Secants and Tangents of Circles PowerPoint.ppt
KineahSoriaMediona
0 views
14 slides
Oct 08, 2025
Slide 1 of 14
1
2
3
4
5
6
7
8
9
10
11
12
13
14
About This Presentation
Grade 10 Matatag Curriculum Secant and Tangent of a Circle GIYA powerpoint
Slide Content
Secants and Tangents
A
B
T
A
B
T
A
B
A secant is a line that
intersects a circle at exactly
two points. (Every secant
contains a chord of the circle.)
T
A tangent is a line that intersects a circle at
exactly one point. This point is called the
point of tangency or point of contact.
B
A secant is a line that
intersects a circle at exactly
two points. (Every secant
contains a chord of the circle.)
T
A tangent is a line that intersects a circle at
exactly one point. This point is called the
point of tangency or point of contact.
T
T
Postulate: A tangent line is perpendicular to
the radius drawn to the point of contact.
Postulate: If a line is perpendicular to a
radius at its outer endpoint, then it is tangent
to the circle.
Tangent lines.
T
Postulate: A tangent line is perpendicular to
the radius drawn to the point of contact.
Postulate: If a line is perpendicular to a
radius at its outer endpoint, then it is tangent
to the circle.
Tangent lines.
Secant and Tangent Segments
A tangent segment is a point of a tangent line
between the point of contact and a point outside the
circle.
A secant segment is the part of a secant line that
joins a point outside the circle to the farther
intersection point of the secant and the circle.
T
B
Tangent segment
A
B
RAR is the secant segment.
A tangent segment is a point of a tangent line
between the point of contact and a point outside the
circle.
A secant segment is the part of a secant line that
joins a point outside the circle to the farther
intersection point of the secant and the circle.
T
B
Tangent segment
A
B
RAR is the secant segment.
The external part of a secant segment is the part
of a secant line that joins the outside point to the
nearer intersection point.
A
B
R
BR is the external part.
of a secant line that joins the outside point to the
nearer intersection point.
A
B
R
BR is the external part.
Theorem 85: If two tangent segments are
drawn to a circle from an external point, then
those segments are congruent. (Two-Tangent
Theorem)
O
A
C
B
drawn to a circle from an external point, then
those segments are congruent. (Two-Tangent
Theorem)
O
A
C
B
Tangent Circles
Tangent circles are circles that intersect each other at
exactly one point.
Two circles are externally tangent if each of the tangent
circles lies outside the other.
Two circles are internally tangent if one of the tangent
circles lies inside the other.
The point of contact lies on the line of centers. PQ
P Q
P
Q
Tangent circles are circles that intersect each other at
exactly one point.
Two circles are externally tangent if each of the tangent
circles lies outside the other.
Two circles are internally tangent if one of the tangent
circles lies inside the other.
The point of contact lies on the line of centers. PQ
P Q
P
Q
Common Tangents:
PQ is the line of center
XY is a common internal tangent.
AB is a common external tangent.
Definition:
A common tangent is a line tangent to two circles (not
necessarily at the same point.)
Such a tangent is a common internal tangent if it lies
between the circles(intersects the segment joining the
centers) or a
common external tangent if it is not between the circles
(does not intersect the segment joining the centers.)
A
B
Y
P
Q
X
PQ is the line of center
XY is a common internal tangent.
AB is a common external tangent.
Definition:
A common tangent is a line tangent to two circles (not
necessarily at the same point.)
Such a tangent is a common internal tangent if it lies
between the circles(intersects the segment joining the
centers) or a
common external tangent if it is not between the circles
(does not intersect the segment joining the centers.)
A
B
Y
P
Q
X
In practice, we will frequently refer to a
segment as a common tangent if it lies on a
common tangent and its endpoints are the
tangent’s points of contact.
In the diagram for example, XY can be called
a common internal tangent and AB can be
called a common external tangent.
A
B
Y
P
Q
X
segment as a common tangent if it lies on a
common tangent and its endpoints are the
tangent’s points of contact.
In the diagram for example, XY can be called
a common internal tangent and AB can be
called a common external tangent.
A
B
Y
P
Q
X
Practice
•Draw five circles anywhere on your paper,
label them 1-5.
–Draw a tangent line to circle 1.
