Recall from Chapter 1 that a unique line is determined by two distinct points on the line and that the values of m and b can then be determined for the general form of the linear function
ƒ(x) = mx + b .
Fill in the blanks with the correct responses, based on your work
If the points with coordinates (x1, y1) and (x2, y2) lie on a line, then when we add the positive constant c to each y-value, we obtain the points with coordinates (x1, y1 + _____) and (x2, y2 + _____).the new line is the slope of the original line. The graph of the new line can be obtained by shifting the graph of the original line _______ units in the _______ direction.
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