Shrink Vs Stretch Function at Raymond Evans blog

Shrink Vs Stretch Function. Given a function \(f(x)\), a new function \(g(x)=f(bx)\), where \(b\) is a constant, is a horizontal stretch or horizontal compression. Vertical scaling (stretching/shrinking) is intuitive: 2f (x) is stretched in the y direction by a factor of 2, and f (x) is shrunk in the y direction by a factor of 2. To stretch or shrink the graph in the y direction, multiply or divide the output by a constant. Given a function [latex]y=f\left(x\right)[/latex], the form [latex]y=f\left(bx\right)[/latex] results in a horizontal stretch or compression. A vertical compression (or shrinking) is the squeezing of the graph toward. Given a function [latex]\text{}f\left(x\right)\text{}[/latex], a new function.

To stretch or shrink the graph in the y direction, multiply or divide the output by a constant. Given a function [latex]y=f\left(x\right)[/latex], the form [latex]y=f\left(bx\right)[/latex] results in a horizontal stretch or compression. Vertical scaling (stretching/shrinking) is intuitive: A vertical compression (or shrinking) is the squeezing of the graph toward. Given a function \(f(x)\), a new function \(g(x)=f(bx)\), where \(b\) is a constant, is a horizontal stretch or horizontal compression. Given a function [latex]\text{}f\left(x\right)\text{}[/latex], a new function. 2f (x) is stretched in the y direction by a factor of 2, and f (x) is shrunk in the y direction by a factor of 2.

Vertical And Horizontal Stretch And Shrink Worksheet

Shrink Vs Stretch Function To stretch or shrink the graph in the y direction, multiply or divide the output by a constant. To stretch or shrink the graph in the y direction, multiply or divide the output by a constant. A vertical compression (or shrinking) is the squeezing of the graph toward. Given a function [latex]\text{}f\left(x\right)\text{}[/latex], a new function. Vertical scaling (stretching/shrinking) is intuitive: 2f (x) is stretched in the y direction by a factor of 2, and f (x) is shrunk in the y direction by a factor of 2. Given a function \(f(x)\), a new function \(g(x)=f(bx)\), where \(b\) is a constant, is a horizontal stretch or horizontal compression. Given a function [latex]y=f\left(x\right)[/latex], the form [latex]y=f\left(bx\right)[/latex] results in a horizontal stretch or compression.

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