MTH 111Z Module 3 Lab Report Consider the function, g(x) = 2 f(x 3) - 4, where f(x) = Vx. 1. Identify the transformations (in the correct order) applied to fin order to get the graph of y = g(x). Use proper vocabulary, such as: vertical, horizontal, stretch, compression, reflection, shift, etc when listing each transformation. Be specific. 2. Track four ordered pairs belonging to f(x) = /x (hint: start with (0,0) and three other ones with nice integer coordinate values) through each transformation separately (see videos). This means show how the ordered pairs change as they undergo each subsequent transformation. You should end up with ordered pairs belonging to y = g(x). Clearly show the ordered pairs that belong to the function, y = 9(x). 3. Make a graph using https://www.desmos.com/calculator by completing the following steps. * First, graph f(x) = Vx on line 1 and g(x) = 2 f(x 3) - 4 on line 2. Click on the keypad icon in the bottom left corner to find the square root symbol. * Then, graph the four points belonging to g found in #2. To enter these points, start each point on a new line. Start with