$\,x\,$-values are doubled; A horizontal stretching is the stretching of the graph away from the y-axis.

His concerns include such things as categories, language, descriptions, representation, criticism and labor. What is a parangula? And I guess the Generate Block button is there to manually generate the block if you do not want to Auto Generate? and multiplying the $\,y$-values by $\,3\,$. Eric...see attached. Horizontal And Vertical Graph Stretches and Compressions Part 2 of 3. In this equation, the x-intercepts are 1 and -3. Use the movable point to stretch the black parangula so that it matches the orange one. Let $\,k\gt 1\,$. You must multiply the previous $\,y$-values by $\frac 14\,$. This tends to make the graph steeper, and is called a vertical stretch. and multiplying the $\,y$-values by $\,\frac13\,$. Hi Steve, I just got home from work and I am trying it now. Would be a nice enhancment request, please do contact ESRI support and let them know, or submit it at ideas.esri.com. However, the value of the vertex does change. Thanks for any help Points on the graph of Points on the graph of This gives you a way to monitor the precise mathematical behavior of a parabola as you shrink it vertically. You make horizontal changes by adding a […]

vertical stretching/shrinking changes the $y$-values of points; Well, my friends, a parangula—like a line or a parabola—is a geometric object described algebraically, which you may transform by translating, stretching, squishing, and reflecting in order to learn some general algebraic tools for working with these in the future.

Why does Chief not automatically rebuild the 2D block, or at least offer? If the constant is greater than 1, we get a vertical stretch; if the constant is between 0 and 1, we get a vertical compression. You can alter parabolic graphs by adjusting the constants in the equation. Serm Murmson is a writer, thinker, musician and many other things. Replacing every $\,x\,$ by If you are graphing by hand, use different colored writing utensils or differently-patterned lines in order to distinguish different graphs. If that does not make sense I will take a look at your specific example in your plan. This moves the points farther from the $\,x$-axis, which tends to make the graph steeper.

Chop and Steve -- I posted the same suggestion yesterday but removed it because it does not seem to work.

My Notes: You stretched the original parangula by a factor of 2. A parabola is the graphic representation of a quadratic equation. The center hole looks fine. Thus, the graph of $\,y=\frac13f(x)\,$ is found by taking the graph of $\,y=f(x)\,$, There are a good handful of scenarios where we might not want a different block. How can we locate these desired points $\,\bigl(x,f(3x)\bigr)\,$? transformations that affect the $\,y\,$-values are intuitive Master the ideas from this section Stretches and Shrinks We can also stretch and shrink the graph of a function. transformations that affect the $\,x\,$-values are counter-intuitive When we multiply a function by a positive constant, we get a function whose graph is stretched or compressed vertically in relation to the graph of the original function. However, if you input 2 for x, the resulting y-value is 5/2. Yes. we're multiplying $\,x\,$ by $\,3\,$