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19 (a) Sketch the graph of $y = (x - 2)^2 - 3$ - OCR - GCSE Maths - Question 19 - 2017 - Paper 1
Question 19
19 (a) Sketch the graph of $y = (x - 2)^2 - 3$. Show the coordinates of any turning points. (b) The sketch shows part of a graph which has equation $y = ax^2 + bx ... show full transcript
Worked Solution & Example Answer:19 (a) Sketch the graph of $y = (x - 2)^2 - 3$ - OCR - GCSE Maths - Question 19 - 2017 - Paper 1
Step 1
Sketch the graph of $y = (x - 2)^2 - 3$
Answer
To sketch the graph of the equation , we note that the parabola opens upwards, as the coefficient of the squared term is positive. The vertex form of the parabola indicates that the vertex is at the point . This is the turning point of the graph.
- Identify the vertex: The vertex is at where and .
- Identify the intercepts:
- For the y-intercept, set :
ewline \ ext{For the x-intercepts, set }y = 0: \ 0 &= (x - 2)^2 - 3 \ (x - 2)^2 &= 3 \ x - 2 &= ext{±}\sqrt{3} \ x &= 2 ext{ ± } \sqrt{3} \ ext{Thus, the x-intercepts are } (2 + \sqrt{3}, 0) ext{ and } (2 - \sqrt{3}, 0). ext{ } ewline \ ext{Sketch the parabola with these points } ewline ext{while ensuring the graph is symmetric about the line } x = 2.
Step 2
Find the values of $a$, $b$ and $c$
Answer
From the graph provided, we can observe that the parabola opens upwards and the vertex lies at approximately .
Using the vertex form of a quadratic equation , we can identify that:
- The vertex . Thus, and .
- This gives us the equation:
To find , we also know the graph passes through the point . Observing the graph, it seems to pass through :
- Substitute into the equation:
Since the opening of the parabola suggests it's wider, we may consider a = rac{1}{4}. Using another point from the graph : 2. Substitute into the equation: a = - rac{3}{4}
Solving and using : By equating the expanded form, we can find:
- y = - rac{3}{4}(x^2 + 2x + 1) + 12 leads us to identify a = - rac{3}{4}, b = - rac{3}{2}, c = 0.
Thus, the final values are:
- a = - rac{3}{4},
- b = - rac{3}{2},
- .