1)What are the six keys that I gave to logical organization?
2)List an example of each of the previous keys.
3)Draw a two-dimensional axes. Draw an identity function from it. Draw a line that is (-1)*the identity function.
Label the quadrants. Circle the labels of the quadrants that corresponds to the identity function.
4)Make a cartoon of the identity function moving as a swipe of one full circle going counterclockwise.
5)Draw lines that go jointedly from one spot to another.
Next, draw a smooth curve that approximates this path.
6)Draw a circle. Circle its top. What function is maximized there? What function is zero there? Put a square at the bottom of the given circle. What function is minimized there? What function is zero there?
Put a triangle on the left side of the given circle. What function is minimized there? What function is zero there? Put a rectangle of the right side of the given circle.
What function is maximized there?
What function is zero there?
7)Why can't change be constantly jointal?
8)Why can't change be constantly smooth?
9)What does the Heisenburg Principle amount to?
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