Grade 4 Expectations in Math
http://www.cde.ca.gov/be/st/ss/mthgrade4.asp
Number
Sense
Students
understand the place value of whole numbers and decimals to two decimal places
and how whole numbers and decimals relate to simple fractions. Students use the
concepts of negative numbers:
·
Read
and write whole numbers in the millions.
·
Order and compare whole numbers and decimals to two decimal places.
·
Round
whole numbers through the millions to the nearest ten, hundred, thousand, ten
thousand, or hundred thousand.
·
Decide
when a rounded solution is called for and explain why such a solution may be
appropriate.
·
Explain
different interpretations of fractions, for example, parts of a whole,
parts of a set, and division of whole numbers by whole numbers; explain
equivalents of fractions (see Standard 4.0).
·
Write
tenths and hundredths in decimal and fraction notations and know the
fraction and decimal equivalents for halves and fourths (e.g., 1/2 = 0.5 or
.50; 7/4 = 1 3/4 = 1.75).
·
Write
the fraction represented by a drawing of parts of a figure; represent a
given fraction by using drawings; and relate a fraction to a simple decimal on
a number line.
·
Use
concepts of negative numbers (e.g., on a number line, in counting, in
temperature, in "owing").
·
Identify
on a number line the relative position of positive fractions, positive
mixed numbers, and positive decimals to two decimal places.
2.0 Students extend their use and understanding
of whole numbers to the addition and subtraction of simple decimals:
·
Estimate and compute the sum or difference
of whole numbers and positive decimals to two places. (adding and subtracting)
·
Round two-place
decimals to one decimal or the nearest whole number and judge the
reasonableness of the rounded answer.
3.0 Students solve problems involving
addition, subtraction, multiplication, and division of whole numbers and
understand the relationships among the operations:
·
Add
and subtract multi digit numbers.
·
Multiply
a multi digit number by a two-digit number
·
Divide
a multi digit number by a one-digit number
·
Check
results by using the opposite operation
4.0 Students know how to factor small whole
numbers:
·
Understand that many whole numbers break down in
different ways (e.g., 12 = 4 x 3 = 2 x 6 = 2 x 2 x 3).
·
Know that numbers such as 2, 3, 5, 7, and 11 do
not have any factors except 1 and themselves and that such numbers are called prime
numbers.
Algebra and Functions
1.0
Students
use and interpret variables, mathematical symbols, and properties to write and
simplify expressions and sentences:
· Use letters, boxes, or other symbols to stand for any number in
simple expressions or equations (e.g., demonstrate an understanding and the use
of the concept of a variable).
· Interpret and evaluate mathematical expressions that now use
parentheses.
· Use parentheses to
indicate which operation to perform first when writing expressions
containing more than two terms and different operations.
· Use and interpret formulas (e.g., area
= length x width or A = lw) to answer questions about
quantities and their relationships.
· Understand that an equation such as y = 3 x + 5
is a prescription for determining a second number when a first number is
given.
2.0
Students know how to manipulate
equations:
· Know and understand that equals added to equals are equal.
· Know and understand that equals multiplied by equals are equal.
1.0
Students understand perimeter and area:
· Measure the area of rectangular shapes by using appropriate
units, such as square centimeter (cm2), square meter (m2), square
kilometer (km2), square inch (in2), square yard (yd2), or square mile (mi2).
· Recognize that rectangles that have the same area can have
different perimeters.
· Understand that rectangles that have the same perimeter can have
different areas.
· Understand and use formulas to solve problems involving perimeters
and areas of rectangles and squares. Use those formulas to find the areas of
more complex figures by dividing the figures into basic shapes.
2.0
Students use two-dimensional coordinate grids to represent points and graph
lines and simple figures:
· Draw the points corresponding to linear relationships on graph
paper (e.g., draw 10 points on the graph of
the equation y = 3 x and connect them by using a straight
line).
· Understand that the length of a horizontal line segment equals the
difference of the x- coordinates.
· Understand that the length of a vertical line segment equals the
difference of the y- coordinates.
3.0
Students demonstrate an understanding of plane and solid geometric objects and
use this knowledge to show relationships and solve problems:
· Identify lines that are parallel and perpendicular.
· Identify the radius and diameter of a circle.
· Identify congruent figures.
· Identify figures that have bilateral and rotational symmetry.
· Know the definitions of a right angle, an acute angle, and an
obtuse angle. Understand that 90°, 180°, 270°, and 360° are associated,
respectively, with 1/4, 1/2, 3/4, and full turns.
· Visualize, describe, and make models of geometric solids
(e.g., prisms, pyramids) in terms of the number and shape of faces, edges, and
vertices; interpret two-dimensional representations of three-dimensional
objects; and draw patterns (of faces) for a solid that, when cut and folded,
will make a model of the solid.
· Know the definitions of different triangles (e.g.,
equilateral, isosceles, scalene) and identify their attributes.
· Know the definition of different quadrilaterals (e.g.,
rhombus, square, rectangle, parallelogram, trapezoid).
1.0
Students organize, represent, and interpret numerical and categorical
data and clearly communicate their findings:
·
Formulate
survey questions; systematically collect and represent data on a number
line; and coordinate graphs, tables, and charts.
·
Identify
the mode(s) for sets of categorical data and the mode(s), median, and
any apparent outliers for numerical data sets.
·
Interpret
one-and two-variable data graphs to answer questions about a situation.
2.0
Students make predictions for simple probability situations:
· Represent all possible outcomes for a
simple probability situation in an organized way (e.g., tables, grids, tree
diagrams).
· Express outcomes of experimental
probability situations verbally and numerically (e.g., 3 out of 4; 3 /4).
1.0
Students make decisions about how to approach problems:
· Analyze problems by:
o
Identifying relationships
o
Distinguishing relevant from irrelevant
information
o
Sequencing and prioritizing
information
o
Observing patterns.
· Determine when and how to break a problem into simpler parts.
2.0
Students use strategies, skills, and concepts in finding solutions:
·
Use estimation to verify the reasonableness of calculated results.
·
Apply
strategies and results from simpler problems to more complex problems.
·
Use
a variety of methods, such as words, numbers, symbols, charts, graphs, tables,
diagrams, and models, to explain mathematical reasoning.
·
Express
the solution clearly and logically by using the appropriate mathematical
notation and terms and clear language; support solutions with evidence
in both verbal and symbolic work.
·
Indicate
the relative advantages of exact and approximate solutions to problems
and give answers to a specified degree of accuracy.
·
Make
precise calculations and check the validity of the results from the
context of the problem.
3.0
Students move beyond a particular problem by generalizing to other situations:
·
Evaluate
the reasonableness of the solution in the context of the original
situation.
·
Note
the method of deriving the solution and demonstrate a conceptual understanding
of the derivation by solving similar problems.
·
Develop
generalizations of the results obtained and apply them in other
circumstances.