1007 : the shortcut
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1007 : The Shortcut. AP CALCULUS. Notation:. The Derivative is notated by:. Newton . L’Hopital. Leibniz. Derivative of the function. With respect to x. Notation used in Cal 3. Notation:. Find the rate of change of the Circumference of a Circle with respect to its Radius. - PowerPoint PPT PresentationTRANSCRIPT
1007 : The Shortcut
AP CALCULUS
Notation:
The Derivative is notated by:
( )
x
y y f x
dy d y Ddx dx
Newton L’Hopital
LeibnizDerivative of the function
With respect to x Notation
used in Cal 3
Notation:Find the rate of change of the Circumference of a Circle with respect to its Radius.
Find the rate of change of the Area of a Square with respect to the length of a Side.
Find the rate of change of the Volume of a Cylinder with respect to its Height.
L’Hopital
Leibniz
A´(s)𝑑 𝑨𝑑 𝒔
𝑽 ′ (𝒉)V
𝐴=𝒔2
You treat r as a constant
C
𝑑𝑽𝑑𝒉=
Algebraic Rules
REM: A). A Constant Function
(3)ddx
( )( )
f x cf x
0
Derivative is the slope of a tangent
y = 3 m = 0
0
Algebraic Rules
B). A Power Function( )( )
nf x xf x
32
1( ) df x x y xdx x
Rewrite in exponent form!
𝒏𝒙𝒏−𝟏
𝒇 ′ (𝒙 )=𝟑 𝒙𝟐()
y
𝒚 ′ (𝒙 )=𝟏𝟐 𝒙−𝟏𝟐
y’ (x) ==-2
( )( )
nf x xf x
𝒏𝒙𝒏−𝟏
𝒚= 𝟏𝟑√𝒙
Rewrite in exponent form!
¿ 𝒙−𝟏𝟑
𝒚 ′ (𝒙 )=−𝟏𝟑 𝒙
−𝟒𝟑
Algebraic Rules
C). A Constant Multiplier
53 2
7 1(3 ) 4
d x y ydx x x
( )( )
nf x cxf x
c
(𝒄𝒏)𝒙𝒏−𝟏
𝑑𝑑𝑥=𝟑 [𝟓 𝒙𝟒 ]
=15
y
𝒚 ′=−𝟐𝟏 𝒙−𝟒𝒚=𝟏
𝟒 𝒙−𝟐
y’ =
Algebraic Rules
REM:
D). A Polynomial d u v
dx
3 25 2 3 4y x x x How do you eat an elephant? One bite at a time
𝒚 ′=𝟏𝟓 𝒙𝟐+𝟒 𝒙−𝟑+𝟎
Example: Positive Integer Powers, Multiples, Sums, and Differences
4 2 3Differentiate the polynomial 2 194
That is, find .
y x x x
dydx
Calculator: [F3] 1: d( differentiateor
[2nd ] [ 8 ] d(
d(expression,variable)
d( x^4 + 2x^2 - (3/4)x - 19 , x )
Do it all !
36 23
43y x xx
Step 1: Rewrite using exponents
𝒚=𝟑 𝒙𝟔−𝟒 𝒙−𝟑+𝒙𝟐𝟑
Must rewrite using exponents!
𝒚 ′=𝟏𝟖 𝒙𝟓+𝟏𝟐𝒙−𝟒+𝟐𝟑 𝒙−𝟏𝟑
A conical tank with height of 4 ft is being filled with water.
a) Write the equation for the volume of the conical tank.
b) Find the instantaneous rate of change equation of the volume with respect to the radius.
c) Find the instantaneous rate of change in Volume when the radius is 9 ft.
𝑽=𝟏𝟑 𝝅 𝒓𝟐𝒉 𝑽=
𝟏𝟑 𝝅 𝒓𝟐(𝟒) 𝑽=
𝟒𝟑 𝝅𝒓𝟐
𝑽 (𝒓 )=𝟒𝟑 𝝅 (𝒓𝟐) 𝑽 ′=𝟒
𝟑 𝝅 (𝟐𝒓 ) 𝑽 ′=𝟖𝟑 𝝅𝒓
𝑽 ′=𝟖𝟑 𝝅 (𝟗) 𝑽 ′=𝟐𝟒𝝅
When the radius is 9 the volume increases 24cu.ft.per minute
Second and Higher Order Derivatives
2
2
The derivative is called the
of with respect to . The first derivative may itself be a differentiable function
of . If so, its derivative, ,
dyy first derivativedx
y x
dy d dy d yx ydx dx dx dx
3
3
is called the of with respect to . If double prime is differentiable, its derivative,
,is called the , and so on ...
second derivative y xy y
dy d yy third derivativedx dx
function
y’ y’’ y’’’ yiv could be y(4)
Second and Higher Order Derivatives
(from superscript)
The multiple-prime notation begins to lose its usefulness after three primes.
So we use " super " to denote the th derivative of with respect to .
Do not c
n y nn y x
y
onfuse the notation with the
th power of , which is .
<< I like to use ROMAN NUMERALS through .>>
vi
n
nn y
y
yy
Example: Find all the derivatives. 5 3 23 2 5 7y x x x x
𝒚 ′=𝟏𝟓 𝒙𝟒−𝟔 𝒙𝟐+𝟏𝟎 𝒙+𝟏𝒚 ′ ′=𝟔𝟎𝒙𝟑−𝟏𝟐 𝒙+𝟏𝟎𝒚 ′ ′ ′=𝟏𝟖𝟎𝒙𝟐−𝟏𝟐𝒚 𝒊𝒗=𝟑𝟔𝟎𝒙𝒚 𝒗=𝟑𝟔𝟎𝒚 𝒗𝒊=𝟎
velocity
acceleration
jerk
The rest have mathematical uses
}
At a Joint PointPiece Wise Defined Functions:
The function must be CONTINUOUS
Derivative from the LEFT and RIGHT must be equal.
The existence of a derivative indicates a smooth curve; therefore, …
3 , 1( )
5 , 1x x
f xx x
2
2 1, 1( )
2, 1x x
f xx x
𝑑𝑦𝑑𝑥 |𝒙<𝟏=𝟐
𝑑𝑦𝑑𝑥 |𝒙 ≥𝟏=𝟐 𝒙
At 2=2 the derivative exists and it is a smooth transition
𝑑𝑦𝑑𝑥|𝒙≤𝟏=𝟏
𝑑𝑦𝑑𝑥|𝒙>−𝟏=−𝟏
Therefore the derivative DNE
Last Update
• 08/12/10