CertifyT Math Questions Competency

Competency - - 016 Mathematical Connections

A chemistry experiment requires four fluid ounces of vinegar be mixed with one teaspoon of soda. How many milliliters of vinegar should be poured into a beaker? Hint: 1 tbsp = 15 ml = 0.5 fl oz

Determine the choice that best describes the characteristics of the slope-intercept form of a line. y = mx + b

Determine which property describes: (a*b)*c=a*(b*c)

Troy and Rosa want to purchase a house. The bank will approve a loan for a house including property tax and insurance on the house for 24% of their adjusted monthly income. Their combined gross monthly income is $5150. They have a car payment of $320 and pickup payment of $465. Also, they have a furniture payment of $250. What is the maximum payment the bank will approve?

A teacher decides to assign students a project where they will develop an amortization schedule of a purchase so they can apply a lesson using the future value formula and observe the details line by line as payments are made. What would be the best approach in assigning a purchase?

The principal is $127,000 and the monthly payments are $583.56. The students want to know how much interest over the period of the note (30 years) will accrue. They decide the first step is to calculate the total amount to be invested in the house. Payment amount x Number of payments = Total amount invested What should the next step of the algorithm be?

The symbol Æ is often used in mathematics. This symbol does not represent (the) ___________________.

Competency - - 017 Skills, Procedures and Concepts

In teaching a lesson for the first time on decay function models using the formula [ y = y0ekt ] where y0 is the amount present at any time t, students are having a hard time understanding how to find the y0 in the problem given below. They understand that it seems like it would be 700, but are confused at how to derive 700 from the formula. Which choice below would not be a good approach for the teacher to handle this learning situation if the teacher is trying to stress critical thinking?

What previous lessons taught for exponents should be reviewed before teaching a lesson on properties of logarithmic functions involving a problem like the following? Write the expression as a single logarithm with coefficient 1. - 2 log 5(3m2) + 1 log 6(9m2) 3 2

Not knowing where to begin, the students began to urge her to give them some help. Wanting them to feel successful and stay engaged, Ms. Jones pointed out to the students that the problem involved subtracting from the time Pat and her sister got home the minutes and hours they were out. She told her students that they needed to convert hour to minutes when subtracting minutes, and that there are 60 minutes in an hour.

Three sudents are playing a game using the spinner above. Each student draws three boxes on a piece of paper. The spinner is spun, and each student writes the number in any one of the three boxes. The spinner is spun two more times, and each time the students write the number in a remaining empty box. The students then compare numbers, and whoever has the largest three-digit number wins the game. This game would be particularly useful in helping students' understanding of:

Mr. Grant wants his fourth-grade math students to learn to work collaboratively, to discuss alternative approaches to solving tasks, and to justify their solutions. Students are grouped in pairs and Mr. Grant gives his students the following task: Express the ratios below in the lowest forms: 15/25, 18/6, 9/36, 18/15 Which of the following best describes the level of student engagement expected with the given task?

Ms. Senath teaches math to a diverse group of students in her fourth-grade class, some of them with learning disabilities. It is important for her to remember when presenting math instruction to her students that —

Mr. Jansen's second-grade students have been working on addition and are now ready to begin learning two-digit subtraction. To introduce this new unit of study he first has students work on addition problems they are familiar with and then follows up by demonstrating to them how those problems are related to subtraction. This approach best demonstrates Mr. Jansen's understanding that — A. students with learning disabilities learn much slower than other students. B. instruction in math should build on existing knowledge of math. C. he must first review students to make sure they understand addition. D. he must build student confidence before beginning new instruction.

Which choice best describes an explanation a teacher could give a student to help him/her judge the reasonableness of the solution in the following scenario. Evaluate: -7 - 12 The student gives an answer of 5.

After a lesson in finding the area and the domain of the length of a side of a rectangle given the perimeter of the rectangle, the teacher finds that almost all the students have answered the following question this way. What would be the best approach for the teacher to respond to the answers?

The teacher plans to look at the quizzes to determine the level of comprehension of the topics taught that day, mark corrections, hand back the quizzes to the students the next day, and adjust the contents taught the next day based on the results. What type of assessment techniques is the teacher utilizing?

