In Exercises 49–58, convert each rectangular equation to a polar ...

Question

In Exercises 49–58, convert each rectangular equation to a polar equation that expresses r in terms of θ.(x − 2)² + y² = 4

Accepted Answer

Hello, today we're going to be transforming the given rectangular equation into a polar form. So before we start this process, there's one thing to understand about the equation. If we have an equation in rectangular form, that means the equation is in terms of X and Y. And if we want to transform the equation from rectangular to polar form, that means we are transforming the terms of X and Y into terms of R comma theta. And if we want to proceed with this process, we have two conversion factors to help us do that, we have X is equal to R multiplied by cosine of data. And we have Y is equal to R multiplied by sign of the. So let's take a look at the given equation. We are given the quantity X minus five squared plus Y squared is equal to 25. We can immediately change the terms of X and Y into R and data by using the written conversion factors. So we can rewrite X as our cosine of data and we have R cosine of data minus five squared and we can rewrite Y as our sign of data and change that term to our sign of data squared and all of that is equal to 25. So currently, our equation is now in polar form, but we're going to need to simplify the equation. We can start by foiling our cosine of data minus five and foiling this quantity will leave us with R squared cosine squared data minus 10 R cosine of theta plus 25. And if we square the term of our sin data, that will leave us with R squared sine squared of data and all of that will equal to 25. Now, there's a bit of simplification that we can do. We can start by eliminating the constants and we can subtract 25 to both sides of the equation which will cancel the quant constants in the equation. Then what we can do is we can write the R squared terms together. So if we do a little bit of reordering on the left hand side, we can rewrite the left hand side as R squared cosine squared theta plus R squared sine squared, the minus 10 R cosine of theta is equal to zero. The next thing we can do is we can factor out an R squared from the first two terms. And that will leave us with R squared multiplied by the quantity cosine squared data plus sine squared data minus 10 R cosine of theta is equal to zero. Now, we have a trigonometric identity to help us simplify cosine squared data plus sine squared data. The trigonometric identity states that if we have cosine squared data plus sine squared data, we can rewrite this quantity as just one. So if we were to use this trigonometric identity on the cosine squared plus sine squared term, we can rewrite that term as R squared multiplied by one minus 10 R cosine of data is equal to zero and R squared multiplied by one will give us R squared. So the left hand side is R squared minus 10 R cosine of theta is equal to zero. Now notice that both of the terms on the left hand side have a multiple of R. So we can factor out an R from the left hand side of the equation. And that will leave us with R multiplied by the quantity R minus 10 cosine of data is equal to zero. And if we were to use the zero property, we can write the factors of R and set them equal to zero. So what that leaves us with is R is equal to zero and R minus 10 cosine of data is equal to zero. On the right hand equation we can solve for R by adding 10 cosine of data to both sides of the equation. And that will give us R is equal to 10 cosine of data. Now one thing to note is that R is equal to zero is a constant value that is included in R is equal to cosine of data. So since the value of R is equal to zero is included in that equation. That means the equation or the polar form of the rectangular equation is R is equal to 10 cosine of data. And that is going to be the answer to this problem. So I hope this video helps you in understanding how to approach this problem. And I'll go ahead and see you all in the next video.

In Exercises 49–58, convert each rectangular equation to a polar equation that expresses r in terms of θ.(x − 2)² + y² = 4

Key Concepts

Rectangular to Polar Coordinates

Equation of a Circle

Trigonometric Identities

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