increases by 10 percent increases by 10 percent increases by 10 percent
When one quantity is proportional to another, it indicates that one quantity is dependent on the other by a factor and increases/decreases with the other quantity. When the two quantities are equal, the output of both the quantities is said to be the same.
-- If doubling one quantity causes the other one to also double, the two quantitiesare directly proportional. Their ratio is always the same.-- If doubling one quantity causes the other one to drop by half, the two quantitiesare inversely proportional. Thier product is always the same.
Scaler Quantity- quantities which are described only by magnitude.Vector Quantity- quantities which are described by both magnitude as well as direction.
the quantities which have both magnitude and direction are called vector quantities
If quantity A is directly proportional to another quantity B, it means that if B is doubled so is A. When B is tripled so is A. It also works in the other direction; if A is tripled so is B. It works for any factor. In mathematical terms one may write: A = C * B Where C is some numerical constant.
Generally, if y increases as x increases, this is a hint that the quantity is directly proportional, and if y decreases as x increases, the relation might be inversely proportional. However, this is not always the case. x and y are directly proportional if y = kx, where k is a constant. x and y are inversely proportional if y = k/x, k is constant. This is the best way to tell whether the quantities are directly or inversely proportional.
When one quantity is proportional to another, it indicates that one quantity is dependent on the other by a factor and increases/decreases with the other quantity. When the two quantities are equal, the output of both the quantities is said to be the same.
ballai
In mathematics, or physics, if one quantity is proportional to the other, that means that if one quantity increases by a certain factor, the other quantity increases by the same factor. For example, if"y" is proportional to "x", and "x" increases by a factor 10, then "y" must also increase by a factor 10. Any relationaship that does NOT follow this rule is NOT proportional.
Quantity and price are proportional .as the price increases ,quantity is increases .as quantity is less and cheap then the market price fell down..example are cellphone ,electronics items etc.
it is a proportional relationship because a proportional relationship is known as a relationship between two quantities in which the ratio of one quantity to the other quantity is constant.
That's basically what rate means - a comparison of two proportional quantities.
-- If doubling one quantity causes the other one to also double, the two quantitiesare directly proportional. Their ratio is always the same.-- If doubling one quantity causes the other one to drop by half, the two quantitiesare inversely proportional. Thier product is always the same.
Having a due proportion, or comparative relation; being in suitable proportion or degree; as, the parts of an edifice are proportional., Relating to, or securing, proportion., Constituting a proportion; having the same, or a constant, ratio; as, proportional quantities; momentum is proportional to quantity of matter., Any number or quantity in a proportion; as, a mean proportional., The combining weight or equivalent of an element.
The theory of demand states that the relation between price and quantity demanded is inversely proportional i.e. if prices go up, quantity demanded falls if prices go down, quantity demanded increases
basically there are 2 component of ohm law 1 is current (I) and other is voltage(v).Current and voltage are directly proportional to each other. If one increases other also increases and vise versa .this give a new Quantity resistance(R). V=IR R=V/I
the differentiate between fundamental quantity and derived quantity?