Skip to main content

Unschooling with Cartoons and Comic Books Doom Patrol Style

 *Spoilers lie below*
Our oldest kid, 5 y.o., No. 1, tried a few weeks of public kindergarten before she decided she missed the outings with her sibs and homeschool buddies.  During her brief stint in kindergarten her teacher mentioned that reading out loud and comprehension were two different things.  I'm still not sure I believe this entirely, but we started trying to be more mindful with respect to comprehension... just in case.

For us, reading comprehension amounts to sitting around discussing the books we're reading.  My wife and I read comic books, and if they're not violent we leave them laying around the house where the kids can reach them.  Similarly, we both enjoy reading the kids' comics that they pick out.  This shared reading material pool has led to really fun reading comprehension discussions.

A few weeks ago after Doom Patrol #2 came out, the kid and I wound up discussing it at the kitchen table.   The comic book is loosely connected to one of our kids' favorite cartoons, Teen Titans.  (For those not in the know, Beast Boy, a member of the Teen Titans, was originally a member of Doom Patrol).

In short,I found out that No. 1 is definitely retaining what she reads, and also that she's taking in way more of the details of what she reads than I do.  The cool part:  I hoped to help her with reading strategies, (and maybe I did a little), but what I'm psyched about are the cool things in the comic books I'd completely missed that No. 1 pointed out.  The highlights of our conversation follow:




No. 1: "Who's this guy?"

"That's negative man, you remember from the Teen Titans?"

"That's not Negative Man. That looks nothing like him."

"'Cause he's not wearing all the bandages?"

"Uhhh, yeah!"

Turning to the page with the negative men statues featuring the bandaged mummy wrapped look, "How about this?"

"Yeah, that looks like Negative man. Why doesn't it look like Negative Man in the other places?"

"Look at the last page of #2. What's it have on it?"

"A parade with a bunch of toys."

"What if it's all happening in a little boy's imagination? Would that make sense of all the differences?"

"Yeah, that would make sense.... It says it's Danny Land!" No. 1 grabs the first Doom patrol issue, and flips through the pages. "Look at this!" She shows me a frame featuring a character screaming "Danny!!!" near a pile of bricks.

This is followed by several minutes of finding other Danny references in the two issues.

I then mention that it makes sense of Robot Man's brain being in a cat dish if it's all pretend. A discussion ensues as to whether the cat is drinking water, or merely licking Robot Man. This is followed by a more heated discussion about whether the garbage truck hit Robot Man, or he attacked it.

No. 1: "He staggered out of the alley, and hit the garbage truck."

"Hunh, that could've happened, but how'd his leg get under the side if he hit it?

"He hit it so hard that his leg flew up, and then fell under."

"What if the truck had swoosh lines? Then would it have hit him?"

"Yeah, then it would be moving, and it would have hit him. See, it's not, so he hit it."

Our focus on the garbage truck leads to yet another DannyLand revelation:

"Oh my gosh! Look what's in the back of the truck!"

"Toys!"

A few minute discussion of foreshadowing and the big DannyLand reveal at the end of #2 ensues.

The kid then flips over to a meeting of 'space aliens,' and points out that the people in business suits are the "same kind of aliens that attacked Robot Man," something I hadn't put together. She then notices that the product they're talking about is Danny Burger.

All this is capped off by a bit more page flipping, and finally finding a brick in the last scene of #1 with the name Danny scratched into it.


So, to tally everything up:
What I learned:
  1. There are way more references to Danny in Doom Patrol in #1, and #2 than I had realized.
  2. Comic books, and cartoons are awesome tools for building reading comprehension, and retention
  3. Swoosh lines make all the difference.
What the kid and I got to discuss:
  1. psychedelic and surreal art
  2. foreshadowing
  3. puzzles hidden in books
This unschooling stuff is awesome!

Comments

Popular posts from this blog

More Cowbell! Record Production using Google Forms and Charts

First, the what : This article shows how to embed a new Google Form into any web page. To demonstrate ths, a chart and form that allow blog readers to control the recording levels of each instrument in Blue Oyster Cult's "(Don't Fear) The Reaper" is used. HTML code from the Google version of the form included on this page is shown and the parts that need to be modified are highlighted. Next, the why : Google recently released an e-mail form feature that allows users of Google Documents to create an e-mail a form that automatically places each user's input into an associated spreadsheet. As it turns out, with a little bit of work, the forms that are created by Google Docs can be embedded into any web page. Now, The Goods: Click on the instrument you want turned up, click the submit button and then refresh the page. Through the magic of Google Forms as soon as you click on submit and refresh this web page, the data chart will update immediately. Turn up the:

Cool Math Tricks: Deriving the Divergence, (Del or Nabla) into New (Cylindrical) Coordinate Systems

Now available as a Kindle ebook for 99 cents ! Get a spiffy ebook, and fund more physics The following is a pretty lengthy procedure, but converting the divergence, (nabla, del) operator between coordinate systems comes up pretty often. While there are tables for converting between common coordinate systems , there seem to be fewer explanations of the procedure for deriving the conversion, so here goes! What do we actually want? To convert the Cartesian nabla to the nabla for another coordinate system, say… cylindrical coordinates. What we’ll need: 1. The Cartesian Nabla: 2. A set of equations relating the Cartesian coordinates to cylindrical coordinates: 3. A set of equations relating the Cartesian basis vectors to the basis vectors of the new coordinate system: How to do it: Use the chain rule for differentiation to convert the derivatives with respect to the Cartesian variables to derivatives with respect to the cylindrical variables. The chain

The Valentine's Day Magnetic Monopole

There's an assymetry to the form of the two Maxwell's equations shown in picture 1.  While the divergence of the electric field is proportional to the electric charge density at a given point, the divergence of the magnetic field is equal to zero.  This is typically explained in the following way.  While we know that electrons, the fundamental electric charge carriers exist, evidence seems to indicate that magnetic monopoles, the particles that would carry magnetic 'charge', either don't exist, or, the energies required to create them are so high that they are exceedingly rare.  That doesn't stop us from looking for them though! Keeping with the theme of Fairbank[1] and his academic progeny over the semester break, today's post is about the discovery of a magnetic monopole candidate event by one of the Fairbank's graduate students, Blas Cabrera[2].  Cabrera was utilizing a loop type of magnetic monopole detector.  Its operation is in concept very sim