If it is inverse, they do the opposite. So as one increases, the other decreases, and vice versa.
Inverse proportion
It is false.
Yes, but the relationship need not be causal.
A negative correlation highlights the similarity of opposites. In a negative correlation, as the value of variable a increases, the value of variable b decreases. It can work the other way too, as the value of a decreases, the value of b increases. A negative correlation is also routinely referred to as an inverse. For instance, every time a person goes to jail, there is one less person in the work force. Therefore, incarceration rates, and work force numbers have an inverse relationship.
the output is halved
This is called an "inverse" relationship.
An inverse proportion between two variables is when the value of one variable increases, the other decreases. Mathematically, this is shown as: x = k / yn where x and y are the two variables, and k and n are constants.
Variables X and Y are in direct proportion is Y = c*X for some constant c (not zero). Then X increases whenever Y increases and conversely. Y increases by c times the increase in X. Variables X and Y are in inverse proportion is X*Y = k for some constant k (not zero). Then X increases whenevr Y decreases and conversely.
As the volume decreases, the pressure increases, and as the volume increases, the pressure decreases, which constitutes an inverse relationship
decreases
In an inverse relationship, one variable decreases while the other increases. As an equation, a basic inverse relationship looks like x = 1/y.
As viscocity increases fluid flow decreases ....in other words, the relationship is inverse.
Inverse
decrease
The inverse variation is the indirect relationship between two variables. The form of the inverse variation is xy = k where k is any real constant.
It is unrelated
inversely proportional or inverse proportion