View
131
Download
5
Category
Preview:
DESCRIPTION
DOUBLE-ANGLE AND HALF-ANGLE FORMULAS. If we want to know a formula for we could use the sum formula. we can trade these pla ces. This is called the double angle formula for sine since it tells you the sine of double . Let's try the same thing for. - PowerPoint PPT Presentation
Citation preview
DOUBLE-ANGLE AND HALF-
ANGLE FORMULAS
If we want to know a formula for we could use the sum formula.
2sin
sincoscossinsin2sin
we can trade these places
cossin2cossincossin This is called the double angle formula for sine since it tells you the sine of double
cossin22sin
Let's try the same thing for 2cos
sinsincoscoscos2cos
22 sincos
This is the double angle formula for cosine but by substiuting some identities we can express it in a couple other ways.
22 sincos2cos
22 sin1cos
22 sinsin1 2sin21 22 cos1sin
22 cos1cos 1cos2 2
Double-angle Formula for Tangent
tantan
tan2
2
1 2
tantan1
tantantan2tan
Summary ofDouble-Angle Formulas
sin sin cos
cos cos sin
cos sin
cos cos
2 2
2
2 1 2
2 2 1
2 2
2
2
tantan
tan2
2
1 2
Half-Angle Formulas
in. is 2
quadrant by what determined is -or thewhere
cos1
cos1
2tan
2
cos1
2cos
2
cos1
2sin
We can also derive formulas for an angle divided by 2.
As stated it is NOT both + and - but you must figure out where the terminal side of the angle is and put on the appropriate sign for that quadrant.
cos1
sin
sin
cos1
2tan
2tanfor Formulas Angle-Half
We could find sin 15° using the half angle formula.
2
cos1
2sin
Since 15° is half of 30° we could use this formula if = 30°
30° 30°
15° is in first quadrant and sine is positive there so we want the +
223
115sin
2
32
4
32
122
32
15sin
2
,5
4sin
2sin Find
cossin22sin
45
-3
5
3
5
422sin Use triangle to
find values.
Let's draw a picture.
25
24
2
,5
4sin
2sin Find
45
-3
253
1
2sin
Use triangle to find cosine value.
If is in quadrant II then half would be in quadrant I where sine is positive
5
52
2
cos1
2sin
5
52
5
2
5
4
1258
253
1
Your Turn: Simplify an Expression
• Simplify cot x cos x + sin x.• Click for answer.
x
xx
sin
coscot
xx
xxx
x
xsin
sin
cossincos
sin
cos 2
xxx
xxcsc
sin
1
sin
sincos 22
Your Turn: Cosine Sum and Difference Identities
)4530cos(75cos
45sin30sin45cos30cos
Find the exact value of cos 75°.
Click for answer.
4
26
2
2
2
1
2
2
2
3
Your Turn: Sine Sum and Difference Identities
• Find the exact value of .• Click for answer.
12
7sin
34sin
12
4
12
3sin
12
7sin
3
sin4
cos3
cos4
sin
4
62
2
3
2
2
2
1
2
2
Your Turn: Double-Angle Identities
• If , find sin 2x given sin x < 0.
• Click for answer.
3
1cos x
Your Turn: Double-Angle Identities
1cossin ,3
1cos 22 xxx
1
3
1sin
22 x
3
22sin
9
8sin 2 xx
9
24
3
1
3
222cossin22sin
xxx
Your Turn: Half-Angle Identities
• Use a half-angle identity to find sin 22.5°.• Click for answer.
2
45cos1
2
45sin5.22sin
2
22
4
22
222
1
Objective: 7-4 Double-Angle and Half-Angle Identities
17
Verifying An Identity Using Double Angle
1cot
1cot
2sin1
2cos
Find using the double angle formulas. (no calculator)
1. sin 420° 2. 3. tan 240°
4. 5. cos 300° 6. tan 630°
€
cos3π
2
€
sin2π
3
Find the exact values of sin 2x, cos 2x, and tan 2x using the double angles formulas
1.
2.
€
≤x ≤3π
2
€
tan x =−1
2
€
sin x =−4
5
€
2
≤ x ≤ π
Recommended