What affect does "h" have on the parent function y = 1/x ?

h < 0 moves the graph to the left, h > 0 moves the graph to the right.

Vertical stretch by a factor of |h|

h > 0 moves the graph up, h < 0 moves the graph down.

h > 0 reflects the graph across the y-axis.

If h moves the graph left or right, [tex]y= \frac{1}{x+h} [/tex] (moves left)
[tex]y= \frac{1}{x-h} [/tex] (moves right)

If a vertical stretch by a factor of |h|, then [tex]y = \frac{h}{x} [/tex]

If h moves the graph up or down, [tex]y= \frac{1}{x} +h[/tex] (moves up)
[tex]y= \frac{1}{x} -h[/tex] (moves down)

[tex]y= \frac{1}{-hx} [/tex] and h = 1

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What affect does "h" have on the parent function y = 1/x ? h < 0 moves the graph to the left, h > 0 moves the graph to the right. Vertical stretch by a factor of |h| h > 0 moves the graph up, h < 0 moves the graph down. h > 0 reflects the graph across the y-axis.

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What affect does "h" have on the parent function y = 1/x ?

h < 0 moves the graph to the left, h > 0 moves the graph to the right.

Vertical stretch by a factor of |h|

h > 0 moves the graph up, h < 0 moves the graph down.

h > 0 reflects the graph across the y-axis.