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Practice1.1 & 1.2Parent Functions and TransformationsFor each function, identify the horizontal translation of the parent function f(x)=x².1. y = (x - 5)²2.y=(x+1.8)²For

Practice11 amp 12Parent Functions and TransformationsFor each function identify the horizontal translation of the parent function fxx1 y x 52yx18For class=

Respuesta :

Given

Function

Find

horizontal translation

Explanation

Horizontal translation refers to the shifting of curve along the x axis by some specific units without changing the shape and domain of the function.

it is given by

[tex]y=f(x\pm k)[/tex]

1.)

[tex]y=(x-5)^2[/tex]

the curve is translated horizontally by -5 units.

2)

[tex]y=(x+1.8)^2[/tex]

the curve is translated horizontally by 1.8 units.

Final Answer

Hence ,

1) the curve is translated horizontally by -5 units.

2) the curve is translated horizontally by 1.8 units.

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