I would like to write a program which plots the points on top of a semicircle on a certain interval and a straight line everywhere else. Something like this:
I defined a time domain, which was stored as a vector (
t = 0:0.01:5). I assumed that I could define the points on the top of the semicircle using elements of the time vector:
if t>=2|t<=2.3 y = sqrt(.15^2-(t-2.15)^2);
but MATLAB produced an error message saying only square matrices can be squared.
I tried to utilize indices to show that I wanted to square an element of the t vector and not the whole vector:
i = [200:230]; for t(200:230) y = sqrt(.15^2-(t(i)-2.15)^2);
After these failures, I noticed that squaring a square matrix with one column of non-zero elements would produce a new square matrix with a column of the first matrix's elements squared. If there is some way to eliminate the extra columns of zeros after squaring the matrix, I could use that property of matrices to square the values of the t vector.
What is the simplest and most effective way to address this problem?