Circles. Vocabulary Interior Exterior Chord Secant

Circles

Vocabulary

• Interior

• Exterior

• Chord

• Secant

Tangents

• Tangent– Perpendicular to radius

• Example:

– 2 tangents from external point• Same measure

Circles

• Congruent

• Concentric

• Tangent– Internally tangent– Externally tangent

Arcs & Chords

• Arc – Minor Arc– Major Arc– Semi-Circle

• Finding Measure:

• Adjacent Arcs

• Congruent Arcs – 2 Arcs with the same measure– Central Angles– Chords

Congruent Arcs

• Examples

• Find RT• Find mCD

Radii & Chords

• If radius is perpendicular to chord– Bisects Chord & Arc

• A perpendicular bisector of chord is a radius

Radii & Chords

• Example: Find QR

Examples

Sectors & Arc Length

• Sector of a circle – 2 radii & arc– The pie shaped slice of the circle

• Area of sector is percent area of circle based on arc or central angle:

A= Area, r= radius, m= measure of arc/angle

Segments of Circles

• Segment of circle– Area of arc bounded by chord

• Finding Area of Segment

Examples

• Sector:

• Segment:– segment RST

Arc Length

• Distance along the arc (circumference)– Measured in linear units

– L= length, r= radius, m= measure of arc/angle

• Example:– Measure of GH

file://localhost/Users/cmidthun/Downloads/practice_a (39).doc

Inscribed Angles

• Inscribed angle– Vertex on circle – Sides contain chords

• Measure of inscribed angle = ½ measure of arc– m<E = ½(mDF)

Inscribed Angles

• If inscribed angle arcs are congruent– Intercept same arc or congruent arcs– THEN: Inscribed angles are congruent

Example

• Find m<DEC

Inscribed Angle

• Inscribed angle subtends a semicircle if and only if the angle is a right angle

• Example:

Angle Relationships

• Tangent and a secant/chord– Measure of angle is ½ intercepted arc measure– Measure of the arc is twice the measure of angle

• Example:– Find m<BCD– Find measure of arc AB

Internal Angle

• Intersect inside circle– Measure of vertical angles is ½ sum of arcs

• Example: – Find m<PQT

External Angle

Examples

• Find x 1.

Equation for Circle

• (x – h)2 + (y – k)2 = r2

– h is the x coordinate of the center point– k is the y coordinate of the center point– r is the radius

Finding center & radius

• Given 2 endpoints – Find center point

• X coordinate is (x1+x2)/2

• Y coordinate is (y1+y2)/2

– Use center point coordinate and one end point with the distance formula to find the radius• (√(x1-xc)2+(y1-yc)2 )

• Plug center point and radius into equation for circle

Slope of Tangent

• Slope of radius = Rise over Run (ΔY ÷ ΔX) • Find negative reciprocal – Change sign, flip fraction

• Insert negative reciprocal into slope formula– Y = mx + b– Substitute y & x coords from tangent point to find b

• Rewrite equation with y & x and the b value

Examples with graph paper

Circles. Vocabulary Interior Exterior Chord Secant

Documents

Lesson 10-1 Introduction to Circles. Circles - Terms y x Chord Radius (r) Diameter (d) Center Circumference = 2 πr = dπ 0° 180° 90° 270°

Circles - White Plains Middle School€¦ · SWBAT: Apply the Power Theorems 1. Given 2 ... The models below show segment relationships in circles. Secant-Tangent Secant ÂX and tangent

Holt McDougal Geometry 12-6 Segment Relationships in Circles secant segment external secant segment tangent segment Vocabulary

Circles 11 - Central CUSD 4 · Circles 11 11.1 Riding a Ferris Wheel ... • chord • diameter • secant of a circle • tangent of a circle • point of tangency • central angle

1 | P a g e Geometry - COACH PHILLIPS · Unit 5B Circles Learning Target #1: Tangent and Chord Properties Learning Target #2: Tangent and Chord Inside and Outside Segments Learning

3 Tangents to Circles - … · 3 Tangents to Circles 61 3 Tangents to Circles Activity Activity 3.1 (p. 3.4) 1. ð—PMO ð=90ð°(line joining centre to mid-pt. of chord ð^ chord)

Riding a Ferris Wheel - Davis School District a Ferris Wheel Introduction to Circles Vocabulary ... chord 3. secant of the circle 4. tangent of the circle 5. point of tangency 11

1111-6-6 Segment Relationships in Circles...11-6 Segment Relationships in Circles Applying the Chord-Chord Product Theorem Find the value of x and the length of each chord. 5 = x EF

MMaatthheemmaattiiccss - · PDF filecircumference, diameter, chord, arc, secant, sector, segment subtended angle. 1. (Prove) Equal chords of a circle subtend equal angles at the center

€¦ · Web viewThey make conjectures and build a logical progression of statements to explore the truth of their conjectures. ... chord. tangent. secant

2 Basic Properties of Circles - WordPress.com · 05.08.2014 · 2 Basic Properties of Circles 27 ... (line from centre ⊥ chord bisects chord) 24 cm 2 ... M and N are the mid-points

Lesson 15.4, page 816 · 2018. 8. 14. · 15.4 Segment Relationships in Circles Chord-Chord Product Theorem Chord-Chord Product Theorem If two chords intersect inside a circle, then

Pg 651. A chord is a line segment with each endpoint on the circle A diameter is a chord that passes through the center of the circle. A secant of a circle

Web viewarc, arc length, central angle, chord, diameter, minor arc, major arc, arc measure, inscribed angle, circumscribed circle, inscribed circle, cyclic quadrilateral, secant, secant

Geometry Chapter 9 Review. Secant A line that contains a chord of a circle. SECANT.P.P

Secant method

Presentasi Secant

· 520 Chapter 10 CirclesCircles Circles • chord (p. 522) • circumference (p. 523) • arc (p. 530) • tangent (p. 552) • secant (p. 561) Key Vocabulary • Lessons 10-1 Ident

CIRCLES BASIC TERMS AND FORMULAS Natalee Lloyd Basic Terms and Formulas Terms Center Radius Chord Diameter Circumference Formulas Circumference

STUDYING THE ABILITY OF 7TH GRADE STUDENTS TO DEFINE …padi.psiedu.ubbcluj.ro/adn/article_8_3_2.pdf · 2015. 11. 20. · (center, radius, diameter, secant, chord, tangent) was arranged