Saturday, June 21, 2014

June 2014 NY Integrated Algebra Regents, Thread 2

Parts 2, 3 and 4 of the Algebra test were open-ended and you had to show your work to get full credit. I don't know the raw score required for passing, but every point here, even partial credit helps. In general, over the last few years, a score of 30-32 is a passing grade. That means you got at least half of the multiple-choice questions correct. However, if you were able to get that many of those questions correct, you have no excuse for not showing some work on these problems.

To answer those who asked on yesterday's Part 1 thread and on Twitter, for the past year I worked at Tottenville High School in Staten Island, and before that I was at William E. Grady High School in Coney Island, Brooklyn, with some time at Boys High School in Bed-Stuy.

Okay, so here we go. Illustrations may get added later, but students seem to be in a hurry for answers:

June 2014 Integrated Algebra Regents, Parts 2, 3 and 4

31. A patio consisting of two semicircles and a square is shown in the diagram below. [ A SQUARE with a semicircle on top and right sides.] The lenght of each side of the square region is represented by 2x. Write an expression for the area of the entire patio, in terms of x and pi.

In terms of x and pi means that you aren't solving for x and you aren't replacing pi with 3.14 or anything else.

Two semicircles make one whole circle. The area of a circle is pi*r2. The radius is half the diameter. The diameter is the side of a square, which is 2x. So the radius is 1x. The area of a square is s2.
The area of the entire patio is (2x)2 + (pi)(x)2, which is 4x2 + (pi)(x)2. That should be enough for full credit.
You could also represent it as (4 + pi)(x)2, but that shouldn't be necessary.

32. Clayton is performing some probability experiments consisting of flipping three coins. What is the probability that when Clayton flips the three coins, he gets two tails and one heads?

I did a very similar problem in class recently. Hopefully, you made a tree diagram or a sample space because there aren't that many possible outcomes: 2 X 2 X 2 = 8 outcomes.

On your diagram you'll see the only possibilities are that the first is H and the others tails, the second is H and the others tails or the third is H and the others tails. Therefore there are 3 positive outcomes, so the probability is 3/8.

This was much easier than a Common Core two-point question!

33. Ross is installing edging around his pool, which consists of a rectangle and a semicircle, as shown in the diagram below. [RECTANGLE WITH A SEMICIRCLE ON TOP, WITH A DIAMETER THE WIDTH OF THE SMALLER END OF THE RECTANGLE.] Determine the length of edging, to the nearest tenth of a foot, that Ross will need to go completely around the pool.

Two irregular shapes in one test? That's new. And both contain semicircles. However, this is a perimeter/circumference problem, not an area problem.

The three sides of the rectangle that need edging are 30 + 15 + 30, which is 75 feet. The semicircle is (1/2)(pi)(d), which is (1/2)(3.141592...)(15), which is 23.56..., which rounds to 23.6.

The total is 75 + 23.6 = 98.6 feet.

Part 3

34. Solve the following system of equations algebraically for all values of x and y. y = x2 + 2x - 8; y = 2x + 1

Algebraically means that you can't use your graphing calculator to find the answer and then use "guess and check" on the paper.

Using substitution, you get x2 + 2x - 8 = 2x + 1
Subtract 2x and subtract 1 from both sides and you have x2 - 9 = 0
This is a Difference of Squares and can be factored as: (x + 3)(x - 3) = 0
So either x + 3 = 0 or x - 3 = 0
Your solution set for x is {-3, 3}

DO NOT STOP HERE. You need the values of y as well.

If x = -3, y = 2(-3) + 1 = -6 + 1 = -5. (-3, -5)
If x = 3, y = 2(3) + 1 = 6 + 1 = 7, (3, 7)

If you plug these into the other equations, they will check.

35. A storage container in the form of a rectangular prism is measured to be 12 inches by 8 inches by 4 inches. Its actual measurements are 11.75 inches by 7.75 inches by 4 inches. Find the relative error in calculating the volume of the container, to the nearest thousandth.

