angles and their measure
DESCRIPTION
Angles and their Measure. Geometric Representation of Angles. Definition of Angles. Angles Initial Side and Standard Position. Angles. Degrees: One degree is 1/360 of a revolution. A right angle is an angle that measures 90 degrees or ¼ revolution - PowerPoint PPT PresentationTRANSCRIPT
Geometric Representation of Angles
Angles
Initial Side and Standard Position
Degrees: One degree is 1/360 of a revolution.
A right angle is an angle that measures 90 degrees or ¼ revolution
A straight angle is an angle that measures 180 degrees or ½ revolution
Drawing an Angle
(a) 45 degrees
(b) -90 degrees
(c) 225 degrees
(d) 405 degrees
1 degree equals 60’ (minutes)
1’ (minute) equals 60” (seconds)
Using graphing calculator to convert
Definition
Arc Length For a circle of radius r, a central angle of
radians subtends an arc whose length s is
s=r
Find the length of the arc of a circle of radius 2 meters subtended by a central angle of 0.25 radian.
s=rwith r = 2 meters and Θ = 0.25
2(0.25) = 0.25 meter
One revolution is 2π therefore, 2πr = rθ (arc length formula)
It follows then that 2π = θ and
1 revolution = 2π radians 360 degrees = 2π radians or 180 degrees = π radians so . . . 1 degree = π/180 radian and 1 radian = 180/π degrees
Convert each angle in degrees to radians:
(a) 60 degrees (b) 150 degrees (c) – 45 degrees (d) 90 degrees
Convert each angle in radians to degrees
(a) π/6 radian (b) 3π/2 radian (c) -3π/4 (d) 7π/3
Page 375 has common angles in degree and radian measures
Steps: (1) Find the measure of the central angle
between the two cities (2) Convert angle to radians (3) Find the arc length (remember we live
on a sphere and the distance between two cities on the same latitude is actually an arc length)
The area A of the sector of a circle of radius r formed by a central angle of θ radians is
A = ½ r^2θ
Examples
Linear Speed:
v = s/t
Angular Speed:
ω = θ/t
Angular Speed is usually measured in revolutions per minute (rpms).
Converting to radians per minute
Linear Speed given an Angular Speed:
v = rω where r is the radius
A child is spinning a rock at the end of a 2-ft rope at the rate of 180 rpms. Find the linear speed of the rock when it is released.
At the Cable Car Museum you can see four cable lines that are used to pull cable cars up and down the hills of San Francisco. Each cable travels at a speed of 9.55 miles per hour, caused by rotating wheel whose diameter is 8.5 feet. How fast is the wheel rotating? Express your answer in rpms.
On-line Examples
On-line Tutorial