Trigonometry is arrived from the Greek word, trigonon = triangle and metron = measure. The father of trigonometry is Hipparchus. He designed the first trigonometric table. Identity is defined as an equation that is true for all probable values of its variables. In online, many websites provide online tutoring using tutors. Double number trigonometric identities problems are easy to solve. Solving double number trigonometric identities problems are easy. Through practice, students can learn about solving trigonometric identities. Through online, students can practice more problems on trigonometric identities. In this topic, we are going to see about; solving double number identities.
Solving Double Number Identities: - Double Number Identities
The list of double number identities are given below,
sin `2theta` = 2sin `theta` cos `theta `
cos `2theta` = 2cos2 `theta` -1
cos `2theta` = 1- 2sin2 `theta`
cos `2theta` = cos2 `theta` – sin2 `theta`
Solving Double Number Identities: - Examples
Example 1:
Evaluate sin 60 using double number identities,
Solution:
sin 2theta = 2sin theta cos theta
sin 60 = (2x30)
= 2 sin 30 cos 30
= 2 (0.5) (0.866)
= 2*0.433
= 0.866
The answer is 0.866
Example 2:
Evaluate sin 90 using double number identities,
Solution:
sin 2theta = 2sin theta cos theta
sin 90 = (2x45)
= 2 sin 45 cos 45
= 2 (0.707) (0.707)
= 2*0.499
= 1
The answer is 1
Example 3:
Evaluate cos 50 using double number identities,
Solution:
cos 2theta = cos2 theta – sin2 theta
cos 50 = cos (2x25)
= cos2 25 - sin2 25
= (0.906)2 - (0.423)2
= 0.820 - 0.179
= 0.641
The answer is 0.641
Example 4:
Evaluate cos 90 using double number identities,
Solution:
cos 2theta = cos2 theta – sin2 theta
cos 90 = cos (2x45)
= cos2 45 - sin2 45
= (0.707)2 - (0.707)2
= 0.499-0.499
= 0
The answer is 0
Example 5:
Find cos 2y if sin y = -15/16 and in 3rd quadrant
Solution:
It is given that sin 2y is in 3rd quadrant,
Use the double angle identities
cos 2theta = 1- 2sin2 theta
cos 2y = 1 -2sin2 y
= 1 – 2`(-15/16)` 2
= 1 – 2 `(225/256)`
Taking LCM, we get
= `(256-450)/256`
= `-194/256`
= -97/128
The answer is `-97/128`
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