Inequalities and their Graphs
... equal sign (eliminate parentheses and combine like terms). Use the addition property of equality to isolate the variable terms from the constant terms on opposite sides of the equal sign. Use the multiplication property to make the coefficient of the variable equal to one. Check your results by eval ...
... equal sign (eliminate parentheses and combine like terms). Use the addition property of equality to isolate the variable terms from the constant terms on opposite sides of the equal sign. Use the multiplication property to make the coefficient of the variable equal to one. Check your results by eval ...
Full text
... A rational number r is said to be divisible by a prime number p provided the numerator of r is divisible by p . Here it is assumed that all rational numbers are written in standard form. That is, the numerators and denominators are relatively prime integers and the denominators are positive. Certain ...
... A rational number r is said to be divisible by a prime number p provided the numerator of r is divisible by p . Here it is assumed that all rational numbers are written in standard form. That is, the numerators and denominators are relatively prime integers and the denominators are positive. Certain ...
Real Number Properties and Basic Word Problems
... This means to arrange numbers in the order from the smallest to the largest. HINT: If there are fractions it might be easier to convert to decimals first. ...
... This means to arrange numbers in the order from the smallest to the largest. HINT: If there are fractions it might be easier to convert to decimals first. ...
Sequences - Web Maths!
... The answer is always 2. Explain by showing what happens when the number is N. * Students simplify 3(p+2)+4(p+3)-5(p-2) as quickly as they can (speed test). * Play ‘missing buddies’. Draw two tables out, one called Factorised and the other Expression. Students have to match up any buddies and fill in ...
... The answer is always 2. Explain by showing what happens when the number is N. * Students simplify 3(p+2)+4(p+3)-5(p-2) as quickly as they can (speed test). * Play ‘missing buddies’. Draw two tables out, one called Factorised and the other Expression. Students have to match up any buddies and fill in ...
Demonstrative Math 800
... A circle is bisected by any diameter The base angles of an isosceles triangle are equal Two triangles are congruent if they have two angles and one side in each respectfully equal. ...
... A circle is bisected by any diameter The base angles of an isosceles triangle are equal Two triangles are congruent if they have two angles and one side in each respectfully equal. ...
Jeopardy
... Which of the following elevations is lower than 4.25 ft. 4 ft, 18, ft, 3ft, 2.5 ft, -1.2 ft, 14 ft ...
... Which of the following elevations is lower than 4.25 ft. 4 ft, 18, ft, 3ft, 2.5 ft, -1.2 ft, 14 ft ...
Full text
... Thus, our assumption implies that (a, b, c) satisfies Fermat's Last Theorem. Conversely, suppose that there exists a positive integer triplet (a, h, c) which satisfies (5) for some n>2, i.e., suppose Fermat's Last Theorem is false. If b - a, then c/a = 2l/n, which is patently impossible; thus, witho ...
... Thus, our assumption implies that (a, b, c) satisfies Fermat's Last Theorem. Conversely, suppose that there exists a positive integer triplet (a, h, c) which satisfies (5) for some n>2, i.e., suppose Fermat's Last Theorem is false. If b - a, then c/a = 2l/n, which is patently impossible; thus, witho ...
Transcendence of generalized Euler constants,
... limiting process), it is often very hard to determine whether it is algebraic or transcendental. Let us consider three famous mathematical constants, π, e, and the Euler constant γ , often referred to as the “holy trinity.” The transcendence of π and e was shown by Ferdinand Lindemann in 1882 and Ch ...
... limiting process), it is often very hard to determine whether it is algebraic or transcendental. Let us consider three famous mathematical constants, π, e, and the Euler constant γ , often referred to as the “holy trinity.” The transcendence of π and e was shown by Ferdinand Lindemann in 1882 and Ch ...
Infinity + Infinity
... account for every object - then obviously the set in question must be uncountable. In fact, an equivalent definition of an uncountable set is a set with cardinality greater than ℵ0 , i.e. any set that is not countable is uncountable. (The Continuum Hypothesis, proven by Paul Cohen, actually states t ...
... account for every object - then obviously the set in question must be uncountable. In fact, an equivalent definition of an uncountable set is a set with cardinality greater than ℵ0 , i.e. any set that is not countable is uncountable. (The Continuum Hypothesis, proven by Paul Cohen, actually states t ...
