Finding Polar Areas

Find the areas of the reg...

Question

Finding Polar Areas

Find the areas of the regions in Exercises 9–18.

Inside the circle r = 4 sin θ and below the horizontal line r = 3 csc θ

Accepted Answer

Hello there. Today we are going to solve the following practice problem together. So first off, let us read the problem and highlight all the key pieces of information that we need to use in order to solve this problem. Find the area of the region inside the circle. R is equal to 6 multiplied by sin of theta, and below the horizontal liner is equal to 9 divided by 2 multiplied by cosicant of theta. OK. So it appears for this particular prompt, we're asked to determine what the area of this specific region will be. Specifically, we're asked to find the area of the region inside of this circle that is below this horizontal line. So we need to take all the information that is provided to us and use it to help us solve for the area of this region inside of this specific circle. So now that we know what we're ultimately trying to solve for, based on our prior knowledge, we need to recall a note that in order to find the area inside a polar circle and below a horizontal line, we must first determine what the intersection angles are that help us identify where the boundary shifts occur between two curves. Then we will need to sum our integrals of the polar area formula, or the circular sectors on the sides, and the linear segment that will be in the center. So now we, now that we have like a brief overview of how we're going to approach solving this problem, our first step that we need to take is we need to determine what the intersection points are, and then we need to draw a graph to help us visualize what we're solving for. So, uh, and it's also it's really helpful whenever to draw like a picture or a graph or a diagram to help you visualize the problem. So considering that, we need to note that our line is R is equal to 9 divided by 2 multiplied by cosequant of theta, and we need to note that this line corresponds to the horizontal line Y is equal to 9 divided by 2. So we now need to set these equations equal to each other. So we need to take 6 multiplied by sin of theta will be equal to 9 divided by 2 multiplied by coequant of theta, which will give us sin squared of theta will be equal to 9 divided by 12, which will be equal to 3/4. And we will need to note that sin of theta will be equal to the square root of 3 divided by 2. And when we rearrange this expression to isolate and solve for theta, we will find that theta is simply equal to pi divided by 3 and 2 pi divided by 3. Fantastic. So, using this information, let us draw our graph now. So, as we should be able to recognize, we need to draw a graph of our circle, and our circle will be represented by a bold black curve, and the yellow highlighted region, so this highlighted region inside of our circle is the region that is below this horizontal line and it represents the area value that we're ultimately trying to solve for. And as you can see, we have plotted our points for theta is equal to 2 pi divided by 3, and theta is equal to pi divided by 3, and we've plotted our R is equal to 9 divided by 2 multiplied by cosequant of theta, and we've plotted R is equal to 6 multiplied by sin of theta. And as you can see, once again, to reiterate, we are ultimately trying to solve for the area of the highlighted yellow region of our graph. So, with that said, and you can always use graphing software such as Desmos or Matlab to help you graph problems like these too. So with that said, our second step now is we need to set up our integral. So by symmetry or considering symmetry across the vertical axis, considering theta is equal to pi divided by 2, we will need to calculate from 0 to pi divided by 2, and then we will need to multiply by 2. And for the condition from 0 to pi divided by 3, we need to consider the boundary is the circle, and this will mean that R is equal to 6 multiplied by sin theta. And from pi divided by 3 to the pi divided by 2 region, we need to note that the boundary will be the line R is equal to 9 divided by 2 multiplied by Cosicant of theta. And our area which will denote as a will be equal to 2 multiplied by square brackets of the integral evaluated from 0 to pi divided by 3 of 1/2 multiplied by parentheses of 6 multiplied by sin theta to the power 2 d theta. Plus the integral evaluated from pi divided by 3 to pi divided by 2 of 1/2 multiplied by parentheses of 9 divided by 2 multiplied by cosiant of theta squared. D theta, and don't forget your square bracket on the end. So now for our third step, we need to evaluate our integrals considering the circle part. We need to take the integral evaluated from 0 to pi divided by 3 of 36 multiplied by sin to the 2 of theta d theta, which will be equal to the integral evaluated from 0 to pi divided by 3. Of 36 multiplied by parentheses of 1 minus cosine of 2 theta divided by 2 d theta. Which will be equal to the integral evaluated from 0 to pi divided by 3 of drum roll, 18 multiplied by parentheses of 1 minus cosine of 2 theta. Which will be equal to square brackets of 18 multiplied by theta minus 9 multiplied by sine of 2 theta evaluated from 0 to pi divided by 3. And this, when we perform our evaluation, it will be ultimately equal to 6 pi minus 9 multiplied by the square root of 3 divided by 2. Now moving our attention to solve for the line part of our integral, which is the integral evaluated from pi divided by 3 to pi divided by 2 of 81 divided by 4 multiplied by Cosicant square theta d theta, which will be equal to square brackets of negative. 81 divided by 4 multiplied by cotangent of theta evaluated from pi divided by 3 to pi divided by 2. And when we perform this evaluation, we will find that it's ultimately going to be equal to 27 multiplied by the square root of 3 divided by 4. Which will mean for our fourth and final step we need to perform our final calculation for the total area, which I'll call TA for short, and the total area will be equal to 6 pi minus 9 multiplied by the square root of 3 divided by 2 plus 27 multiplied by the square root of 3 divided by 4. And this will be ultimately equal to when we write our final answer in its most simplified form, it will be equal to 24 pi plus 9 multiplied by the square root of 3 divided by 4. And don't forget our units will be square units. And that's it, that is our final answer, hooray, we did it. It's very important to make sure you always write down what your units are. And that's it. We've officially solved for this problem. So going back to the top to recap what we've learned, we can safely say without a doubt that our final answer for the area will be parentheses of 24 pi plus 9 multiplied by the square root of 3 divided by 4 square units. And that's it, that is our final answer. Thank you so much for watching, hopefully that helped, and I can't wait to see you in the next video. bye.

Finding Polar AreasFind the areas of the regions in Exercises 9–18.Inside the circle r = 4 sin θ and below the horizontal line r = 3 csc θ

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Finding Polar Areas

Find the areas of the regions in Exercises 9–18.

Inside the circle r = 4 sin θ and below the horizontal line r = 3 csc θ