To evaluate integer questions that involve multiple signs:
... The addition of integers can be shown by moves on a number line. - Start at the first integer - Move to the right for positive integers - Move to the left for negative integers To subtract an integer, add its opposite. Example 1: Evaluate. a) (+3) + (+4) b) (-3) + (-4) c) (+3) + (-4) d) (-3) + (+4) ...
... The addition of integers can be shown by moves on a number line. - Start at the first integer - Move to the right for positive integers - Move to the left for negative integers To subtract an integer, add its opposite. Example 1: Evaluate. a) (+3) + (+4) b) (-3) + (-4) c) (+3) + (-4) d) (-3) + (+4) ...
Microsoft Word version
... □ Examples of patterns in number sequences □ An exploration of infinite sets □ An introduction/review of the use of formulas in mathematics □ The distinction between the pattern rule and the resulting sequence 2. Growth Rates of Sequences □ Why different sequences grow at very different rates □ Meas ...
... □ Examples of patterns in number sequences □ An exploration of infinite sets □ An introduction/review of the use of formulas in mathematics □ The distinction between the pattern rule and the resulting sequence 2. Growth Rates of Sequences □ Why different sequences grow at very different rates □ Meas ...
SET
... a special set in that it has no elements. We have several names for it – Empty Set or Null Set or Void Set. Either way it has no elements and it can be represented in either of 2 ways. ...
... a special set in that it has no elements. We have several names for it – Empty Set or Null Set or Void Set. Either way it has no elements and it can be represented in either of 2 ways. ...
A Review of Basic Function Ideas
... Function: No x’s repeat (it is okay if the y’s repeat). On a graph, you can use the Vertical line test – each vertical line can only touch one point on the line) Domain: x’s ...
... Function: No x’s repeat (it is okay if the y’s repeat). On a graph, you can use the Vertical line test – each vertical line can only touch one point on the line) Domain: x’s ...
Math 111
... Part II: What place value is each underlined digit? 1) 146,789,000.04: ____________________ 2) 65, 933.7782: ______________________ ...
... Part II: What place value is each underlined digit? 1) 146,789,000.04: ____________________ 2) 65, 933.7782: ______________________ ...
Math 111
... Part II: What place value is each underlined digit? 1) 146,789,000.04: ____________________ 2) 65, 933.7782: ______________________ ...
... Part II: What place value is each underlined digit? 1) 146,789,000.04: ____________________ 2) 65, 933.7782: ______________________ ...
Notes
... Many books on analysis simply give the axioms, say 9 axioms for a field, 4 for order and one completeness axiom (every non empty set of real numbers which has an upper bound has a least upper bound). We could put these “specifications” into an OCaml module as a start, but it would not tell us how to ...
... Many books on analysis simply give the axioms, say 9 axioms for a field, 4 for order and one completeness axiom (every non empty set of real numbers which has an upper bound has a least upper bound). We could put these “specifications” into an OCaml module as a start, but it would not tell us how to ...
Infinity
Infinity (symbol: ∞) is an abstract concept describing something without any limit and is relevant in a number of fields, predominantly mathematics and physics.In mathematics, ""infinity"" is often treated as if it were a number (i.e., it counts or measures things: ""an infinite number of terms"") but it is not the same sort of number as natural or real numbers. In number systems incorporating infinitesimals, the reciprocal of an infinitesimal is an infinite number, i.e., a number greater than any real number; see 1/∞.Georg Cantor formalized many ideas related to infinity and infinite sets during the late 19th and early 20th centuries. In the theory he developed, there are infinite sets of different sizes (called cardinalities). For example, the set of integers is countably infinite, while the infinite set of real numbers is uncountable.