Derivatives of exponential and logarithmic functions

Section 3.3
Derivatives of Exponential and
Logarithmic Functions

V63.0121, Calculus I

March 10/11, 2009

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Outline

Derivative of the natural exponential function
Exponential Growth

Derivative of the natural logarithm function

Derivatives of other exponentials and logarithms
Other exponentials
Other logarithms

Logarithmic Differentiation
The power rule for irrational powers

. . . . . .

Derivatives of Exponential Functions

Fact
If f(x) = ax , then f′ (x) = f′ (0)ax .

. . . . . .


Fact

Proof.
Follow your nose:

f(x + h) − f(x) ax+h − ax
f′ (x) = lim = lim
h h
h→0 h→0
ax ah − ax ah − 1
= ax · f′ (0).
= ax · lim
= lim
h h
h→0 h→0

. . . . . .


Fact

Proof.
Follow your nose:

f(x + h) − f(x) ax+h − ax
f′ (x) = lim = lim
h h
h→0 h→0
ax ah − ax ah − 1
= ax · f′ (0).
= ax · lim
= lim
h h
h→0 h→0

To reiterate: the derivative of an exponential function is a constant
times that function. Much different from polynomials!

. . . . . .

The funny limit in the case of e
Remember the deﬁnition of e:
( )
1n
= lim (1 + h)1/h
e = lim 1 +
n
n→∞ h→0

Question
eh − 1
What is lim ?
h
h→0

. . . . . .

( )
1n
= lim (1 + h)1/h
e = lim 1 +
n
n→∞ h→0

Question
eh − 1
What is lim ?
h
h→0

Answer
If h is small enough, e ≈ (1 + h)1/h . So
[ ]h
(1 + h)1/h − 1
eh − 1 (1 + h) − 1 h
≈ = = =1
h h h h

. . . . . .

( )
1n
= lim (1 + h)1/h
e = lim 1 +
n
n→∞ h→0

Question
eh − 1
What is lim ?
h
h→0

Answer
If h is small enough, e ≈ (1 + h)1/h . So
[ ]h
(1 + h)1/h − 1
eh − 1 (1 + h) − 1 h
≈ = = =1
h h h h
eh − 1
=1
So in the limit we get equality: lim
h
h→0
. . . . . .

Derivative of the natural exponential function

From
( )
ah − 1 eh − 1
dx
ax
a= =1
lim and lim
dx h h
h→0 h→0

we get:
Theorem
dx
e = ex
dx

. . . . . .

Exponential Growth

Commonly misused term to say something grows exponentially
It means the rate of change (derivative) is proportional to the
current value
Examples: Natural population growth, compounded interest,
social networks

. . . . . .

Examples

Examples
Find these derivatives:
e3x
2
ex
x2 ex

. . . . . .

Examples

Examples
e3x
2
ex
x2 ex

Solution
d 3x
e = 3ex
dx

. . . . . .

Examples

Examples
e3x
2
ex
x2 ex

Solution
d 3x
e = 3ex
dx
d x2 2d 2
e = ex (x2 ) = 2xex
dx dx

. . . . . .

Examples

Examples
e3x
2
ex
x2 ex

Solution
d 3x
e = 3ex
dx
d x2 2d 2
e = ex (x2 ) = 2xex
dx dx
d 2x
x e = 2xex + x2 ex
dx

. . . . . .


Let y = ln x. Then
x = ey so

. . . . . .


Let y = ln x. Then
x = ey so
dy
ey =1
dx

. . . . . .


Let y = ln x. Then
x = ey so
dy
ey =1
dx
dy 1 1
=⇒ = y=
dx e x

. . . . . .


Let y = ln x. Then
x = ey so
dy
ey=1
dx
dy 1 1
=⇒ = y=
dx e x
So:
Fact
d 1
ln x =
dx x

. . . . . .


y
.
Let y = ln x. Then
x = ey so
dy
ey=1
dx l
.n x
dy 1 1
=⇒ = y=
dx e x
. x
.
So:
Fact
d 1
ln x =
dx x

. . . . . .


y
.
Let y = ln x. Then
x = ey so
dy
ey=1
dx l
.n x
dy 1 1 1
=⇒ = y= .
dx e x x
. x
.
So:
Fact
d 1
ln x =
dx x

. . . . . .

The Tower of Powers

y′
y
The derivative of a power
x3 3x2 function is a power
function of one lower
x2 2x1
power
x1 1x0
x0 0
? ?
x−1 −1x−2
x−2 −2x−3

. . . . . .

The Tower of Powers

y′
y
x2 2x1
power
x1 1x0 Each power function is
the derivative of another
0
x 0
power function, except
x−1 x−1
?
x−1 −1x−2
x−2 −2x−3

. . . . . .

The Tower of Powers

y′
y
x2 2x1
power
x1 1x0 Each power function is
the derivative of another
0
x 0
power function, except
x−1 x−1
ln x
x−1 −1x−2 ln x ﬁlls in this gap
precisely.
x−2 −2x−3

. . . . . .

Other logarithms

Example
dx
Use implicit differentiation to ﬁnd a.
dx

. . . . . .

Other logarithms

Example
dx
dx
Solution
Let y = ax , so
ln y = ln ax = x ln a

. . . . . .

Other logarithms

Example
dx
dx
Solution
Let y = ax , so
Differentiate implicitly:

1 dy dy
= (ln a)y = (ln a)ax
= ln a =⇒
y dx dx

. . . . . .

