determine the equation of a conic section whose diameter is 14 and center (0,-1)

A conic section is given by the equation 57x^2+14√3 xy+43y^2-576=0, identity and sketch the conics.

A conic section is given by the equation 57x^2+14√3 xy+43y^2-576=0, identity and sketch the conics.

For each of the following equations, determine the type of conic section defined by each equation...

For each of the following equations, determine the type of conic section defined by each equation and its properties (including the vertex, the center, the radius, the semi-major and semi- minor axis, and the eccentricity, if and when these are applicable): a. 4x2 –9y2 +16x–18y–29=0 b. 3x2 –24x–8y+24=0 c. 4x2 + 6y2 – 8x + 24y + 4 = 0 d. x2 +y2 +2y–8=0

1.     The general equation of a conic section is given by -4x^2 + 25y^2 -50y +125...

1.     The general equation of a conic section is given by -4x^2 + 25y^2 -50y +125 =0. (a)   Identify what conic section is represented by the equation above. Show all your steps in handwritten work and insert an image of the work below. (b)   Write the equation of this conic section in graphing form. Show all your steps in handwritten work and insert an image of the work below. (c)   Find the coordinates of the center, the foci, and the...

A conic section is given by the equation 4x2 + 10xy + 4y2 = 36. Use...

A conic section is given by the equation 4x2 + 10xy + 4y2 = 36. Use rotation of coordinate axes through an appropriate acute angle θ to find the new equation of the conic section in the uv-coordinate axes , where x = u cos(θ) - v sin(θ) , y = u sin(θ) + v cos(θ). Then identify the conic section.

Rewrite the equation below so that it is in standard form. State the type of conic...

Rewrite the equation below so that it is in standard form. State the type of conic section represented and identify all of the conic section’s relevant characteristics (center, vertices, co-vertices, foci, equations of asymptotes, directrix, and radius). Provide exact answers. Then graph the conic section. 3?2- 2y2 -8 =12x- 4y   

Find an equation for the conic section with the given properties. The ellipse with foci F1(3,...

Find an equation for the conic section with the given properties. The ellipse with foci F1(3, −4) and F2(5, −4) that passes through the point (4, 1)

1) Write a polar equation of a conic with the focus at the origin and the...

1) Write a polar equation of a conic with the focus at the origin and the given data: The curve is a hyperbola with eccentricity 7/4 and directrix y=6. 2a) Determine the equation of a conic that satisfies the given conditions: vertices: (-1,2), (7,2) foci: (-2,2), (8,2) b) Identify the conic: circle parabola, ellipse, hyperbola. c) Sketch the conic. d) If the conic is a hyperbola, determine the equations of the asymptotes.

Find an equation for the conic section with the given properties. The ellipse with vertices V1(−3,...

Find an equation for the conic section with the given properties. The ellipse with vertices V1(−3, −2) and V2(−3, 8) and foci F1(−3, −1) and F2(−3, 7)

Consider the conic section -5.x2 +6xy + 3y2 – 46 – 12y + 9 = 0....

Consider the conic section -5.x2 +6xy + 3y2 – 46 – 12y + 9 = 0. Rotate and translate the coordinate axes to write it in standard form. Hence name the type of conic section.

For each equation, decide which type of conic section each equation represents (parabola, ellipse, hyperbola, circle)....

For each equation, decide which type of conic section each equation represents (parabola, ellipse, hyperbola, circle). If it is none of them, state that as well. Please show your work. 1. 9x^2 -25y -54x +100y = 244 2. 7x^2- y -70x = -177 3. x^2 +y^2 -4x -2y -11= 0