Math terms
parent:f(x)=x^2, Variation g(x)=f(0.8x)
Horizontal Stretch
parent:f(x)=x^2, Variation g(x)=f(64x)
Horizontal compress
parent:f(x)=x^2, Variation g(x)=f(0.64x)
Horizontal stretch
parent:f(x)=x^2, Variation g(x)=f(x-1000)
Move left 1k
parent:f(x)=x^2, Variation g(x)=f(x-2)
Move left 2
parent:f(x)=x^2, Variation g(x)=f(x+3)
Move right 3
parent:f(x)=x^2, Variation g(x)=f(x+347)
Move right 347
Parent: f(x)=(cuberoot)x,Variation: g(x)=-f(x) What does this mean
Reflect across x axis
Parent: f(x)=(cuberoot)x,Variation: g(x)=f(-x) What does this mean
Reflect across y
parent:f(x)=x^2, Variation g(x)=0.3f(x)
Vertical compress
Parent: f(x)=(cuberoot)x,Variation: g(x)=0.333f(-x) What does this mean
Vertical compress, reflect across x
Parent: f(x)=(cuberoot)x,Variation: g(x)=-0.333f(x) What does this mean
Vertical compress, reflect across y
Parent: f(x)=(cuberoot)x,Variation: g(x)=0.6f(x) What does this mean
Vertical compression
Parent: f(x)=(cuberoot)x,Variation: g(x)=0.77777f(x) What does this mean
Vertical compression
Parent: f(x)=(cuberoot)x,Variation: g(x)=77777f(x) What does this mean
Vertical stretch
parent:f(x)=x^2, Variation g(x)=1234567890f(x)
Vertical stretch
parent:f(x)=x^2, Variation g(x)=3f(x)
Vertical stretch
parent:f(x)=x^2, Variation g(x)=f(8x)
horizontal compress
Parent: f(x)=(cuberoot)x, Variation: g(x)=f(2x) What does this mean
horizontal compression
Parent: f(x)=(cuberoot)x, Variation: g(x)=f(40x) What does this mean
horizontal compression
Parent: f(x)=(cuberoot)x,Variation: g(x)=f(0.005x) What does this mean
horizontal stretch
Parent: f(x)=(cuberoot)x,Variation: g(x)=f(0.5x) What does this mean
horizontal stretch
Parent: f(x)=(cuberoot)x,Variation: g(x)=6f(x) What does this mean
vertical stretch
Parent: f(x)=(cuberoot)x,Variation: g(x)=2f(-x) What does this mean
vertical stretch, reflect across x
Parent: f(x)=(cuberoot)x,Variation: g(x)=-2f(x) What does this mean
vertical stretch, reflect across y