WebSay we have the equation: Y-k=x^2. To see how this shifts the parapola up k units, substitute x with 0. The equation will simplify to y-k=0. So for the equation to be true y needs to be … WebIn general, the parabola \(y=ax^2\) is obtained from the basic parabola \(y=x^2\) by stretching it in the \(y\)-direction, away from the \(x\)-axis, by a factor of \(a\). Exercise 2 Sketch the graphs of \(y=\dfrac{1}{2}x^2\) and \(y=x^2\) on the same diagram and describe the relationship between them.
Stretching and compressing the standard parabola
WebHow would you do this? Shifting f (x) 1 unit right then 2 units down. The equation is f (x)=x^2-2x-1. My book says this to shift 1 unit right its g (x)= (x-1)^2-2 (x-1)-1 =x^2-4x+2 for shift 2 units down h (x)=x^2-2x-1-2 =x^2-2x-3 I need some help understanding this please • ( 2 votes) The Purple Bear 3 years ago WebThe standard parabola can be stretched and compressed with the parameter a a. The general formula is: y=ax^2 y = ax2 ! Remember If a ∣a∣ > 1, the graph is steeper than the standard parabola and is stretched. If a ∣a∣ < 1, the graph is flatter than the standard parabola and is compressed. Example \color {green} {g (x)=\frac12x^2} g(x)= 21x2 business bankruptcy chapter 13
Parabola Calculator - Symbolab
WebOct 6, 2024 · As you will soon see, the constant a controls the scaling (stretching or compressing of the parabola), the constant h controls a horizontal shift and placement of the axis of symmetry, and the constant k controls the vertical shift. Let’s begin by looking at the scaling of the quadratic. Scaling the Quadratic WebStretch or compress by changing the value of a a. You can represent a stretch or compression (narrowing, widening) of the graph of f (x) = x2 f ( x) = x 2 by multiplying the squared variable by a constant, a a. f (x) = ax2 f ( … WebThis will reflect the parabola across the x axis. A parabola that opened upward will now open downward, and vice versa. For example, if we have the quadratic f(x) = x 2, then we would multiply by -1 on the right side to get g(x) = -x 2.. This second parabola g(x) = -x 2 has the same shape than the original parabola f(x) = x 2, but it opens downward, and it is reflected … business bankruptcy security clearance