Math

QuestionDetermine the final function after shifting y=xy=|x| up 7 units, reflecting it over the xx- axis, and shifting right 9 units.

Studdy Solution

STEP 1

Assumptions1. The original function is y=xy=|x| . The transformations are applied in the following order shift up7 units, reflect about the xx- axis, and shift right9 units

STEP 2

First, we will shift the graph of the function up by7 units. This can be done by adding7 to the function.
y=x+7y = |x| +7

STEP 3

Next, we reflect the graph about the xx- axis. This can be done by multiplying the function by -1.
y=(x+7)y = -(|x| +7)

STEP 4

Finally, we shift the graph to the right by9 units. This can be done by replacing xx with (x9)(x-9) in the function.
y=x97y = -|x-9| -7The function that is finally graphed after the transformations is y=x97y = -|x-9| -7.

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