Where have all the problems gone...

I reminded my faithful that, after posting numerous times for 2 months, I would crash and burn! But I hope some of you are following me at twitter.com/dmarain.

I have been tweeting many SAT practice problems under my trademark ®SATMATH 800++++.

For example, here's my latest...

What is the probability that a number chosen at random from the first ten positive odd integers is prime?
[45 seconds...]

Here's another not yet tweeted...

In how many ways can 36 be written as the sum of 2 primes, p and q, p ≤ q?

These are NOT of a high order of item difficulty. They are intended to provide practice for this category of arithmetic problems on SATs and other standardized tests, such as the upcoming PARCC assessments.

Just as importantly, as in ALL problems I compose, they are intended to be used as discussion points in class to review fundamental ideas and help students improve their READING COMPREHENSION of math words/phrases.

AS ANY MATH EDUCATOR WILL READILY ACKNOWLEDGE:

LACK OF KNOWLEDGE OF KEY MATH TERMS AND LANGUAGE ISSUES IN GENERAL ARE MAJOR FACTORS IN STUDENTS NOT PERFORMING UP TO THEIR POTENTIAL.

INSCRIBING RECTANGLES IN AN EQUILATERAL TRIANGLE - A COMMON CORE INVESTIGATION

I'll let the video speak for itself...

I would really appreciate dialog here, focusing more on instructional methods -- balanced vs blended, conceptual development AND procedural understanding, etc.
Hope this helpful to someone...

If interested in purchasing my NEW 2012 Math Challenge Problem/Quiz book, click on BUY NOW at top of right sidebar. 175 problems divided into 35 quizzes with answers at back and DETAILED SOLUTIONS/STRATEGIES for the 1st 8 quizzes. Suitable for SAT I, Math I/II Subject Tests, Common Core Assessments, Math Contest practice and Daily/Weekly Problems of the Day. Includes multiple choice, case I/II/III type and constructed response items. Price is $9.95. Secured pdf will be emailed when purchase is verified.

A brief respite...

I will not be posting for the next few days as my family and I observe the one year passing of my wife. Thank you for your understanding.

An SAT quiz to sharpen your brain for March 9

Click on the image to enlarge. Good luck trying to read my scrawl!
This is one I wrote from the 20th century! Feel free to use with your students but observe the copyright please.

No answers yet but you can share your thoughts...



If interested in purchasing my NEW 2012 Math Challenge Problem/Quiz book, click on BUY NOW at top of right sidebar. 175 problems divided into 35 quizzes with answers at back and DETAILED SOLUTIONS/STRATEGIES for the 1st 8 quizzes. Suitable for SAT I, Math I/II Subject Tests, Common Core Assessments, Math Contest practice and Daily/Weekly Problems of the Day. Includes multiple choice, case I/II/III type and constructed response items. Price is $9.95. Secured pdf will be emailed when purchase is verified.

So is 75 the avg of the pos integers from 50 to 100 inclusive?

This very common type of question appears so straightforward. So why do variations of it recur so often on SATs and other standardized tests and math contests?

Why not test it out with your students and ask them to explain their reasoning. I am still surprised by the creativity of our students when given the opportunity to display it!

Again, my boring disclaimer...
This is not a conundrum for the math problem-solvers out there. It is intended as a discussion point for helping students develop some important ideas in mathematics.






If interested in purchasing my NEW 2012 Math Challenge Problem/Quiz book, click on BUY NOW at top of right sidebar. 175 problems divided into 35 quizzes with answers at back and DETAILED SOLUTIONS/STRATEGIES for the 1st 8 quizzes. Suitable for SAT I, Math I/II Subject Tests, Common Core Assessments, Math Contest practice and Daily/Weekly Problems of the Day. Includes multiple choice, case I/II/III type and constructed response items. Price is $9.95. Secured pdf will be emailed when purchase is verified.

A RADICAL DEPARTURE - AN ALGEBRA 2 /CCSSM/MATH 2/MATH CLUB CHALLENGE

A Radical Departure...

(Inspired by Ramanujan and an excellent Wikipedia article on Nested Radicals)

Suggestion: Assign as a 2-day team or individual project after demonstrating a similar but simpler example such as the square root of 3+2√2 = 1+√2.

NOTE: The method below DOES NOT show a detailed algebraic solution, using substitutions and solution of resulting quadratic equations.  Rather, I suggested some reasonable educated guessing,  aka number sense. I would recommend both approaches. 

There is considerable more theory than is suggested by this example, e.g., justification of uniqueness of roots, conditions for roots to be of the form suggested in the solution, etc.  Encourage students to investigate further! 

PROBLEM: Demonstrate the following identity by simplification of the left-hand side only. No calculators permitted for derivation although numerical (decimal) verification that the left side equals the right is recommended prior to starting the 'proof'.

(SOLUTION GIVEN BELOW STATEMENT OF IDENTITY)

NOTE: Illegibility of next to last line of 3rd image!  Should be (Square root of 3 + Square of 2) not 'Square root of 4'.


If interested in purchasing my NEW 2012 Math Challenge Problem/Quiz book, click on BUY NOW at top of right sidebar. 175 problems divided into 35 quizzes with answers at back and DETAILED SOLUTIONS/STRATEGIES for the 1st 8 quizzes. Suitable for SAT I, Math I/II Subject Tests, Common Core Assessments, Math Contest practice and Daily/Weekly Problems of the Day. Includes multiple choice, case I/II/III type and constructed response items. Price is $9.95. Secured pdf will be emailed when purchase is verified.

SAT/CCSSM: How many 3-digit positive integers satisfy...

