Search results
Results from the WOW.Com Content Network
Although composite, 145 is a Fermat pseudoprime in sixteen bases with b < 145. In four of those bases, it is a strong pseudoprime: 1, 12, 17, and 144.; the Mertens function returns 0.
In numerology, gematria (/ ɡ ə ˈ m eɪ t r i ə /; Hebrew: גמטריא or גימטריה, gimatria, plural גמטראות or גימטריות, gimatriot) [1] is the practice of assigning a numerical value to a name, word or phrase by reading it as a number, or sometimes by using an alphanumerical cipher.
The 5,624 Greek root words used in the New Testament. (Example: Although the Greek words in Strong's Concordance are numbered 1–5624, the numbers 2717 and 3203–3302 are unassigned due to "changes in the enumeration while in progress". Not every distinct word is assigned a number, but rather only the root words.
The English language has a number of words that denote specific or approximate quantities that are themselves not numbers. [1] Along with numerals, and special-purpose words like some, any, much, more, every, and all, they are Quantifiers. Quantifiers are a kind of determiner and occur in many constructions with other determiners, like articles ...
Hyphenate all numbers under 100 that need more than one word. For example, $73 is written as “seventy-three,” and the words for $43.50 are “Forty-three and 50/100.”
Get AOL Mail for FREE! Manage your email like never before with travel, photo & document views. Personalize your inbox with themes & tabs. You've Got Mail!
Creates a link to Strong Concordance of the specific word to a lexicon at BlueLetterBible.org. Template parameters [Edit template data] Parameter Description Type Status Word 1 The word in original language or transliterated String required Language code 2 H for Hebrew; or G for Greek. This will direct the number to the Strong Concordance Hebrew Numbering or Greek Numbering. String required ...
A powerful number is a positive integer m such that for every prime number p dividing m, p 2 also divides m. Equivalently, a powerful number is the product of a square and a cube, that is, a number m of the form m = a 2 b 3, where a and b are positive integers. Powerful numbers are also known as squareful, square-full, or 2-full.