Volume = length X width X height.
Relative error = (difference in the values) / (actual value)

So this problem is ( (12)(8)(4) - (11.75)(7.75)(4) ) / ( (11.75)(7.75)(4) ). If you are using a graphing or scientific calculator, and doing this in one step, those extra parentheses are needed.

This becomes ( 384 - 364.25 ) / 364.25 = 19.75 / 364.25 = 0.054221..., which is 0.054 to the nearest thousandth.
DO NOT make it into a percentage.

36. Perform the indicated operations and express the answer in simplest radical form.

This is new, using the Distributive Property with radicals. Good luck.
Keep in mind, this is how I would do it. As long as you did similar steps, possibly in the same order, and achieved the same solution, you're fine. This would've taken longer if I hadn't seen a number pattern and multiplied the sevens before finding the largest perfect squares.

Again, you didn't have to do it my way, as long as you multiplied, factored, added and came up with 189 times the square root of 2.

If I made a mistake here, feel free to point it out and I'll correct it.

Part 4

37. During its first week of business, a market sold a total of 108 apples and oranges. the second week, five times the number of apples and three times the number of oranges were sold. A total of 452 apples and oranges were sold during the second week. Determine how many apples and how many oranges were sold the first week. [Only an algebraic solution can receive full credit.]

We'll let x = the number of apples sold the first week and y = the number of oranges sold the first week. I won't use A and O, because O looks like 0 and that can be confusing.

We know that x + y = 108 and 5x + 3y = 452. Multiply (x + y = 108) by (-3) and you get -3x + -3y = -324.
Combine 5x + 3y = 452 and -3x + -3y = -324 and you get 2x = 128. The y (number of oranges) is eliminated.
If 2x = 128, then x = 64.

64 + y = 108, so y = 44.

Check: 5(64) + 3(44) = 452?
320 + 132 = 452?
452 = 452 (check!)

38. On the set of axes below, solve the following systems of inequalities graphically. Label the solution set S.

2x + 3y < -3; y - 4x > 2

If you want to use your calculator as a guide, you need to rewrite these equations in slope-intercept form.

y < (-2/3)x - 1; y > 4x + 2

Note that the first line will be a broken or dashed line. The second inequality has a solid line.

A picture of the graph will have to wait until later but, you will shade below the first line and above the second line. The solution set will be the section on the left side of the graph between the two lines. That's where the S goes.

39. During the last 15 years of his baseball career, Andrew hit the following number of home runs each season: 35, 24, 32, 36, 40, 32, 40, 38, 36, 33, 11, 20, 19, 22, 8. State and label the values of the minimum, 1st quartile, median, 3rd quartile and maximum. Using the line below, construct a box-and-whisker plot for this set of data.

First, put the numbers in order to make life easier. Your graphing calculator can do this. (It can also make the box-and-whisker plot, too!)

The numbers, in order, are: 8, 11, 19, 20, 22, 24, 32, 32, 33, 35, 36, 36, 38, 40, 40.

There are 15 numbers, so the 8th number is the median (32). The middle of the first 7 numbers, the 4th number, is Q1 (20). The middle of the back 7 numbers, the 12th number, is Q3 (36). The minimum is 8 and the maximum is 40.

I would use a scale of 2 on the number line, which should allow the numbers from 0 to 50 if you wanted. Plot the five numbers we found above. Draw the box around the middle three and the extend the whiskers to the first and last.

24 comments:

  1. This comment has been removed by the author.

    ReplyDelete
  2. This comment has been removed by the author.

    ReplyDelete
  3. Question 34- I didn't put it as coordinates, I just listed the x and y values, so would I lose credit?

    ReplyDelete
  4. Question 31- my answer was 4x^2+4x^2pi so would I lose only 1 point?
    Question 33- I didn't halve the c=pi * d so my answer came out diff so would I lose 1 pt? Everything else was correct except that

    ReplyDelete
  5. As long as you have the x and y values -- and it's obvious which x goes with which y -- you should be find. It didn't say that you needed co-ordinates.

    ReplyDelete
  6. Q31: 4x^2+4x^2pi will probably be worth a point if your work is shown.

