January 2010

News/Events

December 23 – January 4, 2010 – Open by appointment. Have a great Holiday!

Happy January Birthday to Scott, Elijah, Jordan, Camille, Andrew, Maya, Peter & Brendan!

Spin and Win Bonus! Students who complete 3 or more pages in December or January get to spin the wheel for an extra prize like hot cocoa, a game or funny putty. And, kids who  answer the “Question of the Day” also get a chance to spin for a bonus.

5 Part Series: Myths That Can Cause Math Anxiety
Myth #2: TO BE GOOD AT MATH YOU HAVE TO BE GOOD AT CALCULATING

Some people count on their fingers. Invariably, they feel somewhat ashamed about it, and try to do it furtively. But this is ridiculous. Why shouldn’t you count on your fingers? What else is a Chinese abacus, but a sophisticated version of counting on your fingers? Yet people accomplished at using the abacus can out-perform anyone who calculates figures mentally.

Modern mathematics is a science of ideas, not an exercise in calculation. It is a standing joke that mathematicians can’t do arithmetic reliably, and I often admonish my students to check my calculations on the chalkboard because I’m sure to get them wrong if they don’t. There is a serious message in this: being a wiz at figures is not the mark of success in mathematics.

This bears emphasis: a pocket calculator has no knowledge, no insight, no understanding – yet it is better at addition and subtraction than any human will ever be. And who would prefer being a pocket calculator to being human?

This myth is largely due to the methods of teaching discussed above, which emphasize finding solutions by rote. Indeed, many people suppose that a professional mathematician’s research involves something like doing long division to more and more decimal places, an image that makes mathematicians smile sadly. New mathematical ideas – the object of research – are precisely that. Ideas. And ideas are something we can all relate to. That’s what makes us people to begin with.

Tips & Techniques: Travel Math for the Holidays

You and your family are going on a 300-mile automobile trip. You can count mile markers, trucks, or wheels that you pass, or see who can spot the largest license plate number, then ask yourself:

1)  At an average speed of 60 miles per hour, how long will the whole trip take?

2)  If you car gets 25 miles per gallon, how many gallons of gas will be used on the trip?

3)  If gasoline costs $3.25 per gallon, estimate the cost of gas for the trip.

4)  After you have traveled 60 miles:

• a)  How much farther do you have to go?
• b)  What fractional part of the trip have you traveled?
• c)  What percent of the trip is left to go?

5)  After you have traveled 60% of the trip:

• a)  How much farther do you have to go?
• b)  What fractional part of the trip have you traveled?
• c)  What percent of the trip is left to go?

6)  When you have 1/10 of the trip left to go:

• a)  How far have you traveled?
• b)  How many gallons of gas have been used so far?
• c)  What percent of the trip have you completed?

7)  If you increase your average speed from 60mph to 75 mph:

• a)  How much faster will you get there?
• b)  By what percent did your time for the whole trip improve?

Student of the Month

Michael GreenLee

December 2009

News/Events

December 12, 1:00pm – 10:00pm – Holiday Christmas Card Crop

December 23 – January 4, 2010 – Closed for the Holidays. Have a great Holiday!

Happy December Birthday to Jacob, Scott, Megan, Zach, Tyler, Katherine, Bridget, William, and Ted!

Spin and Win Bonus! Students who complete 3 or more pages in December or January get to spin the wheel for an extra prize like hot cocoa, a game or funny putty. And, kids who  answer the “Question of the Day” also get a chance to spin for a bonus.

5 Part Series: Myths That Can Cause Math Anxiety
Myth #1: Aptitude for Math is Inborn

This belief is the most natural in the world. After all, some people just are more talented at some things (music and athletics come to mind) and to some degree it seems that these talents must be inborn. Indeed, as in any other field of human endeavor, mathematics has had its share of prodigies. Karl Gauss helped his father with bookkeeping as a small child, and the Indian mathematician Ramanujan discovered deep results in mathematics with little formal training. It is easy for students to believe that doing math requires a math brain, one in particular which they have not got.

But consider: to generalize from “three spoons, three rocks, three flowers” – to the number “three” – is an extraordinary feat of abstraction, yet every one of us accomplished this when we were mere toddlers! Mathematics is indeed inborn, but it is inborn in all of us. It is a human trait, shared by the entire race. Reasoning with abstract ideas is the province of every child, every woman, every man. Having a special genetic make-up is no more necessary for success in this activity than being Mozart is necessary to humming a tune.

Ask your math teacher or professor if he or she became a mathematician in consequence of having a special brain. (Be sure to keep a straight face when you do this.) Almost certainly, after the laughter has subsided, it will turn out that a parent or teacher was responsible for helping your instructor discover the beauty in mathematics, and the rewards it holds for the student – and decidedly not a special brain.

Tips & Techniques: Number Sense

Here are a variety of skills that exercise and enhance Number Sense for students at different levels of ability:

Level 1: Sometimes it is faster and easier to solve math problems using Number Sense, as opposed to doing so algorithmically.
For instance, since 1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 + 10 = 55,
what is 2 + 4 + 6 + 8 + 10 + 12 + 14 + 16 + 18 + 20?

Level 2: An important thing to understand when developing Number Sense is that mathematical terms have very concrete, specific definitions. While a thesaurus will most likely list the word “probability” as a synonym of the word “odds,” in math, the two concepts, though related, have their own separate definitions. As probability is the ratio of the “number of ways to win” to the “total number of ways things can happen,” odds are defined as the ratio of the “number of ways to win” to the “number of ways to lose.”
With this in mind, if the probability of winning a certain game is 2 to 3,
what are the odds of winning the game?

Level 3: Most of the time, when we consider the concept of absolute value from a geometric perspective, we think of it one-dimensionally, that is, a number’s absolute value is a number’s distance from 0 along a given number line. Absolute value, however, also pertains to points on a two-dimensional plane or even in a three-dimensional space. A single point’s absolute value can thus be defined as the distance of the point from the origin (0,0) on a two-dimensional plane and (0,0,0) on a three-dimensional plane.
Given this, what is the absolute value of the point with coordinates (5,12)?

Math Matters

When we want to know what time it is, reaching for a watch or a clock is second nature. Before the advent of mechanical clocks, however, people relied on other methods, like the sundial, which used the position of the sun in the sky to measure time. The oldest sundials date as far back as 3500 BC, and they have been used throughout ancient and modern times.

The basic principle behind a sundial’s functionality is that the shadow of a fixed object changes throughout the course of the day as the Earth rotates on its axis and the sun appears to move across the sky. The first sundials were essentially tall fixed objects (now referred to as the sundial’s gnomon) such as the Ancient Egyptian obelisks. Later on, the addition of marked dial faces made tracking shadows more accurate by quantifying them.

The Earth is tilted as it both rotates on its axis and revolves around the sun. Because of this, the shadows cast by the gnomon at a given time vary from day-to-day. For a more accurate dundial, gnomons were tilted to align with the Earth’s axis, that is, pointing towards true north (for  those in the northern hemisphere) or true south (for those in the southern hemisphere).

Discrepancies exist between clock time and apparent solar tim (time as measured on sundials). Due to a combination of the elliptical shape of the Earth’s orbit (as opposed to a perfect circle) and the Earth’s tilted position, the sun’s position in the sky is subsequently irregular and affects the time presented on the sundial. The difference between these two times (known as the equation of time) varies throughout the course of the year as the Earth’s position relative to the sun changes.

Student of the Month

Diamond Goodman