that really is
totally negligible.

564
00:35:20,104 --> 00:35:22,020
That doesn't matter to
any measurement at all.

565
00:35:22,020 --> 00:35:25,210
That's on the order
of nanometers,

566
00:35:25,210 --> 00:35:30,200
and it's not important for
any of the uses to which GPS

567
00:35:30,200 --> 00:35:32,510
is put.

568
00:35:32,510 --> 00:35:40,470
OK, so that's a real example of
a use of linear approximations.

569
00:35:40,470 --> 00:35:42,720
So. let's take a
little pause here.

570
00:35:42,720 --> 00:35:44,850
I'm going to switch
gears and talk

571
00:35:44,850 --> 00:35:46,610
about quadratic approximations.

572
00:35:46,610 --> 00:35:48,900
But before I do that, let's
have some more questions.

573
00:35:48,900 --> 00:35:49,400
Yeah.

574
00:35:49,400 --> 00:36:03,780
STUDENT: [INAUDIBLE]

575
00:36:03,780 --> 00:36:04,566
PROF.

576
00:36:04,566 --> 00:36:08,040
JERISON: OK, so the
question was asked,

577
00:36:08,040 --> 00:36:11,580
suppose I did this
by different method.

578
00:36:11,580 --> 00:36:15,840
Suppose I applied the
original formula here.

579
00:36:15,840 --> 00:36:18,050
Namely, I define
the function f(x),

580
00:36:18,050 --> 00:36:22,140
which was this function here.

581
00:36:22,140 --> 00:36:25,050
And then I plugged
in its value at x = 0

582
00:36:25,050 --> 00:36:28,000
and the value of its
derivative at x = 0.

583
00:36:28,000 --> 00:36:32,510
So the answer is, yes, it's
also true that if I call this

584
00:36:32,510 --> 00:36:37,940
function f f(x), then it
must be true that the linear

585
00:36:37,940 --> 00:36:45,910
approximation is f(x_0) plus
f' of - I'm sorry, it's at 0,

586
00:36:45,910 --> 00:36:49,340
so it's f(0), f'(0) times x.

587
00:36:49,340 --> 00:36:50,550
So that should be true.

588
00:36:50,550 --> 00:36:52,810
That's the formula
that we're using.

589
00:36:52,810 --> 00:36:57,170
It's up there in the pink also.

590
00:36:57,170 --> 00:36:58,590
So this is the formula.

591
00:36:58,590 --> 00:37:00,650
So now, what about f(0)?

592
00:37:00,650 --> 00:37:04,350
Well, if I plug in
0 here, I get 1 * 1.

593
00:37:04,350 --> 00:37:05,940
So this thing is 1.

594
00:37:05,940 --> 00:37:07,550
So that's no surprise.

595
00:37:07,550 --> 00:37:11,260
And that's what I got.

596
00:37:11,260 --> 00:37:15,600
If I computed f',
by the product rule

597
00:37:15,600 --> 00:37:19,150
it would be an annoying,
somewhat long, computation.

598
00:37:19,150 --> 00:37:21,510
And because of
what we just done,

599
00:37:21,510 --> 00:37:23,130
we know what it has to be.

600
00:37:23,130 --> 00:37:25,990
It has to be negative 7/2.

601
00:37:25,990 --> 00:37:28,280
Because this is a
shortcut for doing it.

602
00:37:28,280 --> 00:37:29,900
This is faster than doing that.

603
00:37:29,900 --> 00:37:32,190
But of course, that's a
legal way of doing it.

604
00:37:32,190 --> 00:37:33,780
When you get to
second derivatives,

605
00:37:33,780 --> 00:37:36,210
you'll quickly discover that
this method that I've just

606
00:37:36,210 --> 00:37:38,950
described is
complicated, but far

607
00:37:38,950 --> 00:37:41,330
superior to differentiating
this expression twice.

608
00:37:41,330 --> 00:37:46,087
STUDENT: [INAUDIBLE] PROF.

