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====== Math 445 lab 5: programming basics ====== **Problem 1:** Write a **for** loop that will print statements of the form <code> 1 times pi is 3.1416 2 times pi is 6.2832 </code> for the numbers 1 through 10. ---- **Problem 2:** If $F$ is a temperature in Farenheit, then $C = \frac{5}{9}(F-32)$ is the same temperature in Celsius. Write a function ''farenheit2celsius'' that takes a Celsius temperature as input, converts it to Celsius, prints a statement of the form ''20 Farenheit is -6.6667 Celsius.'', and returns the Celsius value as its output. ---- **Problem 3:** Write a **for** loop that uses the above function to print a list of statements <code> -10 Farenheit is -23.3333 Celsius. 0 Farenheit is -17.7778 Celsius. </code> for Farenheit temperatures from -10 to 100, in steps of 10. ---- **Problem 4:** Write a function ''average'' that takes an input vector $x$ and computes the average (mean) value of its components, according to the formula \begin{equation*} \text{average}(x) = \frac{1}{N} \sum_{i=1}^N x_i \end{equation*} Test your function by comparing its output to the output of the built-in Matlab function **mean** on a random vector of length 100 whose elements are uniformly distributed between 0 and 1. ---- **Problem 5:** The formula for matrix-vector multiplication $y = Ax$ is <latex> y_i = \sum_{j=1}^n A_{ij} x_j </latex> In this formula, $A$ is an $m \times n$ matrix, $x$ is an $n$-dimensional column vector, and $y$ is an $m$-dimesional column vector. Write a function ''matvecmult'' that takes a matrix $A$ and a vector $x$ as arguments, computes $y = Ax$ according to that formula, and returns the vector $y$. Compare your ''matvecmult'' to Matlab's built-in matrix-vector multiplication operator ''*'' on a random $4 \times 4$ matrix and a random 4d column vector. ...to be continued...
