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Title: Circles - Differential Calculus
Description: Hi! This is one of the topics before the actual Calculus lectures. This is part of the Pre-Calculus discussion about Circles.
Description: Hi! This is one of the topics before the actual Calculus lectures. This is part of the Pre-Calculus discussion about Circles.
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DIFFERENTIAL CALCULUS
Study Notes 4
βCIRCLESβ
Prepared By: Tutor Win
CIRCLES
07/29/2021
In the last StudyNote 3, we have learned the foundation of lines
through determining its steepness or slope, its equations, procedures on
how to get the equation and the like
...
In this note, we will
learn the foundation of circles and its equation
...
EQUATIONS OF CIRCLES
The standard equation of a circle may be associated to the distance
formula
...
The standard equation of the circle is
(π₯ β β) + (π¦ β π) = π
A(x,y)
r
C(h,k)
1|Page
CIRCLES
07/29/2021
Example 1
...
Step 1
...
(π₯ β 2) + (π¦ β 3) = 5
Step 3
...
Find the standard equation of the circle having a center at (3,-2)
and radius of 2 units
...
(π₯ β β) + (π¦ β π) = π
Step 2
...
(π₯ β 3) + (π¦ + 2) = 4
Example 3
...
Step 1: (π₯ β β) + (π¦ β π) = π
Step 2
...
Step 3
...
If we have,
(x+6)2 + (y-2)2 = 49
It may also be equivalent to,
x2 + y2 + 12x β 4y β 9 = 0
This is the general equation of the circle
...
We
can expand (x+6)2 using multiplication of binomial or FOIL method
...
We can also expand (y-2)2
...
(x+6)2 + (y-2)2 = 49
(x2 + 12x + 36) + (y2 β 4y + 4) = 49
Next is to evaluate by removing the parentheses and combining like
terms
...
How can we now convert the general equation of a circle to its standard
equation? Letβs use again the example above
...
Step 1
...
(x2 + 12x) + (y2 β 4y) β 9 = 0
Now we have grouped them
...
To do so,
(x2
Let (x2 + 12x) = (x2 + Ax); and
(y2 β 4y) = (y2 + By)
To find the constant term of each, solve for
( )2 (in the trinomial with x variable) and
( )2 (in the trinomial with y variable)
A = 12 and B = -4
( )2 = ( )2 = (6)2 = 36
( )2 = ( )2 = (β2)2 = 4
Therefore,
(x2 + 12x + 36) and (y2 β 4y + 4)
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CIRCLES
07/29/2021
(x2 + 12x + 36) + (y2 β 4y + 4) β 9 = 0 + 36 + 4
Note: We have just added 36 and 4 to the left side of the equation
...
Thatβs why
we have also added 36 and 4 to the right side of the equation
...
(x2 + 12x + 36) + (y2 β 4y + 4) β 9 = 40
(x+ )2 + (y+ )2 β 9 = 40
(x+6)2 + (y-2)2 β 9 = 40
(x+6)2 + (y-2)2 β 9 + 9= 40 + 9
(x+π)2 + (y-2)2 = 49
Example 4
...
Step 1
...
(x2 - 2x +1) + (y2 β 6y + 9) = 100
Step 3
...
x2 + y2 - 2x β 6y +1 + 9 = 100
Step 5
...
x2 + y2 - 2x β 6y +10 β 100 = 100 β 100
Step 7
...
Convert x2 + y2 + 8x β 16y β 64 = 0 to its standard form
...
x2 + y2 + 8x β 16y β 64 = 0
Step 2
...
[x2 + 8x + ( )2] + [y2 β 16y + (
Step 4
...
(x2 + 8x + 16) + (y2 β 16y + 64) β 64 = 80
Step 6
...
(x + 4)2 + (y β 8)2 β 64 = 80
Step 8
...
(x + 4)2 + (y β 8)2 = 144
)2] β 64 = 0 + ( )2 + (
)2
)2 β 64 = 80
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CIRCLES
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PRACTICE TEST 4
...
1
...
3
...
(9, 1)
r=4
(-1, 5)
r=6
(2, -2)
r = β7
4
...
(- , )
r = 2β5
B
...
7
...
Convert standard equation to general equation
...
Convert general equation to standard equation
...
x2 + y2 + 6x β 4y β 3 = 0
10
...
x2 + y2 β 6x + 8y + 24 = 0
7|Page
CIRCLES
07/29/2021
PRACTICE TEST 4
...
1
...
(π₯ β β) + (π¦ β π) = π
Step 2
...
(π₯ β 9) + (π¦ β 1) = 16
2
...
(π₯ β β) + (π¦ β π) = π
Step 2
...
(π₯ + 1) + (π¦ β 5) = 36
3
...
(π₯ β β) + (π¦ β π) = π
Step 2
...
(π₯ β 2) + (π¦ + 2) = 7
4
...
(π₯ β β) + (π¦ β π) = π
Step 2
...
(π₯ + 12) + (π¦ + 3) =
1
4
8|Page
CIRCLES
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5
...
(π₯ β β) + (π¦ β π) = π
Step 2
...
1
5
(π₯ β ) + (π¦ β ) = 20
3
6
B
...
Step 1
...
Step 3
...
Step 5
...
Step 7
...
Step 1
...
Step 3
...
Step 5
...
Step 7
...
Step 1
...
Step 3
...
Step 5
...
Step 7
...
9
...
x2 + y2 + 6x β 4y β 3 = 0
Step 2
...
[x2 + 6x + ( )2] + [y2 β 4y + ( )2] β 3 = 0 + ( )2 + ( )2
Step 4
...
Step 6
...
Step 8
...
(x + 3)2 + (y β 2)2 β3 = 13
(x2 + 6x + 9) + (y2 β 4y + 4) β 3 = 13
(x + )2 + (y β )2 β 3 = 13
(x + 3)2 + (y β 2)2 β 3 + 3 = 13 + 3
(x + 3)2 + (y β 2)2 = 16
10
...
x2 + y2 -2x β 4y β 4 = 0
Step 2
...
[x2 - 2x + ( )2] + [y2 β 4y + ( )2] β 4 = 0 + ( )2 + ( )2
Step 4
...
Step 6
...
Step 8
...
(x - 1)2 + (y β 2)2 β 4 = 5
(x2 - 2x + 1) + (y2 β 4y + 4) β 4 = 5
(x - )2 + (y β )2 β 4 = 5
(x - 1)2 + (y β 2)2 β 4 + 4 = 5 + 4
(x - 1)2 + (y β 2)2 = 9
11
...
x2 + y2 - 6x + 8y + 24 = 0
Step 2
...
[x2 - 6x + ( )2] + [y2 + 8y + ( )2] + 24 = 0 + ( )2 + ( )2
Step 4
...
Step 6
...
Step 8
...
(x - 3)2 + (y β 4)2 + 24 = 25
(x2 - 6x + 9) + (y2 + 8y + 16) + 24 = 25
(x - )2 + (y β )2 + 24 = 25
(x - 3)2 + (y β 4)2 + 24 - 24 = 25 - 24
(x - 3)2 + (y β 4)2 = 1
10 | P a g e
Title: Circles - Differential Calculus
Description: Hi! This is one of the topics before the actual Calculus lectures. This is part of the Pre-Calculus discussion about Circles.
Description: Hi! This is one of the topics before the actual Calculus lectures. This is part of the Pre-Calculus discussion about Circles.