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--- gibson:teaching:fall-2012:math445:pf1 [2012/12/05 13:02]
gibson
+++ gibson:teaching:fall-2012:math445:pf1 [2012/12/05 13:23] (current)
gibson
@@ Line 40: / Line 40: @@
 network of websites.
-  <network-of-links figure here>
+{{:gibson:teaching:fall-2012:math445:network2.png?direct&300}}
 . Write Matlab code that converts the connectivity matrix //C// to a
@@ Line 60: / Line 59: @@
  {{:gibson:teaching:fall-2012:math445:fig1.png?direct&300}}
-Bonus: express exponential functions as powers of //e// rather than
-powers of 10. Use $e^{2.3}\approx 10$ to convert between the two.
 . How would you graph the function $y(x) = x^c$, in a way that highlights
@@ Line 119: / Line 117: @@
 <latex>
-y_i = \sum_{j=1} A_{ij} x_j
+y_i = \sum_{j=1}^N A_{ij} x_j
 </latex>
-for each component $y_i$ of the //M// dimensional vector $y$. But don't that
+for each component $y_i$ of the //M// dimensional vector $y$. But don't code that
-formula directly! Instead start your code with
+formula directly! Instead start your function with
 <code>
@@ Line 130: / Line 128: @@
 </code>
-and write the matrix-vector multiplication as a loop over the $K$ nonzero elements
+and write the matrix-vector multiplication as a loop over the K nonzero elements
-of $A$.
+of A.

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