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Find the average rate of change of the function f(x) = 6x from x₁ = 0 to x₂ = 3.
The average rate of change is
(Simplify your answer.)

User Driangle
by
2.6k points

1 Answer

20 votes
20 votes

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How do you find the average rate of change of

f

(

x

)

=

2

x

2

+

1

on [x,x+h]?

Calculus Derivatives Average Rate of Change Over an Interval

1 Answer

Steve M

Feb 28, 2017

4

x

+

2

h

Step-by-step explanation:

The average rate of change of a continuous function,

f

(

x

)

, on a closed interval

[

a

,

b

]

is given by

f

(

b

)

f

(

a

)

b

a

So the average rate of change of the function

f

(

x

)

=

2

x

2

+

1

on

[

x

,

x

+

h

]

is:

A

r

o

c

=

f

(

x

+

h

)

f

(

x

)

(

x

+

h

)

(

x

)

=

f

(

x

+

h

)

f

(

x

)

h

...

.

.

[

1

]

=

2

(

x

+

h

)

2

+

1

(

2

x

2

+

1

)

h

=

2

(

x

2

+

2

x

h

+

h

2

)

+

1

2

x

2

1

h

=

2

x

2

+

4

x

h

+

2

h

2

2

x

2

h

=

4

x

h

+

2

h

2

h

=

4

x

+

2

h

Which is the required answer.

Additional Notes:

Note that this question is steered towards deriving the derivative

f

'

(

x

)

from first principles, as the definition of the derivative is:

f

'

(

x

)

=

lim

h

0

f

(

x

+

h

)

f

(

x

)

h

This is the function we had in [1], so as we take the limit as

h

0

we get the derivative

f

'

(

x

)

for any

x

, This:

f

'

(

x

)

=

h

0

4

x

+

2

h

=

4

x

this is a example

User RNHTTR
by
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