Angular measurement Objectives Be able to define the radian. Be able to convert angles from degrees into radians and vice versa.

Slides:

Advertisements

Similar presentations

EteMS KHOO SIEW YUEN SMK.HI-TECH 2005.

Advertisements

Sec 6.1 Angle Measure Objectives:

Introduction A sector is the portion of a circle bounded by two radii and their intercepted arc. Previously, we thought of arc length as a fraction of.

Radians In a circle of radius 1 unit, the angle  subtended at the centre of the circle by the arc of length 1 unit is called 1 radian, written as 1 rad.

Radian Measure A central angle has a measure of 1 radian if it is subtended by an arc whose length is equal to the radius of the circle. Consider the circle.

Radians and Degrees Trigonometry MATH 103 S. Rook.

Converting Degree Measure to Radian Measure Convert to radian measure: a)  or  π rad ≈ 3.67 Exact radian Approximate radian b) To.

Introduction to Radians (Definition, Converting Between Radians and Degrees, & When to use Degrees or Radians)

Copyright © 2003 Pearson Education, Inc. Slide Radian Measure, Arc Length, and Area Another way to measure angles is using what is called radians.

AGENDA: DG minutes10 minutes Notes Lesson 2 Unit 5 DG 17 Mon.

Radian Measure Angles can be measured 3 ways: 1) Degrees (360 parts to a rotation) 1) Degrees (360 parts to a rotation) used for triangle applications.

8.1 RADIANS AND ARC LENGTH Functions Modeling Change: A Preparation for Calculus, 4th Edition, 2011, Connally.

Day 2 Students will be able to convert between radians and degrees. Revolutions, Degrees, and Radians.

40: Radians, Arc Length and Sector Area

Converting between Degrees and Radians: Radian: the measure of an angle that, when drawn as a central angle of a circle, would intercept an arc whose.

13-3: Radian Measure Radian Measure There are 360º in a circle The circumference of a circle = 2r. So if the radius of a circle were 1, then there a.

Circumference & Arc Length. Circumference The distance around a circle C = 2r or d.

7.7: Areas of Circles and Sectors

Degrees, Minutes, Seconds

Section 5.2 – Central Angles and Arcs Objective To find the length of an arc, given the central angle Glossary Terms Arc – a part of a circle Central angle.

Grade 12 Trigonometry Trig Definitions. Radian Measure Recall, in the trigonometry powerpoint, I said that Rad is Bad. We will finally learn what a Radian.

Circle Properties An Arc is a fraction of the circumference A sector is a fraction of a circle. Two radii and an arc A B O 3 cm r = 3 cm d = 6 cm Arc AB.

Radian Measure. Many things can be measured using different units.

Try describing the angle of the shaded areas without using degrees.

Radians, Arc Length and Sector Area 40: Radians, Arc Length and Sector Area.

A chord of a circle is subtended by an angle of x degrees. The radius of the circle is 6 √ 2. What is the length of the minor arc subtended by the chord?

Can you draw a radius to each point of tangency? What do you notice about the radius in each picture?

4.1 Day 1 Angles & Radian Measure Objectives –Recognize & use the vocabulary of angles –Use degree measure –Use radian measure –Convert between degrees.

CIRCULAR MEASURE. When two radii OA and OB are drawn in a circle, the circle is split into two sectors. The smaller sector OAB is called the minor sector.

Note 2: Perimeter The perimeter is the distance around the outside of a shape. Start at one corner and work around the shape calculating any missing sides.

Starter The perimeter of this sector is (2r + 12∏) m. Find the radius r m, of the sector. r m.

R a d i a n M e a s u r e AREA. initial side terminal side radius of circle is r r r arc length is also r r This angle measures 1 radian Given a circle.

Aim: How do we define radians and develop the formula Do Now: 1. The radius of a circle is 1. Find, in terms of the circumference. 2. What units do we.

Angles and Their Measure. 1. Draw each angle (Similar to p.105 #11-22)

Calculating sector areas and arc lengths. Look at these relationships. What do you notice? Radius = R π R/2 R π 3 π R/2 2 π R Degrees Circumference.

Radians, Arc Length and Sector Area. Radians Radians are units for measuring angles. They can be used instead of degrees. r O 1 radian is the size of.

RADIANS Radians, like degrees, are a way of measuring angles.

C2:Radian Measure Learning Objective: to understand that angles can be measured in radians.

And because we are dealing with the unit circle here, we can say that for this special case, Remember:

MEASURES of ANGLES: RADIANS FALL, 2015 DR. SHILDNECK.

Radian Measure of a Circle another way to measure angles!

Arc Length Start with the formula for radian measure … … and multiply both sides by r to get … Arc length = radius times angle measure in radians.

