CS 121 – Quiz 3
Questions 4 and 5
Question 4
Let’s generalize the problem:
• Given a tower of height H, on a hill sloping at angle a, with guy wires tied down at a distance D on either side of the tower, how long are the guy wires L and R?
• L and R each form the side of a triangle of which the lengths other two sides are known, and the angle between them can be easily calculated. Let’s find the angles first.
• Angle a is one angle in a right triangle, so the unknown angle must be (90 – a), and therefore so is angle r, leaving angle l to be (180 – (90 – a)), or just (90 + a).
• Now that we know two sides of each triangle and the angles between them, we can easily find the unknown sides using the Law of Cosines:
L^2 = H^2 + D^2 – 2*H*D*cos(l) R^2 = H^2 + D^2 – 2*H*D*cos(r)
• Remember that Maple expects the parameter given to cos() to be in radians, not degrees.
Question 5
• Because there are 3 different versions of the same problem in this question, it makes sense to make a re-usable script. We can even re-use some of the script we wrote for Lab 3 Part 1.
• Let’s first identify the parameters:– T[i] – the body’s initial temperature– T[a] – the room’s temperature– T – the time taken to process the scene– B(t) – the body temperature after the scene has been
processed
• Given those parameters, we can easily plug them into the given equation and solve for k.
• Now that we have k, we can find the time of death. We know the following:– k – we just calculated this– T[i] – living body temperature (98.6 degrees F)– T[a] – the room’s temperature– B(t) – the first measured body temperature
• Given this, we can easily plug them into the given equation and solve for t.