Algebra - Absolute values - graphs.
Test Yourself 1 - Solutions.
Graph each of equations 1 - 8 and describe the transformations from the basic graph of y = |x|. |
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Graphing equalities. | 1. The graph is not moved horizontally or vertically. The gradient is increased to 3. |
2. The graph is moved 1 unit to the right. The gradient is unchanged. |
3. The graph is moved 2 units to the right. The gradient is unchanged. |
4. The graph is moved 2 units upwards. The gradient is unchanged. |
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5. The graph is moved 1 unit to the left and down unit. The gradient is unchanged. |
6. The graph is moved 8 units to the left and down 2 units. The gradient is reduced by one half to m = 0.5. |
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7. The graph is moved 3 units and inverted by the negative sign. The gradient has doubled to 2. |
8. The graph is moved 4 units up and 3 units to the right. The gradient is steeped having been increased by a factor of 3. |
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Solving equations graphically. | 9. There are two solutions - at (1, 2) and at (5, 2). |
10. There is only one solution - at (-1, 2). |
11. There are no solutions - the lines do not intersect. |
12. There is only solution - at (-1, 1) - where the given line intersect at the vertex of the absolute value graph. |
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13. There are no solutions - the lines do not intersect as the vertex of the absolute value graph is above the line and the right section is parallel to the line. |
14. |