its AD and BC, and AD means anno domini (greek) means after the birth of christ and BC stands for before christ,before the birth of jesus.
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BDL stands for bad luck luser!
"la BD" stands for "Bande Dessinée", which is French for comics. "Ma passion c'est la BD" means "Comics is my passion".
AD stands for Anno Domini meaning "after Christ". So 498 AD is 498 years after the birth of Christ.
Most often it stands for Date of Birth.
AD stands for the Latin Anno Domini or 'in the year of our lord'.
If bd ≠ 0, then a/b + c/d (the common denominator is bd) = (a x d)/(b x d) + (c x b)/(d x b) = ad/bd + cb/db = ad/bd + cb/bd = (ad + cb)/ bd
AD means that Anno Domini , the year of lord and BD means that Before Christ
It stands for Bandes Dessinees which means comic books
Infinitely many ways!Suppose you have the fraction 2/d.Pick any pair of integers a and b where b � 0.Then 2b-ad is and integer, as is bd so that (2b - ad)/bd is a fraction.Consider the fractions a/b and (2b - ad)/bdTheir sum isa/b + (2b-ad)/bd = ad/bd + (2b-ad)/bd = 2b/bd = 2/d - as required.Since a and b were chosen arbitrarily, there are infinitely many possible answers to the question.
bd stands for business development and sales is commonly known to everyone.
BD in some educational systems stands for Bachelors Degree.
BD is in reference to administration of drugs and it stands for twice a day, or "bi-daily".
BD which stands for Bahraini Dinars.
AD stands for "Anno Domini," which means "In the Year of Our Lord." It's the speculated date of Christ's birth. There is no year "Zero," so it goes from 1BC to AD1.
A rational number is one that can be expressed as a/b The sum of two rational numbers is: a/b + c/d =ad/bd + bc/bd =(ad+bc)/bd =e/f which is rational The difference of two rational numbers is: a/b - c/d =ab/bd - bc/bd =(ab-bc)/bd =e/f which is rational The product of two rational numbers is: (a/b)(c/d) =ac/bd =e/f which is rational
BDL stands for bad luck luser!
The difference of two rational numbers is rational. Let the two rational numbers be a/b and c/d, where a, b, c, and d are integers. Any rational number can be represented this way. Their difference is a/b-c/d = ad/bd-cb/bd = (ad-cb)/bd. Products and differences of integers are always integers. This means that ad-cb is an integer, and so is bd. Thus, (ad-cb)/bd is a rational number (since it is the ratio of two integers). This is equivalent to the difference of the original two rational numbers.