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The graph of the line $y = -x + 4$ is shown below - Junior Cycle Mathematics - Question 14 - 2014

Question 14

The graph of the line $y = -x + 4$ is shown below. (i) Using the same axes and scales, draw the graph of the line $y = x + 2$. (ii) From the graphs, state the poin... show full transcript

Worked Solution & Example Answer:The graph of the line $y = -x + 4$ is shown below - Junior Cycle Mathematics - Question 14 - 2014

Step 1

Using the same axes and scales, draw the graph of the line y = x + 2.

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Answer

To draw the graph of the line $y = x + 2$ :

Identify the y-intercept: The line cuts the y-axis at (0, 2).
Identify another point: If $x = -2$ , then $y = -2 + 2 = 0$ , giving the point (-2, 0).
Plot the points: Mark (0, 2) and (-2, 0) on the graph.
Draw the line: Connect the points with a straight line, ensuring it extends in both directions.

Step 2

From the graphs, state the point of intersection of the two lines.

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Answer

The point of intersection of the two lines can be identified as (1, 3).

Step 3

Verify your answer to (ii) using algebra.

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Answer

To verify the point of intersection (1, 3) using algebra:

Substitute into the equations of both lines:
- For the first line:
  
  $y = -x + 4$
  Substituting $x = 1$ , we get: $y = -1 + 4 = 3$
- For the second line:
  
  $y = x + 2$
  Substituting $x = 1$ , we get: $y = 1 + 2 = 3$
Result: Since both equations yield $y = 3$ when $x = 1$ , we can confirm that the point of intersection is indeed (1, 3).

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