yes because if you use the vertical line test it will not cross it more than once.
center
Due to most conventional way for writing functions (two parts) that represents a ellipse is (x - a)^2 / c + (y - b)^2 / d = 1, which is similar to those of conic functions (hyperbolas) where + is replaced with - in the middle. Yet you can think of -d replaces d.
7/12 and 7/12 is the answer
difference between
The most general form is (ax - b)*(cx - d) = k where a, b, c, d and k are constants.
hyperbolas have an eccentricity (fixed point to fixed line ratio) that is greater than 1, while the parabolas have an exact eccentricity that is equal to 1. And hyperbolas are always come in pairs while parabolas are not.
--actually they are used in real life. parabolas are seen in "parabolic microphones" or satellites. and there are others for both ellipses and hyperbolas.
center
center center
The same as the major axis.
ellipses, parabolas, or hyperbolas. :)
Due to most conventional way for writing functions (two parts) that represents a ellipse is (x - a)^2 / c + (y - b)^2 / d = 1, which is similar to those of conic functions (hyperbolas) where + is replaced with - in the middle. Yet you can think of -d replaces d.
The types of conic sections are circles, parabolas, hyperbolas, and ellipses.
7/12 and 7/12 is the answer
difference between
The most general form is (ax - b)*(cx - d) = k where a, b, c, d and k are constants.
A hyperbola has two separate branches that extend infinitely in opposite directions, which distinguishes it from other conic sections like ellipses and parabolas that are connected or continuous. Additionally, hyperbolas possess asymptotes—lines that the branches approach but never touch—providing unique geometric properties not found in circles or ellipses. This duality and the presence of asymptotes are defining characteristics of hyperbolas.