Math

QuestionDefine the function g(x)g(x) based on the graph of f(x)=xf(x)=|x| shifted left 1 unit and down 9 units.

Studdy Solution

STEP 1

Assumptions1. The function f(x)=xf(x)=|x| is the absolute value function, which gives the distance of a number from zero on the number line. . The function g(x)g(x) is a transformation of f(x)f(x), shifted one unit to the left and nine units down.

STEP 2

The general form of the equation for a function that is shifted horizontally and vertically isg(x)=f(xh)+kg(x) = f(x - h) + kwhere hh is the horizontal shift and kk is the vertical shift.

STEP 3

In this case, the function is shifted one unit to the left and nine units down. So, h=1h =1 (left shift is positive) and k=9k = -9 (down shift is negative).

STEP 4

Substitute h=1h =1 and k=9k = -9 into the general form of the equation.
g(x)=f(x1)9g(x) = f(x -1) -9

STEP 5

Since the original function f(x)f(x) is the absolute value function, we can replace f(x1)f(x -1) with x1|x -1|.
g(x)=x19g(x) = |x -1| -9So, the equation for the function whose graph is the graph of f(x)=xf(x)=|x|, but shifted one unit to the left and nine units down is g(x)=x19g(x) = |x -1| -9.

Was this helpful?

Studdy solves anything!

banner

Start learning now

Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

ParentsInfluencer programContactPolicyTerms
TwitterInstagramFacebookTikTokDiscord