Question

suppose the graph of f is given. write an equation for each graph described that is obtained from the graph of f. (a) shift 5 units upward. \\(\bigcirc\\) \\(y = f(x) - 5\\) \\(\bigcirc\\) \\(y = 5f(x)\\) \\(\bigcirc\\) \\(y = \frac{1}{5}f(x)\\) \\(\bigcirc\\) \\(y = f(x - 5)\\) \\(\bigcirc\\) \\(y = f(x) + 5\\) (b) shift 5 units downward. \\(\bigcirc\\) \\(y = f(x) - 5\\) \\(\bigcirc\\) \\(y = 5f(x)\\) \\(\bigcirc\\) \\(y = \frac{1}{5}f(x)\\) \\(\bigcirc\\) \\(y = f(x - 5)\\) \\(\bigcirc\\) \\(y = f(x) + 5\\) (c) shift 5 units to the right. \\(\bigcirc\\) \\(y = f(x - 5)\\) \\(\bigcirc\\) \\(y = f(x) - 5\\) \\(\bigcirc\\) \\(y = \frac{1}{5}f(x)\\) \\(\bigcirc\\) \\(y = f(x) + 5\\) \\(\bigcirc\\) \\(y = 5f(x)\\) (d) shift 5 units to the left. \\(\bigcirc\\) \\(y = f(x) + 5\\) \\(\bigcirc\\) \\(y = f(x + 5)\\) \\(\bigcirc\\) \\(y = \frac{1}{5}f(x)\\)

Explanation:

Step1: Recall vertical shift up rule

For a vertical upward shift of $k$ units, the equation is $y = f(x) + k$. Here $k=5$, so $y = f(x) + 5$.

Step2: Recall vertical shift down rule

For a vertical downward shift of $k$ units, the equation is $y = f(x) - k$. Here $k=5$, so $y = f(x) - 5$.

Step3: Recall horizontal shift right rule

For a horizontal shift right of $k$ units, the equation is $y = f(x - k)$. Here $k=5$, so $y = f(x - 5)$.

Step4: Recall horizontal shift left rule

For a horizontal shift left of $k$ units, the equation is $y = f(x + k)$. Here $k=5$, so $y = f(x + 5)$.

Answer:

(a) $y = f(x) + 5$
(b) $y = f(x) - 5$
(c) $y = f(x - 5)$
(d) $y = f(x + 5)$