Disclaimer/Reminder
Don't forget to comply with the Creative Commons License in sidebar. Thanks!

An acronym I just thought of for improving your students' performance on SATs or other standardized tests:


S: SPEED
A:ACCURACY
T:TERMINOLOGY

(For training purposes only)
TIME LIMIT: 45 sec
NO CALCULATOR

HOW MANY 3-DIGIT POSITIVE INTEGERS SATISFY BOTH OF THE FOLLOWING CONDITIONS?

• THE PRODUCT OF THE DIGITS IS 72
• THE 3-DIGIT INTEGER IS A PALINDROME (an integer that is the same when its digits are reversed)

Let me know how many of your students can do this within the time limit and no calculator.  And for those who could not? Guess that means they need more of these to practice! Why not ask each student to write a similar problem for hw! They learn more from writing their own and we give up control --- perfect!!


Answer: Read below shameless ad for my book...


If interested in purchasing my NEW 2012 Math Challenge Problem/Quiz book, click on BUY NOW at top of right sidebar. 175 problems divided into 35 quizzes with answers at back and DETAILED SOLUTIONS/STRATEGIES for the 1st 8 quizzes. Suitable for SAT I, Math I/II Subject Tests, Common Core Assessments, Math Contest practice and Daily/Weekly Problems of the Day. Includes multiple choice, case I/II/III type and constructed response items. Price is $9.95. Secured pdf will be emailed when purchase is verified.

Answer (send yours if you believe I erred!):
2 (namely 383,626)

The Quintessential SAT Problem: If h hens eat p pounds of feed a day...

If one was to categorize every SAT question from the very first SAT ever published, I believe we would find the following type of algebraic ratio problem one of the most common type. Even with all the exposure students now have to SAT problems, my direct experience is that many students still struggle with these types of questions.
WHY?

More importantly, are these types of problems important enough in the CCSSM to justify the time investment to introduce them in middle school and reinforce in secondary algebra classes? IMO, ABSOLUTELY!

If h hens consume a total of p pounds of feed per day, then, at this rate, how many pounds of feed would c hens consume in x days?

Not only was a similar question the recent SAT Question of the Day on the College Board web  site, the statistics were also published:
35620 responded (up to the time I checked)
31% correct
So, about 7 out of 10 students attempting this question online got it wrong.

Note: The actual question was followed by 5 choices, allowing students to plug in numbers and test each choice, but I chose to focus on the question here rather than test-taking strategies.

IMO, the College Board hires highly competent math people who write succinct, accurate and helpful online solutions but this only scratches the surface. It only suggests one particular approach and has little to do with Instructional Strategies and the various ways children develop these important ideas.

REFLECTIONS...

1.  Where are ratio concepts introduced for the first time in the CCSSM? K? 1st? 4th 5th?

2. By your own estimate,  how many of these kinds of questions appear as sample problems or homework exercises in your elementary/prealgebra/algebra texts?

3.  Do you believe ALL your students receive adequate exposure to and review of these?

4. Would you be willing to share some of your favorite methods of laying the groundwork for and developing the skills and concepts needed for your students to be successful with ratio problems and ultimately algebraic types? If I take a risk, would you?

Putting myself out there...

The simplest and most instinctive approach usually makes the most sense, doesn't it? We know how we learn best and the same is true of all students.  Do you accept the following as a truism, an essential tenet of teaching and learning mathematics?

EVERYONE LEARNS BETTER WHEN PRESENTED WITH CONCRETE NUMERICAL RELATIONSHIPS BEFORE TACKLING ABSTRACTIONS. FURTHER, THE COMPLEXITY OF LANGUAGE SHOULD BE GRADUALLY INCREASED, STARTING WITH THE MOST ACCESSIBLE INFORMAL PHRASES.

For example,

If 6 hens eat a total of 12 pounds of feed each day, how many pounds of feed would one hen eat in one day?

When first introduced, should our focus be on which operation to perform? In my view, our goal should be to develop number sense, in this case, ratio sense. 

We all know that a powerful construct for developing ratio/proportion sense is the idea of first reducing the information to a UNIT.
Many of us were taught this way and most children tend to think like this at first.

Scaffolding...
If 6 hens eat a total of 12 pounds of feed each day, how many pounds of feed would nine hens eat in one day?

Working from one hen consumes 2 pounds per day, the child can usually move on to 9 hens eat 9x2 or 18 pounds per day.

Two points here...

First, I believe it is important to routinely use a variety of equivalent phrases:
"in one day" vs. "each day" vs. "per day."

Secondly, I would encourage students who can reason proportionally to share this with the group:

"Well, if 6 hens eat 12 pounds, then 3 hens will eat half as much or 6 pounds, so 9 hens will eat 12+6 or 18 pounds."

Teaching conceptually means NOT SETTING UP A PROPORTION initially. Procedures and algorithms turn off the child's sense-making and stifle intuition and number sense. You can fight me on this all you want, folks, but you will not win here on my blog!


So when do we introduce proportion problems involving variables and what are some good ways to solve the original problem??  I'll allow my readers to figure that out for themselves...




If interested in purchasing my NEW 2012 Math Challenge Problem/Quiz book, click on BUY NOW at top of right sidebar. 175 problems divided into 35 quizzes with answers at back and DETAILED SOLUTIONS/STRATEGIES for the 1st 8 quizzes. Suitable for SAT I, Math I/II Subject Tests, Common Core Assessments, Math Contest practice and Daily/Weekly Problems of the Day. Includes multiple choice, case I/II/III type and constructed response items. Price is $9.95. Secured pdf will be emailed when purchase is verified.