Solving for x in Equation (1375sin(x)+794cos(x)=1500)

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The discussion revolves around solving the equation 1375sin(x) + 794cos(x) = 1500. The user reformulated two initial equations to arrive at this expression and seeks assistance in finding the value of x. Suggestions for solving include assuming a solution, using trigonometric identities to simplify the equation, or plotting the equation for visual analysis. The conversation emphasizes the importance of understanding the relationship between sine and cosine in the context of the problem. Overall, the focus is on finding effective methods to solve for x in the given trigonometric equation.
Xenix
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1. So I have 2 equations:
(1) A*cos(30)-1375*cos(x)=0
(2) 1375*sin(x)+A*sin(30)-1500=0


I redid equation (1) into A=1588*cos(x)
And substituted it into equation (2).

The result:

1375*sin(x) + 794*cos(x) = 1500

Can someone please tell me how to solve for x please?
 
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Hi Xenix! Welcome to PF! :smile:

(1375*cos(x))2 + (1375*sin(x))2 = … ? :wink:
 
Hi!

Thanks!

(1375*cos(x))2 + (1375*sin(x))2 = 1

But how does it help me?
 
You can:
1. Assume a solution and see if it satisfies the equation.
2. Play around with trig identities to get all cosines or all sines in the equation.
3. Plot the equation.
 
Xenix said:
(1375*cos(x))2 + (1375*sin(x))2 = 1

(13752, actually! :rolleyes:)

come on … think! :smile:
 

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