Determine the equation of the given graph of the ellipse: у (-2,8) (-2,5+15) - (-4,5) (0,5)...
1) Given parametric equations x(t) = 2 + t and y(t) = 2-1, determine the rectangular form by eliminating the parameter. I Determine the equation of the given graph of the ellipse: (-2,8) (-2,5+15) (-4,5) (0,5) (-2,5) (-2,5-15) (-2, 2) +X
Determine the standard equation of the ellipse using the given graph. х 15 The equation of the ellipse in standard form is
Determine the standard equation of the ellipse using the given graph х 15 14.-5) -13-
Determine whether the given equation represents an ellipse, a parabola, or a hyperbola. If the graph is in ellipse, find the center, foci, vertices, and length of the major and minor axes. If it is a parabola, find the vertex, focus, and directrix. If it is a hyperbola, find the center, foci, vertices, and asymptotes. Graph the equation. 4.2 + y2 – 16x + 6y + 16 = 0
2) Determine the equation of the given graph of a hypberola: у $ (0.9) (-15.0) (15.0) +-X (-12,0) (12, 0) 0 (0.-9) Determine the equation of the graph of the given parabola: axis of symmetry focus parabola vertex directrix
Write an equation for the ellipse Foci at (0,-5) and (0,5), the sum of distances from foci to a point on the ellipse is 16. Choose the correct equation of the ellipse. on 1 OD. = 1
Find an equation of an ellipse satisfying the given conditions. Foci: (0,-5) and (0,5); length of major axis: 12 + + 36 36 11 Solve, finding all solutions in [0°, 360°). 20 sin20 - 3sin 0 - 2 = 0 194.48°, 345.52°, 23.58°, 156.42° 14.48°, 165.52°, 23.589, 156.42° 14.48°, 165.52°, 203.58°, 336.42° 194.48°, 345.52°, 203.58°, 336.42°
Find the foci of the ellipse with the given equation. Then draw its graph. 5x² + 3y2 = 15 The foci of the ellipse are (Use a comma to separate answers. Type an ordered pair. Type an exact answer.)
Complete the square to determine whether the equation represents an ellipse, a parabola. If the graph is an ellipse, find the center, foci, vertices, and lengths of the major and minor axes. If it is a parabola, find the vertex, focus, and directrix. Then sketch the graph of the equation. 4x^2 +4x − 8y + 9 = 0
Problem 3. 3.3) The ellipse with center (0,0) and vertex (0,5) contains the point (2, V15). Write the canonical equation of the ellipse. Problem 4. (3.4] A hyperbola is given by the equation 16y2 - 92 = 144. Find the coordinates of vertices and foci, and the equations of the asymptotes.