Given the ellipse, [(x + 5)2 ÷ 25)] + [(y - 3)2 ÷ 49] = 1, determine the location of the centre, vertices, and foci, and then sketch the graph based on those attributes.
19. For the following ellipse, find the center, vertices, foci, eccentricity. Sketch the graph. Equation: (x+3) , (y-1) 16
For the following ellipse: find the center, vertices, foci. Sketch the graph.
8. (3 marks) (a) Sketch the graph of y= bir-1 by starting with the graph of 2*, and then sketching the following sequence of graphs (each on a separate graph): 2-*,2-(x-1).1 +2-(x-1) – 4 '1+2-(x-1) (b) Confirm your answer in the previous part using a computer to generate the graph. Include the graph in your assignment submission.
Find an equation for the ellipse. Graph the equation. foci at (-2,2) and (-2,-8); ength of major axis is 14 Type the left side of the equation of the ellipse Which graph shown below is the graph of the ellipse? O A OB OC. O D. .9 Click to select your answerls),.
14. Find the center, vertices and foci of the ellipse. Sketch the ellipse. a. 9x24y2 = 36 b. Cx-2)2 Cy+3)2 + = 1 25 16 C. 2x2y= 2 + 4x - 4y
14. Find the center, vertices and foci of the ellipse. Sketch the ellipse. a. 9x24y2 = 36 b. Cx-2)2 Cy+3)2 + = 1 25 16 C. 2x2y= 2 + 4x - 4y
8. (b) Sketch the graph of f(x,y) = 1 - x2 - y2. Sketch the level curves of f(x,y,z) = k for f(x,y,z) = 2x - 3y + z-12, with k=0, 24, -12. - 22. 22
Find a formula for the area of the ellipse 2) -1 by slicing vertically. Sketch the ellipse, + b2 a clearly showing a representative vertical slice. Show your Riemann sum and definite integral Recall that this is an ellipse centered at the origin with major axis length of 2a and minor axis length of 2b Note: If a b, what do you notice about your formula?
Find a formula for the area of the ellipse 2) -1 by slicing vertically....
19. (8) Graph the ellipse * 1 by finding the vertices, foci, major and minor axes and 36 their length
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