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Use these graphs to solve the simultaneous equations 5x - 9y = -46 y = -2x x = __ y = __ Use this graph to find estimates for the solutions of the quadratic equation x² - 4x + 2 = 0 - Edexcel - GCSE Maths - Question 7 - 2020 - Paper 3
Question 7
Use these graphs to solve the simultaneous equations 5x - 9y = -46 y = -2x x = __ y = __ Use this graph to find estimates for the solutions of the quadratic equati... show full transcript
Worked Solution & Example Answer:Use these graphs to solve the simultaneous equations 5x - 9y = -46 y = -2x x = __ y = __ Use this graph to find estimates for the solutions of the quadratic equation x² - 4x + 2 = 0 - Edexcel - GCSE Maths - Question 7 - 2020 - Paper 3
Step 1
Solve the simultaneous equations 5x - 9y = -46 and y = -2x
Answer
To solve these equations using the graphs:
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Plot the equations: The first equation 5x - 9y = -46 can be expressed in slope-intercept form. Rearranging gives us:
The second equation is already in slope-intercept form: [y = -2x]
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Identify intersection point: Look for the point where these two lines intersect on the graph. This intersection point provides the solution for both x and y. After analyzing the graph, we can estimate that:
- x is approximately 2.6
- y is approximately -5.2
Thus, the solution can be approximated as:
Step 2
Use this graph to find estimates for the solutions of the quadratic equation x² - 4x + 2 = 0
Answer
To estimate the solutions of the quadratic equation:
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Identify the x-intercepts: Check where the parabola intersects the x-axis on the graph. The x-coordinates at these intersections represent the solutions to the quadratic equation.
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Estimate the x-values: From the graph, the approximate x-intercepts are:
- x ≈ 0.5
- x ≈ 3.5
Thus, the estimated solutions for the quadratic equation are: