Part A: Fixed at both ends 1. Find the lowest frequency that will establish a standing wave This is the fundamenta frequency 2. Determine the number of nodes, antinodes, and wavelengths for this frequency Create a data table with 5 column (frequency, 1/ frequency. nodes, antinodes, and wavelengths), and enter this data Be careful with wavelengths you should figure out how many wavelengths there are in the length of the suing. Draw the standing wave and label the Nodes with "N" and Antinodes with "A". 3.Increase the frequency until you find the next one that will establish a standing wave Find the values listed in Stop ? for this standing wave enter them into the data table, and draw and label the wave. 4. Continue increasing the frequency and entering the data for additional standing 3. Plot the inverse of the frequency on the x-axis, against the wavelength on the Y-amis and define the linear density. If the maximum tension in the simulation is 10 0 N. what is the linear mass denuly (m/L) of the shine! G The speed of a transverse wave on a string of length I. and mass in under tension I is pura by the formula