Solving Trig Equations: Sin/Tan | Tutorial & Working

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To solve the trigonometric equations sin(x + 30) = 1 and tan(x + 45) = 1, it is suggested to substitute u for x + 30 and x + 45 respectively. For sin(x + 30) = 1, the solution leads to x = 60 + 360k, where k is any integer, due to the periodic nature of the sine function. The discussion emphasizes the importance of recognizing the periodicity of trigonometric functions when solving these equations. Additionally, participants are reminded to post homework-style questions in the appropriate forum. Understanding these concepts is crucial for effectively solving trigonometric equations.
Rudders
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Hi,

I'm just stumped on how to solve the following type of trig equation. Could someone show working / a tutorial on how to solve similar equations. I'm fine with simple ones like: 4 + sinx = 3 , but this style has me stumped:

sin(x + 30) = 1
or

tan(x + 45) = 1

Thanks!
 
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Try letting u = x + 30 in the first one, or u= x+45 in the second one. Then, solve it just like you are used to and you attain your values for u. You know the relation between u and x, easy. =]

EDIT: I didn't realize this wasn't the homework forum when I posted. From now on, please only ask homework style questions in the Homework Help forum.
 
sin(x + 30) = 1

( x + 30 ) = 90

x = 90 - 30

x = 60
 
HanQing said:
sin(x + 30) = 1

( x + 30 ) = 90

x = 90 - 30

x = 60

x = 60 + 2k pi

edit: oh wait, in degrees that is:
x = 60 + 360k

Where k is any whole number.

Because sine is repetitive every 360 deg or 2pi rad.
 
ImAnEngineer said:
x = 60 + 2k pi

edit: oh wait, in degrees that is:
x = 60 + 360k

Where k is any whole number.

Because sine is repetitive every 360 deg or 2pi rad.

opps yea you are right ,forgot to include that =.=
 

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