Other logarithms

Example
dx
dx
Solution
Let y = ax , so
Differentiate implicitly:

1 dy dy
= (ln a)y = (ln a)ax
= ln a =⇒
y dx dx

Before we showed y′ = y′ (0)y, so now we know that

2h − 1 3h − 1
≈ 0.693 ≈ 1.10
ln 2 = lim ln 3 = lim
h h
h→0 h→0

. . . . . .

Other logarithms

Example
d
Find log x.
dx a

. . . . . .

Other logarithms

Example
d
Find log x.
dx a
Solution
Let y = loga x, so ay = x.

. . . . . .

Other logarithms

Example
d
Find log x.
dx a
Solution
Let y = loga x, so ay = x. Now differentiate implicitly:

dy dy 1 1
(ln a)ay = 1 =⇒ =y =
dx dx a ln a x ln a

. . . . . .

Other logarithms

Example
d
Find log x.
dx a
Solution
Let y = loga x, so ay = x. Now differentiate implicitly:

dy dy 1 1
(ln a)ay = 1 =⇒ =y =
dx dx a ln a x ln a
Another way to see this is to take the natural logarithm:

ln x
ay = x =⇒ y ln a = ln x =⇒ y =
ln a
dy 11
=
So .
dx ln a x

. . . . . .

More examples

Example
d
log (x2 + 1)
Find
dx 2

. . . . . .

More examples

Example
d
log (x2 + 1)
Find
dx 2
Answer

dy 1 1 2x
= (2x) =
2+1 (ln 2)(x2 + 1)
dx ln 2 x

. . . . . .

A nasty derivative

Example √
(x2 + 1) x + 3
. Find y′ .
Let y =
x−1

. . . . . .

A nasty derivative

Example √
(x2 + 1) x + 3
. Find y′ .
Let y =
x−1
Solution
We use the quotient rule, and the product rule in the numerator:
[√ ] √
(x − 1) 2x x + 3 + (x2 + 1) 1 (x + 3)−1/2 − (x2 + 1) x + 3(1)
′ 2
y=
(x − 1)2
√ √
(x2 + 1) (x2 + 1) x + 3
2x x + 3
+√ −
=
(x − 1) (x − 1)2
2 x + 3(x − 1)

. . . . . .

Another way

√
(x2 + 1) x + 3
y=
x−1
1
ln y = ln(x + 1) + ln(x + 3) − ln(x − 1)
2
2
1 dy 2x 1 1
−
=2 +
x + 1 2(x + 3) x − 1
y dx

So
( )
dy 2x 1 1
−
= + y
x2 + 1 2(x + 3) x − 1
dx
√
( )
(x2 + 1) x + 3
2x 1 1
−
= +
x2 + 1 2(x + 3) x − 1 x−1

. . . . . .

Compare and contrast

Using the product, quotient, and power rules:
√ √
(x2 + 1) (x2 + 1) x + 3
2x x + 3
′
+√ −
y=
(x − 1) (x − 1)2
2 x + 3(x − 1)

Using logarithmic differentiation:
√
( )2
(x + 1) x + 3
2x 1 1
′
−
y= +
x2 + 1 2(x + 3) x − 1 x−1

. . . . . .


√ √
(x2 + 1) (x2 + 1) x + 3
2x x + 3
′
+√ −
y=
(x − 1) (x − 1)2
2 x + 3(x − 1)

√
( )2
(x + 1) x + 3
2x 1 1
′
−
y= +
x2 + 1 2(x + 3) x − 1 x−1

Are these the same?

. . . . . .


√ √
(x2 + 1) (x2 + 1) x + 3
2x x + 3
′
+√ −
y=
(x − 1) (x − 1)2
2 x + 3(x − 1)

√
( )2
(x + 1) x + 3
2x 1 1
′
−
y= +
x2 + 1 2(x + 3) x − 1 x−1

Are these the same?
Which do you like better?

. . . . . .


√ √
(x2 + 1) (x2 + 1) x + 3
2x x + 3
′
+√ −
y=
(x − 1) (x − 1)2
2 x + 3(x − 1)

√
( )2
(x + 1) x + 3
2x 1 1
′
−
y= +
x2 + 1 2(x + 3) x − 1 x−1

Are these the same?
Which do you like better?
What kinds of expressions are well-suited for logarithmic
differentiation?

. . . . . .

Derivatives of powers

Let y = xx . Which of these is true?
(A) Since y is a power function, y′ = x · xx−1 = xx .
(B) Since y is an exponential function, y′ = (ln x) · xx
(C) Neither

. . . . . .

It’s neither! Or both?

If y = xx , then

ln y = x ln x
1 dy 1
= x · + ln x = 1 + ln x
y dx x
dy
= xx + (ln x)xx
dx
Each of these terms is one of the wrong answers!

. . . . . .

Derivative of arbitrary powers

Fact (The power rule)
Let y = xr . Then y′ = rxr−1 .

. . . . . .

Derivative of arbitrary powers

Fact (The power rule)
Let y = xr . Then y′ = rxr−1 .

Proof.

y = xr =⇒ ln y = r ln x
Now differentiate:
1 dy r
=
y dx x
dy y
= r = rxr−1
=⇒
dx x

. . . . . .

Derivatives of exponential and logarithmic functions

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