609
00:37:46,087 --> 00:37:48,420
JERISON: Would you have to
throw away an x^2 term if you

610
00:37:48,420 --> 00:37:49,560
differentiated?

611
00:37:49,560 --> 00:37:50,470
No.

612
00:37:50,470 --> 00:37:53,220
And in fact, we didn't
really have to do that here.

613
00:37:53,220 --> 00:37:55,385
If you differentiate
and then plug in x = 0.

614
00:37:55,385 --> 00:37:57,510
So if you differentiate
this and you plug in x = 0,

615
00:37:57,510 --> 00:37:58,970
you get -7/2.

616
00:37:58,970 --> 00:38:01,349
You differentiate this
and you plug in x = 0,

617
00:38:01,349 --> 00:38:03,140
this term still drops
out because it's just

618
00:38:03,140 --> 00:38:05,370
a 3x when you differentiate.

619
00:38:05,370 --> 00:38:08,270
And then you plug in
x = 0, it's gone too.

620
00:38:08,270 --> 00:38:10,650
And similarly, if you're
up here, it goes away

621
00:38:10,650 --> 00:38:12,410
and similarly over
here it goes away.

622
00:38:12,410 --> 00:38:18,555
So the higher-order terms never
influence this computation

623
00:38:18,555 --> 00:38:19,055
here.

624
00:38:19,055 --> 00:38:27,430
This just captures the linear
features of the function.

625
00:38:27,430 --> 00:38:30,980
So now I want to go on to
quadratic approximation.

626
00:38:30,980 --> 00:38:44,500
And now we're going to
elaborate on this formula.

627
00:38:44,500 --> 00:38:46,040
So, linear approximation.

628
00:38:46,040 --> 00:38:49,840
Well, that should have
been linear approximation.

629
00:38:49,840 --> 00:38:50,530
Liner.

630
00:38:50,530 --> 00:38:51,680
That's interesting.

631
00:38:51,680 --> 00:38:54,070
OK, so that was wrong.

632
00:38:54,070 --> 00:38:59,700
But now we're going to
change it to quadratic.

633
00:38:59,700 --> 00:39:04,280
So, suppose we talk about a
quadratic approximation here.

634
00:39:04,280 --> 00:39:07,450
Now, the quadratic
approximation is

635
00:39:07,450 --> 00:39:15,430
going to be just an elaboration,
one more step of detail.

636
00:39:15,430 --> 00:39:16,270
From the linear.

637
00:39:16,270 --> 00:39:18,060
In other words,
it's an extension

638
00:39:18,060 --> 00:39:20,230
of the linear approximation.

639
00:39:20,230 --> 00:39:24,320
And so we're adding
one more term here.

640
00:39:24,320 --> 00:39:26,650
And the extra term
turns out to be related

641
00:39:26,650 --> 00:39:28,990
to the second derivative.

642
00:39:28,990 --> 00:39:34,340
But there's a factor of 2.

643
00:39:34,340 --> 00:39:39,090
So this is the formula for
the quadratic approximation.

644
00:39:39,090 --> 00:39:46,450
And this chunk of it, of
course, is the linear part.

645
00:39:46,450 --> 00:39:54,190
This time I'll spell
'linear' correctly.

646
00:39:54,190 --> 00:39:56,030
So the linear part
is the first piece.

647
00:39:56,030 --> 00:40:05,050
And the quadratic part
is the second piece.

648
00:40:05,050 --> 00:40:09,630
I want to develop this
same catalog of functions

649
00:40:09,630 --> 00:40:11,140
as I had before.

650
00:40:11,140 --> 00:40:14,640
In other words, I want
to extend our formulas

651
00:40:14,640 --> 00:40:19,660
to the higher-order terms.

652
00:40:19,660 --> 00:40:26,070
And if you do that
for this example here,

653
00:40:26,070 --> 00:40:28,180
maybe I'll even illustrate
with this example

654
00:40:28,180 --> 00:40:31,050
before I go on, if you
do it with this example

655
00:40:31,050 --> 00:40:39,320
here, just to give you a
flavor for what goes on,

656
00:40:39,320 --> 00:40:41,140
what turns out to be the case.

