The question is if you have the equation r^2 = cos (n*theta), where n is some positive integer, how would you go about finding a general formula to calculate the area?
I'm stumped, and have only got the following so far:
The graph of this is going to be some sort of petal shaped thing, with the values of r^2 being equal to a negative number being discarded for obvious reasons.
If you have a value such as n = 2 and theta = 0, however, you get r^2 =1, which means r could be +/- 1. Does this mean I would plot a value of r at (0, 1) and (pi, 1)? The last coordinate is gotten using the fact that (-r, theta) = (r, pi+theta).
I know the formula for getting an area section is by integrating from a to b w/ the equation r^2*(dtheta), so if I could somehow figure out how many petals an integer n would yield, I would be closer, I think.
Any tips/hints would be appreciated!
I'm stumped, and have only got the following so far:
The graph of this is going to be some sort of petal shaped thing, with the values of r^2 being equal to a negative number being discarded for obvious reasons.
If you have a value such as n = 2 and theta = 0, however, you get r^2 =1, which means r could be +/- 1. Does this mean I would plot a value of r at (0, 1) and (pi, 1)? The last coordinate is gotten using the fact that (-r, theta) = (r, pi+theta).
I know the formula for getting an area section is by integrating from a to b w/ the equation r^2*(dtheta), so if I could somehow figure out how many petals an integer n would yield, I would be closer, I think.
Any tips/hints would be appreciated!