Hyperbola – a set of points in a plane whose difference of the distances from two fixed points is a constant. Section 7.4 – The Hyperbola
Q Hyperbola – a set of points in a plane whose difference of the distances from two fixed points is a constant.
Section 7.4 – The Hyperbola Transverse axis – the line that contains the foci and goes through the center of the hyperbola. Conjugate axis – the line that is perpendicular to the transverse axis and goes through the center of the hyperbola. Conjugate axis Center – the midpoint of the line segment between the two foci. Center
Section 7.4 – The Hyperbola
Identify the direction of opening, the coordinates of the center, the vertices, and the foci. Find the equations of the asymptotes and sketch the graph. Vertices of transverse axis: Equations of the Asymptotes Foci
Section 7.4 – The Hyperbola Vertices of transverse axis: Equations of the Asymptotes Foci Identify the direction of opening, the coordinates of the center, the vertices, and the foci. Find the equations of the asymptotes and sketch the graph.
Section 7.4 – The Hyperbola Find b: Center: Equation of the Hyperbola
Section 7.4 – The Hyperbola Center: Equations of the Asymptotes
Section 7.4 – The Hyperbola Find the center, the vertices of the transverse axis, the foci and the equations of the asymptotes using the following equation of a hyperbola. Opening up/down
Section 7.4 – The Hyperbola Find the center, the vertices of the transverse axis, the foci and the equations of the asymptotes using the following equation of a hyperbola. Vertices: Foci:
Section 7.4 – The Hyperbola Find the center, the vertices of the transverse axis, the foci and the equations of the asymptotes using the following equation of a hyperbola. Equations of the Asymptotes