657
00:40:41,140 --> 00:40:45,390
So this is the linear version.

658
00:40:45,390 --> 00:40:48,220
And now I'm going to compare
it to the quadratic version.

659
00:40:48,220 --> 00:40:55,540
So the quadratic version
turns out to be this.

660
00:40:55,540 --> 00:40:58,760
That's what turns out to be
the quadratic approximation.

661
00:40:58,760 --> 00:41:03,100
And when I use
this example here,

662
00:41:03,100 --> 00:41:09,400
so this is 1.1, which is the
same as ln of 1 + 1/10, right?

663
00:41:09,400 --> 00:41:17,430
So that's approximately
1/10 - 1/2 (1/10)^2.

664
00:41:17,430 --> 00:41:19,170
So 1/200.

665
00:41:19,170 --> 00:41:21,960
So that turns out,
instead of being

666
00:41:21,960 --> 00:41:29,160
1/10, that's point, what is it,
.095 or something like that.

667
00:41:29,160 --> 00:41:31,370
It's a little bit less.

668
00:41:31,370 --> 00:41:36,240
It's not .1, but
it's pretty close.

669
00:41:36,240 --> 00:41:39,350
So if you like,
the correction is

670
00:41:39,350 --> 00:41:48,900
lower in the decimal expansion.

671
00:41:48,900 --> 00:41:53,650
Now let me actually
check a few of these.

672
00:41:53,650 --> 00:41:54,940
I'll carry them out.

673
00:41:54,940 --> 00:41:58,670
And what I'm going to
probably save for next time

674
00:41:58,670 --> 00:42:08,020
is explaining to you, so this
is why this factor of 1/2,

675
00:42:08,020 --> 00:42:10,610
and we're going
to do this later.

676
00:42:10,610 --> 00:42:11,530
Do this next time.

677
00:42:11,530 --> 00:42:17,230
You can certainly do well to
stick with this presentation

678
00:42:17,230 --> 00:42:18,470
for one more lecture.

679
00:42:18,470 --> 00:42:22,210
So we can see this reinforced.

680
00:42:22,210 --> 00:42:32,580
So now I'm going to work
out these derivatives

681
00:42:32,580 --> 00:42:34,630
of the higher-order terms.

682
00:42:34,630 --> 00:42:39,450
And let me do it for the
x approximately 0 case.

683
00:42:39,450 --> 00:42:47,990
So first of all, I want to
add in the extra term here.

684
00:42:47,990 --> 00:42:50,830
Here's the extra term.

685
00:42:50,830 --> 00:42:53,780
For the quadratic part.

686
00:42:53,780 --> 00:42:57,050
And now in order to figure
out what's going on,

687
00:42:57,050 --> 00:43:03,350
I'm going to need to compute,
also, second derivatives.

688
00:43:03,350 --> 00:43:05,150
So here I need a
second derivative.

689
00:43:05,150 --> 00:43:11,465
And I need to throw in the value
of that second derivative at 0.

690
00:43:11,465 --> 00:43:13,340
So this is what I'm
going to need to compute.

691
00:43:13,340 --> 00:43:17,449
So if I do it, for example,
for the sine function,

692
00:43:17,449 --> 00:43:18,740
I already have the linear part.

693
00:43:18,740 --> 00:43:20,290
I need this last bit.

694
00:43:20,290 --> 00:43:22,570
So I differentiate the
sine function twice

695
00:43:22,570 --> 00:43:25,180
and I get, I claim
minus the sine function.

696
00:43:25,180 --> 00:43:26,900
The first derivative
is the cosine

697
00:43:26,900 --> 00:43:29,250
and the cosine derivative
is minus the sine.

698
00:43:29,250 --> 00:43:34,180
And when I evaluate it at
0, I get, lo and behold, 0.

699
00:43:34,180 --> 00:43:35,540
Sine of 0 is 0.

