To move the vertex of the quadratic function from the point \((-3, -2)\) to the point \((0, 0)\), we need to determine the transformations required.
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Identify the differences in the x-coordinates:
- The current x-coordinate is \(-3\) and we want to move to \(0\).
- The transformation requires moving from \(-3\) to \(0\). This is a shift to the right by \(3\) units.
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Identify the differences in the y-coordinates:
- The current y-coordinate is \(-2\) and we want to move to \(0\).
- The transformation requires moving from \(-2\) to \(0\). This is a shift up by \(2\) units.
Putting it all together, to translate the vertex from \((-3, -2)\) to \((0, 0)\), you must shift right 3 units and up 2 units.
Thus, the correct transformation is:
shift right 3 units and up 2 units.