By: Keely Hunter 6 th period Tecnology.  Any whole number and/or the additive inverse of a whole number is an integer.

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Presentation transcript:

By: Keely Hunter 6 th period Tecnology

 Any whole number and/or the additive inverse of a whole number is an integer

 A number that can be written as a fraction, or as finite or repeating decimals. The square root of 2 ( ) is not a rational number.

 A representation of very large or very small numbers as the product of two factors: a × 10 n, where 1 < a < 10.For example, the speed of light, 299,790,000 (m/s), can be written as ×10 8 (m/s).

 A number whose square root is an integer.For example, 4 is a perfect square because its square root is the integer 2.

 A number that cannot be expressed as a fraction. Examples include some square roots such as 2 1/2 and 3 1/2, and numbers such as (the ratio of the circumference of a circle to its diameter).

 All the numbers that includes all rational and irrational numbers.

 The property that states that there always exists another rational number between any two given rational numbers. This means that the set of rational numbers is dense.

 Two angles that share the same vertex and have one side in common between them.

 The number part in front of the non- numerical symbol(s) in an algebraic expression, signifying multiplication. For example, the number 4 in the expression 4xy is a coefficient.

 The distance between two points (x 1, y 1 ) and (x 2, y 2 ) in the Cartesian coordinate system can be given by:[(x 1 - x 2 ) 2 + (y 1 - y 2 ) 2 ] 1/2

 The set of all possible input values for a function or relation

 The side opposite the right angle in a right triangle.

 Either of the two sides that form the right angle in a right triangle or one of the two congruent sides in an isosceles triangle.

 A number that can be written as a fraction, or as finite or repeating decimals. The square root of 2 ( ) is not a rational number.

 The difference between the maximum and minimum values in a set of data.

 Another name for gradient.

 A representation of very large or very small numbers as the product of two factors: a × 10 n, where 1 < a < 10.For example, the speed of light, 299,790,000 (m/s), can be written as ×10 8 (m/s).

 A space figure with two parallel polygonal bases that are the same shape and the same size.

 Data that is plotted as points on a graph to show a possible relationship between two sets of data.

 An algebraic equation, such as y = 2x + 7 or 3x + 2y - z = 4, in which the highest degree term in the variable or variables is of the first degree. The graph of such an equation is a straight line if there are two variables.