You need a steep slope from one inlet to another.
It is a measure of rate of change. That is, when you change one variable, the slope tells you how much the other will (or should) change.
If two lines are parallel and one has a slope of 1.3, what is the slope of the other line?
If they are parallel then the slope of the other line is also 7
If you are asking for slope, the slope of one line is m, the slope of the other is -1/m. For example, if the slope for one line is 5, the slope of the other line is -1/5 = -0.2 . (Math Open Reference)
If two lines in a plane are perpendicular, then one of the following applies:1) Either one line is horizontal (slope zero) and the other is vertical (slope undefined), 2) Or the product of their slopes is equal to -1. For example, one line might have a slope of 2, and the other, -1/2.
If they are in the (x,y) plane , then NO!!! However, if one line is in the (x,y) plane , and the other in is in thr (y,z) or (x,z) plane(s) , then they can intersect, and have the same slope.
The slope of line AB will be 1/2. Two parallel lines will always have the same slope, so if you know the slope of one line that is parallel to another, you know the other line's slope.
Th opposite reciprocal. So if one line has a slope of 2 then the other line will have a slope of -1/2
All of them do. If a certain slope goes downhill in one direction, it will go uphill if you look from the other side.All of them do. If a certain slope goes downhill in one direction, it will go uphill if you look from the other side.All of them do. If a certain slope goes downhill in one direction, it will go uphill if you look from the other side.All of them do. If a certain slope goes downhill in one direction, it will go uphill if you look from the other side.
The slope of a line represents the rate of change between two variables. A positive slope indicates a direct relationship, where one variable increases as the other increases. A negative slope indicates an inverse relationship, where one variable decreases as the other increases. The steeper the slope, the greater the rate of change between the variables.
-(1/3)
The slope will tell you how much change of Y to X >.