Covers: This project covers up through and including Chapter 8 of the tutorial. What to Submit: For this project you will need to create and upload a single script m-file called matlab1.m (all lower case!). This file should do all of the things requested in the problems below in the order specified. Grading Method: Grading for this course is via an automated grading system which checks both that your answers are correct and that you used the correct method of obtaining them. This is why it is important to assign your answers to the correct variable names and use the methods specified. Use of comments (if you know how to use them) is fine - comments are ignored by the grading system. If there are any unexpected errors or the file is incorrectly named (hence can't be found) then the project will automatically earn a grade of 0 so make sure you run your m-file through Matlab and check the output before submitting! Be very careful about making sure that any necessary symbolic variables are defined in your code. The assumption should be that we will run your m-file through a clear matlab process. 1. Clear the workspace completely with clear all as the very first line in your script m-file. 2. This problem is here to remind you to make sure you syms any variables you need. You can do them all now, or later when you need them, but don't forget! 3. Evaluate sin(20). All angles should be treated as radians. Assign to p2. p2 = sin(20) 4. Evaluate cos(cos(29)). All angles should be treated as radians. Assign to p3. 5. Evaluate cos(sin(39). All angles should be treated as degrees. Assign to p4. 6. Evaluate tan^-1(cos(20)). All angles should be treated as degrees. Assign to p5. 7. Calculate log_5 29+log_4 33. You might need a change of base or two. Assign to p6. 8. Use solve to solve 5x + 9 = 28, Assign to p7. 9. Use solve to solve 1 + 5x^2 + 6x^3 + 4x^4 = 1- 9x^2 + 2x^3 - 6x^4. Assign to p8. 10. A surveyor standing at point A sights two targets, one at B and one at C. He measures that target B is 489 yards away, target C is 303 yards away and the angle between them is 44 degrees. Use solve and the Law of Cosines to find the distance between B and C. Assign to p9. I1. Use simplify to simplify (2(2/(2 + (6 - t)) + (3 (5 - (5 + (2/t)))). Assign to p10