Quadratic Transformation_Describe
A horizontal translation left 1 unit with a vertical stretch by a factor of 3 followed by a vertical translation up 5 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= 3(x+1)^2 + 5
A vertical stretch by a factor of 3 with a vertical translation up 7 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= 3x^2 + 7
A vertical stretch by a factor of 5 followed by a vertical translation down 2 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= 5x^2 - 2
A vertical translation down 1 unit.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= x^2 - 1
A horizontal shrink by a factor of 1/4 with a reflection in the y-axis
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=(-4x)^2
A reflection in the y-axis
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=(-x)^2
A reflection in the y-axis followed by a vertical translation down 12 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=(-x)^2 - 12
A horizontal translation left 2 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=(x+2)^2
A horizontal translation right 6 units with a vertical translation down 1 unit
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=(x-6)^2 - 1
A horizontal translation right 9 units
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=(x-9)^2
Horizontal translation right 8 followed by a reflection in the x-axis
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=-(x-8)^2
A vertical stretch by a factor of 4 with a reflection in the x-axis followed by a vertical translation up 5 units
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=-4x^2 + 5
A vertical translation down 7 units
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)=x^2 - 7
A horizontal translation left 1 unit with a vertical stretch by a factor of 2 with a vertical translation up 13 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= 2(x+1)^2 + 13
A horizontal shrink by a factor of 1/5 followed by a reflection in the y-axis.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= (-5x)^2
A horizontal shrink by a factor of 1/6 with a reflection in the y-axis.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= (-6x)^2
A reflection in the y-axis followed by a vertical translation up 15 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= (-x)^2 + 15
A horizontal stretch by a factor of 2 with a vertical translation up 6 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= (0.5x)^2 + 6
A horizontal stretch by a factor of 5
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= (1/5 x)^2
A horizontal stretch by a factor of 3/2 followed by a vertical translation up 11 units
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= (2/3x)^2 + 11
A horizontal shrink by a factor of 4/7
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= (7/4 x)^2
A horizontal translation right 7 units with a vertical translation down 4 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= (x-7)^2 - 4
A horizontal translation left 3 units followed by a horizontal shrink by a factor of 1/2 with a reflection in the x-axis and a vertical translation down 5 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -(2x+3)^2 - 5
A horizontal shrink by a factor of 1/3 with a reflection in the x-axis.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -(3x)^2
A horizontal translation left 5 units followed by a reflection in the x-axis with a vertical translation up 8.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -(x+5)^2 + 8
A horizontal translation right 2 units and a reflection in the x-axis.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -(x-2)^2
A vertical shrink by a factor of 0.25 with a reflection in the x-axis.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -0.25x^2
A vertical shrink by a factor of 1/3 followed by a reflection in the x-axis.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -1/3 x^2
A vertical stretch by a factor of 4.25 with a reflection in the x-axis and a vertical translation up 1 unit.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -4.25x^2 + 1
A vertical stretch by a factor of 5/3 followed by a reflection in the x-axis.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -5/3 x^2
A vertical stretch by a factor of 7.5 with a reflection in the x-axis followed by a vertical translation up 3 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -7.5x^2 + 3
A reflection in the x-axis
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -x^2
A reflection in the x-axis followed by a vertical translation down 8 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= -x^2 - 8
A vertical shrink by a factor of 0.35 followed by a vertical translation down 4 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= 0.35x^2 - 4
A vertical shrink by a factor of 1/6 with a vertical translation up 9 units.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= 1/6 x^2 + 9
A vertical stretch by a factor of 2 with a reflection in the y-axis.
Describe the transformation of the parent graph f(x)=x^2 represented by g. g(x)= 2(-x)^2
