Deck 14: Developing an Understanding of Mathematics in All Learners

A)increase.
B)decrease.
C)be the same as when they were young.
D)change for the better.

A)an ability to reason.
B)high levels of reading fluency.
C)a useful inner language.
D)an ability to evaluate and predict.

A)Mathematical communication
B)Numbers and operations
C)Problem-solving.
D)Computation fluency

A)skills taught in isolation.​
B)intensive direct instruction.
C)a focus on relevant stimuli as opposed to the big picture.
D)authentic, anchored learning.

A)to be critical thinkers
B)procedural knowledge
C)rule-driven knowledge
D)to be concrete thinkers

A)they also have cognitive deficits.​
B)they can only learn in real life settings.
C)they tend to focus on less relevant stimuli and miss the "big picture."
D)behavioral issues impede their learning of math concepts.

A)remained the same.
B)increased.
C)decreased.
D)Diminished.

A)understanding there is only one right way to arrive at an answer.
B)confidence.​
C)risk-taking.
D)willingness to learn from mistakes.

A)in schools.
B)in the home at work.
C)in the community.
D)All of the choices are correct.

A)informal assessments
B)a mixture of assessment tools
C)results from group administered achievement tests
D)standardized assessments

A)time and length.
B)length and direction.​
C)heights and direction.
D)direction and time.

A)diagnostic assessment
B)criterion referenced test​
C)error analysis
D)math interview

A)boys are inherently more skilled in math than girls.
B)boys prefer to use spatial representations and memory to solve math problems.
C)girls prefer math strategies paired with manipulatives to solve math problems.
D)teachers may reinforce positive performance in math with attention and praise more often for boys than for girls.

A)visual-motor skills.
B)spatial learning.​
C)math literacy.
D)computation fluency.

A)pass addition tests.
B)make reasonable predications and estimates.
C)earn reasonable grades in math classes.
D)improve their visual-motor skills.

A)it doesn't seem so concrete.
B)they know we understand the concepts.​
C)it doesn't seem so abstract.
D)they are in compliance with standards based reform.

A)use a number line.
B)work from right to left to solve column-form calculations.​
C)calculate accurately and efficiently.
D)line up computational problems in math.

A)algebraic thinking can be seen on all grade levels as we move toward a problem solving emphasis in math.
B)concrete thinkers generally do poorly in algebra, while more abstract thinkers generally do well.
C)strong skills in algebra are necessary to develop higher level critical math skills needed in most workplaces today.
D)using algebraic symbols, graphs, equations, etc., students learn to represent and analyze mathematical situations and see relationships between numbers.

A)Concrete
B)Representational
C)Abstract
D)Manipulative

A)data analysis and probability.​
B)geometry and data analysis.
C)probability and algebra.
D)data analysis and measurement.

A)providing peer models and social support.
B)assigning individual seat work.
C)discussing incorrect answers.
D)eliminating unnecessary competition.

A)Criterion-referenced assessment
B)Curriculum based assessment​
C)Portfolio assessment
D)Error analysis

A)phonology
B)alphabetic principle​
C)semantics
D)morphology

A)algebra.
B)geometry.
C)measurement.
D)computation fluency.

A)Second language learners who have developed basic interpersonal communication skills in English will also have a sufficient math vocabulary.
B)English language learners need exposure early to math vocabulary in order to accelerate their math performance.
C)Difficulties with math can be overcome in time when an extra effort is made to learn the language and related math skills.
D)Lower performances on math assessments by English language learners relates more to lack of exposure to mathematical words and phrases then to lack of mathematical skill.

A)understand properties of numbers and recognize patterns.
B)identify symbols and understand the related language.
C)use reasoning abilities.
D)easily see pictures and shapes, or have visual spatial "intelligence."

A)Achievement tests​
B)Interest inventories​
C)Diagnostic tests
D)Error analyses

A)spatially-challenged.
B)physically-challenged.
C)verbally-challenged.
D)cognitively challenged.

A)initial learning can be blocked.
B)working memory can be hindered.
C)demonstration of skills and concepts on assessments can be hindered.​
D)long term memory can be hindered.​

A)algebra.
B)problem solving.
C)measurement.
D)geometry.

A)Make sure math vocabulary is embedded  into the content, modeled, and used frequently as part of every lesson
B)For diverse students and English language learners, avoid mathematical vocabulary and teach using simpler terms
C)Use correct, universal mathematical terms when teaching, and put them on cards, posters, or labels
D)Use visual imagery, keyword mnemonics, and connections to prior learning

A)Advance organizers in the form of questions, prompts on a card or worksheet, etc. should be used
B)Explicit instructions in self-monitoring, such as using "think alouds" to model your own thinking process, help students develop reasoning skills
C)Strategies such as the STAR strategy help students to visualize how to solve an equation
D)Assessment of prerequisite mathematical skills is not necessary when planning algebra instruction

A)no significant difference was found in the conventional math knowledge of four-year-old children according to their socioeconomic status.
B)the more "teacher talk" about mathematics that occurs the greater the overall achievement in math by all students.
C)early development in math has long term effects on math achievement.
D)promoting "best practices" in math instruction at the preschool level can set the stage for future math success.

A)creating a storyboard.
B)creating timed competitions.
C)using mnemonic strategies.
D)using multisensory manipulatives.​

A)concrete representations of geometric shapes.
B) independent practice worksheets and homework assignments to assist students in remediating weak and underdeveloped math skills.
C)posters, models, and computer presentations to represent geometric skills and concepts.
D)specialized computer programs such as Dynamic Geometry Software (DGS).

A)younger students enjoy collecting, organizing, analyzing, and displaying data but these are not age appropriate activities for older students.
B)data collection can easily occur in all areas of the curriculum, thus reinforcing mathematical concepts.​
C)graphing student preferences, such as favorite movies, music, etc., can activate the affective domain.
D)probability lessons lend themselves quite easily to employing multisensory learning.

A)completed multisensory, TouchMath tools such as beans, foam dots, and pipe cleaner circles that can represent the relationship between numbers and values.
B)left to right subtraction algorithms to help students who have difficulty with right to left work or with regrouping.
C)lesson extensions where student are expected to intuitively be able to transfer the basic principles in math to real life problem solving.
D)the lattice multiplication method to break down large multiplication problems into small, manageable steps.