Register
Determine the general solution for sin(x-30°)=cos2x
226k views
4 votes
Determine the general solution for sin(x-30°)=cos2x

User Apogalacticon
by
5.7k points

1 Answer

3 votes

Solution

- The solution steps are given below:


\begin{gathered} \sin(x-30)=\cos2x \\ \text{ The following trigonometric identities are used to proceed:} \\ \cos2x=\sin(90-2x) \\ \\ \sin(x-30)=\sin(90-2x) \\ \text{ We can proceed to equate the angles} \\ x-30=90-2x \\ \text{ Collect like terms} \\ 2x+x=90-30 \\ 3x=60 \\ \text{ Divide both sides by 3} \\ x=60 \end{gathered}

User Jakubka
by
5.1k points
Ask a Question
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

5.3m questions

6.9m answers

Other Questions

Pizza planet is running a special 3 pizzas for 16.50. What is the unit rate for one pizza
What number is halfway between 0 and 18
If the 9-inch wheel of cheese costs $18.60, what is the cost per square inch? If the cost is less than a dollar, put a zero to the left of the decimal point?
how long Will it take for $7000 investment to grow to $7553 and the annual rate of 3.4% compounded quarterly assume that no withdrawals are made
I need to simplify this expression.
Link Copied!