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Trig Equation (1 Viewer)
- Thread starter Axio
- Start date
Textbooks offer a well-known standard method (see faisal's method below). I'll do it slightly differently. Sketching a right angled-triangle with sides 1 and sqrt(3) and therefore hypotenuse =2 will help.
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faisalabdul16
Wot
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R = square root of (1^2 + (root3)^2) = 2. your angle is just tanA = root3. Therefore A = pi/3.
2cos(y+pi/3)
Axio
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Thanks, that's a good methodTextbooks offer a well-known standard method. I'll do it slightly differently. Sketching a right angled-triangle with sides 1 and sqrt(3) and therefore hypotenuse =2 will help.
)
.Thanks
Last edited:
Axio
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It'd be good if you did an example
.
aDimitri
i'm the cook
Auxiliary angle method involves taking an expression in the form asinx + bcosx and changing it into a single function. This is the method that involves dividing to get tana in terms of a constant. in this case the question was
 \\ \text{By expanding,} \\ Rcos(y+a) = Rcosacosy - Rsinasiny \\ \text{Comparing this with the original expression,} \\ Rcosa = 1 \: \: \: \: \text{ (A)} \\ Rsina = \sqrt{3} \: \: \: \: \text{ (B)}\\ (A)^{2} + (B)^2 \\ R^{2}(sin^{2}a + cos^{2}a) = 1^{2} + \sqrt{3}^{2} = 4 \\ R = \sqrt{4} = 2 \\ (B) \div (A) \\ tana = \frac{\sqrt{3}}{1} \\ a = \frac{\pi}{3} \\ \text{Therefore, } cosy - \sqrt{3}siny = 2cos\left(y+\frac{\pi}{3}\right))
Hope this helps
Hope this helps