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Without graphing, identify the vertex, axis of symmetry, and transformations from the parent function f(x)= |x|y = |x-5|-1

User Paradox
by
2.6k points

2 Answers

16 votes
16 votes

Answer:

Answer:

• Vertex: (5, –1)

,

• No symmetry

,

• Transformations: 5 units to the right and 1 unit down.

Explanation

We are given the parent function f(x)= |x| and the transformed function:

Thus, we can get the vertex considering that a function in the form:

Has a vertex at (+a, ±b).

Therefore, our vertex is at (5, –1). Additionally, as an absolute function has the form of a 'v', and as the vertex is at (5, –1) then it has no symmetry about the x-axis, nor y-axis, nor about the origin, meaning it has no symmetry.

Finally, the transformation from the parent function shifts 5 units to the right and one unit down.

Explanation:

User Jason Allshorn
by
2.5k points
12 votes
12 votes

Answer:

• Vertex: (5, –1)

,

• No symmetry

,

• Transformations: 5 units to the right, and 1 unit down.

Explanation

We are given the parent function f(x)= |x| and the transformed function:


y=|x-5|-1

Thus, we can get the vertex considering that a function in the form:


y=|x\pm a|\pm b

has a vertex at (+a, ±b).

Therefore, our vertex is at (5, –1). Additionally, as an absolute function has the form of a 'v', and as the vertex is at (5, –1) then it has no symmetry about the x-axis, nor y-axis, and nor about the origin, meaning it has no symmetry.

Finally, the transformation from the parent function is a shift 5 units to the right and one unit down.

User Edd Turtle
by
3.2k points