Martina creates the graph of function g by applying a transformation to function f. f(x) = 4x-2 g(x) = 4x+7 Which transformation did Martina apply? A.a vertical shift of 9 units…

Question

asked Feb 7, 2020 62.0k views

2 Answers

Mara · Answer 1 · 2020-02-07T23:23:46+0000

Answer:

B.a vertical shift of 9 units up

Explanation:

Given
$f(x) = 4x-2\\g(x) = 4x+7$

g (x) = f (x) + k

It means shifting
$f (x)\ k$ unit vertically.

Now, we will find the value of
for the given function

$g(x) = 4x+7\\\\add\ 2\ and\ subtract\ 2\\\\g(x) = 4x+7+2-2\\g(x) = 4x-2+9\\\\We\ have\ f(x)=4x-2\\\So,\ g(x)=f(x)+9$

k=9

Hence, vertical shift of 9 units.

Salines · Answer 2 · 2020-02-11T06:21:31+0000

Answer:

C. a horizontal shift of 9 units left

Explanation:

Look at this helpful chart:

Vertical Translations

translation up k units: g(x) = f(x) + k, where k > 0

translation down k units: g(x) = f(x) – k, where k > 0

Horizontal Translations

translation left k units: g(x) = f(x + k), where k > 0

translation right k units: g(x) = f(x – k), where k > 0

The change happening in Martina's graph is therefore a horizontal translation to the left.