Hey guys,
So I'm still unsure as to how you determine a and b in various conics equations/scenarios ie. b^2=a^2(1-e^2) for the ellipse and b^2=a^2(e^2-1) for the hyperbola. I understand that you let the "bigger value" represent a for the ellipse so that you get a fraction less than one when you solve for e, but what about the hyperbola - regardless of what a or b are, when you add one to the fraction b^2/a^2, the number will be bigger than one anyway? I tried a problem for a hyperbola with y intercepts (x^2/9+y^2/4=-1) and got a and b muddled up, which impacted the equation of my directices and foci. Sorry for the convoluted question. In short, how do you know what a and b are in different situations?
Thanks.
So I'm still unsure as to how you determine a and b in various conics equations/scenarios ie. b^2=a^2(1-e^2) for the ellipse and b^2=a^2(e^2-1) for the hyperbola. I understand that you let the "bigger value" represent a for the ellipse so that you get a fraction less than one when you solve for e, but what about the hyperbola - regardless of what a or b are, when you add one to the fraction b^2/a^2, the number will be bigger than one anyway? I tried a problem for a hyperbola with y intercepts (x^2/9+y^2/4=-1) and got a and b muddled up, which impacted the equation of my directices and foci. Sorry for the convoluted question. In short, how do you know what a and b are in different situations?
Thanks.
