Trigonometry: given sin(x)+cos(x)=1/5, solve for tan(x) | Summary and Q&A

TL;DR

Learn how to solve a quadratic equation involving trigonometric functions using factoring and trigonometric identities.

Key Insights

• 👨‍💼 Converting a quadratic equation involving trigonometric functions to either sine or cosine is the first step in solving it.
• 😑 Factoring the quadratic expression is essential for solving the equation.
• ❓ Trigonometric identities are useful in simplifying and solving the equation.
• 🧡 The solutions of the equation correspond to the values of the trigonometric functions within the given range.
• 😫 The quadratic equation can be solved by setting each factor equal to zero and finding the corresponding values of the trigonometric function.
• ❓ The quadratic formula is not applicable for solving equations involving trigonometric functions.
• 👨‍💼 Understanding and utilizing the relationships between sine, cosine, and other trigonometric functions is crucial in solving these types of equations.

Transcript

and now i'll show you guys how i will solve this right here it's actually a pretty cool equation so here we go this right here is my solution and the deal is that if you look at the original equation right here we have sine cosine volt and you can try to solve for what x doesn't know that but we don't have to and the truth is if you know sine plus ... Read More

Questions & Answers

Q: How do you solve a quadratic equation involving trigonometric functions?

To solve such an equation, you convert it to either sine or cosine using trigonometric identities. Then, factor the quadratic equation and solve each factor separately.

Q: Why do we convert the equation to either sine or cosine?

By converting the equation to either sine or cosine, we can apply trigonometric identities and simplify the equation, making it easier to solve.

Q: How does factoring help in solving the quadratic equation?

Factoring allows us to break down the quadratic expression into two separate factors, which can be set equal to zero and solved individually.

Q: Can we apply the quadratic formula to solve the quadratic equation involving trigonometric functions?

No, the quadratic formula cannot be directly applied to solve an equation with trigonometric functions. Factoring and applying trigonometric identities are more suitable methods.

Summary & Key Takeaways

• The content explains how to solve a quadratic equation involving the trigonometric functions sine and cosine.

• The first step is to convert the equation to either sine or cosine using trigonometric identities.

• By factoring the quadratic expression, the equation is simplified and can be solved for sine or cosine.

• The solutions are found by setting each factor equal to zero and solving for the trigonometric function.