3020 differentials and linear approximation
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3020 Differentials and Linear Approximation. BC Calculus. Related Rates : How fast is y changing as x is changing? -. Differentials: How much does y change as x changes?. Approximation A. Differentials. - PowerPoint PPT PresentationTRANSCRIPT
3020 Differentials and Linear Approximation
BC Calculus
Related Rates :How fast is y changing as x is changing?-
Differentials:How much does y change as x changes?
I. Approximation
A. Differentials
Goal: Answer Two Questions - How much has y changed? and - What is y ‘s new value?
IF…
My waist size is 36 inches
IF I increases my radius 1 inch, how much larger would my belt need to be ?
The earths circumference is 24,367.0070904 miles.
IF I increases the earth’s radius 1 inch, how much larger would the circumference be ?
Algebra to Calculus
x
y
( )
.
y f xyALG mx
y m x
How much has y changed?
The Change in Value : The Differential The Differential finds a QUANTITY OF CHANGE !
REM: miles hours mileshour
y x yx
34
y m x
y
y
NOTE: Finds the change in y -- NOT the value of y
Differentials and Linear Approximation in the News
Algebra to Calculus
x
y
( ) for ( ) linear
. ( )
( )
y f x f xy dyCal m f xx dx
y f x x
How much has y changed?
Algebra to CalculusThe DIFFERENTIAL: “How much has y changed?”
“the first difference in y for a fixed change in x ”
( )
( )
dy f xdxdy f x dx
dy:( )dy f x dx
Notation:
Also written: df
The Differential finds a QUANTITY OF CHANGE !
In Calculus dy approximates the change in y using
the TANGENT LINE.
( )3 44
dy f x dx
dy
dyy
NOTE: APPROXIMATES the change in y
ydy
x dx
The Differential Function: Example 1
Find the Differential Function and use it to approximate change.
( ) 1 sin( )f x x
A). Find the differential function.
B). Approximate the change in y
at with 6
x
36x
The Differential Function: Example 2
Find the Differential Function and use it to approximate the volume of latex in a spherical balloon with inside radius
and thickness 34( )3
V r r
A). Find the differential function.
B). Approximate the change in V.
C). Find the actual Volume.
1 .16
in
4 .r in
B: Linearization
“Make It Linear!”
Linearization:
Linearization:
y – y1 = m (x – x1 )
y = y1 + m (x – x1 )
The standard linear approximation of f at a
The point x = a is the center of the approximation
L(x) = f(a) + f / (a) (x – a)
Linearization
Find the Linearization of sin ( ) at 3
y x x
Linearization
Find the Linearization of 2 1 at 5y x x
C: Tangent Line Approximation
What is the new value?
y – y1 = m ( x – x1 )
y2 – y1 = m ( x2 – x1 )
y2 = y1 + m (Δx)
New Value : Tangent line Approximation
y
2 1
( )
( ) ( )
y dydy f x dx
y y dyf a x f a f a dx
In words: _____________________________________________
1y
2y
2 1 ( )( )
y y m xf a x f a y
x
With the differential :
Linear Approximation - Tangent Line Approximation
.
( ) ( )f a x f a f a dx
EXAMPLE: 11Approximate cos36
Wants the VALUE!
Linear Approximation - Tangent Line Approximation
.
( ) ( )f a x f a f a dx
EXAMPLE: Approximate 16.5Wants the VALUE!
II. Error
ERROR:There are TWO types of error:
A. Error in measurement tools- quantity of error
- relative error
- percent error
B. Error in approximation formulas- over or under approximation
- Error Bound - formula
y dydyy
(100)dyy
A. Error in Measurement Tools
0 1 2
Choose either 1 or 2
EXAMPLE 1: Measurement (A)Volume and Surface Area: The measurement of the edge of a cube is found to be 12 inches, with a possible error of 0.03 inches. Use differentials to approximate the maximum possible error in computing:
• the volume of a cube• the surface area of a cube• find the range of possible measurements in parts (a) and (b).
EXAMPLE 2: Measurement (A)Volume and Surface Area: the radius of a sphere is claimed to be 6 inches, with a possible error of .02 inch
Use differentials to approximate the maximum possible error in calculating the volume of the sphere.
Use differentials to approximate the maximum possible error in calculating the surface area.
Determine the relative error and percent error in each of the above.
EXAMPLE 3: Measurement (B) : Tolerance
Area: The measurement of a side of a square is found to be15 centimeters.
Estimate the maximum allowable percentage error in measuring the side if the error in computing the area cannot exceed 2.5%.
relative error daa
EXAMPLE 4: Measurement (B) : ToleranceCircumference The measurement of the circumference of a circle is found to be 56 centimeters.
Estimate the maximum allowable percentage error in measuring the circumference if the error in computing the area cannot exceed 3%.
B. Error in Approximation Formulas
ERROR: Approximation Formulas
For Linear Approximation:
The Error Bound formula is
Error = (actual value – approximation) either Pos. or Neg.
Error Bound = | actual – approximation |
21 ( )2LE f x x
Since the approximation uses the TANGENT LINE
the over or under approximation is determined by the
CONCAVITY (2ndDerivative Test)
In Calculus dy approximates the change in y using the
TANGENT LINE.
y
dy
x dx
The ERROR depends on distance from center( ) and the bend in the curve ( f ” (x))
x
Example 5: Approximation
For Linear Approximation:
The Error Bound formula is
Error = (actual value – approximation) either Pos. or Neg.
Error Bound = | actual – approximation |
21 ( )2LE f x x
EX: Find the Error in the linear approximation of 16.5
Example 6: Approximation
21 ( )2LE f x x
EX: Find the Error in the linear approximation of 11cos36
Last Update:
• 11/04/10