700
00:43:35,540 --> 00:43:40,361
So actually the quadratic
approximation is the same.

701
00:43:40,361 --> 00:43:40,860
0x^2.

702
00:43:40,860 --> 00:43:43,070
There's no x^2 term here.

703
00:43:43,070 --> 00:43:46,510
So that's why this is such
a terrific approximation.

704
00:43:46,510 --> 00:43:48,890
It's also the quadratic
approximation.

705
00:43:48,890 --> 00:43:53,460
For the cosine function,
if you differentiate twice,

706
00:43:53,460 --> 00:43:56,300
you get the derivative is
minus the sign and derivative

707
00:43:56,300 --> 00:44:00,170
of that is minus the cosine.

708
00:44:00,170 --> 00:44:03,060
So that's f''.

709
00:44:03,060 --> 00:44:09,600
And now, if I evaluate
that at 0, I get -1.

710
00:44:09,600 --> 00:44:11,530
And so the term that I
have to plug in here,

711
00:44:11,530 --> 00:44:15,240
this -1 is the coefficient
that appears right here.

712
00:44:15,240 --> 00:44:23,350
So I need a -1/2 x^2 extra.

713
00:44:23,350 --> 00:44:26,100
And if you do it for
the e^x, you get an e^x,

714
00:44:26,100 --> 00:44:39,450
and you got a 1 and so
you get 1/2 x^2 here.

715
00:44:39,450 --> 00:44:42,329
I'm going to finish these
two in just a second,

716
00:44:42,329 --> 00:44:43,745
but I first want
to tell you about

717
00:44:43,745 --> 00:44:56,480
the geometric significance
of this quadratic term.

718
00:44:56,480 --> 00:44:58,790
So here we go.

719
00:44:58,790 --> 00:45:18,430
Geometric significance
(of the quadratic term).

720
00:45:18,430 --> 00:45:21,100
So the geometric
significance is best

721
00:45:21,100 --> 00:45:25,670
to describe just by
drawing a picture here.

722
00:45:25,670 --> 00:45:29,300
And I'm going to draw the
picture of the cosine function.

723
00:45:29,300 --> 00:45:34,270
And remember we already
had the tangent line.

724
00:45:34,270 --> 00:45:38,620
So the tangent line was
this horizontal here.

725
00:45:38,620 --> 00:45:40,350
And that was y = 1.

726
00:45:40,350 --> 00:45:42,880
But you can see intuitively,
that doesn't even

727
00:45:42,880 --> 00:45:46,130
tell you whether this function
is above or below 1 there.

728
00:45:46,130 --> 00:45:47,437
Doesn't tell you much.

729
00:45:47,437 --> 00:45:50,020
It's sort of begging for there
to be a little more information

730
00:45:50,020 --> 00:45:52,470
to tell us what the
function is doing nearby.

731
00:45:52,470 --> 00:45:57,470
And indeed, that's what this
second expression does for us.

732
00:45:57,470 --> 00:46:00,850
It's some kind of
parabola underneath here.

733
00:46:00,850 --> 00:46:05,420
So this is y = 1 - 1/2 x^2.

734
00:46:05,420 --> 00:46:08,890
Which is a much better
fit to the curve

735
00:46:08,890 --> 00:46:12,740
than the horizontal line.

736
00:46:12,740 --> 00:46:23,750
And this is, if you like,
this is the best fit parabola.

737
00:46:23,750 --> 00:46:28,510
So it's going to be the
closest parabola to the curve.

738
00:46:28,510 --> 00:46:31,370
And that's more or
less the significance.

739
00:46:31,370 --> 00:46:34,600
It's much, much closer.

740
00:46:34,600 --> 00:46:40,220
All right, I want
to give you, well,

741
00:46:40,220 --> 00:46:43,040
I think we'll save these other
derivations for next time

742
00:46:43,040 --> 00:46:44,880
because I think we're
out of time now.

743
00:46:44,880 --> 00:46:47,110
So we'll do these next time.