Find the slope of the line determined by each relation. (time in hours, distance traveled at 50mi/h)
To find the slope of a line determined by a relation, we need to determine the rate of change between the variables involved in the relation.
The given relation is between time in hours and the distance traveled at a constant speed of 50 miles per hour (mi/h). Let's denote time as "t" and distance as "d".
Since the relationship is a constant speed, which means the distance traveled is constant for every hour, the slope of the line will be constant. In other words, the rate of change between time and distance will be consistent.
The slope of a line represents the rate of change between two variables. In this case, since the distance traveled is constant at 50 mi/h, the slope will be 50.
Therefore, the slope of the line determined by the relation between time in hours and distance traveled at 50 mi/h is 50.