Measuring Angles – Radian Measure Given circle of radius r, a radian is the measure of a central angle subtended by an arc length s equal to r. The radian.

Radian Measure Length of Arc Area of Sector

MATHPOWER TM 12, WESTERN EDITION Chapter 4 Trigonometric Functions 4.1.

Geometry Honors Section 5.3 Circumference and Area of Circles.

6.1 Angles and Radian Measure Objective: Change from radian to degree measure and vice versa. Find the length of an arc given the measure of the central.

Trigonometry Radian Measure Length of Arc Area of Sector Area of Segment.

Perimeter and Area with Circles. Circumference of a Circle Circumference is the perimeter of the circle Formula: or (for exact answers, leave π in your.

Sections Perimeter and Area with Circles.

Radians. Definition A radian is the angle that is subtended (cut out) at the center of the unit circle when the radius length and the arc length are equal.

Trigonometry Radian Measure Length of Arc Area of Sector.

More Trig - Radian Measure and Arc Length Warm-up Learning Objective: To convert from degree measure to radian measure and vice versa and to find arc length.

Unit Circle. Special Triangles Short Long Hypotenuse s s 2s Hypotenuse 45.

Section 3-4 Radian Measures of Angles. Definition: Radian Measure of an Angle.

Arcs, Sectors & Segments

C2 TRIGONOMETRY.

Aim: How do we define radians and develop the formula

Warm-Up: If , find tan θ..

11.3 Areas of Circles and Sectors

1.2 Radian Measure, Arc Length, and Area

CIE Centre A-level Pure Maths

Arc length and area of a sector.

47.75⁰ Convert to radians: 230⁰.

11.1 Vocabulary Circumference PI () Arc Length Radian.

Chapter 2 Section 1.

Chapter 2 Section 1.

40: Radians, Arc Length and Sector Area

Trig Graphs and reciprocal trig functions

11.1 Vocabulary Circumference PI () Arc Length Radian.

Presentation transcript:

Angular measurement Objectives Be able to define the radian. Be able to convert angles from degrees into radians and vice versa.

Outcomes MUST ALL You MUST ALL be able to define the radian AND be able to convert degrees into radians and vice-versa. MOSTSHOULD MOST of you SHOULD Be able to understand the reasons for using radians AND be able to solve problems involving a mixture of degrees and radians. SOMECOULD SOME of you COULD be able to work out arc length.

Radians Radians are units for measuring angles. They can be used instead of degrees. r O 1 radian is the size of the angle formed at the centre of a circle by 2 radii which join the ends of an arc equal in length to the radius. r r x = 1 radian x = 1 rad. or 1 c

r O 2r r 2c2c If the arc is 2r, the angle is 2 radians. Radians

O If the arc is 3r, the angle is 3 radians. r 3r r 3c3c If the arc is 2r, the angle is 2 radians. Radians

O If the arc is 3r, the angle is 3 radians. If the arc is 2r, the angle is 2 radians. r r If the arc is r, the angle is radians. r Radians

O If the arc is 3r, the angle is 3 radians. r r If the arc is 2r, the angle is 2 radians. If the arc is r, the angle is radians. r Radians

If the arc is r, the angle is radians. O r r r But, r is half the circumference of the circle so the angle is Hence, Radians

We sometimes say the angle at the centre is subtended by the arc. Hence, r O r r x x = 1 radian Radians

 Radians SUMMARY One radian is the size of the angle subtended by the arc of a circle equal to the radius 1 radian

Exercises 1. Write down the equivalent number of degrees for the following number of radians: Ans: (a) (b) (c) (d) 2. Write down, as a fraction of, the number of radians equal to the following: (a) (b) (c) (d) Ans: It is very useful to memorize these conversions

Extension Arc Length

Let the arc length be l. O r r l Consider a sector of a circle with angle. Then, whatever fraction is of the total angle at O, l is the same fraction of the circumference. So, ( In the diagram this is about one-third.) circumference

Examples 1. Find the arc length, l, of the sector of a circle of radius 7 cm. and sector angle 2 radians. Solution: where is in radians

2. Find the arc length, l, of the sector of a circle of radius 5 cm. and sector angle. Give exact answers in terms of. Solution: where is in radians rads. So, Examples

 Radians An arc of a circle equal in length to the radius subtends an angle equal to 1 radian. 1 radian  For a sector of angle radians of a circle of radius r, the arc length, l, is given by SUMMARY

1. Find the arc length, l, of the sector shown. O 4 cm l 2. Find the arc length, l, of the sector of a circle of radius 8 cm. and sector angle. Give exact answers in terms of. Exercises

1. Solution: O 4 cm A l Exercises

2. Solution: rads. So, O 8 cm A l where is in radians Exercises