Horizontal And Vertical Stretch at Justin Finn blog

Horizontal And Vertical Stretch. When we multiply a function by a positive constant, we get a function whose graph is stretched or compressed vertically in relation to the. If \(b>1\), then the graph will be compressed by \(\frac{1}{b}\). If the constant is greater than 1, we get a horizontal compression of the function. • if k > 1, the graph of y. If the constant is between 0 and 1, we get a horizontal stretch; Given a function \(f(x)\), a new function \(g(x)=f(bx)\), where \(b\) is a constant, is a horizontal stretch or horizontal compression of the function \(f(x)\).

When we multiply a function by a positive constant, we get a function whose graph is stretched or compressed vertically in relation to the. • if k > 1, the graph of y. If \(b>1\), then the graph will be compressed by \(\frac{1}{b}\). If the constant is between 0 and 1, we get a horizontal stretch; Given a function \(f(x)\), a new function \(g(x)=f(bx)\), where \(b\) is a constant, is a horizontal stretch or horizontal compression of the function \(f(x)\). If the constant is greater than 1, we get a horizontal compression of the function.

Horizontal and Vertical Stretch and Compression YouTube

Horizontal And Vertical Stretch When we multiply a function by a positive constant, we get a function whose graph is stretched or compressed vertically in relation to the. If \(b>1\), then the graph will be compressed by \(\frac{1}{b}\). • if k > 1, the graph of y. If the constant is between 0 and 1, we get a horizontal stretch; If the constant is greater than 1, we get a horizontal compression of the 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 of the function \(f(x)\). When we multiply a function by a positive constant, we get a function whose graph is stretched or compressed vertically in relation to the.

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