Deck 19: Developing Measurement Concepts

A)They focus directly on the attribute being measured.
B)Avoids conflicting objectives of the lesson on area or centimeters.
C)Provides good rational for using standard units.
D)Understanding of how measurement tools work.

A)Deciding whether to measure an item beginning with the end of the ruler
B)Deciding how to measure an object that is longer than the ruler
C)Properly using fractional parts of inches and centimeters
D)Converting between metric and customary units

A)P = l + w + l + w
B)P = l + w
C)P = 2l + 2w
D)P = 2(l + w)

A)Height and base.
B)Length and width.
C)Width and Rows
D)Number of square units

A)Area is a measure of two-dimensional space inside a region.
B)Direct comparison of two areas is not always possible.
C)Rearranging areas into different shapes does not affect the amount of area.
D)Area and perimeter formulas are often used interchangeably.

A)Familiarity with the unit.
B)Knowledge of relationships between units
C)Estimation with standard and nonstandard units
D)Ability to select and appropriate unit.

A)Refers to the amount a container will hold.
B)Refers to the amount of space of occupied by three-dimensional region.
C)Refers to the measure of only liquids.
D)Refers to the measure of surface area.

A)Helps focus on the attribute being measured.
B)Helps provide an extrinsic motivation for measurement activities.
C)Helps develop familiarity with the unit.
D)Helps promote multiplicative reasoning.

A)Measuring attribute with the wrong measurement tool.
B)Using wrong end of the ruler.
C)Counting hash marks rather than spaces.
D)Misaligning objects when comparing.

A)Basic idea if the measure is the same as the unit it is equal.
B)Basic idea that if the measure is larger the unit is longer.
C)Basic idea that if the measure is larger the unit is shorter.
D)Basic idea that if the measure is shorter the unit is shorter.

A)What attribute to measure?
B)What unit they can use to measure that attribute?
C)How to compare the unit to the attribute?
D)What formulas they should use to find the measurement?

A)A rectangle can be cut along a diagonal line and rearranged to form a non-rectangular parallelogram.Therefore the two shapes have the same formula.
B)A rectangle can be cut in half to produce two congruent triangles.Therefore,the formula for a triangle is like that for a rectangle,but the product of the base length and height must be cut in half.
C)The area of a shape made up of several polygons (a compound figure)is found by adding the sum of the areas of each polygon.
D)Two congruent trapezoids placed together always form a parallelogram with the same height and a base that has a length equal to the sum of the trapezoid bases.Therefore,the area of a trapezoid is equal to half the area of that giant parallelogram,½ h (b1 +b2).

A)Using measurement formulas.
B)Using physical models.
C)Using measuring instruments.
D)Using comparisons of attributes.

A)Iterating.
B)Tiling.
C)Comparing.
D)Matching.

A)Students focus on customary units of measurement.
B)Students focus on formulas versus actual measurements.
C)Students focus on conversions of standard to metric.
D)Students focus on metric unit of measurement as well as customary units.