A teacher begins a new lesson on Trigonometry on Monday. She would like to identify which concepts of the new lesson are most difficult for students to comprehend, so that she can adjust her lesson plans for Tuesday as the lesson progresses. Which of the following assessment methods would be least appropriate for achieving this goal?

A teacher that uses constructivism will not practice which of the following in the classroom?

The lesson today is to determine whether equations such as the following have a circle as their graph. And, if they are a circle, then graph them. x2 + y2 + 6x − 2y = −6 As a lead into this lesson, the teacher should review which method of solving a quadratic equation?

The use of mathematics manipulatives and technological tools help which of the following learners?

The teacher leads the classroom outside to measure the sidewalks from the parking lot to the doorway of the school. She divides the students into groups of 4 and divides the sidewalk into 4 pieces. Each group is given the task to measure how many feet are in their section of the sidewalk. Part 2 of the exercise includes each student in each group taking a normal step. The group measures the inches of each student's step. Part 3 of the exercise is for each group to calculate the average inches in a step of their group. Part 4 of the exercise is the groups are to work together and determine the weighted average of a normal step. Part 5 is for the class to determine the average number of steps a student makes on the sidewalk walking one time from the parking lot to the door. Which of the following is this exercise lacking?

Competency 18 - Instructional Implementation

Which of the following concepts or procedures best describes how to find the following retail solution? A $100 pair of shoes is on sale for 25% off. The department store offers a one day special on Saturday: take an additional 20% off. What is the price of the shoes if purchased on Saturday?

Mr. Taylor wants to introduce his students to the concept of place value. Which of the following sets of manipulatives best describe those that can effectively be used to teach the given concept?

Ms. Brown wants to introduce her students to the concept of ratios. Which of the following sets of manipulatives best describe those that can effectively be used to teach the given concept?

Base-ten blocks, attribute blocks, Cuisenaire rods and cubes are some of the manipulatives a math teacher has available to teach several mathematical concepts to his class. Cuisenaire rods is a type of manipulative most effectively used to teach which of the following concepts?

Cuisenaire rods

Which of the following is a reflection the teacher of mathematics should engage to ensure that every student is learning sound and significant mathematics and is developing a positive disposition toward mathematics?

Which of the following would be the least effective approach in teaching a lesson of algebra?

The greatest benefit of providing elementary students with mathematical tools such as geoboards is that these tools:

Calculators, base-ten blocks, attribute blocks and cubes are some of the manipulatives a math teacher has available to teach several mathematical concepts to his class. Attribute blocks is a type of manipulative most effectively used to teach which of the following sets of concepts?

|3x + 2| = 9 |3x -4| ≤10 |7x +9| > 16 Next, he gives the students an absolute value problem as a quiz for the day. Which problem below would not be consistent with what has been taught? A. |-2x + 4 | = 7 B. |4x -5| < 11 C. |2x + 9 | > -2 D. | x + 9 | ≥ 9

Which of the following is NOT a prerequisite for children to recognize patterns? A. exploration of many objects B. determine similarities and differences C. compare sets D. classify objects

After studying a basic section on factoring quadratics that does not include complex numbers, the students are given a quiz the next day. Determine the following that is not an appropriate question for the quiz. A. x2 + x − 6 = 0 B. x2 + 6x + 9 = 0 C. x2 − 2x − 8 = 0 D. x2 + 6x + 14 = 0

Determine the best problem to put on a quiz to check for a common misconception with exponents. A. −3^2 B. (−5)^2 C. −2^3 D. −3^5

The teacher asks students to evaluate the following problem.-------3x − (2 − 9x) After a few seconds, the teacher puts these answers on the Smart Board. A. 12x − 2 B. −6x − 2 60% of students chose Answer A and 40% chose Answer B with their classroom Clickers. What property does the teacher need to re-teach?

Determine the best choice to assess each student's comprehension of a concept. A. Quiz B. Clickers C. Group Work D. Both A and B

The teacher wants the grade for this project to reflect different levels of performance of arithmetic skills, well-defined processes in solving the problem and checking the answer, use of quantitative language in writing that supports their answers, and their applications of the mathematics to a real-world problem. What method of assessment would be best for this project?