Any two non-zero quantities are always proportional. If the two quantities are X and Y, they are proportional to X/Y.
The answer is proportional.
Any two ratios, provided the second is not 0, form a proportion.
Graphical: If two variables are proportional, the graph of one of the variables against the other is a straight line through the origin.Algebraic: If the ratio of the two variables is a constant.
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.
Compound proportion refers to a mathematical relationship between two ratios where multiple quantities are compared. It involves comparing multiple ratios involving more than two quantities in a proportional relationship.
Two numbers, 155 and 945, do not form a proportion.
Any two non-zero quantities are always proportional. If the two quantities are X and Y, they are proportional to X/Y.
Two quantities and are said to be inversely proportional (or "in inverse proportion") if is given by a constant multiple of , i.e., for a constant. This relationship is commonly written
The answer is proportional.
A proportion is an equation written in the form Proportion stating that two ratios are equivalent. In other words, two sets of numbers are proportional if one set is a constant times the other.
If two quantities are directly proportional, when one quantity increases by 10 percent, the other quantity will also increase by 10 percent. This means that the relationship between the two quantities remains consistent as they change by the same proportion.
Proportional
A proportional relationship between two quantities is one in which the two quantities called the unit rate, the rate of change, or the constant of proportionality.
Two quantities are said to be proportional if they vary in such a way that one of the quantities is a constant multiple of the other, or equivalently if they have a constant ratio.
In mathematics, two quantities are proportional if they vary in such a way that one of them is a constant multiple of the other.
Increases