It depends on the direction of the relationship.
Consider y = x2 where x is a real number.
The relationship from x to y is a function but the one in the opposite direction (x = sqrt(y) is not a function because it is a one-to-many mapping.
mom & son
In that case, one quantity (the quantity that depends on the other) is said to be a function of the other quantity.
The word sought is probably "function", although in some contexts "equation" would also work.
The answer depends on the quantities and the nature of the relationship. It can be a line-of-best-fit (or regression line), or a formula.
-3x + 4x = 12 x = 12 A graph normally shows the relationship between two interconnected quantities, such as 'x' and 'y' . This equation can't be graphed. There's only one quantity ... 'x' . It doesn't depend on any other quantity, and no other quantity depends on 'x'. 'x' is 12, it's always 12, and it doesn't change, and that's the whole story.
It depends of what kind of squared b and squared c your talking about... Sorry Hun! It depends "of" what kind of squared b and squared c "your" talking about... Sorry Hun! What the heck is that even supposed to mean (even without the mispelling and bad grammar)? a2 b2 and c2 are all unknown quantities - without extra symbols it's impossible to state a relationship between the three numbers.
In that case, one quantity (the quantity that depends on the other) is said to be a function of the other quantity.
The word sought is probably "function", although in some contexts "equation" would also work.
Function
it would be a function * * * * * Not always. It depends on the direction of the relationship. Consider y = x2 where x is a real number. The relationship from x to y is a function but the one in the opposite direction (x = sqrt(y) is not a function because it is a one-to-many mapping.
function
What is the proper term for a relationship between two variables in which one quantity depends on the other It depends on the direction of the relationship. Consider y = x2 where x is a real number. The relationship from x to y is a function but the one in the opposite direction (x = sqrt(y) is not a function because it is a one-to-many mapping.
these type of quantities are called derived quantities. Their value depends on some fundamental quantities or some other derived quantities. eg. force is a derived quantity whose value depends on mass(fundamental) and acceleration(derived).
The answer depends on the quantities and the nature of the relationship. It can be a line-of-best-fit (or regression line), or a formula.
Fundamental quantities r those which r independent of other quantities and r scaler and on the other hand derived quantities r those which depends on fundamental quantities!! For example metre sqaure!
limited by the quantity of that nutrient - its the limiting stepthe actually rate of growth depends on the relationship between tha nutrient and the growth rate if its a linear relationship then growth rate = k[Nutrient]
-3x + 4x = 12 x = 12 A graph normally shows the relationship between two interconnected quantities, such as 'x' and 'y' . This equation can't be graphed. There's only one quantity ... 'x' . It doesn't depend on any other quantity, and no other quantity depends on 'x'. 'x' is 12, it's always 12, and it doesn't change, and that's the whole story.
Function!:) * * * * * It depends on the direction of the relationship. Consider y = x2 where x is a real number. The relationship from x to y is a function but the one in the opposite direction (x = sqrt(y) is not a function because it is a one-to-many mapping.