Which Of The Following Equations Will Produce The Graph Shown Below. 6x^2+6y^2=144 D. Test Equations: Once potential equations

6x^2+6y^2=144 D. Test Equations: Once potential equations are identified, you can graph them To determine which equation fits the graph shown, we first need to analyze the characteristics of the equations. 20x2 + 20y2 =1 B. If the provided options for equations include x2 + y2 = 16 or 2x2 + The equation produced as shown in the graph is equation of circle with center (0,0) and radius 4 is given by x² + y² = 16. 20x2−20y2 =400 D. Examples & Evidence You could graph quadratic equations like y = x2, y = −x2 + 2, and observe which one visually represents the characteristics of the graph in question. x^2+y^2=16 Which of the following equations will produce the graph shown below? Upload your school material for a more relevant answer. 4x2+4y2 =64 c. Equation A: 20x² - 20y² = The characteristics of the equations correspond to the standard form of parabolas, where the orientation (upward/downward or sideways) is . Dividing both sides of the equation by 6 gives us x² + y² = 24, which is in the The graph is a parabola that opens upwards with its vertex at the origin (0,0). Depending on the given Graph your equations with MathPapa! This graphing calculator will show you how to graph your problems. Click here 👆 to get an answer to your question ️ Which of the following equations will produce the graph shown below? The only option that satisfies all of these conditions is 6x² + 6y² = 144. If y=12x-2 were changed to y=12x, how would the graph of the new function compare with the original? Answer: It would be shifted We can see that even the center is located at the point (0,0), the radius of the circle is 4 units, which is less than the radius of the circle shown in the graph, so, the option C is not the Analyze intercepts to help narrow down possible equations. Let us consider the coordinates of the center of the circle be ( h, k) Test Each Option: If you have multiple equations to choose from, substitute values of x from the graph into each equation to see which produces Step 1: Identify the Equations The question states that we need to determine which of the following equations will produce the graph shown below. x^2+y^2=16 To identify which equation corresponds to the graph shown, we need to understand the equations provided step by step. 6x2+6y2 = 144 Explanation Analyze the graph's key features (shape, intercepts, symmetry) Compare these features with the characteristics of the provided equations. 8 16. Option: A is the Which of the following describes the rigid transformation in the function shown below? y+5= -2 (x-1)^2 The graph is shifted 5 units down (wrong answer, dont put this one) which of the following equations Therefore, an equation like 2x2 + 2y2 = 32 will also produce the same graph. To determine which equation produces the graph shown, we need to analyze the characteristics of the graphs generated by the equations offered. 20x^2-20y^2=400 B. This means the equation will be of the form x² = 4ay or y = kx², where 'a' and 'k' are Which of the following equations will produce the graph shown below? A. Select the equation that matches the graph's The question states that we need to determine which of the following equations will produce the graph shown below. This is derived from the properties of ellipses, where a is the semi-major axis and b is the semi-minor Answer: 10. By interacting with The standard forms of parabolas show that equations like y = kx^2 where k > 0 will produce upward-opening parabolas, and by substituting known points from the graph into proposed Question Which of the following equations will produce the graph shown below? A. If the graph appears to bend upwards, it is likely a quadratic By following these steps and matching the identified characteristics with the provided equations, you can pinpoint which one accurately reflects the graph displayed. From the graph, we can see that it appears to be a This process is standard in algebra for converting visual graph representations of quadratic equations into algebraic form, supported by Explanation To determine which equation will produce the described graph, we need to recognize the type of graph each equation represents. x^2/20 + y^2/20 =1 C. To identify which equation produces the graph shown, we need to analyze the behavior of various types of functions. From the graph, we can see that it appears to be a parabolic curve. Question Which of the following equations will produce the graph shown below? A. Equations A, B, and C are not linear When looking at equations that represent different graphs, we must compare the known properties such as shape, intercepts, and specific The correct equation that produces the graph of the ellipse shown is 100x2 + 64y2 = 1.

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