    Q33: if you didn't use C=pi*d or 2*pi*r, and then half of that, then you have what they called a "conceptual" error. You would lose half the points for the problem, which in this case is one point.

    If you answers are consistent with your mistake -- you didn't make a second mistake in calculation -- you should get 1 point.

    ReplyDelete
  7. I just wrote x= ....... And .......
    And then y=......... And ......
    Still full credit??

    ReplyDelete
  8. I don't know.

    If it's obvious from the work, the scorer will most likely given to you.

    Each question is looked at by two scorers, and if they disagree, then the person in charge of that group makes a decision.

    ReplyDelete
  9. For number 37, if we didn't plug in the answer back into the equation to check, do we still receive full credit?

    ReplyDelete
  10. You don't need to check your work.

    It's just a really, good idea.

    If you have the right answer, it won't matter. If you had the wrong answer, checking would've told you so and you could've fixed it.

    ReplyDelete
  11. Does anyone notice that question 34 is straight off from question 36 from the August 2012 Integrated Algebra regents?

    Wonder what the test-makers were thinking...

    ReplyDelete
  12. Good catch. You would think that they would change a couple of numbers, even if the answer was the same.

    The probability problem was practically a textbook problem, two tails and one head. Nothing tricky about it.

    ReplyDelete
  13. This article regarding Algebra regents, is full informative and useful for me. I think you have huge collection of math related topics. I appreciated your work. Here I also like to share a useful website which offer math practice for grade 1 to grade 12 free of cost.
    Math Games For Kids

    ReplyDelete
  14. do you know when students receive their grades?

    ReplyDelete
  15. There's no way to know for certain. Here in NYC, I know that exams are still being graded because there are more Algebra exams than any other math exam. I suspect that grades should be available by Wed or Thurs.

    (And I'm aware of the fact that Thursday is the last day of classes in NYC.)

    ReplyDelete
  16. I made the relative error into a percentage. Will i still recieve credit?

    ReplyDelete
  17. Since they've had relative error on the test (which replaced "percent of error" in Math A, before that), it has always been considered an "error" to convert the answer into a percent.

    I don't agree with that, particularly because you are doing an extra step, but that is how it has been scored. I have to assume that they will do the same now.

    If you're answer is otherwise correct, they'll deduct one point for this.

    ReplyDelete
  18. Do you know the curve for Integrated Algebra exam?

    ReplyDelete
  19. The curve for the Integrated Algebra exam:

    http://www.nysedregents.org/IntegratedAlgebra/614/ialg62014-cc.pdf

    ReplyDelete
  20. I got a 97 so my grade wouldn't go up to a 100?

    ReplyDelete
  21. I don't understand. There is no 97 "raw" score. If you missed three points, you scored 84 out of 87 points. According to the chart, that is curved to 96.

    You can't get 100 on this test (june 2014) unless you had a perfect score.
    http://www.nysedregents.org/IntegratedAlgebra/614/ialg62014-cc.pdf

    ReplyDelete
  22. There are certain distinctions which I understand the importance of, and to not make the distinction between the two would be a conceptual error.

    That said, I don't see the point of penalizing "percent of" error in lieu of "relative" error, especially if the percent sign is in place.

    Now if they just don't understand percents as many of my Financial Algebra students didn't, that's another story.

    ReplyDelete
  23. The Integrated algebra regents is the worst! I've been trying to pass this test since freshman year and now I'm going to be a junior and I still haven't passed. I take the regents again (like the 4th time) tomorrow and I've been crying all day today because I know I won't pass. I was so close in June , I got a 63 all I needed was two more points and I could have passed :( I wanna just drop out of school bc i can't pass this regents and probably never will. I use to be positive about this but I failed it so many time that I lost hope.

    ReplyDelete
  24. Good luck tomorrow. Take your time; you have plenty. Read the questions carefully. Look at what information they are giving you and what they are looking for. What info do they expect you to know to solve the problem?

    Show your work Check your work. Don't cross out any answers unless you have a better one to take its place.

    Label everything. And stay calm.

    ReplyDelete