If the value of b is negative the function is reflected across the y-axis. A horizontal compression will give the same outcome as a vertical stretch (by the same factor), and a horizontal stretch produces the same outcome as a vertical compression. A horizontal compression pushes the graph closer to the y-axis, while a horizontal stretch pulls them away from the y-axis. The b value controls the horizontal stretch or horizontal compression. Horizontal Compressions and Stretches (b) 24) 1000 Maximum compression in the spring (light) in the physical situation show is At rest se m oot yop toesthes ooy 3m Smooth horizontal surface 3m 116k. Notice from the diagram on the right, the a, h, and k values preform the same transformations as they did in the quadratic function. Recall that the parent function of a quadratic is y = x^2 and the transformations applied to this parent function in h,k form, is what determines the parabola after the transformations. 4 years ago Transformations of functions is the most trickier and interesting topic Ive seen since joining khan academy.
To the right you see the point of origin is (0, 0). This is why the square root function has a point of origin (starting point). This is because taking the square root of a negative number results in a non-real number. Notice there are no negative x values in the parent function. Since we do horizontal stretch by the factor 2, we have to replace x by (1/2)x in f (x) to get g (x). The graph and table of the parent function is show to the right. Step 1 : Let g (x) be a function which represents f (x) after the horizontal stretch by a factor of 2. A Square root function contains a square root with the independent variable (x) under the radical. Square root functions can also be written in h,k form.
0 kommentar(er)