–Draw a secant line to circle 2.
–Draw a common tangent line between circles 3
and 4.
–Draw an external tangent line between 4 and 5.
–Draw an internal tangent line between 1 and 2.
•Draw five circles anywhere on your paper,
label them 1-5.
–Draw a tangent line to circle 1.
–Draw a secant line to circle 2.
–Draw a common tangent line between circles 3
and 4.
–Draw an external tangent line between 4 and 5.
–Draw an internal tangent line between 1 and 2.
1.Draw the segment joining the centers.
2.Draw the radii to the points of contact.
3.Through the center of the smaller circle, draw
a line parallel to the common tangent.
4.Observe that this line will intersect the radius
of the larger circle (extended if necessary) to
form a rectangle and a right triangle.
5.Use the Pythagorean Theorem and properties
of a rectangle.
2.Draw the radii to the points of contact.
3.Through the center of the smaller circle, draw
a line parallel to the common tangent.
4.Observe that this line will intersect the radius
of the larger circle (extended if necessary) to
form a rectangle and a right triangle.
5.Use the Pythagorean Theorem and properties
of a rectangle.
Problem #1
A circle with a radius of 8 cm is
externally tangent to a circle with a
radius of 18 cm. Find the length of a
common external tangent.
A circle with a radius of 8 cm is
externally tangent to a circle with a
radius of 18 cm. Find the length of a
common external tangent.
1.Draw the segment joining the centers.
2.Draw the radii to the points of contact.
3.Through the center of the smaller circle, draw a line parallel to
the common tangent.
4.Use the Pythagorean Theorem and properties of a rectangle
to solve.
5.In ΔRPQ, (QR)
2
+ (RP)
2
= (PQ)
2
1.10
2
+ (RP)
2
= 26
2
2.RP = 24
6.AB = 24 cm
818
R
2.Draw the radii to the points of contact.
3.Through the center of the smaller circle, draw a line parallel to
the common tangent.
4.Use the Pythagorean Theorem and properties of a rectangle
to solve.
5.In ΔRPQ, (QR)
2
+ (RP)
2
= (PQ)
2
1.10
2
+ (RP)
2
= 26
2
2.RP = 24
6.AB = 24 cm
818
R
Problem #2
Given: Each side of
quadrilateral ABCD is a
tangent to the circle.
AB = 10, BC = 15, AD = 18.
Find CD.
D
C
B
A
Let BE = x and “walk around” the figure
using the given information and the Two-
Tangent Theorem.
E
x
10 - x
x
15 - x
10 - x
15 - x
18 – (10 – x)
1
8
–
(
1
0
–
x
)
CD = 15 – x + 18 – (10 – x)
= 15 – x + 18 – 10 + x
= 23
Given: Each side of
quadrilateral ABCD is a
tangent to the circle.
AB = 10, BC = 15, AD = 18.
Find CD.
D
C
B
A
Let BE = x and “walk around” the figure
using the given information and the Two-
Tangent Theorem.
E
x
10 - x
x
15 - x
10 - x
15 - x
18 – (10 – x)
1
8
–
(
1
0
–
x
)
CD = 15 – x + 18 – (10 – x)
= 15 – x + 18 – 10 + x
= 23
Categories
EducationDownload
Download Slideshow Get the original presentation fileQuick Actions
Statistics
- Views 0
- Slides 14
- Age 58 days
Related Slideshows
11
TLE-9-Prepare-Salad-and-Dressing.pptxkkk
MaAngelicaCanceran
32 views
12
LESSON 1 ABOUT MEDIA AND INFORMATION.pptx
JojitGueta
27 views
60
GRADE-8-AQUACULTURE-WEEKQ1.pdfdfawgwyrsewru
MaAngelicaCanceran
43 views
26
Feelings PP Game FOR CHILDREN IN ELEMENTARY SCHOOL.pptx
KaistaGlow
42 views
![Jeopardy_Figures_of_Speech_Template.pptx [Autosaved].pptx](https://slidepub.com/thumb/5828/284015828.jpg)
54
Jeopardy_Figures_of_Speech_Template.pptx [Autosaved].pptx
acecamero20
26 views
7
Jeopardy_Figures_of_Speech.pptxvdsvdsvsdvsd
acecamero20
27 views